In [74]:
n_A = 216
n_B = 137
l_A = 2
l_B = 3
n_A, n_B, l_A, l_B
Out[74]:
(216, 137, 2, 3)
In [75]:
p = l_A^n_A * l_B^n_B -1
p, is_prime(p)
Out[75]:
(24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567,
 True)
In [76]:
F.<i> = GF(p^2, modulus=x^2+1)
F
Out[76]:
Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [77]:
E = EllipticCurve(F, [0, 6, 0, 1, 0])
p, F, E, E.is_supersingular()
Out[77]:
(24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567,
 Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 True)
In [78]:
def isogeny_walk (E,R,l, a):
    Ei, Ri = E, R
    Phi = E.isogeny(E(0))
    for j in (a-1, a-2 .. 0):
         R1 = l^j * Ri
         phi = Ei.isogeny(R1)
         Phi = phi*Phi
         Ei = phi.codomain()
         Ri = phi(Ri)
    return Phi
In [79]:
# un point de l_A^n_A = 2^216-torsion sur E
P0 = E(0)
while (2^(n_A - 1))*P0 == 0:
    P0 = l_B^n_B*E.random_point()
P0, P0.order() == l_A^n_A
Out[79]:
((11692668493819457538241069705101150852190462902600699270227329824829566133195793293367341447100145308831576142138524983163668586767*i + 10698373140280377200321048931473677716025596894391735595957636674412886271309614091889994508290674988066120010296880208279333556628 : 668987396257869331121576850357237221851636711872389917463908013494608175339888275449285223461013069534471888348320439106080233937*i + 7095772857248243995546732777553584722423123619462287340111367109781310670586366843704976410385611919259955769587387915749839737219 : 1),
 True)
In [80]:
Q0 = P0
while P0.weil_pairing(Q0, l_A^n_A)^(l_A^(n_A - 1)) == 1:
    Q0 = l_B^n_B* E.random_point()
Q0, Q0.order() == l_A^n_A
Out[80]:
((2445315898819509247819221530436545536858205653511680988570934320038615562889158041152291231648111091804240123179591637069117415678*i + 8806496941114829339590524252125586849628260640936018522909452915777895122465988235564634503880170077372875550542356617622544944652 : 15105232200739939264010168128476725815432058863758577145562089085161242950264659980496634044538472402461761174697697261456349927708*i + 22449349027614998757826361533264610375392386982759799343007292088151880499001412761454314403174570756834496046496490148058693401376 : 1),
 True)
In [81]:
# un point de l_B^n_B = 3^137-torsion sur E
P1 = E(0)
while (3^(n_B - 1))*P1 == 0:
    P1 = l_A^n_A*E.random_point()
P1, P1.order() == l_B^n_B
Out[81]:
((1267896454969831011747006248009225131715228544297693948944694235425865586312700144614683811476700945670524499119049326216511646921*i + 14423317350650748134831191209325943666661601486250179153427482328436083013294995576142267252853568094549741498991675067507766249491 : 13023401648389096097449646682148010555132534220998775213414973103538979475279345258527764942585267580221181775360442503339775387412*i + 1227785435391166209202564958867908213713043503213521775114395528448381187260665794725535382307051970912201513372094838745051176118 : 1),
 True)
In [82]:
Q1 = P1
while P1.weil_pairing(Q1, l_B^n_B)^(l_B^(n_B - 1)) == 1:
    Q1 = l_A^n_A* E.random_point()
Q1, Q1.order() == l_B^n_B
Out[82]:
((23682299195553928375552559395733993387192887931954628545967679902321734590014351979825093636887404623159951922948890499154413874410*i + 24061073322786351790613592173453433470487982659087864857332722847959442378654348547713463541868619627444685101564271243640149963682 : 8648224394947774767312047013034741784920617832112358817106520660273552214792372144415754788964724539382172233529147261771474492099*i + 23073464716580606459853680886834140799749560099336248133999449818307111642056682337048550375696869935558529344237836648416410266933 : 1),
 True)
In [83]:
S3 = randint(0, l_B^n_B - 1)
S5 = randint(0, l_B^n_B - 1)
R3 = P1 + S3 * Q1
R5 = P1 + S5 * Q1
R3, R3.order() == l_B^n_B, R5, R5.order() == l_B^n_B
Out[83]:
((119171564082236739692339677718321555856820512366122190588019849246680749896728537563598370350850046814539985713315682993105106327*i + 1647974970299425697805883653370945061054854131330059773581337600080846865150010214421726591906082981354749526584089330260020831766 : 11743664439412799524068556874614245502971661486649083479679689520146034645753712798830864387732230698398698900586759323998810938671*i + 21203566249383922775902242036572652053808812359971539765098792364081848832067226758370770287469244979442519707096403111944453038907 : 1),
 True,
 (21598645732094178203555550346687168772077162494688706573273967324448305200131550932972502274163282461571855212922138683343795077451*i + 2697617661471693970274767542865886357548912735128547724901734078911793777119118149176159140240299621311913216209313023118144914527 : 13359879886611853154513400855975276856086411016885006035790848334860769921686733129336683186612238990070934858606137849279823134505*i + 12973472254506511620456460621793038807995402334479283499720459785061207710618920376273288561814534651839120990599478125326978192074 : 1),
 True)
In [84]:
Phi3 = isogeny_walk (E, R3, l_B, n_B)
Phi3
Out[84]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 4813219499806256080727360664475860652733186331573760157358957127654698345021523345903606250811847755265270184703092745751596166671*x + 8128306828198975511370882453904078308531459311946487122736624031357472915020620097055819354221408300507484961940652068289827994951 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 4813219499806256080727360664475860652733186331573760157358957127654698345021523345903606250811847755265270184703092745751596166671*x + 8128306828198975511370882453904078308531459311946487122736624031357472915020620097055819354221408300507484961940652068289827994951 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 18632326121661071058663921534467355458015364978920978301508021511158795791239391719633602079301178450129648619257596271201795385020*x + 7384078133599120960650310732813614942107088448191329357616051198652742921033321455684467967062596395491393382649246851484472333570 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 18632326121661071058663921534467355458015364978920978301508021511158795791239391719633602079301178450129648619257596271201795385020*x + 7384078133599120960650310732813614942107088448191329357616051198652742921033321455684467967062596395491393382649246851484472333570 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7901789486882341682542727971582840727668357368959544453182639297795751144326689643856738370831611661936833629972636832223364327984*i+6230810348761250982976259304580557564930818856860588910726908267173705662800529018235838533049818316202936008240062572569866135167)*x + (18824687580469455619172615927507897506341438451759982867616419457478777427900558063353903970234747652202511693722359337518151840437*i+2598238898580065097735181847884488273705562697920029435990765594270964702225119075848694867513418855898599406548662634987561632172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7901789486882341682542727971582840727668357368959544453182639297795751144326689643856738370831611661936833629972636832223364327984*i+6230810348761250982976259304580557564930818856860588910726908267173705662800529018235838533049818316202936008240062572569866135167)*x + (18824687580469455619172615927507897506341438451759982867616419457478777427900558063353903970234747652202511693722359337518151840437*i+2598238898580065097735181847884488273705562697920029435990765594270964702225119075848694867513418855898599406548662634987561632172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21968775495219856630586740170518362846403630589756181405935134850513191619837636105951943430545182793242070699183613176633512021736*i+17559803870791511439639123390147247019278438454931334278543776961079764087340291151790839960464793274650895824187542248445265827354)*x + (9211148080508789451995263090716941760369648666099043420273230624297801216312856198499642693506473884664921726466665802986820623850*i+16333429018218450939635263241627160158429220079770238020330847802698431358293995308408936458151258768687966265770535616910021178791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21968775495219856630586740170518362846403630589756181405935134850513191619837636105951943430545182793242070699183613176633512021736*i+17559803870791511439639123390147247019278438454931334278543776961079764087340291151790839960464793274650895824187542248445265827354)*x + (9211148080508789451995263090716941760369648666099043420273230624297801216312856198499642693506473884664921726466665802986820623850*i+16333429018218450939635263241627160158429220079770238020330847802698431358293995308408936458151258768687966265770535616910021178791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22686549599936007464226467069804175012846708105102190589603368040533716934403822181801375417041404246446824124123088032994717759357*i+4091811506909263025165876291197009572710364551654164874228708792338559384244563955729831917019563408521684213464500641864686732135)*x + (7773647539731622565863185806914115010910318282979013346600364529150424125866546976273880223210265216099493704223963777452011046548*i+24138397085910104862292540191360437444714314915602960951572443931011940581874337327286826419492590009621626322519860080156056593926) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22686549599936007464226467069804175012846708105102190589603368040533716934403822181801375417041404246446824124123088032994717759357*i+4091811506909263025165876291197009572710364551654164874228708792338559384244563955729831917019563408521684213464500641864686732135)*x + (7773647539731622565863185806914115010910318282979013346600364529150424125866546976273880223210265216099493704223963777452011046548*i+24138397085910104862292540191360437444714314915602960951572443931011940581874337327286826419492590009621626322519860080156056593926) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5064541608861160544149736190012006034839047793006161490463780644682397533304079885242844296428851168021928728240370322979879175760*i+10060217962754039936522244639828125824818446044288714885510627385196129661506207650914704888980779801738717315627762333397531726779)*x + (19709929135070573299471960399925692370753111181298308663322840728724303423130921449470194265334174302146788385380233324988586758040*i+8374476996681558830126535602728937432052751569029739335252821689910140393943610854590854802049703002589258548515532185959299502140) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5064541608861160544149736190012006034839047793006161490463780644682397533304079885242844296428851168021928728240370322979879175760*i+10060217962754039936522244639828125824818446044288714885510627385196129661506207650914704888980779801738717315627762333397531726779)*x + (19709929135070573299471960399925692370753111181298308663322840728724303423130921449470194265334174302146788385380233324988586758040*i+8374476996681558830126535602728937432052751569029739335252821689910140393943610854590854802049703002589258548515532185959299502140) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (389912915193907071657881821846645923157073863428234744334311991230898250412007949363903381830396629078972692704643523473189431602*i+18770505208239206795820724521378879266863625051252702701411538797976358305006462837902425290763487530977356388668808712352025375887)*x + (10371325878327902553750555415486459119084551785557104619538637616745450285933816131794616554420403187452213615361943392776144562242*i+12004924292003520576327337564997882845501009380661295874298846240528113494394071769467007221023317432799551682337762413420823465692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (389912915193907071657881821846645923157073863428234744334311991230898250412007949363903381830396629078972692704643523473189431602*i+18770505208239206795820724521378879266863625051252702701411538797976358305006462837902425290763487530977356388668808712352025375887)*x + (10371325878327902553750555415486459119084551785557104619538637616745450285933816131794616554420403187452213615361943392776144562242*i+12004924292003520576327337564997882845501009380661295874298846240528113494394071769467007221023317432799551682337762413420823465692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16967004276246421260169400299318618502133724926821698707474974470708736318739519451696904253693721137854428082134120062859196832812*i+2868284561314266925058964801180759884908296570441731583185137341877679713919521565404992078264204605168088940708310654075540811538)*x + (20222882818253637199508632058313060616834209416056295701236204690687640540222343519695360435374356100596558191999125436423262935933*i+7121918987383413952843235832651415541109546034671823866118983011470301255970218830014483632125265695082656711405947107243109946063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16967004276246421260169400299318618502133724926821698707474974470708736318739519451696904253693721137854428082134120062859196832812*i+2868284561314266925058964801180759884908296570441731583185137341877679713919521565404992078264204605168088940708310654075540811538)*x + (20222882818253637199508632058313060616834209416056295701236204690687640540222343519695360435374356100596558191999125436423262935933*i+7121918987383413952843235832651415541109546034671823866118983011470301255970218830014483632125265695082656711405947107243109946063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16526920785412751307490510208925470175486567810917374910975225469048848634475795726897390867819367114376355605006492199780532687081*i+1930564269856477534816943496648876753007063358518387719063085055496654295216174088475897064077127354693276805497895284472378215576)*x + (1460591853129018707053291833636705277595622589337831384827815875210508805834639490794959285400958079266256965093846708880269644811*i+5243694153557448301756359924842890671434847757834833048093001583264706020082809215084703913008305782145935716342423807946889607505) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16526920785412751307490510208925470175486567810917374910975225469048848634475795726897390867819367114376355605006492199780532687081*i+1930564269856477534816943496648876753007063358518387719063085055496654295216174088475897064077127354693276805497895284472378215576)*x + (1460591853129018707053291833636705277595622589337831384827815875210508805834639490794959285400958079266256965093846708880269644811*i+5243694153557448301756359924842890671434847757834833048093001583264706020082809215084703913008305782145935716342423807946889607505) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24094827722266396259290972800167125592257862951176952776760957532697788958351906483616468830133329080240587145761794554019979012832*i+15225855035747448495964542826246639470181294412210353909054887814957813606786901130920504088940989136117583986816408211904915460895)*x + (12044098964798882366222646354424261292535200677952854973452562273677870531525347060522412043880598478768518546811881718211505876268*i+23210274282820489156559559918297181742962735870621620360148377491538681850609341793668409191393240431490896173773713027169869526984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24094827722266396259290972800167125592257862951176952776760957532697788958351906483616468830133329080240587145761794554019979012832*i+15225855035747448495964542826246639470181294412210353909054887814957813606786901130920504088940989136117583986816408211904915460895)*x + (12044098964798882366222646354424261292535200677952854973452562273677870531525347060522412043880598478768518546811881718211505876268*i+23210274282820489156559559918297181742962735870621620360148377491538681850609341793668409191393240431490896173773713027169869526984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13445582998965771974324194121783418606885133127875011326700128041676211340875833468188564935730430824668009217910071653301832912986*i+12649114558107306316312034398992660249290686338889358177650207193918328074573782119733910959134644904789194457412006051595335327220)*x + (20615705135894924708733590043777994884940142802013072284159714744761589819722936361371574845606274377255359521981730758898753932597*i+411796879899359675039586537656890750660244284806256390200327063988941658884349739617446413476974254221698753325494771516402378757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13445582998965771974324194121783418606885133127875011326700128041676211340875833468188564935730430824668009217910071653301832912986*i+12649114558107306316312034398992660249290686338889358177650207193918328074573782119733910959134644904789194457412006051595335327220)*x + (20615705135894924708733590043777994884940142802013072284159714744761589819722936361371574845606274377255359521981730758898753932597*i+411796879899359675039586537656890750660244284806256390200327063988941658884349739617446413476974254221698753325494771516402378757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22885589835761205241026969580072641146311187246671942933370802525525557246539593828005473872807352805153544610706597310378290071463*i+13518832911917410419020565148361992460672310733428462644065250425278508312354840156023519651490349863251878089759003262032397261153)*x + (22344374802785602065720350690993220998943394649687378715012371172564153892084025126789872106614605763992837021009419477336788064427*i+21358208821135126816189050955227162905745988557418245728109165456654572148692290179714829190125171118279423910607151432160538802293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22885589835761205241026969580072641146311187246671942933370802525525557246539593828005473872807352805153544610706597310378290071463*i+13518832911917410419020565148361992460672310733428462644065250425278508312354840156023519651490349863251878089759003262032397261153)*x + (22344374802785602065720350690993220998943394649687378715012371172564153892084025126789872106614605763992837021009419477336788064427*i+21358208821135126816189050955227162905745988557418245728109165456654572148692290179714829190125171118279423910607151432160538802293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17807482436973670310179429443325244289362832782148406979281575973785716667611616666866045048341052327922194562113951116571349036459*i+3289680370647783078179565039320727198560188765283231116240997425981506531555197861275196436654802051236022836938179663243664336492)*x + (5343421050939233538823683503667368968042292845944929033089305686931609521966911527938016744890866369020347753075412533278406788284*i+8133767977719488202683410256144583819984040508005602466998255838797311782611325990159906106913027178329682672767385579540796274183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17807482436973670310179429443325244289362832782148406979281575973785716667611616666866045048341052327922194562113951116571349036459*i+3289680370647783078179565039320727198560188765283231116240997425981506531555197861275196436654802051236022836938179663243664336492)*x + (5343421050939233538823683503667368968042292845944929033089305686931609521966911527938016744890866369020347753075412533278406788284*i+8133767977719488202683410256144583819984040508005602466998255838797311782611325990159906106913027178329682672767385579540796274183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8795660621025458350622477050452953428144771139951371892485648084610074818360310514919506817545230382428022956905813333367277106257*i+4501400383558241331778594470545967798010843718340014971101053119398654518593214696358748480757307844944141111649206517590148228027)*x + (23358102543140283187578612311437038588496596400904493581362854352678490576306774790849518509881198593403169748097629470772095748866*i+7259909304987005306845816760146019755261679007944542976898676672016127931611343792939380053208564690329946226127062509808193861441) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8795660621025458350622477050452953428144771139951371892485648084610074818360310514919506817545230382428022956905813333367277106257*i+4501400383558241331778594470545967798010843718340014971101053119398654518593214696358748480757307844944141111649206517590148228027)*x + (23358102543140283187578612311437038588496596400904493581362854352678490576306774790849518509881198593403169748097629470772095748866*i+7259909304987005306845816760146019755261679007944542976898676672016127931611343792939380053208564690329946226127062509808193861441) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16961725253640357100847213704246528334783277243898268309259519098795804159167323582701072713763641076840321209269083483753186551480*i+11592587906849481879560928864625889593326512670552428024545924013933461881256406430650294094108477470600792293528337621347958529298)*x + (8680074660216067214353110727253348752422256742023689500958616442385695431168732925064405840189510471275241874146370618249815799172*i+512997460165001049153767794864297521884370043752871259948030879253278284085073740251116913538399075182680311784596724736992407593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16961725253640357100847213704246528334783277243898268309259519098795804159167323582701072713763641076840321209269083483753186551480*i+11592587906849481879560928864625889593326512670552428024545924013933461881256406430650294094108477470600792293528337621347958529298)*x + (8680074660216067214353110727253348752422256742023689500958616442385695431168732925064405840189510471275241874146370618249815799172*i+512997460165001049153767794864297521884370043752871259948030879253278284085073740251116913538399075182680311784596724736992407593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11269592369717174582315700892704420567980115320822676330338970445332799182156062625761310372606836416398363215977454592615877688082*i+8944885252482509212092674392967710634724269397488761018613112939486825378125811755533070869923623514237166721696560310678259315696)*x + (4574312594744299904085465535420073010861107782443777315000880615268878911676576563462362500514120088934446382999911540002434229990*i+4035648662429584517255048062476994160721839828516706451976407756686858117619709927999394707769069837894646271552170901697837337583) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11269592369717174582315700892704420567980115320822676330338970445332799182156062625761310372606836416398363215977454592615877688082*i+8944885252482509212092674392967710634724269397488761018613112939486825378125811755533070869923623514237166721696560310678259315696)*x + (4574312594744299904085465535420073010861107782443777315000880615268878911676576563462362500514120088934446382999911540002434229990*i+4035648662429584517255048062476994160721839828516706451976407756686858117619709927999394707769069837894646271552170901697837337583) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10352188257723622848075504610238939071587267184951980255049446424015018657154716526036979251054292051074383355156979579786142682249*i+18265318914581017252560188004145525570975190422646124929977236461897101492280706581275869346346497699830972055751554763784551780236)*x + (17873658555953378269702090895571634382384531008593479413363908384794847225615552066597611400787339311890352969042213800744616778114*i+20499770380415415490169102180082158821167260548300796719024500051032305424202188059114900751300848410158249917388228274878806381859) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10352188257723622848075504610238939071587267184951980255049446424015018657154716526036979251054292051074383355156979579786142682249*i+18265318914581017252560188004145525570975190422646124929977236461897101492280706581275869346346497699830972055751554763784551780236)*x + (17873658555953378269702090895571634382384531008593479413363908384794847225615552066597611400787339311890352969042213800744616778114*i+20499770380415415490169102180082158821167260548300796719024500051032305424202188059114900751300848410158249917388228274878806381859) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22280291941706243053887452257968901516900075611007731498238270829217590401745014403723347570993431428642746068015764058799832897221*i+3921964892336355188579992118681242204598315392204651658212813330784495565221930517905263179114589274061486338687432146742687727450)*x + (23851045357380735192561648697258837190887739017280084073052275666143380614356923947618113531717618511735735335422704635063315940933*i+18641119231569696668364584849957506658847253679091037519424399025411787318463608132086936236043537917064857735953946143868364599499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22280291941706243053887452257968901516900075611007731498238270829217590401745014403723347570993431428642746068015764058799832897221*i+3921964892336355188579992118681242204598315392204651658212813330784495565221930517905263179114589274061486338687432146742687727450)*x + (23851045357380735192561648697258837190887739017280084073052275666143380614356923947618113531717618511735735335422704635063315940933*i+18641119231569696668364584849957506658847253679091037519424399025411787318463608132086936236043537917064857735953946143868364599499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14386862991129456663688269947776836825778065603511495025225616054984320219873192398818369302262632542546119023819270624107684792920*i+11455176924169106911527109663522012216392583529789425385522350330112024057355712526672224211216739951454384800069448082197959670042)*x + (17154478098667812399478476354097274964769065582457379896044213703158671773911920173442031338573873167327898076152635137589141396473*i+10367135551763024166018728462121723005848841714349404149467222636981986757779843316184381114861293953137586998969290182947706704493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14386862991129456663688269947776836825778065603511495025225616054984320219873192398818369302262632542546119023819270624107684792920*i+11455176924169106911527109663522012216392583529789425385522350330112024057355712526672224211216739951454384800069448082197959670042)*x + (17154478098667812399478476354097274964769065582457379896044213703158671773911920173442031338573873167327898076152635137589141396473*i+10367135551763024166018728462121723005848841714349404149467222636981986757779843316184381114861293953137586998969290182947706704493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10360156685025188832646707470096273767401167376574293762278653171313930465087765408040537164269775669964403537635653447404086762146*i+15726237770939059260177655917573418893540856382928069386059423129187000810353143636650995604067544050378193653010307589761262174134)*x + (21595256681049753465119978818744979704797106611149174002008021427513122038202303154491401772545837224431514995771386245420586130662*i+4106252092743696753965234503195024469122795706206105488375886665852557829965462832262332470309726210876959341281539018601432150921) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10360156685025188832646707470096273767401167376574293762278653171313930465087765408040537164269775669964403537635653447404086762146*i+15726237770939059260177655917573418893540856382928069386059423129187000810353143636650995604067544050378193653010307589761262174134)*x + (21595256681049753465119978818744979704797106611149174002008021427513122038202303154491401772545837224431514995771386245420586130662*i+4106252092743696753965234503195024469122795706206105488375886665852557829965462832262332470309726210876959341281539018601432150921) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9813151453477330992562540762221598447808974826547480023073038093687455230854538538295436524004445241115098730709336917177825234542*i+15259898115034326123601742706862917228011962027594642769996441085372171000764359851651322113737113516295767015767300824339981197381)*x + (23101616894452963920919562618590018212683124630039544112087683229740589755814762880321198617496526673748694713685699797786961316682*i+18315422472759294531145609646725741803276346241248107870457218034778222146531648424511446314852134765414145347992358383301257456862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9813151453477330992562540762221598447808974826547480023073038093687455230854538538295436524004445241115098730709336917177825234542*i+15259898115034326123601742706862917228011962027594642769996441085372171000764359851651322113737113516295767015767300824339981197381)*x + (23101616894452963920919562618590018212683124630039544112087683229740589755814762880321198617496526673748694713685699797786961316682*i+18315422472759294531145609646725741803276346241248107870457218034778222146531648424511446314852134765414145347992358383301257456862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23644027046506404193372264346600960196447346552859271456283196085927154532301017510336466984820200248416919152686112910603992497830*i+21244914875090820372682933083504429226414653269297578366410724597292254208676544937194793905696592539751517514911182141887806792971)*x + (8011351347254486021073199865695857354277944383014669149923545159427033387389546334540205682538416972199954609840109113731876914630*i+13412560675152611363265667064041946663370424359643096154921058775590955808498109294342483933025275027001737895852593793600326861262) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23644027046506404193372264346600960196447346552859271456283196085927154532301017510336466984820200248416919152686112910603992497830*i+21244914875090820372682933083504429226414653269297578366410724597292254208676544937194793905696592539751517514911182141887806792971)*x + (8011351347254486021073199865695857354277944383014669149923545159427033387389546334540205682538416972199954609840109113731876914630*i+13412560675152611363265667064041946663370424359643096154921058775590955808498109294342483933025275027001737895852593793600326861262) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18942350445480670820154022624465424299364360432493101485283066122917997350275760994519784684740793344530678889802979519711993641754*i+24116512889477907231546204120513694797519995886316437254746613033200689709363184053647192418675175497204102586691871325302941587776)*x + (1767850012631777213370103594613445691424804144151921207687600156611314022620539652957402091218272241951463553813478381213266217733*i+320238709047204603632228453333048742010812823092855398773168812948284060893568956350500639137717220016361990946047941854277344927) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18942350445480670820154022624465424299364360432493101485283066122917997350275760994519784684740793344530678889802979519711993641754*i+24116512889477907231546204120513694797519995886316437254746613033200689709363184053647192418675175497204102586691871325302941587776)*x + (1767850012631777213370103594613445691424804144151921207687600156611314022620539652957402091218272241951463553813478381213266217733*i+320238709047204603632228453333048742010812823092855398773168812948284060893568956350500639137717220016361990946047941854277344927) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21305428504059163230520490056780760361846310117775124055251026433061728923614597351018539317174765355431608909268816125814518990143*i+18975473929020625681729625985951185442446661441148519470415888853322204838363176192419229303845854463461691221256867905948721375185)*x + (14477963417300054504177451686852190478751909338720886876645869031699805316977026598648420751891416504542290557140766155504971938762*i+19432579987802579135529042476398091717281210407762784381522768221901335292796168117936510597994832901497969411705677460864209530050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21305428504059163230520490056780760361846310117775124055251026433061728923614597351018539317174765355431608909268816125814518990143*i+18975473929020625681729625985951185442446661441148519470415888853322204838363176192419229303845854463461691221256867905948721375185)*x + (14477963417300054504177451686852190478751909338720886876645869031699805316977026598648420751891416504542290557140766155504971938762*i+19432579987802579135529042476398091717281210407762784381522768221901335292796168117936510597994832901497969411705677460864209530050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20812167167853006037681272819638432442226300222234812804222626775120612256214005361186409237017682633892025514865410038295406780843*i+2166783179066396889201057680486349368393486693187634182017856744104200606069748468239112120932420640577079639858889390009240966229)*x + (4428153412187336560625127253823763912657056047156403289671730300341266951337722588474027347719162668506058842747182590174678436761*i+17067318446736362264284325297890949162514908445239680678559309643065397502804097356245399238438991648203020070281451181912401953396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20812167167853006037681272819638432442226300222234812804222626775120612256214005361186409237017682633892025514865410038295406780843*i+2166783179066396889201057680486349368393486693187634182017856744104200606069748468239112120932420640577079639858889390009240966229)*x + (4428153412187336560625127253823763912657056047156403289671730300341266951337722588474027347719162668506058842747182590174678436761*i+17067318446736362264284325297890949162514908445239680678559309643065397502804097356245399238438991648203020070281451181912401953396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3308776584576278754944065835753295449510164674207468665644698032855534989509011093890881202695727437881810272676779976846964782901*i+14470271031548758973599496465644175860325875734266027940016687765663841752817745899118403033854277766926428686294796804262543818902)*x + (6921712575363579037602630634640942579403741022152323155684499303399919869923645517372753448940029002481702562624263613639811847274*i+20110004262294104275589880194791450261251855885333535246112433392720472271674188442616318340748203674822600735282765055709423772209) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3308776584576278754944065835753295449510164674207468665644698032855534989509011093890881202695727437881810272676779976846964782901*i+14470271031548758973599496465644175860325875734266027940016687765663841752817745899118403033854277766926428686294796804262543818902)*x + (6921712575363579037602630634640942579403741022152323155684499303399919869923645517372753448940029002481702562624263613639811847274*i+20110004262294104275589880194791450261251855885333535246112433392720472271674188442616318340748203674822600735282765055709423772209) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13586973990646206574531327223443520108319085732803610492379992410634721318717830064334465113482944198682267092703587364261600926677*i+9333927032078072777893143184224556038968191065621411469472075833602002745814584964888269753963550899399530103446563375881113350250)*x + (23039679512097040750975960443139668884768528888053753613905930396548226392707604665539277643496167885468427462255522932831254064471*i+12650753913167319878886637766207871735728755524663512338507520577369812471948727700815063533897367006188280871351535800484908829707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13586973990646206574531327223443520108319085732803610492379992410634721318717830064334465113482944198682267092703587364261600926677*i+9333927032078072777893143184224556038968191065621411469472075833602002745814584964888269753963550899399530103446563375881113350250)*x + (23039679512097040750975960443139668884768528888053753613905930396548226392707604665539277643496167885468427462255522932831254064471*i+12650753913167319878886637766207871735728755524663512338507520577369812471948727700815063533897367006188280871351535800484908829707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11335817515032542162364139138499226666862238851493302255274302627513960552927485264112288609952902601723218671454972758214572234626*i+16788382908482842636246313561961593745335067756909241565613999653589791094631719853661332693705470479315729865554855576997091428531)*x + (20882444703729711040225068792302017848759869739719923892976987022340210075992206495867696885520323032279187877469039179001458493464*i+11880577828600127807150130251819243588633831656010741755189953007425476901627381508829583269614427315103960165885169321400105263074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11335817515032542162364139138499226666862238851493302255274302627513960552927485264112288609952902601723218671454972758214572234626*i+16788382908482842636246313561961593745335067756909241565613999653589791094631719853661332693705470479315729865554855576997091428531)*x + (20882444703729711040225068792302017848759869739719923892976987022340210075992206495867696885520323032279187877469039179001458493464*i+11880577828600127807150130251819243588633831656010741755189953007425476901627381508829583269614427315103960165885169321400105263074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2904046490541428360152354261697878477131716225690332053902096000569317043502285920178024817840558877594832474408475236360175410182*i+3694590676712654465611262156823544850573609148339576646643155542733297960637560164263735599544869439818193732567550079391301432379)*x + (15645746075213177333553230829870834394295926462765668206066565139529884596021166521580123802986811124380900138429916943012192491160*i+4881369897868255964220427929373298375906247528533804766264833476275648313937929792612484214605156227880987647082389630298983225693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2904046490541428360152354261697878477131716225690332053902096000569317043502285920178024817840558877594832474408475236360175410182*i+3694590676712654465611262156823544850573609148339576646643155542733297960637560164263735599544869439818193732567550079391301432379)*x + (15645746075213177333553230829870834394295926462765668206066565139529884596021166521580123802986811124380900138429916943012192491160*i+4881369897868255964220427929373298375906247528533804766264833476275648313937929792612484214605156227880987647082389630298983225693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17043921335345146899110760047268982984357363144609185972997592566046695644784047908632459145788648163299934428969307653038063882658*i+22167728891259642082910857158516669040436394826443410907446050748141448077146662084067066853635906452203311965138064444904780459487)*x + (2724011430401996135123754020182953423784983428140491960277546375471764920780895054835116743952856691034128522337315635207942343663*i+4340627110460420277879770079004203491923042818758447560577957194230663259961678049164876198023060563910480692123279368840037056745) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17043921335345146899110760047268982984357363144609185972997592566046695644784047908632459145788648163299934428969307653038063882658*i+22167728891259642082910857158516669040436394826443410907446050748141448077146662084067066853635906452203311965138064444904780459487)*x + (2724011430401996135123754020182953423784983428140491960277546375471764920780895054835116743952856691034128522337315635207942343663*i+4340627110460420277879770079004203491923042818758447560577957194230663259961678049164876198023060563910480692123279368840037056745) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10601306847140232546444913925026653246106045869978314025847122274388065853075409905884187117770488965383376874036894089049167684428*i+17681834601230655713772441299045550966262411678557704797574541510731643867905486038504033630114224595609123600652066670167002059677)*x + (21752250576957830048302858044056216204497045154906551813399924333391604620586089269253924981911823163755114781007350599159341082437*i+10884970944621275655901135774048526724455233883916934083846756961376581677929739231507706796754078746733401992090454370424081812769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10601306847140232546444913925026653246106045869978314025847122274388065853075409905884187117770488965383376874036894089049167684428*i+17681834601230655713772441299045550966262411678557704797574541510731643867905486038504033630114224595609123600652066670167002059677)*x + (21752250576957830048302858044056216204497045154906551813399924333391604620586089269253924981911823163755114781007350599159341082437*i+10884970944621275655901135774048526724455233883916934083846756961376581677929739231507706796754078746733401992090454370424081812769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7227442976481881789922064951770338028731742635016624757143228305571513822387872110204891227289437767964573590333867121797479182094*i+15893008322866326511786743693704154225497912571699506239916554582867421838981667840600918145436918828184476028082409198770647664694)*x + (11597469539201018834802530432248016763216189773141422674561769346034520088429793453202910423497360346696892738809144782148292924980*i+8040827676640400819441704348842172619193197831523152090250847220289954946055174371997715359004868200958769432544641764179969109929) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7227442976481881789922064951770338028731742635016624757143228305571513822387872110204891227289437767964573590333867121797479182094*i+15893008322866326511786743693704154225497912571699506239916554582867421838981667840600918145436918828184476028082409198770647664694)*x + (11597469539201018834802530432248016763216189773141422674561769346034520088429793453202910423497360346696892738809144782148292924980*i+8040827676640400819441704348842172619193197831523152090250847220289954946055174371997715359004868200958769432544641764179969109929) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22887749952125041539736811128293661733241644490002175907243721918980981210183487898409487357789679780543101334302095338140520526706*i+3244158418455742723173568707721375119127088057455014105273206264898741573695736266976807180784556097201237540319031372713495522954)*x + (15028469527358231581291720472421687764188111184623743012066215338560879331863285837279582143425483602994348056504981736503628796325*i+3943135880213988256554364377355164804165673962001566198085100707281404003436468437385704641077857475325177024803058329031134551384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22887749952125041539736811128293661733241644490002175907243721918980981210183487898409487357789679780543101334302095338140520526706*i+3244158418455742723173568707721375119127088057455014105273206264898741573695736266976807180784556097201237540319031372713495522954)*x + (15028469527358231581291720472421687764188111184623743012066215338560879331863285837279582143425483602994348056504981736503628796325*i+3943135880213988256554364377355164804165673962001566198085100707281404003436468437385704641077857475325177024803058329031134551384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14704772701415349770205527804719667589528637278394602311423040886743330001214202635140136496039493536951421430880643395975527805362*i+16282247984445046912245165379706954106779601257232325776233737148784577254211679478454727772210570746819807781538392276342394980695)*x + (805277808622389330514626639108999900032227479875514053095330250794522364882675313313294923518470860932137300691141054298693467786*i+21508073424436573277041787444140486312788753550192440909123078778350998055211202440778009210971855594322727555028355207199936991143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14704772701415349770205527804719667589528637278394602311423040886743330001214202635140136496039493536951421430880643395975527805362*i+16282247984445046912245165379706954106779601257232325776233737148784577254211679478454727772210570746819807781538392276342394980695)*x + (805277808622389330514626639108999900032227479875514053095330250794522364882675313313294923518470860932137300691141054298693467786*i+21508073424436573277041787444140486312788753550192440909123078778350998055211202440778009210971855594322727555028355207199936991143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1449562701548766263493278421249148379444143023856352968388707122571455394430453171126823539576117229999855719213506176569019325373*i+797702323401508287974487147409177006761873689213919460907260407939969992076016033011905051618585498362318803209102202243007879944)*x + (15426436675730149097603128864279042698407410423401525335819100159881627787059945383294412110830714843087296210802514560471617841434*i+8919580690370340111391634395454514726336706131292878667703340682657362322228253194285960042521141014886594194671207585140976825780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1449562701548766263493278421249148379444143023856352968388707122571455394430453171126823539576117229999855719213506176569019325373*i+797702323401508287974487147409177006761873689213919460907260407939969992076016033011905051618585498362318803209102202243007879944)*x + (15426436675730149097603128864279042698407410423401525335819100159881627787059945383294412110830714843087296210802514560471617841434*i+8919580690370340111391634395454514726336706131292878667703340682657362322228253194285960042521141014886594194671207585140976825780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17815624114761729996266834128885886520769310686762031019984175007442814021219600552984142946478272035787520634681268651342324936300*i+4127330020621357772627741903282861880477289662030236777014019238816240094250273344773773862060987673415760304268518249751713441388)*x + (113374318450151224512833764507118255973854147431556695001863018773143223168509875693562511566818622456966701461017188680772295553*i+15296669465926804279105940877712729188219488174481318861767685886840451307592034466606817885461588360482970767935850884850873017928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17815624114761729996266834128885886520769310686762031019984175007442814021219600552984142946478272035787520634681268651342324936300*i+4127330020621357772627741903282861880477289662030236777014019238816240094250273344773773862060987673415760304268518249751713441388)*x + (113374318450151224512833764507118255973854147431556695001863018773143223168509875693562511566818622456966701461017188680772295553*i+15296669465926804279105940877712729188219488174481318861767685886840451307592034466606817885461588360482970767935850884850873017928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17648961360681438992015849976956021551709899887805405859947904364294119098177155902315593319736274370214388222820131853111069724653*i+21178677453308148014864909945263525887036768998411988316296444126200459897909935868593787537901702286368147168410977345487873103714)*x + (23105085694270454493911093956142076073387131049701698484397747322926599681666808382003477519813057424874383233960111381007812694850*i+8168057249512119576225163237702794464726559257187513714144242763653466608844221310688888383025892632227683714845412988153484957922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17648961360681438992015849976956021551709899887805405859947904364294119098177155902315593319736274370214388222820131853111069724653*i+21178677453308148014864909945263525887036768998411988316296444126200459897909935868593787537901702286368147168410977345487873103714)*x + (23105085694270454493911093956142076073387131049701698484397747322926599681666808382003477519813057424874383233960111381007812694850*i+8168057249512119576225163237702794464726559257187513714144242763653466608844221310688888383025892632227683714845412988153484957922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14381626716701796132118876921538372553109313766501477996545419959560118686227261016452827148856653527126109454064297499608111800703*i+23256316480908245316502535369271088563083269778343108918542215800280361571589966330038063895108442939432974464648666131717226739778)*x + (23235143021466877408135463859049685153220906944125277176345158452764253183586765506049991850746118936665621037468925203044419741193*i+4760085669293832908658520104023024319579916722057192714371685785008923525048538957233424824260678418882689177421687325291243818171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14381626716701796132118876921538372553109313766501477996545419959560118686227261016452827148856653527126109454064297499608111800703*i+23256316480908245316502535369271088563083269778343108918542215800280361571589966330038063895108442939432974464648666131717226739778)*x + (23235143021466877408135463859049685153220906944125277176345158452764253183586765506049991850746118936665621037468925203044419741193*i+4760085669293832908658520104023024319579916722057192714371685785008923525048538957233424824260678418882689177421687325291243818171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23825912818021543701821604533847642113842757999326988307244523677235287245079991844450579903735795275346969730298802767735930665067*i+16835908300010970869833586784477622488136873623363992581023053476940306410652130479389855551241918733379017254601942636837831327129)*x + (15519375369532925120127964099030906286062268077278096212415803898001216453955313059577985723462417254278757353159931413928848655853*i+16540680718421574778307749813535326312232716560272348316003139159038411469419898193814149376692909166332919352246482105361879793289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23825912818021543701821604533847642113842757999326988307244523677235287245079991844450579903735795275346969730298802767735930665067*i+16835908300010970869833586784477622488136873623363992581023053476940306410652130479389855551241918733379017254601942636837831327129)*x + (15519375369532925120127964099030906286062268077278096212415803898001216453955313059577985723462417254278757353159931413928848655853*i+16540680718421574778307749813535326312232716560272348316003139159038411469419898193814149376692909166332919352246482105361879793289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22079049783937234548547570168260032897398929859680801733403361291116454558711868945776927192063138384337299342922764483212612581004*i+22445621146951618980692852185278358054970128602193562035934144741577888088765354051167004511913668871698338926670057378640149897940)*x + (17507667389446507145422473290625035740833172361013721317442457335858170756282920900740015900502502665999404255677978795894573582945*i+2439565116468223356725997820785415062666202231345488051725684387370965244800722939045770956054020573084297594809137248552372631749) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22079049783937234548547570168260032897398929859680801733403361291116454558711868945776927192063138384337299342922764483212612581004*i+22445621146951618980692852185278358054970128602193562035934144741577888088765354051167004511913668871698338926670057378640149897940)*x + (17507667389446507145422473290625035740833172361013721317442457335858170756282920900740015900502502665999404255677978795894573582945*i+2439565116468223356725997820785415062666202231345488051725684387370965244800722939045770956054020573084297594809137248552372631749) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16404245818683126090588335040150158071470553424000798286685247409090256699748889194341556892774030499089774490186022952271526879305*i+7107623668921302216653493430694081469073958315006509201636561832335694978641216882407920012764942462289875804687328903749717649456)*x + (5775803718889780006353006570862732714374833140803495235626944604295108834008425997463918760342658570321610626628391645100298214403*i+6794668402629323160511671561346338102194394590237150030371799302644232126339009393548749894013743468015022446656045756951607645967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16404245818683126090588335040150158071470553424000798286685247409090256699748889194341556892774030499089774490186022952271526879305*i+7107623668921302216653493430694081469073958315006509201636561832335694978641216882407920012764942462289875804687328903749717649456)*x + (5775803718889780006353006570862732714374833140803495235626944604295108834008425997463918760342658570321610626628391645100298214403*i+6794668402629323160511671561346338102194394590237150030371799302644232126339009393548749894013743468015022446656045756951607645967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (324643017217959383964685802687288892559226234484689971123909844644319395516768844998343508449445127251414418106888914799853183881*i+2229652140800315373327829990219706764403366951429323262341291628966943260049462387466310834194610642973172342375379384156384637182)*x + (4226768974071954266701328782128227359985466767090535033627773907422476944509771658590167179238312948297707735130228799721904890059*i+23037902207419548940325899234960890985794355746129993174836715981551108944105799960862515475090357517722616350983529541898541528131) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (324643017217959383964685802687288892559226234484689971123909844644319395516768844998343508449445127251414418106888914799853183881*i+2229652140800315373327829990219706764403366951429323262341291628966943260049462387466310834194610642973172342375379384156384637182)*x + (4226768974071954266701328782128227359985466767090535033627773907422476944509771658590167179238312948297707735130228799721904890059*i+23037902207419548940325899234960890985794355746129993174836715981551108944105799960862515475090357517722616350983529541898541528131) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10481218866960283370377137168148760584544674408538421677120917569938278925036832206993831895869257024019286173572501812750938900206*i+19577780216632201553363722717925223511853352880638413876800419532929307083867316003693003088336309420369065683990992108669594407824)*x + (23389569123347347416227370458577552698329642693434568446271021313780378510942151192246931436459406415768509773181818789713530921067*i+14056767378002315327924057070677787622169366852300868961210421141842511673143223404932044364760636503367041001270867170705586726183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10481218866960283370377137168148760584544674408538421677120917569938278925036832206993831895869257024019286173572501812750938900206*i+19577780216632201553363722717925223511853352880638413876800419532929307083867316003693003088336309420369065683990992108669594407824)*x + (23389569123347347416227370458577552698329642693434568446271021313780378510942151192246931436459406415768509773181818789713530921067*i+14056767378002315327924057070677787622169366852300868961210421141842511673143223404932044364760636503367041001270867170705586726183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20378628657988968446848042664924004070622123808926151371336749455553405819988259293102606195130455644300104503663668750451195129354*i+8044984192061030045538927948012279929144635868548809306050471042442946589073556749724330277813875925189420830319222382016963815443)*x + (23753647876607327740269101387964970005798590871530862518351737994920668168956000412725165822783386542633544220958790287901248850876*i+11017556647220263475704091460878691447767852535435276512105607876033945806732189018246582252025880353224135840095121479432376327420) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20378628657988968446848042664924004070622123808926151371336749455553405819988259293102606195130455644300104503663668750451195129354*i+8044984192061030045538927948012279929144635868548809306050471042442946589073556749724330277813875925189420830319222382016963815443)*x + (23753647876607327740269101387964970005798590871530862518351737994920668168956000412725165822783386542633544220958790287901248850876*i+11017556647220263475704091460878691447767852535435276512105607876033945806732189018246582252025880353224135840095121479432376327420) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16908365779702410235045993858135384515739863419475768405949491073346124695844654151331491363334715004742668898104002869906276055078*i+11381210485102878155848630894533579749430171949262432158209313420023359669490463510049182789394572643163012756908227688699200083860)*x + (3411772764359679508850930012152944695234178703094871791969556820008307847362555220588838841735170401482905578788257510713918626311*i+11716374769913289353746793577655289617400932236060263755506698384952282465202035383912204960027185660493431542826860304057931700236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16908365779702410235045993858135384515739863419475768405949491073346124695844654151331491363334715004742668898104002869906276055078*i+11381210485102878155848630894533579749430171949262432158209313420023359669490463510049182789394572643163012756908227688699200083860)*x + (3411772764359679508850930012152944695234178703094871791969556820008307847362555220588838841735170401482905578788257510713918626311*i+11716374769913289353746793577655289617400932236060263755506698384952282465202035383912204960027185660493431542826860304057931700236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11718488018334611731071399531732576613006495451486348170099517168347157654631398855367375444289245132876105246989290755671362171202*i+747041951270584733768182697348410303692014897099523585227048782960029097924975100849027263422526518292433842414697626735881965460)*x + (10526243652345622376654867290777002873634687614146646613341248216623728283726324103611926944317967091839557869580436513106580810337*i+1527398349610559691219928215213740387825058358802128803714730512940111378387040817984903782906859864453945794316565884905606003495) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11718488018334611731071399531732576613006495451486348170099517168347157654631398855367375444289245132876105246989290755671362171202*i+747041951270584733768182697348410303692014897099523585227048782960029097924975100849027263422526518292433842414697626735881965460)*x + (10526243652345622376654867290777002873634687614146646613341248216623728283726324103611926944317967091839557869580436513106580810337*i+1527398349610559691219928215213740387825058358802128803714730512940111378387040817984903782906859864453945794316565884905606003495) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22868038470527571396561464366401652036620625744525097722100984171842781852588926920454043985421166829309949033092940651955670217432*i+3390962241722507316384755961432425883868334141892999166456825154540846218133375311191219513807891798250928812295048438061862968344)*x + (10708074151497269616053334115368175278145759702524996629365727812518531360091994149863437801408792728177583919747124537168009792828*i+10101806122128315511886637327872023469942347608894288465835801926695944449839882064814934571754113550479160050636372326786936261361) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22868038470527571396561464366401652036620625744525097722100984171842781852588926920454043985421166829309949033092940651955670217432*i+3390962241722507316384755961432425883868334141892999166456825154540846218133375311191219513807891798250928812295048438061862968344)*x + (10708074151497269616053334115368175278145759702524996629365727812518531360091994149863437801408792728177583919747124537168009792828*i+10101806122128315511886637327872023469942347608894288465835801926695944449839882064814934571754113550479160050636372326786936261361) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22607221536942266711455923162429140872196179457876469472643730593418473742543917171463050415170258485939366869113232937143655836171*i+8982660390184119607380686524357315748569959667866786500979627884622625315498928569189613676217251718802506371527056462454192094867)*x + (9580827512006661254645345361636133368808607822253448094311068521085454769104959980863318240103281267256305108644757883893072657716*i+23806576057342458809553303207223830374365756087127845651004469380088076783519592547095701857588135258728493695553953883680812441997) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22607221536942266711455923162429140872196179457876469472643730593418473742543917171463050415170258485939366869113232937143655836171*i+8982660390184119607380686524357315748569959667866786500979627884622625315498928569189613676217251718802506371527056462454192094867)*x + (9580827512006661254645345361636133368808607822253448094311068521085454769104959980863318240103281267256305108644757883893072657716*i+23806576057342458809553303207223830374365756087127845651004469380088076783519592547095701857588135258728493695553953883680812441997) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4791806209518782129357378677442631093156110117384802857242588215814313844981293322189732621474333416796103492465900042692140860347*i+13186794608581587185546695597012389473054948434157128430744880925186862028344631462974479509440146468051954094726499620111362530590)*x + (7437668382999006620553373311718737966205584939960181437472426521036213498910315065679833099351185161016926657425203703027672227547*i+99204517464764870342138601391380636559564375939443029972142494108416854165510128202994171431249477574859870715376967052580079752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4791806209518782129357378677442631093156110117384802857242588215814313844981293322189732621474333416796103492465900042692140860347*i+13186794608581587185546695597012389473054948434157128430744880925186862028344631462974479509440146468051954094726499620111362530590)*x + (7437668382999006620553373311718737966205584939960181437472426521036213498910315065679833099351185161016926657425203703027672227547*i+99204517464764870342138601391380636559564375939443029972142494108416854165510128202994171431249477574859870715376967052580079752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6791348689906901056531879621650737169388637032942628943224292169058540404362469674562082731470312789721431299015639157624199228843*i+9510177356899713049542674086026594572078603186937463940897421040578062054871346756540869611492607141574680568697119950038082770673)*x + (14342280058332703582934192415624582440825343991057731796421324003064257926798903431855039104200678703537474628461108762189060698875*i+18896431263829101176685823423177626631792861428575696385523735342061060008179211798321096672026019569011706881452197887134943538390) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6791348689906901056531879621650737169388637032942628943224292169058540404362469674562082731470312789721431299015639157624199228843*i+9510177356899713049542674086026594572078603186937463940897421040578062054871346756540869611492607141574680568697119950038082770673)*x + (14342280058332703582934192415624582440825343991057731796421324003064257926798903431855039104200678703537474628461108762189060698875*i+18896431263829101176685823423177626631792861428575696385523735342061060008179211798321096672026019569011706881452197887134943538390) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5635547889655396440172732328409358077903278862960031583110756294241937839010651068995694717210837466615860730807767423978410148432*i+281502281286358043947618110640747433978159197427009000806737821572857925457894274660703650423030851701616060684768692078262210422)*x + (5449294472316178705786171422284812944283304581956707391897762174401814734068777175545269480092062269504008719940817055038766835037*i+11165007261398004261809460244553622391645700948654203913142206925837305084122698499813324934261056419821140937441863365690605050314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5635547889655396440172732328409358077903278862960031583110756294241937839010651068995694717210837466615860730807767423978410148432*i+281502281286358043947618110640747433978159197427009000806737821572857925457894274660703650423030851701616060684768692078262210422)*x + (5449294472316178705786171422284812944283304581956707391897762174401814734068777175545269480092062269504008719940817055038766835037*i+11165007261398004261809460244553622391645700948654203913142206925837305084122698499813324934261056419821140937441863365690605050314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11499583185692977662080774983149948789110135940636451028423397858540740760520272564431225073084067598428234270612719300331207011561*i+22984478278825853781610100211444511536313421506687231366434189551495412851442968011422611381941676994421041260065677717849701605205)*x + (22005097124864748297893850658018083784068204948793885829255921929742788413160830346733438832084494234229454891478802904978153820902*i+4358547246888667429433227709947949905465377664119521298657585163762028829227197916033852302726355888141141872522549781581764368313) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11499583185692977662080774983149948789110135940636451028423397858540740760520272564431225073084067598428234270612719300331207011561*i+22984478278825853781610100211444511536313421506687231366434189551495412851442968011422611381941676994421041260065677717849701605205)*x + (22005097124864748297893850658018083784068204948793885829255921929742788413160830346733438832084494234229454891478802904978153820902*i+4358547246888667429433227709947949905465377664119521298657585163762028829227197916033852302726355888141141872522549781581764368313) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14656957514676265279618624626434268600416704500885026337647785317998314978324302919639278505052155136132357887232399131068570668230*i+15041169120147413820456441099192223145517374061391742929192727521890419937000443144386208266632007263342355243893384869684834069332)*x + (19112438794214247180098418066254885649896262168679527129555677561396689052518851502559892706475680792241421166252118647428843424143*i+11374547924420354737410138628001556435966874170849796206572637903557077945229283263334853310500623692058954678124687389263289786798) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14656957514676265279618624626434268600416704500885026337647785317998314978324302919639278505052155136132357887232399131068570668230*i+15041169120147413820456441099192223145517374061391742929192727521890419937000443144386208266632007263342355243893384869684834069332)*x + (19112438794214247180098418066254885649896262168679527129555677561396689052518851502559892706475680792241421166252118647428843424143*i+11374547924420354737410138628001556435966874170849796206572637903557077945229283263334853310500623692058954678124687389263289786798) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6803281861856384573388733367195334564688223467863707450459109556629109072753304385763235467953035760000382547530029151255819647040*i+6274584564812870460860169146099453793156578639670708607410733537319789179986268890504452138254077135517338379064831919626390595886)*x + (21281511725007001300666174950160874556110687180947333717523174077492447528428830167834273291173116077303237376773574073627860854492*i+22918229472809174384569576515037646017354846205204364649078265709831711728876618205002412598022834269734935197723653149156704178409) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6803281861856384573388733367195334564688223467863707450459109556629109072753304385763235467953035760000382547530029151255819647040*i+6274584564812870460860169146099453793156578639670708607410733537319789179986268890504452138254077135517338379064831919626390595886)*x + (21281511725007001300666174950160874556110687180947333717523174077492447528428830167834273291173116077303237376773574073627860854492*i+22918229472809174384569576515037646017354846205204364649078265709831711728876618205002412598022834269734935197723653149156704178409) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7359491775744761703292062615245075853209438909441064436710550755926193539827627456554167845177487473502359996902592725631694303980*i+6244263950537924076059907051606006358461765749466960042412941609446816618570261747229130023991893451492759979586677165293437940219)*x + (16734453233909850754784513383431966411397206185871921110061509981947741645273457097394994151214485778783693129282486036168162145693*i+14540174811147686387746180420743113852613634399294990691240473797918990344053974302739826643941242169250506663178260192778376474734) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7359491775744761703292062615245075853209438909441064436710550755926193539827627456554167845177487473502359996902592725631694303980*i+6244263950537924076059907051606006358461765749466960042412941609446816618570261747229130023991893451492759979586677165293437940219)*x + (16734453233909850754784513383431966411397206185871921110061509981947741645273457097394994151214485778783693129282486036168162145693*i+14540174811147686387746180420743113852613634399294990691240473797918990344053974302739826643941242169250506663178260192778376474734) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5848277533518768137924733274775057365489026283681841529333551795478814798969258785816677415522203659877740483142695309103299018209*i+13748738002839519095987570629484904293895745834607209364822742206078653896918788074758597211319875883604651467333291735149392539987)*x + (411597452042116162421445281607419498153791871635140102926439935093282223088298643893755669754852533995960119791668166468827699501*i+5830064702423049137125459519972504468078404023494944180054249527472069688617062192240648778303511296762024053371987990636975285813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5848277533518768137924733274775057365489026283681841529333551795478814798969258785816677415522203659877740483142695309103299018209*i+13748738002839519095987570629484904293895745834607209364822742206078653896918788074758597211319875883604651467333291735149392539987)*x + (411597452042116162421445281607419498153791871635140102926439935093282223088298643893755669754852533995960119791668166468827699501*i+5830064702423049137125459519972504468078404023494944180054249527472069688617062192240648778303511296762024053371987990636975285813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1975096722144882516322892504992545148998638024751943465953526548948765813122799961314601287078401113391714034382381669078141738859*i+15416649525362859878059379324960902890839806729185947934562736863733823766260011301474981786898760014386420844966243479163841493265)*x + (17174372675281555493486819859687996009278575436942983738052093728256927523854442579866002644478688586060857249790750302939735747460*i+7019934112692330003155961586050585300246448271098393560512143706854595548732730001136364360646455870416908780734941869959535325213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1975096722144882516322892504992545148998638024751943465953526548948765813122799961314601287078401113391714034382381669078141738859*i+15416649525362859878059379324960902890839806729185947934562736863733823766260011301474981786898760014386420844966243479163841493265)*x + (17174372675281555493486819859687996009278575436942983738052093728256927523854442579866002644478688586060857249790750302939735747460*i+7019934112692330003155961586050585300246448271098393560512143706854595548732730001136364360646455870416908780734941869959535325213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6814850459729567812482885660720860056246333481856369574911524679747081100442215684313894905690186978205694136923870654376089180777*i+22861446574501670110747530434372466203616956402630660038574517628421982115505546325970821355757098593355189164618521460734672606368)*x + (14971561543410641654553192481062480732308673831943156672576592373325174150866240857552365689680820745223771806877688730431809395732*i+5846956406480857477381390457434391591343454746886135274855944807755613055929099266833850350747538885748201667114210226996193431715) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6814850459729567812482885660720860056246333481856369574911524679747081100442215684313894905690186978205694136923870654376089180777*i+22861446574501670110747530434372466203616956402630660038574517628421982115505546325970821355757098593355189164618521460734672606368)*x + (14971561543410641654553192481062480732308673831943156672576592373325174150866240857552365689680820745223771806877688730431809395732*i+5846956406480857477381390457434391591343454746886135274855944807755613055929099266833850350747538885748201667114210226996193431715) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23032155891568533383416135544464119232416781679888849566766605081144275609456640810886414031191432901612744370757234144433623615656*i+22934758991205034187141717426472474306470357598980134754734594203303719414942889313160391824320775353635463245331837008942267005560)*x + (15374195902316856392926207659409620864800514765036658165420499868347304425761874620687246030077937220298911741059465834072176772469*i+9210725561587224810230051400337373659691187102272257540907351292441792526026338227891005405046027529570781653153888851074409643081) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23032155891568533383416135544464119232416781679888849566766605081144275609456640810886414031191432901612744370757234144433623615656*i+22934758991205034187141717426472474306470357598980134754734594203303719414942889313160391824320775353635463245331837008942267005560)*x + (15374195902316856392926207659409620864800514765036658165420499868347304425761874620687246030077937220298911741059465834072176772469*i+9210725561587224810230051400337373659691187102272257540907351292441792526026338227891005405046027529570781653153888851074409643081) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1993610740795260169746735324315467862181328245380089114331508763250551878308264223729708035680371169290890893398759379508548875964*i+22119330110916950897828164679456027010417631428583790000591807498328486220958148437200510636922759855931463546050081710726360809893)*x + (765017311154990503548334924807104222444838009485326296993634196026565130934853163087379128052785592376407425150384806008417272443*i+7634725886378373454875802702885697354031571316004051228318610302650019236774886514310308866651740659197460901636568499682321201099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1993610740795260169746735324315467862181328245380089114331508763250551878308264223729708035680371169290890893398759379508548875964*i+22119330110916950897828164679456027010417631428583790000591807498328486220958148437200510636922759855931463546050081710726360809893)*x + (765017311154990503548334924807104222444838009485326296993634196026565130934853163087379128052785592376407425150384806008417272443*i+7634725886378373454875802702885697354031571316004051228318610302650019236774886514310308866651740659197460901636568499682321201099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1871877739931913178644859991280766475819371315489198851390164181461665676869133681820292816482063930688279209526864455124026952423*i+24057965965865831618636598147427922986810252083289346042075119505123159915644276521356817476912741697267722286026102706898809047342)*x + (15966040675496221868102363755642677867566728385123741714675130152165962679106071612736994996459427000337642186806872894078040541477*i+4478362223627647574709393311466988304912746390644408327198647153622582500186881118220797146339725728211722197036670069568730757737) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1871877739931913178644859991280766475819371315489198851390164181461665676869133681820292816482063930688279209526864455124026952423*i+24057965965865831618636598147427922986810252083289346042075119505123159915644276521356817476912741697267722286026102706898809047342)*x + (15966040675496221868102363755642677867566728385123741714675130152165962679106071612736994996459427000337642186806872894078040541477*i+4478362223627647574709393311466988304912746390644408327198647153622582500186881118220797146339725728211722197036670069568730757737) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3168412038206432974284500425077605384063912979901655401067888508315179608699874829007217037062436910060323824087460699860113972062*i+14184635740788856935121971918473266598808772755708857409993948105360235224808756763506083461893502292420653467566431369017232517757)*x + (10391957124004283960556834922805509156900369622036785589068961393661979508037718700888349902043873773209148925572176066917742755320*i+8325075364889920685109836414336647866792602950898042586615318447890821624457534276953632595118360340611284164193649029645606181586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3168412038206432974284500425077605384063912979901655401067888508315179608699874829007217037062436910060323824087460699860113972062*i+14184635740788856935121971918473266598808772755708857409993948105360235224808756763506083461893502292420653467566431369017232517757)*x + (10391957124004283960556834922805509156900369622036785589068961393661979508037718700888349902043873773209148925572176066917742755320*i+8325075364889920685109836414336647866792602950898042586615318447890821624457534276953632595118360340611284164193649029645606181586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (853630358277148152201029796161077720405385087310261912340444960358727498421539870278569735219839607822364330392758905142233599516*i+18293866580130034747590549019050681827028304301736009608087016207111674335107578806689735825328448156040071047757354761309977475718)*x + (15733207092213696043293769550162782890019415311731264802717268222433347194942853909182026223407862066558234639013685347122762978660*i+20936390293083753802922781395416152621397664362279278061467629850574822835734802672049370583068927726649859510348491861855912259658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (853630358277148152201029796161077720405385087310261912340444960358727498421539870278569735219839607822364330392758905142233599516*i+18293866580130034747590549019050681827028304301736009608087016207111674335107578806689735825328448156040071047757354761309977475718)*x + (15733207092213696043293769550162782890019415311731264802717268222433347194942853909182026223407862066558234639013685347122762978660*i+20936390293083753802922781395416152621397664362279278061467629850574822835734802672049370583068927726649859510348491861855912259658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19124030419071790184409638461233978211456181294352105239385716522752110207572750119310962532141972136680941415448627937010563252642*i+15133585028879163519290620113066185637860627579917493304590627601514046290691258107248905595829121337872582305241797476841813211840)*x + (6163613525800779070137346367794960452241127367296186814061361256872141330499090914358888017229047623122705841165964160464032229484*i+7976203111676456979717978908771480855781590352292973424095635847200133208447053680238179960635784810300639110093036175087030247093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19124030419071790184409638461233978211456181294352105239385716522752110207572750119310962532141972136680941415448627937010563252642*i+15133585028879163519290620113066185637860627579917493304590627601514046290691258107248905595829121337872582305241797476841813211840)*x + (6163613525800779070137346367794960452241127367296186814061361256872141330499090914358888017229047623122705841165964160464032229484*i+7976203111676456979717978908771480855781590352292973424095635847200133208447053680238179960635784810300639110093036175087030247093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20233635503174156022551448467563883616676389900842356303309724696276538284320345024954966261630170460940349887933509741220382574836*i+11046166195778313173287512964995335480572992797871695789653242832775387594894252793420201543678824506672139604688601166456666878261)*x + (12847197763388813587073496565901991667005318650745399684394213768975759559094658162625876154233944676369649859588710594508402773788*i+12846636974580781662937142988405866945612780950840368169281101044995193125626656296904625356909489619747249590486954295573627999622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20233635503174156022551448467563883616676389900842356303309724696276538284320345024954966261630170460940349887933509741220382574836*i+11046166195778313173287512964995335480572992797871695789653242832775387594894252793420201543678824506672139604688601166456666878261)*x + (12847197763388813587073496565901991667005318650745399684394213768975759559094658162625876154233944676369649859588710594508402773788*i+12846636974580781662937142988405866945612780950840368169281101044995193125626656296904625356909489619747249590486954295573627999622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21686002320237618838951734470364981256620717901320641016528547339353438456343290202953596595334980401305257099304032370717049975724*i+20259051426081975991090902767114600977428406812606949710657744732816996692229519262232444149734831201242707639945104848062939941771)*x + (8990896689098558419185485621229625767714293227784969657870436830067893636682989007159628375289107921250985373586327413627203275139*i+11766140548116137858880240257131735640984643060198003256029461701961950172782789080558624611853667345338404819913051809462907857202) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21686002320237618838951734470364981256620717901320641016528547339353438456343290202953596595334980401305257099304032370717049975724*i+20259051426081975991090902767114600977428406812606949710657744732816996692229519262232444149734831201242707639945104848062939941771)*x + (8990896689098558419185485621229625767714293227784969657870436830067893636682989007159628375289107921250985373586327413627203275139*i+11766140548116137858880240257131735640984643060198003256029461701961950172782789080558624611853667345338404819913051809462907857202) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4530839598472383847613225725484506646388427920137529306753194471698449028825581171335559416029416165001047391266187587306712929600*i+4517918437782642258928607772232074595907137460154851380461083524442401425544054078112510577169866153013802376674926917485146448124)*x + (19082192575116803352145901035978785449012170595622291336783802338000909334885569424552619383727087692925773982826204118259776249978*i+2726446452842704438860506210820381770409733851377025065344139718198946833467407667581858785798634662863656286544457797552878049895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4530839598472383847613225725484506646388427920137529306753194471698449028825581171335559416029416165001047391266187587306712929600*i+4517918437782642258928607772232074595907137460154851380461083524442401425544054078112510577169866153013802376674926917485146448124)*x + (19082192575116803352145901035978785449012170595622291336783802338000909334885569424552619383727087692925773982826204118259776249978*i+2726446452842704438860506210820381770409733851377025065344139718198946833467407667581858785798634662863656286544457797552878049895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18067346828264863886936109341823435212053142495325023272438097202425880455215740536333947213854275223312564354996304665823045716006*i+6109896624535633825120494531781598453535567775092125606394967040774218525367557935941732122231939676994819542357046747274339648670)*x + (3600566654847337623693034560142397058940124751302382262734292078609026159474350810414253693037385526434135066960773390960149814068*i+21027259073324437509965613255981903414280299478806758555521079124587358888277226005156708880132523771169514201387614658733564006063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18067346828264863886936109341823435212053142495325023272438097202425880455215740536333947213854275223312564354996304665823045716006*i+6109896624535633825120494531781598453535567775092125606394967040774218525367557935941732122231939676994819542357046747274339648670)*x + (3600566654847337623693034560142397058940124751302382262734292078609026159474350810414253693037385526434135066960773390960149814068*i+21027259073324437509965613255981903414280299478806758555521079124587358888277226005156708880132523771169514201387614658733564006063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22517844172929565617213858635125809650281192489804789462469024770555450685340410674541753156985309649811082386334402697708206758955*i+23820517237551130109331368217071186244091530443259419819657441178379230836123122101234450697427704465565244891480343797475464724171)*x + (13391980462818687368163334006190575350030352995935001136825399190252057974829387708876358574482648764695617848068455992912467087992*i+3824003394130160149699647346955082729250783388989871603173129345534370330846721493313445158255364013893787748916567235778190759972) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22517844172929565617213858635125809650281192489804789462469024770555450685340410674541753156985309649811082386334402697708206758955*i+23820517237551130109331368217071186244091530443259419819657441178379230836123122101234450697427704465565244891480343797475464724171)*x + (13391980462818687368163334006190575350030352995935001136825399190252057974829387708876358574482648764695617848068455992912467087992*i+3824003394130160149699647346955082729250783388989871603173129345534370330846721493313445158255364013893787748916567235778190759972) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8089793816318836090855045561786018337648887409245388935874405610290842448634201004832267861497634993242801034300273566512482274224*i+17814414359821984416363257977784562781492989898305857372813748511215948964693585496971897621126362749977865323549522423014162654270)*x + (1506096223996918781152966192442083686892406220235115884428641557331897668252357884142094103581403214627190550669578383434597689692*i+4458680082070516628987968631598180176603083636195557287887248040065974496837597931497498790231019910800859136044269702573378228492) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8089793816318836090855045561786018337648887409245388935874405610290842448634201004832267861497634993242801034300273566512482274224*i+17814414359821984416363257977784562781492989898305857372813748511215948964693585496971897621126362749977865323549522423014162654270)*x + (1506096223996918781152966192442083686892406220235115884428641557331897668252357884142094103581403214627190550669578383434597689692*i+4458680082070516628987968631598180176603083636195557287887248040065974496837597931497498790231019910800859136044269702573378228492) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7430105947069270741591224400767533431274129737127729408466002276698080738020389143682443486770606457353773047680815044241800573653*i+14664418168545607512970909672148271278732153033338142230956346153223846547465118589759932234713896185180878066278345676768704101729)*x + (17838394737840880714833617484308981588885189295145323256133648097351086150787939508612768669320631024210539192972460663053469927882*i+6009644232704274743132361850436514543580705513034503843181763104250634614011004378208733305946825504503913188053128923215289911009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7430105947069270741591224400767533431274129737127729408466002276698080738020389143682443486770606457353773047680815044241800573653*i+14664418168545607512970909672148271278732153033338142230956346153223846547465118589759932234713896185180878066278345676768704101729)*x + (17838394737840880714833617484308981588885189295145323256133648097351086150787939508612768669320631024210539192972460663053469927882*i+6009644232704274743132361850436514543580705513034503843181763104250634614011004378208733305946825504503913188053128923215289911009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8957769481898319267997355727764323761145807917360120960676515914187484384609532288169553728350056177977687812992612876180382273720*i+18843643283321084663859899707172313412185882192474742581976062440821631020274004935788136294519314216136282458093320175480757757168)*x + (11551879519421860044546704430027706584075906065803308938810577161128927964430887882468216189362712961099359266320783548424536625123*i+10553746947037095752057203949235822464349594866352386539316849620512267896704096449775377041822716337535464202136687156516416811431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8957769481898319267997355727764323761145807917360120960676515914187484384609532288169553728350056177977687812992612876180382273720*i+18843643283321084663859899707172313412185882192474742581976062440821631020274004935788136294519314216136282458093320175480757757168)*x + (11551879519421860044546704430027706584075906065803308938810577161128927964430887882468216189362712961099359266320783548424536625123*i+10553746947037095752057203949235822464349594866352386539316849620512267896704096449775377041822716337535464202136687156516416811431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20462686097628853455567037191014550547786179961447622270307265193980573503239000153873009427135133583045085727062375847844284276208*i+20163014579616822625473760236347051680449139867223998894947715560154593762463688313143246707426872494670384286185530061262506982811)*x + (3281673595738974635634549878792439674915728244333554129672483631750842716842124285398360204374387482181016343181997062082231539219*i+17263823184107606860180914551589134410589529726558677672470335950575138190563070762962800874288119856394974688725870383976349795481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20462686097628853455567037191014550547786179961447622270307265193980573503239000153873009427135133583045085727062375847844284276208*i+20163014579616822625473760236347051680449139867223998894947715560154593762463688313143246707426872494670384286185530061262506982811)*x + (3281673595738974635634549878792439674915728244333554129672483631750842716842124285398360204374387482181016343181997062082231539219*i+17263823184107606860180914551589134410589529726558677672470335950575138190563070762962800874288119856394974688725870383976349795481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3754372480319940048867738353727020658545373601664610805618428818652508007630604003883591935644607594978191501277199689216152599913*i+17285607748040653417738307830568917825481983072768816207720102038620674691959736218553969567472161443792448159261096237643207971902)*x + (877119272951251290342365998423901571567280494320906476372683273501738892017996094513849317800580705017341431274061895103195477299*i+3341649186806739182264956168262268511420436990403496608187828281205597085027516332605734215640737586913404131534424013006573978887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3754372480319940048867738353727020658545373601664610805618428818652508007630604003883591935644607594978191501277199689216152599913*i+17285607748040653417738307830568917825481983072768816207720102038620674691959736218553969567472161443792448159261096237643207971902)*x + (877119272951251290342365998423901571567280494320906476372683273501738892017996094513849317800580705017341431274061895103195477299*i+3341649186806739182264956168262268511420436990403496608187828281205597085027516332605734215640737586913404131534424013006573978887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5386739554470916777949726081973926119131259774555464975201584076311513539032648465882198985506509512717502135487713374069303761970*i+3729305953608312287468218724644188781857206424734954467554197241065580226735915707860447367650856158279466223126521401356708322666)*x + (10865198002888376537383410108165438175873573782529770110787197822087895303115417040653288629315070070379093944443538717959577205513*i+22327250448138483152754825876073886921481241269295042836728326097703602929345928124131676444505429210666870004132348163852649658189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5386739554470916777949726081973926119131259774555464975201584076311513539032648465882198985506509512717502135487713374069303761970*i+3729305953608312287468218724644188781857206424734954467554197241065580226735915707860447367650856158279466223126521401356708322666)*x + (10865198002888376537383410108165438175873573782529770110787197822087895303115417040653288629315070070379093944443538717959577205513*i+22327250448138483152754825876073886921481241269295042836728326097703602929345928124131676444505429210666870004132348163852649658189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23965403413841695962248866459925584317051133629858929979191493357665794797394759456877698152391802477270172925299497193391299084710*i+15606888867276056215682090877211355205263832605962517007510329238085345934569287628100456890503970155067953997942017545512501991349)*x + (1413127707835193876676284986504987382259621571748446834208141487510445275752269712162583077972560527482826034423868412829974145057*i+18639264166432104435443819441855240955818373707268582889290943712434068482195914168422356507440186866021412951262609386443586857081) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23965403413841695962248866459925584317051133629858929979191493357665794797394759456877698152391802477270172925299497193391299084710*i+15606888867276056215682090877211355205263832605962517007510329238085345934569287628100456890503970155067953997942017545512501991349)*x + (1413127707835193876676284986504987382259621571748446834208141487510445275752269712162583077972560527482826034423868412829974145057*i+18639264166432104435443819441855240955818373707268582889290943712434068482195914168422356507440186866021412951262609386443586857081) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19906838186269284560476247138790841931136054648034907359518596392696592608598296880498760562919859123635428529591475370601711801692*i+17227223527724099026802273101521871808433695161393394396885248332451856752773758636154350976938824233178535437123954843820202187910)*x + (6781066203435726086658067579780427131366393005054956336306383254169256677988985477777369040663556718440987375652877990977662856935*i+14722085519841803087154490229602909365965739810129491376828049103480912625785800441256359638430513630326071982210764832862047342781) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19906838186269284560476247138790841931136054648034907359518596392696592608598296880498760562919859123635428529591475370601711801692*i+17227223527724099026802273101521871808433695161393394396885248332451856752773758636154350976938824233178535437123954843820202187910)*x + (6781066203435726086658067579780427131366393005054956336306383254169256677988985477777369040663556718440987375652877990977662856935*i+14722085519841803087154490229602909365965739810129491376828049103480912625785800441256359638430513630326071982210764832862047342781) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15931994811177415367691580375616205755189381908049130844439271694695932309651764834614272670641877002747972106455243155226675569263*i+1344372593330855968815481764156463486180848271374706720225942124176749051868316286225517043002611836774304069617201635786773107871)*x + (5555466921289997636749044496246677600432879733504866555692767210846081247095395942689693730868555490063011936498398328234334099426*i+3655056905251447838862708467534369965408287519814754614944401442870057280615714824881002980418038226973380659946480793573117196685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15931994811177415367691580375616205755189381908049130844439271694695932309651764834614272670641877002747972106455243155226675569263*i+1344372593330855968815481764156463486180848271374706720225942124176749051868316286225517043002611836774304069617201635786773107871)*x + (5555466921289997636749044496246677600432879733504866555692767210846081247095395942689693730868555490063011936498398328234334099426*i+3655056905251447838862708467534369965408287519814754614944401442870057280615714824881002980418038226973380659946480793573117196685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22824995961014153578005272770588504940295128339334775260020644275793988983444630447242094916551815319257672128375247108152007048379*i+22933398148839751187883824451861209501590362903408697199984555755910057878082751593921049931858002339765494907113667039347394708520)*x + (6829044969093083432378942029866553680465736004171756405753143590090391982597189030319018231879663379470335081710314600411104378614*i+19555532567226332366852831279501770849533911015127342558474445401212625915196556215185715438959994460511688048036145881963361299837) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22824995961014153578005272770588504940295128339334775260020644275793988983444630447242094916551815319257672128375247108152007048379*i+22933398148839751187883824451861209501590362903408697199984555755910057878082751593921049931858002339765494907113667039347394708520)*x + (6829044969093083432378942029866553680465736004171756405753143590090391982597189030319018231879663379470335081710314600411104378614*i+19555532567226332366852831279501770849533911015127342558474445401212625915196556215185715438959994460511688048036145881963361299837) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9739221540810835559771050924111566054166378009589448424799062724373914245495500020704231009575870746531892435328518004613034746204*i+14955121347178223683745278144128167457398101422051380462029179443299653074806773760065699018031189024797871347702393051682983620361)*x + (20811850766264164490066445161437190335388771584567486129106674521261787568845077341301889666315674629356048998067208334145291153358*i+10865104779906273463507183359224829838898415889784728623448727776537444055914246966747281993519750002168546413873770501469612724200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9739221540810835559771050924111566054166378009589448424799062724373914245495500020704231009575870746531892435328518004613034746204*i+14955121347178223683745278144128167457398101422051380462029179443299653074806773760065699018031189024797871347702393051682983620361)*x + (20811850766264164490066445161437190335388771584567486129106674521261787568845077341301889666315674629356048998067208334145291153358*i+10865104779906273463507183359224829838898415889784728623448727776537444055914246966747281993519750002168546413873770501469612724200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11376746243726347808944616345937169752950336358671975280901601638708666082907943744279073091170450400824551836273023886824513521051*i+20248571156681998988408719968986049979909359971126433371450165828404798214669898105233562467913922127178537530072359074161324861023)*x + (1203570891093510155325848275570899648737148746329585544354174360911999767228347537044575031389932630593562461144377809288672400171*i+23520248913667931181660632198852014959988135462329436118021134767769169930680214660832672307097261960996949501107537210855518574408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11376746243726347808944616345937169752950336358671975280901601638708666082907943744279073091170450400824551836273023886824513521051*i+20248571156681998988408719968986049979909359971126433371450165828404798214669898105233562467913922127178537530072359074161324861023)*x + (1203570891093510155325848275570899648737148746329585544354174360911999767228347537044575031389932630593562461144377809288672400171*i+23520248913667931181660632198852014959988135462329436118021134767769169930680214660832672307097261960996949501107537210855518574408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9744999950549595278361794332287397870641936935381185092373161493233657251652003579423319875540405568585341225584680757134834859551*i+1552917064149653580131438715951510295829859415208214592750599667216890150831312024343875730977717530899217940957492245364721428767)*x + (12583198746886465246266598071770615637883121450694198546425411699643999608363821149819102274818465227470162798419149388024841809549*i+6894235069028244364635407122153098767344357131139946126663465938912191904719680587438369165605552952870413961819164733373878125547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9744999950549595278361794332287397870641936935381185092373161493233657251652003579423319875540405568585341225584680757134834859551*i+1552917064149653580131438715951510295829859415208214592750599667216890150831312024343875730977717530899217940957492245364721428767)*x + (12583198746886465246266598071770615637883121450694198546425411699643999608363821149819102274818465227470162798419149388024841809549*i+6894235069028244364635407122153098767344357131139946126663465938912191904719680587438369165605552952870413961819164733373878125547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8843718310099624197804965217228538218675387249234961426614614131597589305525442698166142248349041972027423220295192166150675804047*i+17829744947761915631393344980842313190324939288089699935255500858615835336480653940114750869400302052574489841559313922528451795559)*x + (5971671017781477103899696657587489655212251866694263556556037068448550228558497928597560752973785612517206504796963895545263226041*i+1080654892753604931477476155018531049556466146630847449902723660785063165929564786724012690196758781394310132326779458720176638273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8843718310099624197804965217228538218675387249234961426614614131597589305525442698166142248349041972027423220295192166150675804047*i+17829744947761915631393344980842313190324939288089699935255500858615835336480653940114750869400302052574489841559313922528451795559)*x + (5971671017781477103899696657587489655212251866694263556556037068448550228558497928597560752973785612517206504796963895545263226041*i+1080654892753604931477476155018531049556466146630847449902723660785063165929564786724012690196758781394310132326779458720176638273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11181468250806097290260041504225028038183620794756927036447630498775973454981111490829537430404258456415865278184831983662911218018*i+18273064937200689452862796915416252517964764932624046499379992570630346560935584135325578025846921535927979717497853197864220473385)*x + (12232878774632519425124367366682952222460633425318737942633150255966866563242712770872542434524627643763606264149788159190258555086*i+10921726338290531333930183483481110940056774931805732510258642485192296466403249263894426867298488924937028959730090316655967864630) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11181468250806097290260041504225028038183620794756927036447630498775973454981111490829537430404258456415865278184831983662911218018*i+18273064937200689452862796915416252517964764932624046499379992570630346560935584135325578025846921535927979717497853197864220473385)*x + (12232878774632519425124367366682952222460633425318737942633150255966866563242712770872542434524627643763606264149788159190258555086*i+10921726338290531333930183483481110940056774931805732510258642485192296466403249263894426867298488924937028959730090316655967864630) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20948394390715176187931816751578038237934406898219827250443137261599330382422650607971920040480385252207924768064062468447136818171*i+263052933657288424976279760373462046979939732334582029268566794437776542272393916069264004054052635371162311142377470713177730003)*x + (11133567813562183620478805191284696358559520974972229577267731441988371708378657209492095921916069425289873188319774065556612821290*i+23036320658935216126402075248234767209056534785777312705775719203540869312157308875195271154538107357034972795463170091547451010354) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20948394390715176187931816751578038237934406898219827250443137261599330382422650607971920040480385252207924768064062468447136818171*i+263052933657288424976279760373462046979939732334582029268566794437776542272393916069264004054052635371162311142377470713177730003)*x + (11133567813562183620478805191284696358559520974972229577267731441988371708378657209492095921916069425289873188319774065556612821290*i+23036320658935216126402075248234767209056534785777312705775719203540869312157308875195271154538107357034972795463170091547451010354) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16811914216284114025094154768931979862116521717407785217259859279251729119079040706934743063509335730924986191846926055687553307119*i+20430271831110162873843929504293449425479833620985121206519402844986765143125511577524575113845192766802562829907808795070016263811)*x + (11476799673909908302492684005183230925923252070437322042706972693178139412214292375541453324864741455935755241371391420569013779519*i+24039482655120346935591654901037251798990962025633605518029135762794736996933744132215423311459560812146041979677101615563238184794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16811914216284114025094154768931979862116521717407785217259859279251729119079040706934743063509335730924986191846926055687553307119*i+20430271831110162873843929504293449425479833620985121206519402844986765143125511577524575113845192766802562829907808795070016263811)*x + (11476799673909908302492684005183230925923252070437322042706972693178139412214292375541453324864741455935755241371391420569013779519*i+24039482655120346935591654901037251798990962025633605518029135762794736996933744132215423311459560812146041979677101615563238184794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14163740706939770410882062365982850384235047796222334713351504820716192668360643843154701507303091008189478606837701524823744576251*i+6936683707959973491726547010501590381668584149306032597149084498527658348949904423565351782134474427764496913008139822880403375741)*x + (7434157947815530514231653159331120804934395007416498653472991700128308032060214227907958215303735308088306848679084771191484438029*i+18424772444067836166616601196264569052394906739080137052532316881944424347787340451795919263113855927407964485123387136693023997831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14163740706939770410882062365982850384235047796222334713351504820716192668360643843154701507303091008189478606837701524823744576251*i+6936683707959973491726547010501590381668584149306032597149084498527658348949904423565351782134474427764496913008139822880403375741)*x + (7434157947815530514231653159331120804934395007416498653472991700128308032060214227907958215303735308088306848679084771191484438029*i+18424772444067836166616601196264569052394906739080137052532316881944424347787340451795919263113855927407964485123387136693023997831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15102812165000846112863612260395137311281106282242101472535630255478109679385284213654817192056010588052813760581351334397137185165*i+19457646087283925657464952183730944667071362128354055015211555225454253768236539951458404854498546827395708253451826145656570619912)*x + (21730075631008180411940846929776842536344052150570733804774427119756993569340511080415596766087112472321427970346451091181502017731*i+11056862073638121883185829345441033768907367035293149369894771847649290868771241959816762005044040378166989343534506150992467338545) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15102812165000846112863612260395137311281106282242101472535630255478109679385284213654817192056010588052813760581351334397137185165*i+19457646087283925657464952183730944667071362128354055015211555225454253768236539951458404854498546827395708253451826145656570619912)*x + (21730075631008180411940846929776842536344052150570733804774427119756993569340511080415596766087112472321427970346451091181502017731*i+11056862073638121883185829345441033768907367035293149369894771847649290868771241959816762005044040378166989343534506150992467338545) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22717816662127063700238991471550730767010474915130923620733461408026475145013417946227933397303501636410112775335948554536950799926*i+18917424661948938145511433732493052375200082713592611080917071942272022347879992515656546282869381788094326282010283963234945836991)*x + (462801525221430251968141394322615223946622474517706050885152348166149813279363179082317446757986047199201033003678814067326445323*i+24082096037647817765073172304425092880154361353859303794657694009310450764546142556368618207572725204205256990940546939611112567343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22717816662127063700238991471550730767010474915130923620733461408026475145013417946227933397303501636410112775335948554536950799926*i+18917424661948938145511433732493052375200082713592611080917071942272022347879992515656546282869381788094326282010283963234945836991)*x + (462801525221430251968141394322615223946622474517706050885152348166149813279363179082317446757986047199201033003678814067326445323*i+24082096037647817765073172304425092880154361353859303794657694009310450764546142556368618207572725204205256990940546939611112567343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11746167284469965723876984582836024088138756561399399928229369381464071351480809584522981123396248783050204058528357128256476534672*i+23156836044322922506041838318549568621223267803635421249118800051618536125074562722575367299648979256649598629324763086269237306588)*x + (22376519662900242057222672013527139583731170958197406101038379467920157962981566474132064729063848999425446462432669145475387556505*i+9028079872798992112006481846553440725692568987259039706953876538588804659337261671050548861666948607661148707279615500857313743082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11746167284469965723876984582836024088138756561399399928229369381464071351480809584522981123396248783050204058528357128256476534672*i+23156836044322922506041838318549568621223267803635421249118800051618536125074562722575367299648979256649598629324763086269237306588)*x + (22376519662900242057222672013527139583731170958197406101038379467920157962981566474132064729063848999425446462432669145475387556505*i+9028079872798992112006481846553440725692568987259039706953876538588804659337261671050548861666948607661148707279615500857313743082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13408317962833516959465591130214687937336114775732276906691263115388884035650935007425394477068973266542244117052889283221353263747*i+305552885453713834042799687555124192818242880997660845450072354054044479574516466110736527895876025863340850469186902948962394025)*x + (12792598694773294986291618695627383350026808046575107993311583736137106834825440443873672181855181367258481616733604637048020081357*i+5718715723032462006794673335115808024321781385682181324860168194723442620454091833672244383693299842960370491913602418435483344265) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13408317962833516959465591130214687937336114775732276906691263115388884035650935007425394477068973266542244117052889283221353263747*i+305552885453713834042799687555124192818242880997660845450072354054044479574516466110736527895876025863340850469186902948962394025)*x + (12792598694773294986291618695627383350026808046575107993311583736137106834825440443873672181855181367258481616733604637048020081357*i+5718715723032462006794673335115808024321781385682181324860168194723442620454091833672244383693299842960370491913602418435483344265) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13258931550651711670509971287109996238629574215601978858542384507517426178804581989304654447129463095326181320218462414514429290052*i+17558110698004532863996402802704807537470933945928745280908368712186577760717334261551917660747952330002492637866147761116388950841)*x + (4768650322598097179707115038467720034612398852052541588565234356807832854123950039720966740006828388570041412483125714264105462269*i+23883670170771938812663092101140431976638464742798166053778479584365128980531602827911726209286353020185136835094084815601079828904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13258931550651711670509971287109996238629574215601978858542384507517426178804581989304654447129463095326181320218462414514429290052*i+17558110698004532863996402802704807537470933945928745280908368712186577760717334261551917660747952330002492637866147761116388950841)*x + (4768650322598097179707115038467720034612398852052541588565234356807832854123950039720966740006828388570041412483125714264105462269*i+23883670170771938812663092101140431976638464742798166053778479584365128980531602827911726209286353020185136835094084815601079828904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6133807575369869032616636845488047301906742929581554291522259806801830442763106312309813098579453557466320104662019279834160089707*i+12203675693452490851246592739465954347537821510093016652223916897309179434991575536632075815289454564624199825646535609714440546273)*x + (18579134798078302974843153135970492983677530987259260730079966337419190802223581385992919023723410317467502278095362451929494241668*i+10975763141720444248335693345820990151780007781541147354024776182280270521641296056025072473408245050014060418853970879901782120368) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6133807575369869032616636845488047301906742929581554291522259806801830442763106312309813098579453557466320104662019279834160089707*i+12203675693452490851246592739465954347537821510093016652223916897309179434991575536632075815289454564624199825646535609714440546273)*x + (18579134798078302974843153135970492983677530987259260730079966337419190802223581385992919023723410317467502278095362451929494241668*i+10975763141720444248335693345820990151780007781541147354024776182280270521641296056025072473408245050014060418853970879901782120368) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15331040344724686780768043233058147503845990610151738560158832773156135969420562553874854754568158671608969591713685241618653364131*i+23318427485590120065448619869910472448203758792313313286684720177138338673855021915942994284214941862610450745699634140608004827554)*x + (17070263927705597521682442459266858915392555711702571559330053726665386778769225827524411257585710613838815263604820835583107806199*i+7592865474452186313121318891905799512866755344784214634680614443766140148593368819424506392957669187669820168841924202202589827604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15331040344724686780768043233058147503845990610151738560158832773156135969420562553874854754568158671608969591713685241618653364131*i+23318427485590120065448619869910472448203758792313313286684720177138338673855021915942994284214941862610450745699634140608004827554)*x + (17070263927705597521682442459266858915392555711702571559330053726665386778769225827524411257585710613838815263604820835583107806199*i+7592865474452186313121318891905799512866755344784214634680614443766140148593368819424506392957669187669820168841924202202589827604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (609654206195723471601576297916088067752548732626589793394878368102528924308225556936052103274394014206458392728328223668219818195*i+15963221109870294434360022780982215760298437202370590481622954588090281186502887058632110735529414839639074538740577049561042492606)*x + (14201717260917858211830081911058654029977909203971353277488660141247394294992744457290936076565607374068176914868412456040234956576*i+1055647445087453496179220143892605128824960876139226659142167460527524920639455050730102463656398018438068607173636124467523522350) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (609654206195723471601576297916088067752548732626589793394878368102528924308225556936052103274394014206458392728328223668219818195*i+15963221109870294434360022780982215760298437202370590481622954588090281186502887058632110735529414839639074538740577049561042492606)*x + (14201717260917858211830081911058654029977909203971353277488660141247394294992744457290936076565607374068176914868412456040234956576*i+1055647445087453496179220143892605128824960876139226659142167460527524920639455050730102463656398018438068607173636124467523522350) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4415102407168790175293985838782317568277834631836409775669746902401976144188137053142919996409733842398721943799338199432675074783*i+21879875374812636948067322995590061587564836871728396297849050895883292477033864447415708342466208693611322790977971113415288951450)*x + (1926407455011217130778600769334522975092667546324683464996561000464461126100244381156178892877693624124719556076235149068351590766*i+8054974791703379652049402198864414692036136615881699587687581480941431435152170512138879844990574948592949800658367230137618574378) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4415102407168790175293985838782317568277834631836409775669746902401976144188137053142919996409733842398721943799338199432675074783*i+21879875374812636948067322995590061587564836871728396297849050895883292477033864447415708342466208693611322790977971113415288951450)*x + (1926407455011217130778600769334522975092667546324683464996561000464461126100244381156178892877693624124719556076235149068351590766*i+8054974791703379652049402198864414692036136615881699587687581480941431435152170512138879844990574948592949800658367230137618574378) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23814533827520780900727031621116349481100181954794809789457383969377161453341100384292904787244331683203920509826197824203000716979*i+6795399584128899943664795557711966878624837789944235874856883078838575168622326151198820921189154264055353045753553764504182707452)*x + (9857169503970962292648127407557628271104837835614396221055156179475962118683201179958198400402034843635817825085092718495834434226*i+10037788817518703550437452960879264354576922937734993576983048477386052849121670494487052459438835458090794425846637696363940762493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23814533827520780900727031621116349481100181954794809789457383969377161453341100384292904787244331683203920509826197824203000716979*i+6795399584128899943664795557711966878624837789944235874856883078838575168622326151198820921189154264055353045753553764504182707452)*x + (9857169503970962292648127407557628271104837835614396221055156179475962118683201179958198400402034843635817825085092718495834434226*i+10037788817518703550437452960879264354576922937734993576983048477386052849121670494487052459438835458090794425846637696363940762493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4412039801030295086853670085499388562083778806249527343996908813522040524050963102426985232478432246960842250643151003540055157188*i+19867023667046476488526908641032780907183939993977780693782943681869844224800645890165733023260215940350194005919640935216605357380)*x + (17340422355602612437074110034131753579260761597284570502057869742584167720094008379133652035340484674867300711140673137739181614312*i+4251134261777316702626146987547277743001691221308169596445270704028011770892323953678852285723947649067139721408853694027020388280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4412039801030295086853670085499388562083778806249527343996908813522040524050963102426985232478432246960842250643151003540055157188*i+19867023667046476488526908641032780907183939993977780693782943681869844224800645890165733023260215940350194005919640935216605357380)*x + (17340422355602612437074110034131753579260761597284570502057869742584167720094008379133652035340484674867300711140673137739181614312*i+4251134261777316702626146987547277743001691221308169596445270704028011770892323953678852285723947649067139721408853694027020388280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10042290217864869091649042344928953180435437327799325204057078423124916436010066891416479062179418804832957939722573508698895778426*i+8559600462506073971794621009634651944300470854548455588735242686349838391727468487255339742325235579417543184805539392887124317619)*x + (11656493280277981639210734244012986199298059847701285536000764061514312888755174375520860720422556280715638578671072721675642775040*i+18741243722670113831541351776090136498326004923097031543787517720828327369933445743452645807388986510473882415969879131913071967144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10042290217864869091649042344928953180435437327799325204057078423124916436010066891416479062179418804832957939722573508698895778426*i+8559600462506073971794621009634651944300470854548455588735242686349838391727468487255339742325235579417543184805539392887124317619)*x + (11656493280277981639210734244012986199298059847701285536000764061514312888755174375520860720422556280715638578671072721675642775040*i+18741243722670113831541351776090136498326004923097031543787517720828327369933445743452645807388986510473882415969879131913071967144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13902299379697115243105175757510729931903408268224288972708446333452098598770392290259108495749984039968030851302673681482640778435*i+12560972009705972391444998755881037257751822659174011873986925516716044971480137960443717081063753304672130893194874354647183298829)*x + (6024450345916075564334405028773516059343136878905163090297170607957042214894397376173082403174580641210139537240479335590076296975*i+4477393887763839139173368799625825379000438833381454249936699697800120862595358885518417909202237879033993080412173757306220141861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13902299379697115243105175757510729931903408268224288972708446333452098598770392290259108495749984039968030851302673681482640778435*i+12560972009705972391444998755881037257751822659174011873986925516716044971480137960443717081063753304672130893194874354647183298829)*x + (6024450345916075564334405028773516059343136878905163090297170607957042214894397376173082403174580641210139537240479335590076296975*i+4477393887763839139173368799625825379000438833381454249936699697800120862595358885518417909202237879033993080412173757306220141861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5051125632247272255434189922440327983745461908524675114753798980440862104903354851670076867828347680155401911528205827821612175884*i+2386137344708928681220802917348381738638470342718969040029216651340671056190175495808656540197070186851884914676077244227307663827)*x + (7861523712266231829867255688565364715708888121922163751824377003502449964912208353199309335863303798050201766550888753009632388442*i+17338241199245305961086432224642418960473097577928807106408521369828627680573230396126883483006142503237546054226511013190824858021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5051125632247272255434189922440327983745461908524675114753798980440862104903354851670076867828347680155401911528205827821612175884*i+2386137344708928681220802917348381738638470342718969040029216651340671056190175495808656540197070186851884914676077244227307663827)*x + (7861523712266231829867255688565364715708888121922163751824377003502449964912208353199309335863303798050201766550888753009632388442*i+17338241199245305961086432224642418960473097577928807106408521369828627680573230396126883483006142503237546054226511013190824858021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2186042079925757346277184523525365770396825175468975628033774177508514659640408413884974724503697995371053081856965379778436638253*i+20810728007713126021494524839921504578959355721667804352929024416284058222695056221202089849009600944032854776141542621787400617940)*x + (4367940355802343732174098832148710362046056469981371747926696340481233844088153290209470538386142721829238067975669692431215141805*i+12254537297209369810032160719931739589838160711615031384620790886422651082144965282620966430096503820288504526265719853735571486145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2186042079925757346277184523525365770396825175468975628033774177508514659640408413884974724503697995371053081856965379778436638253*i+20810728007713126021494524839921504578959355721667804352929024416284058222695056221202089849009600944032854776141542621787400617940)*x + (4367940355802343732174098832148710362046056469981371747926696340481233844088153290209470538386142721829238067975669692431215141805*i+12254537297209369810032160719931739589838160711615031384620790886422651082144965282620966430096503820288504526265719853735571486145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15107228045823681616760588608259617149771025291843173457287771965359878852663905344827584862209001004797440882311422049482809333556*i+10246472112696051324734031592781396238345382207048196854505851513822777732936414075401021967957738486466531370631950302217774855102)*x + (23754008648141212100811122367298443518149629450575743796603651528736473238295416322880191385256360680642310163208911573417586564582*i+518281960567618328074294456658316065257040283836156404509401528151855603968654261399179512149026966657534753575663112711843720937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15107228045823681616760588608259617149771025291843173457287771965359878852663905344827584862209001004797440882311422049482809333556*i+10246472112696051324734031592781396238345382207048196854505851513822777732936414075401021967957738486466531370631950302217774855102)*x + (23754008648141212100811122367298443518149629450575743796603651528736473238295416322880191385256360680642310163208911573417586564582*i+518281960567618328074294456658316065257040283836156404509401528151855603968654261399179512149026966657534753575663112711843720937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7533995488320866796547660046623607982653796392233253445698546258062787725127523074268049564868906579437245839400259748095949387764*i+18927737130289857281925131290494601593610770298018135578733474366637864165614666714189681160459639731881888064137119293061905020533)*x + (10183585107716630866175321050758796352218626065682845735838173451980137120424269608589671296634035362287178569453412596987985122336*i+4001762770450168400918264544261583690723797698442407963320256798764761504686457878949547759835888688561683324990377549405744638577) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7533995488320866796547660046623607982653796392233253445698546258062787725127523074268049564868906579437245839400259748095949387764*i+18927737130289857281925131290494601593610770298018135578733474366637864165614666714189681160459639731881888064137119293061905020533)*x + (10183585107716630866175321050758796352218626065682845735838173451980137120424269608589671296634035362287178569453412596987985122336*i+4001762770450168400918264544261583690723797698442407963320256798764761504686457878949547759835888688561683324990377549405744638577) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11848584159395205161958012177285148807690024513822268041084724992471007268514967448783342074909899150024355963873312871578840107026*i+14208669690038258048437219791207992863509756406586268858489757375290419222557209319080184362394715950787504046650799676676123008335)*x + (19294778363620997081232744258066113203305430886989622382134273339316581352420181502590760717031641807898705653097271594153818521641*i+571191898374204276480088026418585130655928491040392934298432692827371580481277694749441879805228977454879708759790546847659535367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11848584159395205161958012177285148807690024513822268041084724992471007268514967448783342074909899150024355963873312871578840107026*i+14208669690038258048437219791207992863509756406586268858489757375290419222557209319080184362394715950787504046650799676676123008335)*x + (19294778363620997081232744258066113203305430886989622382134273339316581352420181502590760717031641807898705653097271594153818521641*i+571191898374204276480088026418585130655928491040392934298432692827371580481277694749441879805228977454879708759790546847659535367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12239279774647989403074583080816637975770612914373083957459128450386694594522002942695493863796128592742288027797211612882319562028*i+8250974356527913292759215685885616847341776613331130812812306900783039980225167660440090363731661984290942793195937605907255866460)*x + (15735955526862773205578053133439712336127343857914496597153449121155250152327681805739019914114115775730386926854826495240037726904*i+20605503146615157288203128024863617954421092268359240858600339791395980751836813440494866672994929622245253510989108169684388265012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12239279774647989403074583080816637975770612914373083957459128450386694594522002942695493863796128592742288027797211612882319562028*i+8250974356527913292759215685885616847341776613331130812812306900783039980225167660440090363731661984290942793195937605907255866460)*x + (15735955526862773205578053133439712336127343857914496597153449121155250152327681805739019914114115775730386926854826495240037726904*i+20605503146615157288203128024863617954421092268359240858600339791395980751836813440494866672994929622245253510989108169684388265012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19039952006456288354209152568072920376586403774101159793449631727898999015928169074058202127040499354660169552844785618991852653174*i+8612917131925943668795483175415351745668342925344743581815025157176407547491511451390552043856794221781144362975847176366712758210)*x + (18433310120919597229545741863422700204821440232647146829666177463805032902111984978185935600005604977109727581941059659406023407880*i+9604989575518687073583311581043304705627257475633047652733704743661615945264882940810761247803020113395007994301636633529066666501) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19039952006456288354209152568072920376586403774101159793449631727898999015928169074058202127040499354660169552844785618991852653174*i+8612917131925943668795483175415351745668342925344743581815025157176407547491511451390552043856794221781144362975847176366712758210)*x + (18433310120919597229545741863422700204821440232647146829666177463805032902111984978185935600005604977109727581941059659406023407880*i+9604989575518687073583311581043304705627257475633047652733704743661615945264882940810761247803020113395007994301636633529066666501) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4110853981524789030997163715104595069125501710768675718072802428012426074097657019108081064793240317462295341404084164900547802819*i+2430779936116037355328466652056353983559369906450590030530373941392114918349194321607265866322284978042185781992311393087789334876)*x + (217010358986567545957707326527849806671281107938329380472153872375702894836189221058979830884822822651054767065007310224951063289*i+15741018853859682646454392131156757203686825738168551661713632831769177051514292520039168926146427787737378918187619107576372986567) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4110853981524789030997163715104595069125501710768675718072802428012426074097657019108081064793240317462295341404084164900547802819*i+2430779936116037355328466652056353983559369906450590030530373941392114918349194321607265866322284978042185781992311393087789334876)*x + (217010358986567545957707326527849806671281107938329380472153872375702894836189221058979830884822822651054767065007310224951063289*i+15741018853859682646454392131156757203686825738168551661713632831769177051514292520039168926146427787737378918187619107576372986567) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (916312086692126419005766194173190931688046345596325715993875093364071284012937579869956767477315773369641630119476823204399300853*i+9270550402293786889019306254743412670271894858564749754620535811388306808725223614367922913670379247799253339292457223007543366969)*x + (15754995547122074738863070663923422403777821224885278296313517827316965920890023376037898962901958022613829923939678698953740245675*i+2509512399787882667055854628233327963859264228624736805401567539961616084903266940187444021028839890534904432207648077044814519151) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (916312086692126419005766194173190931688046345596325715993875093364071284012937579869956767477315773369641630119476823204399300853*i+9270550402293786889019306254743412670271894858564749754620535811388306808725223614367922913670379247799253339292457223007543366969)*x + (15754995547122074738863070663923422403777821224885278296313517827316965920890023376037898962901958022613829923939678698953740245675*i+2509512399787882667055854628233327963859264228624736805401567539961616084903266940187444021028839890534904432207648077044814519151) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6356732408393556440564900467597397975789472108960488977348926788643153484374655696748521095996726988679163377172075435919889776199*i+23352016176894828656947358340735814164697958491149310616097919885794079555638724237510498397093141053075959102808967813718468496166)*x + (4116388877838219524206608127388518098859734550796140812417855691391779371216182391868473330937343323203135114551941903638835687801*i+22202502144443835566339973690704710461369748244700695441107736516700971612783248431717441096075084114022585169005359237112381114010) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6356732408393556440564900467597397975789472108960488977348926788643153484374655696748521095996726988679163377172075435919889776199*i+23352016176894828656947358340735814164697958491149310616097919885794079555638724237510498397093141053075959102808967813718468496166)*x + (4116388877838219524206608127388518098859734550796140812417855691391779371216182391868473330937343323203135114551941903638835687801*i+22202502144443835566339973690704710461369748244700695441107736516700971612783248431717441096075084114022585169005359237112381114010) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6841302722704437910563070132675099216368359037067719388872860652759597639936741229552102759943640899659336192405858702182406001090*i+23754732637964632574697312573605908234790430836662207753527409218127850403695827692748675909600807385684579782762979796205926061364)*x + (8391818726126063441117227501989635700203306039528627654013335495861575624968055799834887169213294847832738026274993985660780151865*i+20601862582184292042213372298704769054668055126988554670601601923274303742487679098027404847219982655503461124755938849732543990921) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6841302722704437910563070132675099216368359037067719388872860652759597639936741229552102759943640899659336192405858702182406001090*i+23754732637964632574697312573605908234790430836662207753527409218127850403695827692748675909600807385684579782762979796205926061364)*x + (8391818726126063441117227501989635700203306039528627654013335495861575624968055799834887169213294847832738026274993985660780151865*i+20601862582184292042213372298704769054668055126988554670601601923274303742487679098027404847219982655503461124755938849732543990921) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8212089054234213988720951488288997841198194356619942188174348244246475143239795977351878079071470695657030373455173650845080102404*i+14146765517030876613861038619395641962759077677500928375490564585641684693587053125312797196300071274537396429620416895026638022182)*x + (21054090881259541708248860874586089901215196425081781312156057821334594590479203781404940331541177730793356627786732722156577862561*i+24019121380138951369488831217607543336419081181224029598679866082397308349785194064168768542804726436860054244696951530171537244830) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8212089054234213988720951488288997841198194356619942188174348244246475143239795977351878079071470695657030373455173650845080102404*i+14146765517030876613861038619395641962759077677500928375490564585641684693587053125312797196300071274537396429620416895026638022182)*x + (21054090881259541708248860874586089901215196425081781312156057821334594590479203781404940331541177730793356627786732722156577862561*i+24019121380138951369488831217607543336419081181224029598679866082397308349785194064168768542804726436860054244696951530171537244830) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19665372586859735824823782461022046100188376246584904030761983047397690422634390260662217319854951776156491169967940548181681431590*i+20732713485255691528231505048361791327137493397948899411937463226616588684505814927033976079002963928192308930440530239566993703678)*x + (8055935289784890016323669131601982420656608390602527615083844360157151529155680839281679232748773644768103578432952998587469462035*i+20533914429396550375842383114397199765254318325940658688090558226777325196020127407578341859498271600067568011930393311821053767084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19665372586859735824823782461022046100188376246584904030761983047397690422634390260662217319854951776156491169967940548181681431590*i+20732713485255691528231505048361791327137493397948899411937463226616588684505814927033976079002963928192308930440530239566993703678)*x + (8055935289784890016323669131601982420656608390602527615083844360157151529155680839281679232748773644768103578432952998587469462035*i+20533914429396550375842383114397199765254318325940658688090558226777325196020127407578341859498271600067568011930393311821053767084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16910773273566599656756161614601776379484835476232268248090014029221452551502503894917525385533965072298571399442472097196414893790*i+11707150863242744781363886476068926759091283720987380510026565853119253415937893710796165077718897435322688167101791147548201728924)*x + (21971042899458962001214556433914289577004912856044692065305442846702810741234886204408333300105129161301129748561579390158911242391*i+8779363772783108105835131634356130709523562395875026179874789071803018659101252317389995047615831088483011204008758285801721457633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16910773273566599656756161614601776379484835476232268248090014029221452551502503894917525385533965072298571399442472097196414893790*i+11707150863242744781363886476068926759091283720987380510026565853119253415937893710796165077718897435322688167101791147548201728924)*x + (21971042899458962001214556433914289577004912856044692065305442846702810741234886204408333300105129161301129748561579390158911242391*i+8779363772783108105835131634356130709523562395875026179874789071803018659101252317389995047615831088483011204008758285801721457633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7525968646280758304479087875394791432643972128740636660626504085818230994683867895865145053283396000480026792330579218515495619518*i+11793384038462945209438083245521788820126726752891521780637903817885003983046504337495223190010981790018154206321877085684870348153)*x + (2950368193579112158201174221220040941265771597670553346376423290796685783284676279115418041851955675790997220793803880139494456776*i+23394466090929701766317170361099687765153301435885964647855917030295968669065507770070242679238200968992801453373699027930138632511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7525968646280758304479087875394791432643972128740636660626504085818230994683867895865145053283396000480026792330579218515495619518*i+11793384038462945209438083245521788820126726752891521780637903817885003983046504337495223190010981790018154206321877085684870348153)*x + (2950368193579112158201174221220040941265771597670553346376423290796685783284676279115418041851955675790997220793803880139494456776*i+23394466090929701766317170361099687765153301435885964647855917030295968669065507770070242679238200968992801453373699027930138632511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5301421687833647975469730619748274972491273822901539766720450292264263580715893756143861720467483011573682526213065272657955910891*i+1319013154510820450317219040073987515423048866533095572088952067378445039523450500813662796450723225215860111887978474043118145257)*x + (5917067761027914503857551699037305858383235679475466806483805088331283809028454921886313932661459563831690398720283453992476019853*i+3078598370763113925228051555763868340116098598232638772094290627797355639567042866825300017314671960869357813410278372129496320238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5301421687833647975469730619748274972491273822901539766720450292264263580715893756143861720467483011573682526213065272657955910891*i+1319013154510820450317219040073987515423048866533095572088952067378445039523450500813662796450723225215860111887978474043118145257)*x + (5917067761027914503857551699037305858383235679475466806483805088331283809028454921886313932661459563831690398720283453992476019853*i+3078598370763113925228051555763868340116098598232638772094290627797355639567042866825300017314671960869357813410278372129496320238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22919838247430094779714600222187819999204370397730766133082344499174064795944433766215811681731627359098206677737824807024703572484*i+10195045731733494721168128877015676671638702018472378990323639363253313393878280267363556750200842839240909478686456697659002117514)*x + (18156794192193556898136448289844630121034165500888567392352843285091642015947526014629214491788848356571835335199264224618379631852*i+24390049770233059704999188450758212544371542790555958144713207394639941820453210912073350942335152255640648314205463614419035252937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22919838247430094779714600222187819999204370397730766133082344499174064795944433766215811681731627359098206677737824807024703572484*i+10195045731733494721168128877015676671638702018472378990323639363253313393878280267363556750200842839240909478686456697659002117514)*x + (18156794192193556898136448289844630121034165500888567392352843285091642015947526014629214491788848356571835335199264224618379631852*i+24390049770233059704999188450758212544371542790555958144713207394639941820453210912073350942335152255640648314205463614419035252937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2723513891894852976456036048988880611904202767799904245246520158020889153585685158764172866238712019930163277559579636277561946423*i+8599259852390078548627899369270968205190684749239120497773518099376334551487391625418411847454144940345262795108390165519531846881)*x + (24010614982941974752330018287502749574408902318631980809370349650380889172204388613068439036255212844372734346848318423369368259699*i+11992713001327982645670005987345875670210139017577017582337107352018090978118566055769636925055172686484371230737621541168443718134) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2723513891894852976456036048988880611904202767799904245246520158020889153585685158764172866238712019930163277559579636277561946423*i+8599259852390078548627899369270968205190684749239120497773518099376334551487391625418411847454144940345262795108390165519531846881)*x + (24010614982941974752330018287502749574408902318631980809370349650380889172204388613068439036255212844372734346848318423369368259699*i+11992713001327982645670005987345875670210139017577017582337107352018090978118566055769636925055172686484371230737621541168443718134) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23331335751249857483198898959019751588105498947206555130827944546168556633945864752334176104879539737758469656912543275135159513833*i+21500916001853603241670828751397912474138610748451245653129182741666167668789060800011329722070476840499104593837941279291668741498)*x + (11222269306737862321092069663848614840847659884798049869007733222551222308285915601684350422305408539564071999007542654525251318340*i+20380192142115069971602790986930679871093069809904059522091876372975583700055428160161287344732462341290538982167870928472139989090) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23331335751249857483198898959019751588105498947206555130827944546168556633945864752334176104879539737758469656912543275135159513833*i+21500916001853603241670828751397912474138610748451245653129182741666167668789060800011329722070476840499104593837941279291668741498)*x + (11222269306737862321092069663848614840847659884798049869007733222551222308285915601684350422305408539564071999007542654525251318340*i+20380192142115069971602790986930679871093069809904059522091876372975583700055428160161287344732462341290538982167870928472139989090) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10786497870523843553789562561981569591447612515080694201916504513645599961340916004453067875700623977479112491946076466063399503259*i+21764003781477718452301052833223508582021047774402524057985599274323038034821943296981332574428135579696347014203043579798792979814)*x + (9113883474679360599867101820635654976816866234714907544130715328659961796389866107618425689244903894746386223788515715914051889579*i+7466583007069105848646398352186349866738736372295776107006292812072620841117964256719075895137618649181599914110880793849243737785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10786497870523843553789562561981569591447612515080694201916504513645599961340916004453067875700623977479112491946076466063399503259*i+21764003781477718452301052833223508582021047774402524057985599274323038034821943296981332574428135579696347014203043579798792979814)*x + (9113883474679360599867101820635654976816866234714907544130715328659961796389866107618425689244903894746386223788515715914051889579*i+7466583007069105848646398352186349866738736372295776107006292812072620841117964256719075895137618649181599914110880793849243737785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1395248531960294135644383751082636477617352764442082217769278438822128553845153553431970508035148948677524424782469387710103025330*i+18161372074033225870110605377763246787454414101809969127493369284462298633178059671134614020086663613288175262367697849271134595118)*x + (19535764535538645201165164598118198236826351997197053461401699522596326685003992034880400617462219290626913698784138861927569289555*i+4985867717378722752410867844022447391576363498552349125962989131643733510884474744215286678723936647732741866365536065902482189624) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1395248531960294135644383751082636477617352764442082217769278438822128553845153553431970508035148948677524424782469387710103025330*i+18161372074033225870110605377763246787454414101809969127493369284462298633178059671134614020086663613288175262367697849271134595118)*x + (19535764535538645201165164598118198236826351997197053461401699522596326685003992034880400617462219290626913698784138861927569289555*i+4985867717378722752410867844022447391576363498552349125962989131643733510884474744215286678723936647732741866365536065902482189624) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23455323573999058747294026170527924942328076900915462479907000622706952708525698581878553170178168379016606024838328267483394353250*i+4234397766686216556722209436983514979147777616449165613014179760994204977797766728554758657006608195788200023978260602093370241714)*x + (2470777553210587247620943464801422648240827223763123814549885944820685974913432390979754812725407767457660254165180237438210075034*i+8632629538711379763695541394508542305820215269939775943848243430255586183155670338883152203553104993550228985824406677831056664961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23455323573999058747294026170527924942328076900915462479907000622706952708525698581878553170178168379016606024838328267483394353250*i+4234397766686216556722209436983514979147777616449165613014179760994204977797766728554758657006608195788200023978260602093370241714)*x + (2470777553210587247620943464801422648240827223763123814549885944820685974913432390979754812725407767457660254165180237438210075034*i+8632629538711379763695541394508542305820215269939775943848243430255586183155670338883152203553104993550228985824406677831056664961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12460743981057781662603525407200878056581661631753387416281704612366987661324159280267389414393950200667851795157522051400279235596*i+3226390586234393626853050102962886906032681452701448450722111377298333199483770351964480451413452111009685839378900181975973488739)*x + (21495294095552071269539638539029797589386606542971575285301391469322291898158415268636010748562763655484276321302335136810886303742*i+6019353143726397629333206814588426722195662911291848391325192531459755151995711868963336329766037999538048028772026035949369066189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12460743981057781662603525407200878056581661631753387416281704612366987661324159280267389414393950200667851795157522051400279235596*i+3226390586234393626853050102962886906032681452701448450722111377298333199483770351964480451413452111009685839378900181975973488739)*x + (21495294095552071269539638539029797589386606542971575285301391469322291898158415268636010748562763655484276321302335136810886303742*i+6019353143726397629333206814588426722195662911291848391325192531459755151995711868963336329766037999538048028772026035949369066189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11933013346715741319049315538634428215409130741339361500302780638626490850079349287127578266433725230842234946153163689670912100616*i+4600179442487693712548412182613599670242495524440425901622019823091674387630250908653026086293767556246040340866193707055242009998)*x + (7837829373223878825665194179245457460253150148145872073246374564336892952390101133440374435618553334294512185423577029227889613540*i+11695870974763729479699099927799663341044252769051806172048294785374081553865051364762933163918707033147503966952852004274013167831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11933013346715741319049315538634428215409130741339361500302780638626490850079349287127578266433725230842234946153163689670912100616*i+4600179442487693712548412182613599670242495524440425901622019823091674387630250908653026086293767556246040340866193707055242009998)*x + (7837829373223878825665194179245457460253150148145872073246374564336892952390101133440374435618553334294512185423577029227889613540*i+11695870974763729479699099927799663341044252769051806172048294785374081553865051364762933163918707033147503966952852004274013167831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15165290126913970254377797933885033243757202623481164752495330898529640033747762830598797480919989888811734418558559044318972686467*i+18607640593497321631299987551705516588561459662304680721967762945016600144754202920850887327894250573538109613822338630475133868424)*x + (1047428034386680797417824523435229719954136113852447956892391778205276177283815628688373698203789314663294873808970181825100485847*i+7697643831628044275890833841845301884950510644232155795614488740415339971210045913943661818496621693152261216755709847450051434374) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15165290126913970254377797933885033243757202623481164752495330898529640033747762830598797480919989888811734418558559044318972686467*i+18607640593497321631299987551705516588561459662304680721967762945016600144754202920850887327894250573538109613822338630475133868424)*x + (1047428034386680797417824523435229719954136113852447956892391778205276177283815628688373698203789314663294873808970181825100485847*i+7697643831628044275890833841845301884950510644232155795614488740415339971210045913943661818496621693152261216755709847450051434374) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23253637042402922202682695508661704444183336083112763984353342601961224094973531535534065054607775053982828080151457186708226650187*i+20910479757401689151507340772112217407924451914517492165797724527130652352646973517034311089573495693294136971863193134898515382879)*x + (6248255779770017718697796271248135970991569806296038791511299884891942509837706029651850204350452472653097374717154793061837138095*i+16782220425873974293704227002040097036158581466043420807648320446946502533573876481474976061041254893333824825356258201690669365629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23253637042402922202682695508661704444183336083112763984353342601961224094973531535534065054607775053982828080151457186708226650187*i+20910479757401689151507340772112217407924451914517492165797724527130652352646973517034311089573495693294136971863193134898515382879)*x + (6248255779770017718697796271248135970991569806296038791511299884891942509837706029651850204350452472653097374717154793061837138095*i+16782220425873974293704227002040097036158581466043420807648320446946502533573876481474976061041254893333824825356258201690669365629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1731473751626335484991681386129234535525794954367536097586950439111084827933535206197213002057104742209358055890683469068904671003*i+12343623535699774895418986546297378658610337174882115643962527796385385487626132421752498328126244341475825165753597413073984127741)*x + (4722594058065003385044571195602101823547029717427821343537791670262072268030692986342294248767586471743069623167770294477359156922*i+19052129154461221624648529000533997015526999418196771804465812540507674884841810510260494499767013374377465565844260973847252574159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1731473751626335484991681386129234535525794954367536097586950439111084827933535206197213002057104742209358055890683469068904671003*i+12343623535699774895418986546297378658610337174882115643962527796385385487626132421752498328126244341475825165753597413073984127741)*x + (4722594058065003385044571195602101823547029717427821343537791670262072268030692986342294248767586471743069623167770294477359156922*i+19052129154461221624648529000533997015526999418196771804465812540507674884841810510260494499767013374377465565844260973847252574159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6405040737132719501092756908137638656602762711349934567526154892413868536053779908968892701906573271101932791735459280158437607296*i+14593289150472704687062145729503706880173135454070045604678210554302309854990305680051704757136459269793409731321065931970051044827)*x + (8272591489299947537263475493652236381218534825332186455243638808987629360826523398491287615012743887018347948403082420041973780951*i+15152606980067831368164118171977506103708711759147063870953846804535628484881280450768548574118041690775298384836504032812704821400) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6405040737132719501092756908137638656602762711349934567526154892413868536053779908968892701906573271101932791735459280158437607296*i+14593289150472704687062145729503706880173135454070045604678210554302309854990305680051704757136459269793409731321065931970051044827)*x + (8272591489299947537263475493652236381218534825332186455243638808987629360826523398491287615012743887018347948403082420041973780951*i+15152606980067831368164118171977506103708711759147063870953846804535628484881280450768548574118041690775298384836504032812704821400) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5065917003690762776352615166454782297821096414953175686571867157095297289466356933865476901839328248444707641775165620490472122463*i+14096284654626072322273112439918831710107428483332575836254575716907212097470972200030129123076548087979302268799964081076740058381)*x + (3555424005251313946289301975674880724133549168387353094201310377793637944973680526713960503732812051238464152767399161898462176730*i+17176600477852297441317333076598008752012666316457893053531881122251139179060119012143201688981269817311193228251660132002289226527) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5065917003690762776352615166454782297821096414953175686571867157095297289466356933865476901839328248444707641775165620490472122463*i+14096284654626072322273112439918831710107428483332575836254575716907212097470972200030129123076548087979302268799964081076740058381)*x + (3555424005251313946289301975674880724133549168387353094201310377793637944973680526713960503732812051238464152767399161898462176730*i+17176600477852297441317333076598008752012666316457893053531881122251139179060119012143201688981269817311193228251660132002289226527) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20421236160202866982975087027241987745194551305565844528562169489443317142284052239756306741355384778249175540706004980715912955779*i+20032446890389793635949733979258951305436572786560402697924278745629210299215212882975538357590532645704858231637091732030704074453)*x + (15946892248323387682932383602711129336690872976267482751905135401294415648992817584251067085029744401254429900777429221120960063954*i+7991940205736995741261408241875910540886813868533805248944878169295751054847608040537375114170167294392754612598754809306270554917) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20421236160202866982975087027241987745194551305565844528562169489443317142284052239756306741355384778249175540706004980715912955779*i+20032446890389793635949733979258951305436572786560402697924278745629210299215212882975538357590532645704858231637091732030704074453)*x + (15946892248323387682932383602711129336690872976267482751905135401294415648992817584251067085029744401254429900777429221120960063954*i+7991940205736995741261408241875910540886813868533805248944878169295751054847608040537375114170167294392754612598754809306270554917) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13977378357760888396116093125973426909019091366682791855303604656923035119556392552351878339894605063961450369259728059539331743047*i+17008248872378007114617045132778166539593048673698972330377767915363713780572598433158256850075883903121068931069230782062400866845)*x + (23019368751752533974078773417076925719857740890607933154019697907383933360849102599713797985068975893723786316503689283344453280307*i+270843939977451593911402158433002934203004717385367246668943539929261764104328081223308978154716089055348209074869740049557601158) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13977378357760888396116093125973426909019091366682791855303604656923035119556392552351878339894605063961450369259728059539331743047*i+17008248872378007114617045132778166539593048673698972330377767915363713780572598433158256850075883903121068931069230782062400866845)*x + (23019368751752533974078773417076925719857740890607933154019697907383933360849102599713797985068975893723786316503689283344453280307*i+270843939977451593911402158433002934203004717385367246668943539929261764104328081223308978154716089055348209074869740049557601158) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18773200352129777181671490176845804193157921331592259669400677404836914290729953080843016169322287740558481691824762232033510856754*i+2525440387462064330031441282320142748126805049735131605895861481676197184882348134770837592432333277850138825776382319074823652020)*x + (41204677403539008127496711423531601949381525397693130356608495158510910301519151380433528206058202623641582881102385446247258937*i+5209016372904113066148515093510891271828008100599141131728008126877682937227085317327287282624588754958838319055032506237310866095) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18773200352129777181671490176845804193157921331592259669400677404836914290729953080843016169322287740558481691824762232033510856754*i+2525440387462064330031441282320142748126805049735131605895861481676197184882348134770837592432333277850138825776382319074823652020)*x + (41204677403539008127496711423531601949381525397693130356608495158510910301519151380433528206058202623641582881102385446247258937*i+5209016372904113066148515093510891271828008100599141131728008126877682937227085317327287282624588754958838319055032506237310866095) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12123971305797043286001767907986277502459161292300593689294264417469044367582696855984385576522313450497160972234187651511727714259*i+20199445098619541056313324769969009199331279212505629696649826656314512906407817384218412531759602791998745399145950572089141803651)*x + (6631860465397749923153727656701242947993769579822922714817748251194549487503877631801581185514052338478784334039781337297462739361*i+9191809269222731263171058140647717408470494827291865156505771906646067547818069046261506933311610956914091913663515271468779556855) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12123971305797043286001767907986277502459161292300593689294264417469044367582696855984385576522313450497160972234187651511727714259*i+20199445098619541056313324769969009199331279212505629696649826656314512906407817384218412531759602791998745399145950572089141803651)*x + (6631860465397749923153727656701242947993769579822922714817748251194549487503877631801581185514052338478784334039781337297462739361*i+9191809269222731263171058140647717408470494827291865156505771906646067547818069046261506933311610956914091913663515271468779556855) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16347167065589786131838937655527874907265274080177371191402918517234145020679639031788073678081042045761669454361795239422388536927*i+8744574952626249841305849588605069386359803601912570868726233910660744012788496140671387414971857238241508829523609904709266411967)*x + (19583746024789532121097495870761636654569295158883585699957127300462952748294313642585088291182084512131269959220425882991382721298*i+22556594611013862473142614708708513729825868555608021728980379193069071191766255920363870427170226349599673049481658789193042568326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16347167065589786131838937655527874907265274080177371191402918517234145020679639031788073678081042045761669454361795239422388536927*i+8744574952626249841305849588605069386359803601912570868726233910660744012788496140671387414971857238241508829523609904709266411967)*x + (19583746024789532121097495870761636654569295158883585699957127300462952748294313642585088291182084512131269959220425882991382721298*i+22556594611013862473142614708708513729825868555608021728980379193069071191766255920363870427170226349599673049481658789193042568326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5076725814425273360796361360290163203493050349117481330957794693393455441107299875558099732095879010170611555223624495856254204250*i+11207654662726381244905474154432796062967507088552289944099511247592715406282860423765108034362106232975255961624174192728288155339)*x + (4711565492403504419033780646570278634930635521866954674795866388293735409258873860829180825090624559105311533265535180911162068788*i+19196057773913132541933704096843245653016718524415329400251388578455894449289286800616491947324527525528331642513598695810178087145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5076725814425273360796361360290163203493050349117481330957794693393455441107299875558099732095879010170611555223624495856254204250*i+11207654662726381244905474154432796062967507088552289944099511247592715406282860423765108034362106232975255961624174192728288155339)*x + (4711565492403504419033780646570278634930635521866954674795866388293735409258873860829180825090624559105311533265535180911162068788*i+19196057773913132541933704096843245653016718524415329400251388578455894449289286800616491947324527525528331642513598695810178087145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9355057709998419976423538491663172422673074377299569246535196973643024162164107971185061048925121192966111139352015615267813432556*i+11436429446565424286863481342523636302284831675812707911096718778042055149852451550825124636012246842885239301322378631936364160602)*x + (15791552464593826684072860153548174298933244139656558450634907890537586803475700345274605963049649410294489159592822428338165292018*i+21503467423375871974858975104038296259082460470776454383469780119459231827249826733327374588142735730942790906189171475508427781637) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9355057709998419976423538491663172422673074377299569246535196973643024162164107971185061048925121192966111139352015615267813432556*i+11436429446565424286863481342523636302284831675812707911096718778042055149852451550825124636012246842885239301322378631936364160602)*x + (15791552464593826684072860153548174298933244139656558450634907890537586803475700345274605963049649410294489159592822428338165292018*i+21503467423375871974858975104038296259082460470776454383469780119459231827249826733327374588142735730942790906189171475508427781637) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [85]:
Phi5 = isogeny_walk (E, R5, l_B, n_B)
Phi5
Out[85]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 4813219499806256080727360664475860652733186331573760157358957127654698345021523345903606250811847755265270184703092745751596166671*x + 8128306828198975511370882453904078308531459311946487122736624031357472915020620097055819354221408300507484961940652068289827994951 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 4813219499806256080727360664475860652733186331573760157358957127654698345021523345903606250811847755265270184703092745751596166671*x + 8128306828198975511370882453904078308531459311946487122736624031357472915020620097055819354221408300507484961940652068289827994951 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 18632326121661071058663921534467355458015364978920978301508021511158795791239391719633602079301178450129648619257596271201795385020*x + 7384078133599120960650310732813614942107088448191329357616051198652742921033321455684467967062596395491393382649246851484472333570 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 18632326121661071058663921534467355458015364978920978301508021511158795791239391719633602079301178450129648619257596271201795385020*x + 7384078133599120960650310732813614942107088448191329357616051198652742921033321455684467967062596395491393382649246851484472333570 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16537634174462879869366417039874652891417422874802052058143168038409470095005287082113478300997006783961885396720248107118950405583*i+6230810348761250982976259304580557564930818856860588910726908267173705662800529018235838533049818316202936008240062572569866135167)*x + (5614736080875765932736529083949596112744341792001613643709387878726443811431418662616312701593870793696207332970525601824162893130*i+2598238898580065097735181847884488273705562697920029435990765594270964702225119075848694867513418855898599406548662634987561632172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16537634174462879869366417039874652891417422874802052058143168038409470095005287082113478300997006783961885396720248107118950405583*i+6230810348761250982976259304580557564930818856860588910726908267173705662800529018235838533049818316202936008240062572569866135167)*x + (5614736080875765932736529083949596112744341792001613643709387878726443811431418662616312701593870793696207332970525601824162893130*i+2598238898580065097735181847884488273705562697920029435990765594270964702225119075848694867513418855898599406548662634987561632172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7173776124271091155589377069465430875325740583274900382091001922466272236505352046687807699159780016836013516908876121682416355204*i+8654789105752801254158058372122372489110942858093159967750803353741434192026868371649540647963688154766504269446880751444565354343)*x + (2833982387301802882869862930978986331702856894445510985601047700034254668232875309418699155523224007617009283284274090315002254557*i+22808669296064795126096622280393576118740047366882701671330912863854598440813693242230224885654769948542463620291287839878376293004) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7173776124271091155589377069465430875325740583274900382091001922466272236505352046687807699159780016836013516908876121682416355204*i+8654789105752801254158058372122372489110942858093159967750803353741434192026868371649540647963688154766504269446880751444565354343)*x + (2833982387301802882869862930978986331702856894445510985601047700034254668232875309418699155523224007617009283284274090315002254557*i+22808669296064795126096622280393576118740047366882701671330912863854598440813693242230224885654769948542463620291287839878376293004) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19779040979967966611213494293163989420666533478385999612688113225398464416744463239850204503003378038166978916975202637321989976630*i+17131152122483207941119314328607115904706266889168684624201994652853894439523225088079374130341716300849761257537136381366705015697)*x + (13275316954097733810889422535452667165281429850422089661981420295128105817885779344274628644831603217620244729627433007639482716510*i+6604568083792133331323198281520586600967077753273147811441543323659184372958624574284653387659186522637093529365470095492295619311) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19779040979967966611213494293163989420666533478385999612688113225398464416744463239850204503003378038166978916975202637321989976630*i+17131152122483207941119314328607115904706266889168684624201994652853894439523225088079374130341716300849761257537136381366705015697)*x + (13275316954097733810889422535452667165281429850422089661981420295128105817885779344274628644831603217620244729627433007639482716510*i+6604568083792133331323198281520586600967077753273147811441543323659184372958624574284653387659186522637093529365470095492295619311) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23288649207867363466088559041405141063782488756889054936439263668156913656785840256801777757933865210045619838932599520320364405751*i+3366962536540500643416463467106316781603828271801798783768231875257066771472694642965976817877302303158000452855311525786047866159)*x + (2474331241175013252037981492072974931201480146180688396860851643585358928456305747836507664139045677076435780572574003117230342658*i+1671821751521206983521463179877174780409491552812934161017831394937127581016481311970187669471950622296301377665712632176102214486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23288649207867363466088559041405141063782488756889054936439263668156913656785840256801777757933865210045619838932599520320364405751*i+3366962536540500643416463467106316781603828271801798783768231875257066771472694642965976817877302303158000452855311525786047866159)*x + (2474331241175013252037981492072974931201480146180688396860851643585358928456305747836507664139045677076435780572574003117230342658*i+1671821751521206983521463179877174780409491552812934161017831394937127581016481311970187669471950622296301377665712632176102214486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10551196954247606792830204322732457563931168190129653458404209945854792087354813568294343747227692786408389673452118877777154645108*i+22375112374076894175558184407786304231761310827817829166714344527928258763301021116195917180262378172317052621137211206162405584917)*x + (1922015730652592035513995305801941795717913846291250168185529741298918900342818531734157011184184106068164758876173298473155072250*i+14332214540459533644092253352759745975475205110586475830180302631664415701189655837137040402266545070598412248543469221380106150069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10551196954247606792830204322732457563931168190129653458404209945854792087354813568294343747227692786408389673452118877777154645108*i+22375112374076894175558184407786304231761310827817829166714344527928258763301021116195917180262378172317052621137211206162405584917)*x + (1922015730652592035513995305801941795717913846291250168185529741298918900342818531734157011184184106068164758876173298473155072250*i+14332214540459533644092253352759745975475205110586475830180302631664415701189655837137040402266545070598412248543469221380106150069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1257707124179729304511190829256942804408065265263680116970869460302011047232582000406283239069514429440683520634824251986612522570*i+17203516853686928686651350692001196534438957372731793322288999572964397281286362186102156929117128966007069271257158263628688782674)*x + (22544453029990043659146593694399690619794892669034696224336853143361384054331796283192558318192398189435960610401835203487614237282*i+18412379385017871596323252217175725335618258247790094378243955184328572949881867216395633809527893708088982385082728862852475493102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1257707124179729304511190829256942804408065265263680116970869460302011047232582000406283239069514429440683520634824251986612522570*i+17203516853686928686651350692001196534438957372731793322288999572964397281286362186102156929117128966007069271257158263628688782674)*x + (22544453029990043659146593694399690619794892669034696224336853143361384054331796283192558318192398189435960610401835203487614237282*i+18412379385017871596323252217175725335618258247790094378243955184328572949881867216395633809527893708088982385082728862852475493102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7302971440702125934177305480834413481332270190585644136475320505440540873246812766037934332833416611422906229654629354789689095397*i+17622962794786436681239894670999407200439909038548666245098618784149758760665392916085048138928338679615508700298600487580581450836)*x + (15887866971380413239798746941553134788177659700460817991330852935011453335519297558246334551930603761307459259245380410094488689496*i+9379182998739961761570489142401644160331803822003967535054247325972038324937574343272358339182010122455289566401577934665824181848) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7302971440702125934177305480834413481332270190585644136475320505440540873246812766037934332833416611422906229654629354789689095397*i+17622962794786436681239894670999407200439909038548666245098618784149758760665392916085048138928338679615508700298600487580581450836)*x + (15887866971380413239798746941553134788177659700460817991330852935011453335519297558246334551930603761307459259245380410094488689496*i+9379182998739961761570489142401644160331803822003967535054247325972038324937574343272358339182010122455289566401577934665824181848) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13025152923626718877584504080506645025062751471118598406772219232589665882413447375756849011381305038317784554155507397078076608788*i+15816819766095976854323416004154836770649795422009308366931224189954916951909416034827590366594433214286080273751112968693557643512)*x + (14244694463200004346062634751538065655467233435984691543133468331554782540914267012623457905302407326683115386721490582089721597583*i+5097012158801886837885051476464331374014099636974297327926793338585917997274906101393577986695890855003533168357648270216178722733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13025152923626718877584504080506645025062751471118598406772219232589665882413447375756849011381305038317784554155507397078076608788*i+15816819766095976854323416004154836770649795422009308366931224189954916951909416034827590366594433214286080273751112968693557643512)*x + (14244694463200004346062634751538065655467233435984691543133468331554782540914267012623457905302407326683115386721490582089721597583*i+5097012158801886837885051476464331374014099636974297327926793338585917997274906101393577986695890855003533168357648270216178722733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23742778645318314198500565885357129969069274855596564797525954637300739561622239962908885077527932633633980329394124472639234278007*i+22690681343624260388699697096994153708048304208123154923950265031487693262678905893344765053917118583824689789301046984603794397764)*x + (12357065585262699374893608684463197084451081251697698700347062054227279291073953098071342730213568136358439457635698718266968269083*i+15682717303662991962175482276046064740860831585764904022260663258564692100184097797944381686291489401406768713730097142061861659961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23742778645318314198500565885357129969069274855596564797525954637300739561622239962908885077527932633633980329394124472639234278007*i+22690681343624260388699697096994153708048304208123154923950265031487693262678905893344765053917118583824689789301046984603794397764)*x + (12357065585262699374893608684463197084451081251697698700347062054227279291073953098071342730213568136358439457635698718266968269083*i+15682717303662991962175482276046064740860831585764904022260663258564692100184097797944381686291489401406768713730097142061861659961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22199265273423885251242659635187899210072705802677723367922308542780557041326937101732770617067828782929864628374629003450280981080*i+12863603063395125371910740957092569856652241936180369440818836728487317848968001344724990564213215703777859201073673962110635601900)*x + (3461934097476098048822425030008750592328104093749189664107647007097996848067769911786176772553341007123580713651502791785172038984*i+21943833942738468892546709690620422085663447638648020550231424527918154536604581273449523316328307814190995874829050372982491991590) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22199265273423885251242659635187899210072705802677723367922308542780557041326937101732770617067828782929864628374629003450280981080*i+12863603063395125371910740957092569856652241936180369440818836728487317848968001344724990564213215703777859201073673962110635601900)*x + (3461934097476098048822425030008750592328104093749189664107647007097996848067769911786176772553341007123580713651502791785172038984*i+21943833942738468892546709690620422085663447638648020550231424527918154536604581273449523316328307814190995874829050372982491991590) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8759687978384835093767654602875314330777051698782454238370313696012782645894366933075239542725221187490212795147830577649487528429*i+16210244567067696419366991959344967448124049187496668071069334921715300374394860231448630728487024386749512773196670462370589370256)*x + (21640461548227602186189697359940504335137938680793266902367624175193490577001059043016558322327270694434128609025194892514041872510*i+2796398755359010392195111170049613311052176451365841424378189345382483766397506525762713893840450980693718215302165598654895182203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8759687978384835093767654602875314330777051698782454238370313696012782645894366933075239542725221187490212795147830577649487528429*i+16210244567067696419366991959344967448124049187496668071069334921715300374394860231448630728487024386749512773196670462370589370256)*x + (21640461548227602186189697359940504335137938680793266902367624175193490577001059043016558322327270694434128609025194892514041872510*i+2796398755359010392195111170049613311052176451365841424378189345382483766397506525762713893840450980693718215302165598654895182203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1452710918561619609034170008003592181384661868662206109536524149377059240561780039519629417973908332537962229374714642184213521775*i+7994474892080457797114859484686986948634804921613004817865406472709449277271961991873127633079024051424110494957222782078820916947)*x + (9084683332431857202112907575408172962983471232232829152116940474407308228993932986281873018137886239866231497046272055941765306046*i+15602914657302058383191704545296962912833725447873124068412365867451566784913298151535106646274239028555461441663006448413318891638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1452710918561619609034170008003592181384661868662206109536524149377059240561780039519629417973908332537962229374714642184213521775*i+7994474892080457797114859484686986948634804921613004817865406472709449277271961991873127633079024051424110494957222782078820916947)*x + (9084683332431857202112907575408172962983471232232829152116940474407308228993932986281873018137886239866231497046272055941765306046*i+15602914657302058383191704545296962912833725447873124068412365867451566784913298151535106646274239028555461441663006448413318891638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14524556548612503530295259613900539191951524374062515732640893942999835026340573179816137548919711726992343151162692818808009680678*i+18871255195771649846196974990653032106053542790015391162815018752688055193436930076935829215680348058631738158046520978740843848768)*x + (11029796317177239221513667048281901577222125723398221027092959483428421769535213478089309704449301065399106448069880947751196194406*i+687773410279834251350195961400849672178249363549468297189503553595191903458642474585597887357608549907402709703341005300735980269) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14524556548612503530295259613900539191951524374062515732640893942999835026340573179816137548919711726992343151162692818808009680678*i+18871255195771649846196974990653032106053542790015391162815018752688055193436930076935829215680348058631738158046520978740843848768)*x + (11029796317177239221513667048281901577222125723398221027092959483428421769535213478089309704449301065399106448069880947751196194406*i+687773410279834251350195961400849672178249363549468297189503553595191903458642474585597887357608549907402709703341005300735980269) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22393590978067694564026393935793437784991028620539320448959342508575176482912523508677863434981798754061972524107537657472208440811*i+19602894297907877709138421652289603424961129461826332193744978629090945141064285879917584092415847873311610448157898772526486787024)*x + (19274016176440658064045220564526009909552464110020233191839176620754775975076378648809991862544569188528072878001091399674174632253*i+532082105311571260116338262390404378857439992523777756628544899801420807773726838833058126298717633854920552423420660084477345) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22393590978067694564026393935793437784991028620539320448959342508575176482912523508677863434981798754061972524107537657472208440811*i+19602894297907877709138421652289603424961129461826332193744978629090945141064285879917584092415847873311610448157898772526486787024)*x + (19274016176440658064045220564526009909552464110020233191839176620754775975076378648809991862544569188528072878001091399674174632253*i+532082105311571260116338262390404378857439992523777756628544899801420807773726838833058126298717633854920552423420660084477345) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17674295164744945921803273135034422828856654591762893655417245953293252775958483687264711376554973234190894094414751457703038612484*i+21717179558347093470466491607701924520059093211455897038101182726296134911114011775195271248957287071183321639730513075417961128840)*x + (21426346570081263416530842272104529767865381342953183117817582967512897170572765264841361450638458574560895985202455146096287213904*i+9206855423508331975088502168569874671249925041262316384853844650108118797552552097947305640354271599706225610789335290078065116037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17674295164744945921803273135034422828856654591762893655417245953293252775958483687264711376554973234190894094414751457703038612484*i+21717179558347093470466491607701924520059093211455897038101182726296134911114011775195271248957287071183321639730513075417961128840)*x + (21426346570081263416530842272104529767865381342953183117817582967512897170572765264841361450638458574560895985202455146096287213904*i+9206855423508331975088502168569874671249925041262316384853844650108118797552552097947305640354271599706225610789335290078065116037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5784601209063307209968471753936224555406422210707143849801355978082130671574432389347395395152714428217807533159711882693075772364*i+6208839996736967194419199786753916789622016273492384583792993819544203852207384081037094895455557000546990289495003032172508610545)*x + (15356724797741699014948710973900567233491448937205691166547358327252484519901622452220789784246625079535262990021076154390431738804*i+22397388048567180608049983830462892056577708762595918525158923680325182477932170177156194326289254179708991418686505732107250161685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5784601209063307209968471753936224555406422210707143849801355978082130671574432389347395395152714428217807533159711882693075772364*i+6208839996736967194419199786753916789622016273492384583792993819544203852207384081037094895455557000546990289495003032172508610545)*x + (15356724797741699014948710973900567233491448937205691166547358327252484519901622452220789784246625079535262990021076154390431738804*i+22397388048567180608049983830462892056577708762595918525158923680325182477932170177156194326289254179708991418686505732107250161685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22970693191453164974854872561376835356741693839815102574289925504599336174344948564386761993472082337331498585823147407202803485444*i+18994434163810098391248748802994824876503635827209096390377532171073673052951138809676233241859081246905886910455840768143310075429)*x + (21641314608333428069736663734875725149902453407719867344944401941310484260516398962230326400235058584023341136785973902558593797483*i+1003238684989814837948667465826385998855223734539056014846965076718848044393449750500942453343934794940250247584391529407353686352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22970693191453164974854872561376835356741693839815102574289925504599336174344948564386761993472082337331498585823147407202803485444*i+18994434163810098391248748802994824876503635827209096390377532171073673052951138809676233241859081246905886910455840768143310075429)*x + (21641314608333428069736663734875725149902453407719867344944401941310484260516398962230326400235058584023341136785973902558593797483*i+1003238684989814837948667465826385998855223734539056014846965076718848044393449750500942453343934794940250247584391529407353686352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11527052476872849414119543610370763501202826056285434868142206729124632287427131990142432418092819136030639334516595811667083817556*i+11315796864425042813483262424881178139622461213171472003806486477480655353968244647131859831616760046165206375106797656675317555357)*x + (4188108663624242890252589379134394839360009901890019772738405450269096804106826490170271453755711055594072710355197614585317497987*i+22650546474428816399826561183978482890202067719076037478584572271849302325710143381800376704429720773022526409455505411163918669174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11527052476872849414119543610370763501202826056285434868142206729124632287427131990142432418092819136030639334516595811667083817556*i+11315796864425042813483262424881178139622461213171472003806486477480655353968244647131859831616760046165206375106797656675317555357)*x + (4188108663624242890252589379134394839360009901890019772738405450269096804106826490170271453755711055594072710355197614585317497987*i+22650546474428816399826561183978482890202067719076037478584572271849302325710143381800376704429720773022526409455505411163918669174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23403239072301254950376576800703370621943609182267171649598253905149824235829268859809909185436446782911894798896566224420781610011*i+4691472123406712452732199466948157656810892579480621098485886143872990807573166897379911524457738897692480085386567527074773948297)*x + (23559769073726488319648537939196849450827729851276570940045083469356298772832170954574485361966171736679148084463384152108561684956*i+1096697404955619408581875955795818694173172320200999616400479517785479168642817811716917962063312170899865595548145195859699980550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23403239072301254950376576800703370621943609182267171649598253905149824235829268859809909185436446782911894798896566224420781610011*i+4691472123406712452732199466948157656810892579480621098485886143872990807573166897379911524457738897692480085386567527074773948297)*x + (23559769073726488319648537939196849450827729851276570940045083469356298772832170954574485361966171736679148084463384152108561684956*i+1096697404955619408581875955795818694173172320200999616400479517785479168642817811716917962063312170899865595548145195859699980550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15675407734023754064469075030384398129368643326342369647409193315745302106987281961950781411565783625850068993812681592866037639230*i+20079077338982031352035936356203186812503417444850821566965415230458856937383341188515776689217607329120951813121726902519117270084)*x + (2343553952221435145373637225871350643977940265457955661290290368511066397418281887452223901060914744476105604460119393302713832250*i+17268224646810901812355259118064653092872105905396024574726280845075734000082475081742886792458101800060662322288749441146192602058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15675407734023754064469075030384398129368643326342369647409193315745302106987281961950781411565783625850068993812681592866037639230*i+20079077338982031352035936356203186812503417444850821566965415230458856937383341188515776689217607329120951813121726902519117270084)*x + (2343553952221435145373637225871350643977940265457955661290290368511066397418281887452223901060914744476105604460119393302713832250*i+17268224646810901812355259118064653092872105905396024574726280845075734000082475081742886792458101800060662322288749441146192602058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14950395979804104426589006224044441069818577473078459327812236634115027997594282043429234362645231438663943299180219748979694705712*i+19382449891541974516000031413426210343008582692719030790962901117188229129164574792633830756480460072782446277091414870488006476495)*x + (13245165096575951982815372344911310590313179787224091946752652962347573358687707518865712009193103073736586487089536323868947722361*i+18296935084703785009159352945480990446459894943456763507674549550535105749155213912813580178593196232321527855147069038222405015922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14950395979804104426589006224044441069818577473078459327812236634115027997594282043429234362645231438663943299180219748979694705712*i+19382449891541974516000031413426210343008582692719030790962901117188229129164574792633830756480460072782446277091414870488006476495)*x + (13245165096575951982815372344911310590313179787224091946752652962347573358687707518865712009193103073736586487089536323868947722361*i+18296935084703785009159352945480990446459894943456763507674549550535105749155213912813580178593196232321527855147069038222405015922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20884745335315652475060016910946664327524732990810092307638730177223327267484582572410672928738442005546031194329294982662918787489*i+824589353711994183693906357424713696429251667320126763217173205214160566447163482287940762491186919855723784205106188001519242879)*x + (6281952342984371841605581007403479977994246701599476757870176925859057275709212562211131849412530899968613866153355963733015875213*i+9140453232356568305111716816745040415059239874901945989497027296252737331384294134535151228140641663989445952701028359740377741827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20884745335315652475060016910946664327524732990810092307638730177223327267484582572410672928738442005546031194329294982662918787489*i+824589353711994183693906357424713696429251667320126763217173205214160566447163482287940762491186919855723784205106188001519242879)*x + (6281952342984371841605581007403479977994246701599476757870176925859057275709212562211131849412530899968613866153355963733015875213*i+9140453232356568305111716816745040415059239874901945989497027296252737331384294134535151228140641663989445952701028359740377741827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14397723326628802675816128751614710824207821595179152235354980416295290810433432532227552524647858552779207968576419779150603349577*i+9218620683722016989989449304367829395653904123662319123114705068746158083249590759650210261858534948122074078373901910562299678415)*x + (23073702775096520087379016552191225883717944029754655557498476690353799517798469913119700308407303560366356943066584178143225881042*i+21458999861296736767727310569063491432956450794769630570568155649199859573489301121496349506072322773794774532267857694218587660894) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14397723326628802675816128751614710824207821595179152235354980416295290810433432532227552524647858552779207968576419779150603349577*i+9218620683722016989989449304367829395653904123662319123114705068746158083249590759650210261858534948122074078373901910562299678415)*x + (23073702775096520087379016552191225883717944029754655557498476690353799517798469913119700308407303560366356943066584178143225881042*i+21458999861296736767727310569063491432956450794769630570568155649199859573489301121496349506072322773794774532267857694218587660894) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15912315387772256445874500793653455608919651953451086162996458401408195325154489073587621389740539978031754210924095205869249409924*i+5003901187665354238923512530764027876175473917634530495533145953225686265807938373726605196068144702719112865246516573541377852206)*x + (6492130103977800138425749659302277998359088029936448946567538859320836046991228291066425085473871002315237651145801656694458472484*i+24057725211359832669746946918423751225037019398532587345326686466819836609351120771464991336451814858053893805373471934732123701085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15912315387772256445874500793653455608919651953451086162996458401408195325154489073587621389740539978031754210924095205869249409924*i+5003901187665354238923512530764027876175473917634530495533145953225686265807938373726605196068144702719112865246516573541377852206)*x + (6492130103977800138425749659302277998359088029936448946567538859320836046991228291066425085473871002315237651145801656694458472484*i+24057725211359832669746946918423751225037019398532587345326686466819836609351120771464991336451814858053893805373471934732123701085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12073326968147168451760260411833758834972709290748679006505449146215933538922929537479332611459792642638882874918739827171882582197*i+20857452967589997994405791639008621607052130982611308825855645202359140163997111090132160467622115989999083679298808682352807901272)*x + (2752111604772426663740968950103448468685128758382182490435266926549727832338275759982049652695737565092959638422589030523429366690*i+9829186320868586110871000661516999981469323116643908747338190204898874407754762202345426406284635681360479549085365301619943923421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12073326968147168451760260411833758834972709290748679006505449146215933538922929537479332611459792642638882874918739827171882582197*i+20857452967589997994405791639008621607052130982611308825855645202359140163997111090132160467622115989999083679298808682352807901272)*x + (2752111604772426663740968950103448468685128758382182490435266926549727832338275759982049652695737565092959638422589030523429366690*i+9829186320868586110871000661516999981469323116643908747338190204898874407754762202345426406284635681360479549085365301619943923421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22231720392852700949055068723654549415636778995335677436933448686934242307201034517235322084588151436926013677837273681342617684169*i+6434485381458106570356969427454961567873540220021008141154899510915168788411333569953205654943108839247240254048627293181524048909)*x + (3584148911007863188378858670466358098504842710660461611717329189841748247925481437450073975440318338486929525743051329213370234556*i+4391942447016995706006775542176555366770537572541452033155414815604851405716921715698655522284608333122960339910228061236037717300) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22231720392852700949055068723654549415636778995335677436933448686934242307201034517235322084588151436926013677837273681342617684169*i+6434485381458106570356969427454961567873540220021008141154899510915168788411333569953205654943108839247240254048627293181524048909)*x + (3584148911007863188378858670466358098504842710660461611717329189841748247925481437450073975440318338486929525743051329213370234556*i+4391942447016995706006775542176555366770537572541452033155414815604851405716921715698655522284608333122960339910228061236037717300) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4926231001490907951490420525139456543060750265509798168012570509335585370451215689820751141745129602671835994761578443988089923444*i+9136478528662973523343135916916730348576598792747406899557292517245347706455680166442085835010051589747010530321190803375205233275)*x + (19793358168171292931588565572317203376232250941395063121052474342736858947664364923297959997824687253813391707260398945747555861388*i+8801905275577325478305102809342247945133535157369179971927177119887297054174601729733723966726460822132245465863106649776423954389) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4926231001490907951490420525139456543060750265509798168012570509335585370451215689820751141745129602671835994761578443988089923444*i+9136478528662973523343135916916730348576598792747406899557292517245347706455680166442085835010051589747010530321190803375205233275)*x + (19793358168171292931588565572317203376232250941395063121052474342736858947664364923297959997824687253813391707260398945747555861388*i+8801905275577325478305102809342247945133535157369179971927177119887297054174601729733723966726460822132245465863106649776423954389) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23051659319995220313052050135857247418695371897248991604552820454179187408480208775219283396434822977809650349321363497724144398437*i+17202244377214737885046743418666423866022415674396658301989904303444715984245518471517171563533865340834139786651042238609870943426)*x + (11376962472400246135876513225400411689463974519103924640379530491139917405315461378946179057270906282124450556371205228140637408466*i+18978279988321467107095668496023408940786477178165392305085249513805012358408437438822778313184849977538443495394384342021065816846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23051659319995220313052050135857247418695371897248991604552820454179187408480208775219283396434822977809650349321363497724144398437*i+17202244377214737885046743418666423866022415674396658301989904303444715984245518471517171563533865340834139786651042238609870943426)*x + (11376962472400246135876513225400411689463974519103924640379530491139917405315461378946179057270906282124450556371205228140637408466*i+18978279988321467107095668496023408940786477178165392305085249513805012358408437438822778313184849977538443495394384342021065816846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21862623267405784275775393348033439225541371822958796920569252026129168230799431648321857270550437893083270011623923630651830376783*i+9238328867727597835462894392172005824356232459083306904485352786636999727492525913947357384839154149632728323410876295268911709725)*x + (9845221419304255998019510033303142620972928966656431610020842185009705913336733956718804881789522063945112637710585896395938895521*i+8138283568541626005360483473227169498954245130403639749032731500262631646302989277901314850365676541868092133459546224127934673915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21862623267405784275775393348033439225541371822958796920569252026129168230799431648321857270550437893083270011623923630651830376783*i+9238328867727597835462894392172005824356232459083306904485352786636999727492525913947357384839154149632728323410876295268911709725)*x + (9845221419304255998019510033303142620972928966656431610020842185009705913336733956718804881789522063945112637710585896395938895521*i+8138283568541626005360483473227169498954245130403639749032731500262631646302989277901314850365676541868092133459546224127934673915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16586036678640109473961162176005286232936675605144171753296012121171242098666821254026142545038777198383807825185350860913320224320*i+21423090006995376791403025918520368896504699856634889196213188877768480159383359644298203367000941736494445806137861917015989878977)*x + (5464015594321327866851759680293945419609387547052485375215382147206931706776837681579783512105581260417445349804083756962803249204*i+14553574326291712479935437735878319176934261099148657477797971839999213443026144771941862859622415473916240943682671538697482956174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16586036678640109473961162176005286232936675605144171753296012121171242098666821254026142545038777198383807825185350860913320224320*i+21423090006995376791403025918520368896504699856634889196213188877768480159383359644298203367000941736494445806137861917015989878977)*x + (5464015594321327866851759680293945419609387547052485375215382147206931706776837681579783512105581260417445349804083756962803249204*i+14553574326291712479935437735878319176934261099148657477797971839999213443026144771941862859622415473916240943682671538697482956174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16547406432864018030134740493946027936912542656168662301821258294627081098186839622770789421144304529806437495045201471439736857008*i+14738588021730577980614732645562258140576567003062531095526038433400425757143630287088273706903017294497210877777472285393592202119)*x + (4658227396541278705324181826999110164316164886126063174749280494981391291956509048188421492564401845822296072586889363312299480457*i+7019673789569348307274144972701533617700654629900114253470743682298039061310036640936716327108514519357939285888231156532499950289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16547406432864018030134740493946027936912542656168662301821258294627081098186839622770789421144304529806437495045201471439736857008*i+14738588021730577980614732645562258140576567003062531095526038433400425757143630287088273706903017294497210877777472285393592202119)*x + (4658227396541278705324181826999110164316164886126063174749280494981391291956509048188421492564401845822296072586889363312299480457*i+7019673789569348307274144972701533617700654629900114253470743682298039061310036640936716327108514519357939285888231156532499950289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17571643306733471167639298888077507064503748957925097845507457094660575165135018504371277366054467095282730585096850746873397774871*i+6509498355305497019492976414228334997412541934723272769045969949408188468270890311463780533142575986841061380231238064378231531755)*x + (20369557142190842146429190442497420973281657515413083819134939435156558675711020999999688474005470011077303785405925227323864881089*i+19176972153682467455800520640218927418223174286850836426668915991910129014586429053637024647294922887636977753634877179557635621656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17571643306733471167639298888077507064503748957925097845507457094660575165135018504371277366054467095282730585096850746873397774871*i+6509498355305497019492976414228334997412541934723272769045969949408188468270890311463780533142575986841061380231238064378231531755)*x + (20369557142190842146429190442497420973281657515413083819134939435156558675711020999999688474005470011077303785405925227323864881089*i+19176972153682467455800520640218927418223174286850836426668915991910129014586429053637024647294922887636977753634877179557635621656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2785356162975171457113371350340950839482231409722252187472538513059028198961511096120829120689188488735070921974042417286987745436*i+17586786450401548957434406072432281588389440749714586150498103677640481637054668897060189324975220018501283526932511191075577810380)*x + (7524011898513866614894259638482916534204879634794066210931875599361346345673420300384223845575974374066179595402279995834579561771*i+18518003868332042296663418456580196273925622462777164965092530166139247029120686153402105953874968185863569716619500693841549701422) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2785356162975171457113371350340950839482231409722252187472538513059028198961511096120829120689188488735070921974042417286987745436*i+17586786450401548957434406072432281588389440749714586150498103677640481637054668897060189324975220018501283526932511191075577810380)*x + (7524011898513866614894259638482916534204879634794066210931875599361346345673420300384223845575974374066179595402279995834579561771*i+18518003868332042296663418456580196273925622462777164965092530166139247029120686153402105953874968185863569716619500693841549701422) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10296887177347064228226864700709570183976936724442677874692946898571945265680073601997214721598855839700794869257769200209094042383*i+21458303888945096112911969122366534174465698732382734230152925787540840937032991538316478653509117309087652914382599212924868430133)*x + (15356816452615426364260862404434082010540144750815828055000106753504124407416152277203961761591742331370811757719916534022821656234*i+9645672948389775287177162977549863324135860407982765530916956477503763140194969823153425967343328250381430255703658257808324222245) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10296887177347064228226864700709570183976936724442677874692946898571945265680073601997214721598855839700794869257769200209094042383*i+21458303888945096112911969122366534174465698732382734230152925787540840937032991538316478653509117309087652914382599212924868430133)*x + (15356816452615426364260862404434082010540144750815828055000106753504124407416152277203961761591742331370811757719916534022821656234*i+9645672948389775287177162977549863324135860407982765530916956477503763140194969823153425967343328250381430255703658257808324222245) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20677314850837352754460801949056695666188434038248472703142918726268614735164896270142237205062134831483062599952935763641353198887*i+21353938267407613065831182064318023040469879254220266333018239038153393589803347460477791166765345310149499460448515074192440566325)*x + (15784158507507960837887723893653853665297624820652858846344484293540236837243919823870199423986699713690412778265629280252596269049*i+19611710106017149078945947391108760298969691868674060746125278183193790939168865297182454051688768304204319075532312767777801847334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20677314850837352754460801949056695666188434038248472703142918726268614735164896270142237205062134831483062599952935763641353198887*i+21353938267407613065831182064318023040469879254220266333018239038153393589803347460477791166765345310149499460448515074192440566325)*x + (15784158507507960837887723893653853665297624820652858846344484293540236837243919823870199423986699713690412778265629280252596269049*i+19611710106017149078945947391108760298969691868674060746125278183193790939168865297182454051688768304204319075532312767777801847334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16011391935669813691302325842012822906378651493817981875325667783203882914878783928453136175977012354495232229351223707020669470714*i+24204572209025328243997836100791516683425038438198821909714469134150288401876499694812919195855569170230042144164865329578417327418)*x + (18675337032246666144985542027234336387307702130542115198351853176519230885707530108213092986677217980157037628525095252198120013435*i+24378264245910983063489264859049873065203529842762166174642696115358184443551341569953503435566563936559639716565327835572147369263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16011391935669813691302325842012822906378651493817981875325667783203882914878783928453136175977012354495232229351223707020669470714*i+24204572209025328243997836100791516683425038438198821909714469134150288401876499694812919195855569170230042144164865329578417327418)*x + (18675337032246666144985542027234336387307702130542115198351853176519230885707530108213092986677217980157037628525095252198120013435*i+24378264245910983063489264859049873065203529842762166174642696115358184443551341569953503435566563936559639716565327835572147369263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1036559621696357626174302234288045354352038408355767881286948859570125745418946398682359192298849341328098857812510033589233033817*i+13970416696460180593663146234762801725681950888666791576143523747755541374011499165129519220610900430836388287944434714742755273902)*x + (10289003709681658438405066010432873440311195806429056890533440100893442188062869985263156821912661514989055908389917856098446541252*i+16070856323732286472402041113606614249308015151850716347384884171566240058867175008480086230666585106133900778936199181313029832739) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1036559621696357626174302234288045354352038408355767881286948859570125745418946398682359192298849341328098857812510033589233033817*i+13970416696460180593663146234762801725681950888666791576143523747755541374011499165129519220610900430836388287944434714742755273902)*x + (10289003709681658438405066010432873440311195806429056890533440100893442188062869985263156821912661514989055908389917856098446541252*i+16070856323732286472402041113606614249308015151850716347384884171566240058867175008480086230666585106133900778936199181313029832739) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11729268652122932795221525275397739723099662779895839419277853788594131577355815046058711333538862559589003924422693544636393214488*i+601675210641489478112556264074728376454021293257713907209681667328657340226222846071250293193053389698560662427220966044136008231)*x + (8976179027121570308674487326066092308118972399758011953069280642712645098847088719363074096771350761573853638499547729844256167987*i+3813839535414646382691386774216267088969837535833256704952891620232680839963221854627165258830747266986524020438829140739384044674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11729268652122932795221525275397739723099662779895839419277853788594131577355815046058711333538862559589003924422693544636393214488*i+601675210641489478112556264074728376454021293257713907209681667328657340226222846071250293193053389698560662427220966044136008231)*x + (8976179027121570308674487326066092308118972399758011953069280642712645098847088719363074096771350761573853638499547729844256167987*i+3813839535414646382691386774216267088969837535833256704952891620232680839963221854627165258830747266986524020438829140739384044674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15438476971956629823619822038106450396243171941614101518839711122718641714607985034562266396207097222654790384118469884144124950443*i+21157671660012482671001326244436529894588314598132437691111574488556384541939553771208864550207037658368321567464175291997369977328)*x + (15443933194562129034779653384150625631660214487250459523879974501685231352809963166174352301402734034883923858551553678456249662970*i+7912211592493822634134217170819396707862620909242285458107804621803365296796501218289935194333079548343553546300605093738413054792) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15438476971956629823619822038106450396243171941614101518839711122718641714607985034562266396207097222654790384118469884144124950443*i+21157671660012482671001326244436529894588314598132437691111574488556384541939553771208864550207037658368321567464175291997369977328)*x + (15443933194562129034779653384150625631660214487250459523879974501685231352809963166174352301402734034883923858551553678456249662970*i+7912211592493822634134217170819396707862620909242285458107804621803365296796501218289935194333079548343553546300605093738413054792) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3478017818337394678643636083806782030720958472013475031419944125987827680423963537144464212725660628859114266772519184002727061198*i+20828188256215284009919666112649661222156206804765149590020465727248928638399865698768966086081289973800507186457551047453960722673)*x + (21353343254024218595316116388966620261588506323006854538923354927632139620491360339124580526332671325506290838257635528541039446186*i+2258996698160991746675410304276497865405275150580553519844710591165372419595450994144956246206458057891987406065004736039967521598) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3478017818337394678643636083806782030720958472013475031419944125987827680423963537144464212725660628859114266772519184002727061198*i+20828188256215284009919666112649661222156206804765149590020465727248928638399865698768966086081289973800507186457551047453960722673)*x + (21353343254024218595316116388966620261588506323006854538923354927632139620491360339124580526332671325506290838257635528541039446186*i+2258996698160991746675410304276497865405275150580553519844710591165372419595450994144956246206458057891987406065004736039967521598) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9574961678109640158153849008764302186703781784790708030664948346829169354118699485436463967675052072746228010798297829230711423484*i+20888858367723830407919876242360914818324722604053718860232728540642656172422558560361563703766126729549918822897536636190254629339)*x + (1382427381389278536441261613120087378357462216151494267489753949086100359994265717694813731840821833012421285536196687274909214714*i+1548615890460903317659246283863022215816445471893575388414351619763422844465842564295069318785663612328855174663095058884083585121) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9574961678109640158153849008764302186703781784790708030664948346829169354118699485436463967675052072746228010798297829230711423484*i+20888858367723830407919876242360914818324722604053718860232728540642656172422558560361563703766126729549918822897536636190254629339)*x + (1382427381389278536441261613120087378357462216151494267489753949086100359994265717694813731840821833012421285536196687274909214714*i+1548615890460903317659246283863022215816445471893575388414351619763422844465842564295069318785663612328855174663095058884083585121) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10222398360314439502314576074115698300606496716927893112922268084135547048106663217268150164758600264953061634214695276164310556592*i+13690195461496322484914739594223233468110293343675980577186442797777227532912689793866563667746958069961814546383923607606716766874)*x + (5055873790448325510977852862664540133353165610848317793346557870669896984955629625457322054144073987572654941382368417976558631118*i+12021094105257878974767355273955196819816170055961391418188549633922574485986071823284918652450795376531030690572171814327911557372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10222398360314439502314576074115698300606496716927893112922268084135547048106663217268150164758600264953061634214695276164310556592*i+13690195461496322484914739594223233468110293343675980577186442797777227532912689793866563667746958069961814546383923607606716766874)*x + (5055873790448325510977852862664540133353165610848317793346557870669896984955629625457322054144073987572654941382368417976558631118*i+12021094105257878974767355273955196819816170055961391418188549633922574485986071823284918652450795376531030690572171814327911557372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12901520262993212605370726038791870339436127690824647450402213762022045583802996367816892971312009461513707060725407736270912647262*i+11764040170112311897861501341988453728325778329637272455782310029617685996244821199566043667457547536454049979558752651765347625516)*x + (23796465043656279121950507850913482843310738413386770660030720402327244542690020239445200499210275323191923391075795413144882873479*i+17619548955899001194925646914600928676155099062767647078905239131731531839554691083345214360323765219295041759732492526401264540955) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12901520262993212605370726038791870339436127690824647450402213762022045583802996367816892971312009461513707060725407736270912647262*i+11764040170112311897861501341988453728325778329637272455782310029617685996244821199566043667457547536454049979558752651765347625516)*x + (23796465043656279121950507850913482843310738413386770660030720402327244542690020239445200499210275323191923391075795413144882873479*i+17619548955899001194925646914600928676155099062767647078905239131731531839554691083345214360323765219295041759732492526401264540955) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14048334351867535439805992779127446667185632425226543970968264362592841549925048732741297968638342628088405345361992728508981506828*i+2080327489553570942249434528448714999332792444166759977299110271630514807591039211799567908159232973966672378959297773384074896099)*x + (20145473122327917280391163316000672879690961730982639399644208578345899744491211960557445144012377697396452253748642046006785337868*i+4905208393456672243711287658384729854944794044051152073060530075493147332974209404925519622137375500327410120627261445324674095462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14048334351867535439805992779127446667185632425226543970968264362592841549925048732741297968638342628088405345361992728508981506828*i+2080327489553570942249434528448714999332792444166759977299110271630514807591039211799567908159232973966672378959297773384074896099)*x + (20145473122327917280391163316000672879690961730982639399644208578345899744491211960557445144012377697396452253748642046006785337868*i+4905208393456672243711287658384729854944794044051152073060530075493147332974209404925519622137375500327410120627261445324674095462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13286899658478017682480635212787612039006679393527995003434057889435314566265278429259387413931631179380680571154646320656953017962*i+24150172906704756654142723550344363840999583915824985354858494601527598865754897777191506738259542243367982286802015015542085288730)*x + (10166912656569025277617238955489808675848745907090684049720160153840790610667207508614622374832661840814563055146992573745662247499*i+12487460814203001898619806846361207583877579625327747652673513609826866971960481974065660166535572417875492096035457717709593097471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13286899658478017682480635212787612039006679393527995003434057889435314566265278429259387413931631179380680571154646320656953017962*i+24150172906704756654142723550344363840999583915824985354858494601527598865754897777191506738259542243367982286802015015542085288730)*x + (10166912656569025277617238955489808675848745907090684049720160153840790610667207508614622374832661840814563055146992573745662247499*i+12487460814203001898619806846361207583877579625327747652673513609826866971960481974065660166535572417875492096035457717709593097471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6976747815530544919047546636575997147048238968867275107816556470930067601746147330936581669655676553609102128111556000840541193052*i+16539786598591890779174618620619438905919366256393390156537513545280875164237267980312200807223935548044473496363711842474062002970)*x + (24122101028426411763056338491763704988396156137273028098515341918025866452654019145097662731016776423823796696895227757308410164364*i+21557675137871403709083215499811010040659344601004286907339217624260643059650565824486655782017454794655976203423065074113102772752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6976747815530544919047546636575997147048238968867275107816556470930067601746147330936581669655676553609102128111556000840541193052*i+16539786598591890779174618620619438905919366256393390156537513545280875164237267980312200807223935548044473496363711842474062002970)*x + (24122101028426411763056338491763704988396156137273028098515341918025866452654019145097662731016776423823796696895227757308410164364*i+21557675137871403709083215499811010040659344601004286907339217624260643059650565824486655782017454794655976203423065074113102772752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19628089600961821926845844313117200020626306415157036152683792290982621788792675253161542183561487452423360383357271928841662922101*i+1539621439807490613333083906155606338549167791667280332963429862097497717164630610878165226996914130845546912923762292582980430412)*x + (1732887210708997137196531283608552680985689465783844027633188346786814693851447716749272702685147139645313365431996974156868748417*i+3835671153139269289239770976042648362123065250058926675971408390178230848835487727414521127478224811095052798348870015219170637640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19628089600961821926845844313117200020626306415157036152683792290982621788792675253161542183561487452423360383357271928841662922101*i+1539621439807490613333083906155606338549167791667280332963429862097497717164630610878165226996914130845546912923762292582980430412)*x + (1732887210708997137196531283608552680985689465783844027633188346786814693851447716749272702685147139645313365431996974156868748417*i+3835671153139269289239770976042648362123065250058926675971408390178230848835487727414521127478224811095052798348870015219170637640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9843548087010430400141717945722011992143263962626625695019122973050881653053654151576485245079175885567860648621196644721166021747*i+4467772133454217113836797572951219907969027998382697835830360303122618735845127732660090672046414589634281418010924836076122628505)*x + (19407160872252219275344205939879357889776726589773192106281884858902507778044093006927347420603995318813969055972024303003691950040*i+6872045328068074222949305408977707693263403896972334412558391536249090252793157683369354048112084062389557734568814440626808037862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9843548087010430400141717945722011992143263962626625695019122973050881653053654151576485245079175885567860648621196644721166021747*i+4467772133454217113836797572951219907969027998382697835830360303122618735845127732660090672046414589634281418010924836076122628505)*x + (19407160872252219275344205939879357889776726589773192106281884858902507778044093006927347420603995318813969055972024303003691950040*i+6872045328068074222949305408977707693263403896972334412558391536249090252793157683369354048112084062389557734568814440626808037862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10960720587579246658675181177495430681434467148013655179951326474305631172163422200916646470580091779575755249575645700751981232961*i+8721167454482116827852149877630946028626382445202086081137045267048581517759122565451343625278041033117009293931391525961659052958)*x + (8158467259445258539586950029102974691620539179692707115963280542673091394876996251754104092863994602004134831010977774861301450150*i+4547621923895332919975523315700875586662053735366703858918639304622005226086198042264707368545486516611209853315113330657770127109) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10960720587579246658675181177495430681434467148013655179951326474305631172163422200916646470580091779575755249575645700751981232961*i+8721167454482116827852149877630946028626382445202086081137045267048581517759122565451343625278041033117009293931391525961659052958)*x + (8158467259445258539586950029102974691620539179692707115963280542673091394876996251754104092863994602004134831010977774861301450150*i+4547621923895332919975523315700875586662053735366703858918639304622005226086198042264707368545486516611209853315113330657770127109) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23339831413548977502745936966738151590495631499979746664027359880952434831540513040599986441780995451622888091384534622080495447048*i+20568344965040785244748368120351293405361194056243976155416457458356625501509421765720235550815827845004861122793059331240034265242)*x + (22562141172908703562949831685310470908643128373037258734688623937216089840172871169176931158135179866941370845044681227328076269776*i+16041700014976285083789618630979123569584258487877068840976079872261618409884231606996399688902878776305571126325284636382765064868) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23339831413548977502745936966738151590495631499979746664027359880952434831540513040599986441780995451622888091384534622080495447048*i+20568344965040785244748368120351293405361194056243976155416457458356625501509421765720235550815827845004861122793059331240034265242)*x + (22562141172908703562949831685310470908643128373037258734688623937216089840172871169176931158135179866941370845044681227328076269776*i+16041700014976285083789618630979123569584258487877068840976079872261618409884231606996399688902878776305571126325284636382765064868) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22433488716800037062819444114414598322973620812250462895591012146594649939305201300167753070381394883895973827632634678851690586444*i+13158161204762088451645008311296215973209438890424617702106466492316474361877590046122980586583981760693868653840174686993120091571)*x + (23515181618097451422785002969916866385261164290529238996398000936200166977024536277717884097487941617900472259341160554757748607799*i+16699630724296262237715955889132219531653623136815197529067283198555954098076518187620456763730601526663910790142204063480084693471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22433488716800037062819444114414598322973620812250462895591012146594649939305201300167753070381394883895973827632634678851690586444*i+13158161204762088451645008311296215973209438890424617702106466492316474361877590046122980586583981760693868653840174686993120091571)*x + (23515181618097451422785002969916866385261164290529238996398000936200166977024536277717884097487941617900472259341160554757748607799*i+16699630724296262237715955889132219531653623136815197529067283198555954098076518187620456763730601526663910790142204063480084693471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11356236476345457309175885902185598594101395267342044237912119490499379843707157456625312641191719414595514451184243176777605244876*i+13958106215207066109263619593809029691878004448765508170877473867169717616653472764094794045075792571892347099109240435590928052013)*x + (3431739363612147228467946705001043653178213533211426074315844347088212773736179784019780893042400762970191491299990471004261412316*i+21056485807363976034831056289584745505315322560242244555155775862240721532675923871171814041806599773158595403803238998964480887102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11356236476345457309175885902185598594101395267342044237912119490499379843707157456625312641191719414595514451184243176777605244876*i+13958106215207066109263619593809029691878004448765508170877473867169717616653472764094794045075792571892347099109240435590928052013)*x + (3431739363612147228467946705001043653178213533211426074315844347088212773736179784019780893042400762970191491299990471004261412316*i+21056485807363976034831056289584745505315322560242244555155775862240721532675923871171814041806599773158595403803238998964480887102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20992494646672707953882231863897359742670836031197429394354878462640224157059538614652714903353884598588225230359911621134973730205*i+5270753986239518468444023976987916514643169333469517289717734196212011369462957533892644865335028122306527487609139200368255810960)*x + (6530586493592276497543192358904575112997754314361846756813741795820371743208292944970519934770636670913831259060510610951874624950*i+12479919225587324742109405344242895471442787114869889939661969789716548679894459789609689751393803729840518193435873485903253851593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20992494646672707953882231863897359742670836031197429394354878462640224157059538614652714903353884598588225230359911621134973730205*i+5270753986239518468444023976987916514643169333469517289717734196212011369462957533892644865335028122306527487609139200368255810960)*x + (6530586493592276497543192358904575112997754314361846756813741795820371743208292944970519934770636670913831259060510610951874624950*i+12479919225587324742109405344242895471442787114869889939661969789716548679894459789609689751393803729840518193435873485903253851593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18650058505443519518490721490139368019548172485313789759143911007673834762295255071242043783348085115565661217121761507938961948146*i+21472970869340839010513026041566133406507558603418363202591002976532398157351095893985416756981885828398526720688476925870115726506)*x + (9207285697756117710291053555807911560943753319752860444633390279898168656489519626660155461817453285221794844312063174162421829102*i+13964494120866988845948699250954179730459189755210513940872273049410290469852044181783240214719455400343260307480803256029545090212) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18650058505443519518490721490139368019548172485313789759143911007673834762295255071242043783348085115565661217121761507938961948146*i+21472970869340839010513026041566133406507558603418363202591002976532398157351095893985416756981885828398526720688476925870115726506)*x + (9207285697756117710291053555807911560943753319752860444633390279898168656489519626660155461817453285221794844312063174162421829102*i+13964494120866988845948699250954179730459189755210513940872273049410290469852044181783240214719455400343260307480803256029545090212) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16509185187884806767755638706403761719652083057539699979985220791978283261688181766858279753362525729587009966721573204947195339837*i+17277200867906028491099412923673197543434921361432213991310299273104818530575715188918948927969414142168544693623620379818793384382)*x + (4598166386209613159605500002198913822688259484336423630233233079687209293084716559026270700506541769666259191208022954440313717713*i+16991266442303057764073827947618126195874051917409696556226752056602238695691856361221801047026519990263175079259250613739436562650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16509185187884806767755638706403761719652083057539699979985220791978283261688181766858279753362525729587009966721573204947195339837*i+17277200867906028491099412923673197543434921361432213991310299273104818530575715188918948927969414142168544693623620379818793384382)*x + (4598166386209613159605500002198913822688259484336423630233233079687209293084716559026270700506541769666259191208022954440313717713*i+16991266442303057764073827947618126195874051917409696556226752056602238695691856361221801047026519990263175079259250613739436562650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7213234985664847418400818028056649348494751222929854107888807804025107819033261877884604405911800774875783516500090498786596989349*i+4754686218991104593844065563291135297378414961191143521843883832724056312443959013772731745736455224834799216383628445494832983561)*x + (15053529965096031039947444159746310112228076901525370695390718866968662718284142921627033222474143328798592356288483956396653055355*i+24378930013910874348653098584686838265780280179405642827781253139873766872286219428430461477759132696486885073241177580211632548318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7213234985664847418400818028056649348494751222929854107888807804025107819033261877884604405911800774875783516500090498786596989349*i+4754686218991104593844065563291135297378414961191143521843883832724056312443959013772731745736455224834799216383628445494832983561)*x + (15053529965096031039947444159746310112228076901525370695390718866968662718284142921627033222474143328798592356288483956396653055355*i+24378930013910874348653098584686838265780280179405642827781253139873766872286219428430461477759132696486885073241177580211632548318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4203512285752441727554881764273240927642954162514163333304601661495196038123953932933036351237728282649862912631778419161097738556*i+23915193367417338804261427510855126942419047281572132557720621887352484068549930464626021015789807207585554140975786758399879696611)*x + (13423891068335117451989282396451717275420944675622000429334633165110173377301391168726082722546426368040069072090415282154983524715*i+22673386527693725766745294990187411373859553905156426001364557860540827557291136101667663153500959746509893559862509196227880732180) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4203512285752441727554881764273240927642954162514163333304601661495196038123953932933036351237728282649862912631778419161097738556*i+23915193367417338804261427510855126942419047281572132557720621887352484068549930464626021015789807207585554140975786758399879696611)*x + (13423891068335117451989282396451717275420944675622000429334633165110173377301391168726082722546426368040069072090415282154983524715*i+22673386527693725766745294990187411373859553905156426001364557860540827557291136101667663153500959746509893559862509196227880732180) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11728648252210695810633735309465891981953512106497473916536177116036759847731643549431192616837366191780080242172849417679027979487*i+15507291218263308360721356676765930473358471645766472460977483541324686688552292608474355695995686691811365655812431758536376962457)*x + (8516647494947486852480949545130900321261428002196328718617570880942968657091818160461127449642722850084355961460221483870682851419*i+14481856708363699295313713103393475271300293260231035374012457938142655634986965372662139098967918635534516741360854172722201426226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11728648252210695810633735309465891981953512106497473916536177116036759847731643549431192616837366191780080242172849417679027979487*i+15507291218263308360721356676765930473358471645766472460977483541324686688552292608474355695995686691811365655812431758536376962457)*x + (8516647494947486852480949545130900321261428002196328718617570880942968657091818160461127449642722850084355961460221483870682851419*i+14481856708363699295313713103393475271300293260231035374012457938142655634986965372662139098967918635534516741360854172722201426226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1905178656445603934141027283641676461444166539771475722440721609241597680987627770402540291249313515750001946642153717878641102694*i+23258187487391105367033626360113607520174744093345643664355390008818231558395554844677203342116966316766620777094881553855745268974)*x + (15376593283177189269088307512784622794316994538396287569992046716830278615515049412050575997363978473521177033466994676192796498126*i+17294229715144535303036469475701774990575186168709766453133378628648996776024807894836884975282900047042388743435351522932383166841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1905178656445603934141027283641676461444166539771475722440721609241597680987627770402540291249313515750001946642153717878641102694*i+23258187487391105367033626360113607520174744093345643664355390008818231558395554844677203342116966316766620777094881553855745268974)*x + (15376593283177189269088307512784622794316994538396287569992046716830278615515049412050575997363978473521177033466994676192796498126*i+17294229715144535303036469475701774990575186168709766453133378628648996776024807894836884975282900047042388743435351522932383166841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1784405399058802237391551058368292677034726617169633667079132704915545793707705971626731128060386305363183525387100613403509039617*i+12393896010984327361745540693641812589707102676520371012528508051907129133493377219187048557423062834805045350259689709649228358029)*x + (244747464102606982412228391685911543240780128745653961127340520284215494801248972208254482894487575342331399482084014101626647015*i+2139123698083031866443553441456284482327171209038158758641218379753726451656755968881367611323384437209918804424394281145414677767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1784405399058802237391551058368292677034726617169633667079132704915545793707705971626731128060386305363183525387100613403509039617*i+12393896010984327361745540693641812589707102676520371012528508051907129133493377219187048557423062834805045350259689709649228358029)*x + (244747464102606982412228391685911543240780128745653961127340520284215494801248972208254482894487575342331399482084014101626647015*i+2139123698083031866443553441456284482327171209038158758641218379753726451656755968881367611323384437209918804424394281145414677767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11733621804935325404980801678566413551111444885605561193360051311756139002716832823185171469023288384681800723734720040000224649799*i+11595831153638816268066182151096406007325342183981087542935914080701792979506188799491395426827716240617721039221891840871717939951)*x + (4268589967764784305044036379226784845967521988620215389350056935575715346831798641485855524039569044007567029334357059117417520595*i+14602025139350670878061519547658058326390690518732633317103954525515281312557301791194550659584878953873547367781564983131016860505) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11733621804935325404980801678566413551111444885605561193360051311756139002716832823185171469023288384681800723734720040000224649799*i+11595831153638816268066182151096406007325342183981087542935914080701792979506188799491395426827716240617721039221891840871717939951)*x + (4268589967764784305044036379226784845967521988620215389350056935575715346831798641485855524039569044007567029334357059117417520595*i+14602025139350670878061519547658058326390690518732633317103954525515281312557301791194550659584878953873547367781564983131016860505) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21305722677983743800752081531282111805572956283103716815552871255036541630501109113075877189729909024245454108303782869691234363320*i+8844031158653179240174681069487480740803976621501401200777759905919470210509945564906021709081152289235462833035368859848956466358)*x + (6161703113762254188202652560408130667796424819955581126140849775693149773117191284902607070019734877134578117910103878492964768354*i+5030637878069338347048284626748943431490279515306067936259278132176966800856505613428842914208464688746939093774716464891509783213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21305722677983743800752081531282111805572956283103716815552871255036541630501109113075877189729909024245454108303782869691234363320*i+8844031158653179240174681069487480740803976621501401200777759905919470210509945564906021709081152289235462833035368859848956466358)*x + (6161703113762254188202652560408130667796424819955581126140849775693149773117191284902607070019734877134578117910103878492964768354*i+5030637878069338347048284626748943431490279515306067936259278132176966800856505613428842914208464688746939093774716464891509783213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5947693809395720198797293724552188027218930325384314859018267946560561543086310322969073331431889374369601826841623227000415951905*i+2560884418986160847769078664493188378980127358202308480342460890656973139889370913083129792786914259132540888234453540649259971524)*x + (23265773653073497504832677194187645036954978327002796227500873579485168942023169740220741423480204197841556170593338174284354675314*i+14468968725954533989277729220435436357488103214481863265422422363122821924901722934543089525063463823223217687775871015742901818438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5947693809395720198797293724552188027218930325384314859018267946560561543086310322969073331431889374369601826841623227000415951905*i+2560884418986160847769078664493188378980127358202308480342460890656973139889370913083129792786914259132540888234453540649259971524)*x + (23265773653073497504832677194187645036954978327002796227500873579485168942023169740220741423480204197841556170593338174284354675314*i+14468968725954533989277729220435436357488103214481863265422422363122821924901722934543089525063463823223217687775871015742901818438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17971927863392477296077578184689442919577425503206348537405980284019985929593779167179416952839683975086520883941267144483760712200*i+12875373788904821577711044609027558053405333755068811808028707458232849326211058207233842169703126792071260764269164305002914284496)*x + (13805286359939691712409328537300184811998932982599564919489148239298656326876584366242924008682950037339980656937871794037088312097*i+20793644352887342027500837214078694472520936543215240082909869949190143687295507634648965621157535276096409309474231205275709643291) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17971927863392477296077578184689442919577425503206348537405980284019985929593779167179416952839683975086520883941267144483760712200*i+12875373788904821577711044609027558053405333755068811808028707458232849326211058207233842169703126792071260764269164305002914284496)*x + (13805286359939691712409328537300184811998932982599564919489148239298656326876584366242924008682950037339980656937871794037088312097*i+20793644352887342027500837214078694472520936543215240082909869949190143687295507634648965621157535276096409309474231205275709643291) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22008745839627458743830949966095104160239155586276688008032891061169603544102227917787683882269633368111146817346618149232277482313*i+7738366128826731989846981126819434502691701492126238610231280869388268777686517059445133469733203967971499760658593065158894407874)*x + (20966323907743643143689378197668799028648330041807674249099039467325781467093553561875078367219993596874793137867466467438939835056*i+22388855449684461070281436788722911724064935529462843675094851003796006107237202027830433817677132298941236583680709857675596294503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22008745839627458743830949966095104160239155586276688008032891061169603544102227917787683882269633368111146817346618149232277482313*i+7738366128826731989846981126819434502691701492126238610231280869388268777686517059445133469733203967971499760658593065158894407874)*x + (20966323907743643143689378197668799028648330041807674249099039467325781467093553561875078367219993596874793137867466467438939835056*i+22388855449684461070281436788722911724064935529462843675094851003796006107237202027830433817677132298941236583680709857675596294503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7349787777793112226400062707956306450513990954083096114139064380424321593211058577764686670409183139665073086270461340207625839570*i+3480939827599786073756823080953861562376763817422295755885949941815048806607004009441940673178544729589671286578612384336827712459)*x + (21147986919133322619922407138212672529004905519058392609009850766769009052996080713152013981903425447774860834498603023284986601237*i+10784912231498904359177098545859423956985135752153137603394408397965404557320314117169486383445916427288135157247713760492879801635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7349787777793112226400062707956306450513990954083096114139064380424321593211058577764686670409183139665073086270461340207625839570*i+3480939827599786073756823080953861562376763817422295755885949941815048806607004009441940673178544729589671286578612384336827712459)*x + (21147986919133322619922407138212672529004905519058392609009850766769009052996080713152013981903425447774860834498603023284986601237*i+10784912231498904359177098545859423956985135752153137603394408397965404557320314117169486383445916427288135157247713760492879801635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13662375321198821761939406630071998636232251918848353624815544683942798452831472130903288952902633974611529366580544507638548281743*i+1084922065188880583508611543520531588474911451024199080216892057425056696401044831674172238393272514118321135012761740328214524167)*x + (21374676716070883314970467354606760245425695393145711494912128140834693387900010442353983217693533108533501999588238473048104846897*i+1448120398796268980331521719549298820030218005749666875860777950965476562949345102610038322639641483375713971624234667566339999143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13662375321198821761939406630071998636232251918848353624815544683942798452831472130903288952902633974611529366580544507638548281743*i+1084922065188880583508611543520531588474911451024199080216892057425056696401044831674172238393272514118321135012761740328214524167)*x + (21374676716070883314970467354606760245425695393145711494912128140834693387900010442353983217693533108533501999588238473048104846897*i+1448120398796268980331521719549298820030218005749666875860777950965476562949345102610038322639641483375713971624234667566339999143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4066649522669250566024463003272665611528731406229364166001346157871063123593780444833230438648755781428430700717964757430895475801*i+8512739494246435120675437575084520492554017523889635930610381589174672750275348150959792293465082789367971092382341107313724727314)*x + (23725544221558097972363351145149668599444992585881147588971423242505942405348769213739913321294609927842165503897578054619003920028*i+13031205632780029025793772988361027277781875023224411599804098560407050239220857103045854931614207797769786664717785530425881541222) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4066649522669250566024463003272665611528731406229364166001346157871063123593780444833230438648755781428430700717964757430895475801*i+8512739494246435120675437575084520492554017523889635930610381589174672750275348150959792293465082789367971092382341107313724727314)*x + (23725544221558097972363351145149668599444992585881147588971423242505942405348769213739913321294609927842165503897578054619003920028*i+13031205632780029025793772988361027277781875023224411599804098560407050239220857103045854931614207797769786664717785530425881541222) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16147226776632178832422070504593132062677253772512296845662436414192436242616947819092896412402218601770138903107794683044389392017*i+18630920664998548409265717731902469595034233782680247738496941221997075379314682570673319494157617238951630513003948430215548182016)*x + (17486106452055571403926910607600844436139037737578763595380907610540912751084767068836958366535501007948663535490725742790780982265*i+12208343120998826387095221855312425805265700831878708447823824015008107099999794803908701424061887955561631030313832692388811730054) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16147226776632178832422070504593132062677253772512296845662436414192436242616947819092896412402218601770138903107794683044389392017*i+18630920664998548409265717731902469595034233782680247738496941221997075379314682570673319494157617238951630513003948430215548182016)*x + (17486106452055571403926910607600844436139037737578763595380907610540912751084767068836958366535501007948663535490725742790780982265*i+12208343120998826387095221855312425805265700831878708447823824015008107099999794803908701424061887955561631030313832692388811730054) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9563758282761280203283142357259462649866866217346899441670035693856501012480126825644981366084481871019443788857187879663845382089*i+6993421275152007554212535691721145496698589498534792833103587876309099478209533053946724903461697701816003636298212949910958889217)*x + (17982755402581282998245766931567918293519653006925420895017515455745033350770886792714198901964173417623477096825379032095765864636*i+9298744333627185438669046314655202354982659363513612867678610207162596030324351488962441791863467896281670775783522712823807200061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9563758282761280203283142357259462649866866217346899441670035693856501012480126825644981366084481871019443788857187879663845382089*i+6993421275152007554212535691721145496698589498534792833103587876309099478209533053946724903461697701816003636298212949910958889217)*x + (17982755402581282998245766931567918293519653006925420895017515455745033350770886792714198901964173417623477096825379032095765864636*i+9298744333627185438669046314655202354982659363513612867678610207162596030324351488962441791863467896281670775783522712823807200061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7021932782105236555738695668280733255056406823488332034553886661199305759279529206864508429439565435866327865049808945703801533818*i+14706781371258692688627124371695037160804724009099227394665421305763636552421646833497712271581789070214877693298158986235578486225)*x + (19464796085856676721527426758202204937172535380060184343969328703034064011970426529720342385965656750284295771029469603145227799262*i+18262746132059273696786404416095993483021648214293742981571839151012728108438553609936835854263617078650574355892350804140235386826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7021932782105236555738695668280733255056406823488332034553886661199305759279529206864508429439565435866327865049808945703801533818*i+14706781371258692688627124371695037160804724009099227394665421305763636552421646833497712271581789070214877693298158986235578486225)*x + (19464796085856676721527426758202204937172535380060184343969328703034064011970426529720342385965656750284295771029469603145227799262*i+18262746132059273696786404416095993483021648214293742981571839151012728108438553609936835854263617078650574355892350804140235386826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8553643272323079063648470732070643864575733068416409464177305126883856301593208307757408352866625502669821586622156672268732395345*i+3352162660170881872684757845254515343635172129611254878699648925234880996632289544115135014219304354106150989008875591705249764509)*x + (1779572744365558774159113723775667587918976104808355667679693687633445816321966709179272414796406762143940529270090941340259652766*i+3888658891813922389893904648646058076821462557689061824054536004290495150666303626546644195336949013194664886991998010772193945343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8553643272323079063648470732070643864575733068416409464177305126883856301593208307757408352866625502669821586622156672268732395345*i+3352162660170881872684757845254515343635172129611254878699648925234880996632289544115135014219304354106150989008875591705249764509)*x + (1779572744365558774159113723775667587918976104808355667679693687633445816321966709179272414796406762143940529270090941340259652766*i+3888658891813922389893904648646058076821462557689061824054536004290495150666303626546644195336949013194664886991998010772193945343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9379306908640169811643358288243425253780067841876951646602246708668831149397191721635314645128296041191856732235593370580566349866*i+1749025496378331908510261841515028335719915307936835705351186422584780468830683092910324717927763869107695131320656199624726094079)*x + (20860352986141969323260090552046082056344356860124476774941217203539912247194010847991023228328275710912451449701081821803043604442*i+20377443735117852244866097935787722247111517961724915322392348003549119586983822286124195592399430296038508814016091092830782854762) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9379306908640169811643358288243425253780067841876951646602246708668831149397191721635314645128296041191856732235593370580566349866*i+1749025496378331908510261841515028335719915307936835705351186422584780468830683092910324717927763869107695131320656199624726094079)*x + (20860352986141969323260090552046082056344356860124476774941217203539912247194010847991023228328275710912451449701081821803043604442*i+20377443735117852244866097935787722247111517961724915322392348003549119586983822286124195592399430296038508814016091092830782854762) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1564253456457459352307182987494600784167012214314556660440612116244006404641871120084183682554684171773608028154230844452448410099*i+14843411517237100099972907034182315146068022621924804920207756495385830783951163836621452556041468795489193115102452952425292373171)*x + (13242334053645037510644486334024801101414427396336117882230100846720825569960133057821648555057919793915573137488236266062178272358*i+12457453209636014202362950671969423549466300036481561112293300370066604236403648844724724464815157833993691496493654058061844596744) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1564253456457459352307182987494600784167012214314556660440612116244006404641871120084183682554684171773608028154230844452448410099*i+14843411517237100099972907034182315146068022621924804920207756495385830783951163836621452556041468795489193115102452952425292373171)*x + (13242334053645037510644486334024801101414427396336117882230100846720825569960133057821648555057919793915573137488236266062178272358*i+12457453209636014202362950671969423549466300036481561112293300370066604236403648844724724464815157833993691496493654058061844596744) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11260793995901918940270273911617997865096748177290715942124698623810620129054734113148689674730609703431293043388214339760863481947*i+6127100863885058572664185935742568510860217768524550352683917344750149491833887530138472508911023534617737902931856887970882198612)*x + (12276941167537598407091108228459235673662409379434644495131272246784323713244846356808127924267799103460321285945880701765791683276*i+6228507877131516299153864582274592636860912931070949045884490849623120353106290382184385891626634790738375734936796178289195807603) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11260793995901918940270273911617997865096748177290715942124698623810620129054734113148689674730609703431293043388214339760863481947*i+6127100863885058572664185935742568510860217768524550352683917344750149491833887530138472508911023534617737902931856887970882198612)*x + (12276941167537598407091108228459235673662409379434644495131272246784323713244846356808127924267799103460321285945880701765791683276*i+6228507877131516299153864582274592636860912931070949045884490849623120353106290382184385891626634790738375734936796178289195807603) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8521902503845726445179890897684808326707590708234279229208069324223307831647477015811388994488445080067338238802711096820413440511*i+505994117296145140176688254354065460101392708846322943795072016476706929088647069037588949634528283777580000030530297873732784218)*x + (16033503030033243971210177937797143658864722262647666059198801828653124507086198639947934149013538715284353608695366818313657592389*i+11760305034149624051248674717297507748746067678942524080462793102087138711402150754738175089111250138001360687889620545567417594548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8521902503845726445179890897684808326707590708234279229208069324223307831647477015811388994488445080067338238802711096820413440511*i+505994117296145140176688254354065460101392708846322943795072016476706929088647069037588949634528283777580000030530297873732784218)*x + (16033503030033243971210177937797143658864722262647666059198801828653124507086198639947934149013538715284353608695366818313657592389*i+11760305034149624051248674717297507748746067678942524080462793102087138711402150754738175089111250138001360687889620545567417594548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13497741896826434209817656804453548558705861417358336860102589643315393784300371359538954484151401375191851269270272146586947368293*i+19475342189320930413680464700028918899579347312284103404351234422997264161453490240647615688745894136309749959411545991986918476840)*x + (19706517885326888653658963275848911325329590904255577604300640439326151545517501888848380012745889281862001725150951995243943661369*i+9017766278189409288303641913727394638040953779445179096500141873902496207759820364876868876603123431933877626103897935293579089023) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13497741896826434209817656804453548558705861417358336860102589643315393784300371359538954484151401375191851269270272146586947368293*i+19475342189320930413680464700028918899579347312284103404351234422997264161453490240647615688745894136309749959411545991986918476840)*x + (19706517885326888653658963275848911325329590904255577604300640439326151545517501888848380012745889281862001725150951995243943661369*i+9017766278189409288303641913727394638040953779445179096500141873902496207759820364876868876603123431933877626103897935293579089023) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5339615770450647454827763073476933386578938527327681932780767007437170729861005880476006995789765047879442459969476691354906737910*i+3075902131603997900923263857679029282207758195899804559393236052798983889318995747374136870713270170843519683365702688754204554675)*x + (13232944576201390784692245507195133287516955725009057048320265882300980645601444206636444931406373639498504010270519316454240264176*i+18699525229421761660971205761219767072503668995649726955649709550955320867514407976173721980620980866392410346133162181870919244892) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5339615770450647454827763073476933386578938527327681932780767007437170729861005880476006995789765047879442459969476691354906737910*i+3075902131603997900923263857679029282207758195899804559393236052798983889318995747374136870713270170843519683365702688754204554675)*x + (13232944576201390784692245507195133287516955725009057048320265882300980645601444206636444931406373639498504010270519316454240264176*i+18699525229421761660971205761219767072503668995649726955649709550955320867514407976173721980620980866392410346133162181870919244892) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22602511824664772071001848663163141775645917603543672167949165069480794561905425851017672790378277710739751428995865077392697604873*i+18041616697351968150327779113425889049802231015928591050276968843334903532332375785587710836026199291831581319226591631154042705593)*x + (12242433289957185577499539825238995165831799470851724407761682683545214157416170441917592222052513156076279873577327982309509972711*i+6068872330696476261223870545766294330539444884388564085487510466992811465409451580868191767326338500205707076815927141757936257038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22602511824664772071001848663163141775645917603543672167949165069480794561905425851017672790378277710739751428995865077392697604873*i+18041616697351968150327779113425889049802231015928591050276968843334903532332375785587710836026199291831581319226591631154042705593)*x + (12242433289957185577499539825238995165831799470851724407761682683545214157416170441917592222052513156076279873577327982309509972711*i+6068872330696476261223870545766294330539444884388564085487510466992811465409451580868191767326338500205707076815927141757936257038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (249335694823178590831784850210053305621283581220473602811018021730574065491110574643332700052544411543335787943680447168994166774*i+9781783219710998153847575835996666327698898822600513611722769114405558933642681285343419964260994329424659823982015918516817460360)*x + (1891829569886355567362221605903009814974786844659302214787580318498490487110900430319395548034167675728815292926723792336605740834*i+9634629550689997401888543418138949346879929300606129872346296704572533621259061272802158246874757509295150053929562794365125422312) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (249335694823178590831784850210053305621283581220473602811018021730574065491110574643332700052544411543335787943680447168994166774*i+9781783219710998153847575835996666327698898822600513611722769114405558933642681285343419964260994329424659823982015918516817460360)*x + (1891829569886355567362221605903009814974786844659302214787580318498490487110900430319395548034167675728815292926723792336605740834*i+9634629550689997401888543418138949346879929300606129872346296704572533621259061272802158246874757509295150053929562794365125422312) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11920376876035936104403402522148461623644673564175277353798011161775248990258233707498089328079133368186900940797214894135381435908*i+21946383292053640370707212166062679741972189916498038767307394139090965257720193319876275283211402854422085767860337034960713328344)*x + (11310542336184649041529330129540263391883818085008777128068850566091711322333172686663907249201034048077103128241283311084153499238*i+8579086776184158693979444364586586877849625084710173376269018374152135192260811058646843278642711996895274066488565417689723318619) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11920376876035936104403402522148461623644673564175277353798011161775248990258233707498089328079133368186900940797214894135381435908*i+21946383292053640370707212166062679741972189916498038767307394139090965257720193319876275283211402854422085767860337034960713328344)*x + (11310542336184649041529330129540263391883818085008777128068850566091711322333172686663907249201034048077103128241283311084153499238*i+8579086776184158693979444364586586877849625084710173376269018374152135192260811058646843278642711996895274066488565417689723318619) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20428760197181601286688621806592997629028425764660385558816758550448730650491078366169526538441217532976488811187277416072400235237*i+11372618039706852046277792138832125828082834807505307203836114135086562996488218515262616661439024883243084840732263989809724393462)*x + (6298368381981298096454668549634876620862315455462328067628706244103854650000450093862284772119462624512359393300646721822093403989*i+21132562004339476560734289694682742427985570438250772923571552404172058836029590878803052594895168083437225832730890458641119424381) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20428760197181601286688621806592997629028425764660385558816758550448730650491078366169526538441217532976488811187277416072400235237*i+11372618039706852046277792138832125828082834807505307203836114135086562996488218515262616661439024883243084840732263989809724393462)*x + (6298368381981298096454668549634876620862315455462328067628706244103854650000450093862284772119462624512359393300646721822093403989*i+21132562004339476560734289694682742427985570438250772923571552404172058836029590878803052594895168083437225832730890458641119424381) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16928009798119364685844571271345472196340965546176143424981871322220804476820661110309977139230811962314392500427214983535339308463*i+12886452557028249595959269054223606532236211133772815117723879699709639323614770598484653081239226101155220093516165942047626718763)*x + (17002598876750951578571909146986372968043964766446149670383326939144811397325676961425277439604821721795288324336132947419147097502*i+13586382103335476909134533839089252584332861878444148873793798901763559434108713348450901901471802715315804199710881002360631284086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16928009798119364685844571271345472196340965546176143424981871322220804476820661110309977139230811962314392500427214983535339308463*i+12886452557028249595959269054223606532236211133772815117723879699709639323614770598484653081239226101155220093516165942047626718763)*x + (17002598876750951578571909146986372968043964766446149670383326939144811397325676961425277439604821721795288324336132947419147097502*i+13586382103335476909134533839089252584332861878444148873793798901763559434108713348450901901471802715315804199710881002360631284086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20975523819626027126201666054280377838942744707345924202960110478036935873282425094535004162515491339109462216364933895293253780912*i+16790024118487320529910778735581125816799294199223660539203027564137051951271318452743480971798971043332206705079718324213789844053)*x + (12685938901118475111642207769634328830568900948079330155870291762865150585224861080009464643342464446259844564740563310153814168010*i+8483530536881368138664152044838767104109014284041954488646628974152366021979483499385232449663232401507206886934628707145590055746) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20975523819626027126201666054280377838942744707345924202960110478036935873282425094535004162515491339109462216364933895293253780912*i+16790024118487320529910778735581125816799294199223660539203027564137051951271318452743480971798971043332206705079718324213789844053)*x + (12685938901118475111642207769634328830568900948079330155870291762865150585224861080009464643342464446259844564740563310153814168010*i+8483530536881368138664152044838767104109014284041954488646628974152366021979483499385232449663232401507206886934628707145590055746) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (607054337257921595659708701659545538744363202234564506232162050947812578809922779317161556803357169480842560068478826692711713628*i+10250554678888149342498795120746023421265255372708487704801858748502093496733239249722745521649017022685042196923917379395561252869)*x + (8878019623458030536948082420494411471570597735269134154223920025841175505568023412619945265852774103691920700328886576066689744592*i+1640661543748632429829397384538704078052066734994741641992117623684825324282987511993976589395935342320935361694336410749274737962) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (607054337257921595659708701659545538744363202234564506232162050947812578809922779317161556803357169480842560068478826692711713628*i+10250554678888149342498795120746023421265255372708487704801858748502093496733239249722745521649017022685042196923917379395561252869)*x + (8878019623458030536948082420494411471570597735269134154223920025841175505568023412619945265852774103691920700328886576066689744592*i+1640661543748632429829397384538704078052066734994741641992117623684825324282987511993976589395935342320935361694336410749274737962) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11579378993341526325499958062849323030138610629557197407110683280490325599977723287233676440102269798020057346244288961894687236068*i+8558400812701538218939465025769903392371399735175280640165957700983023031787412866121714460001535648988857537830061638544466748248)*x + (10266583781256781054354531496287151732975565450119185401094573090279186353906534222146668973892126820242089026323665815034539532597*i+3581991552260504129495857682331715314282393223792918313028512372061521996177170533692225572853992185353756289056933949510818991642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11579378993341526325499958062849323030138610629557197407110683280490325599977723287233676440102269798020057346244288961894687236068*i+8558400812701538218939465025769903392371399735175280640165957700983023031787412866121714460001535648988857537830061638544466748248)*x + (10266583781256781054354531496287151732975565450119185401094573090279186353906534222146668973892126820242089026323665815034539532597*i+3581991552260504129495857682331715314282393223792918313028512372061521996177170533692225572853992185353756289056933949510818991642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3484971383331067084537709555413567198665202882079098987112037204105508577478274973983822227563456989982475852905830942961395024884*i+11844622171131522567326138950198043539576730405572051762091934300923215196140567393371099642508496424452099602489127996102267579750)*x + (5034823291712174149279191095535464004854652706185420510231534646055897800700080579788479032067330657568621790912575721303443492236*i+9428905497904164055113861491410541621638769561952409153939004085260198239355883435200448333966956658372383099519794407932989706675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3484971383331067084537709555413567198665202882079098987112037204105508577478274973983822227563456989982475852905830942961395024884*i+11844622171131522567326138950198043539576730405572051762091934300923215196140567393371099642508496424452099602489127996102267579750)*x + (5034823291712174149279191095535464004854652706185420510231534646055897800700080579788479032067330657568621790912575721303443492236*i+9428905497904164055113861491410541621638769561952409153939004085260198239355883435200448333966956658372383099519794407932989706675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8864737165762142087679693136326036383037074225526652746983115670439221277996353070278895137478614698352551434969445616624107398447*i+14885298995609233818402649985253891485103369747092507353356392906503621869933639738687207167931850960509152686919976560584429772543)*x + (8620991876985646623218249189208019043840506777491161134963301009659000174267122944465971732977385439548579019257731343585477107231*i+4142299114002264839104523427323125481852964444862544252484437071976546776313731200634140001041983183036966484121120599438195684658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8864737165762142087679693136326036383037074225526652746983115670439221277996353070278895137478614698352551434969445616624107398447*i+14885298995609233818402649985253891485103369747092507353356392906503621869933639738687207167931850960509152686919976560584429772543)*x + (8620991876985646623218249189208019043840506777491161134963301009659000174267122944465971732977385439548579019257731343585477107231*i+4142299114002264839104523427323125481852964444862544252484437071976546776313731200634140001041983183036966484121120599438195684658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1130814784825034322475381413461707212910441240404089656153030397926717548130177879294121991975718960911837717576095096396263534237*i+10566870714702813509020551008831905782146289737058525351571276633902215169601666812201100645413814828903414934279004714003752461327)*x + (13025523113091441661453330976546090025854741398223745688192655727696803919214782125627592032121237039542952182817409839940175456490*i+17863238381646362601819692203721141473900050651293390638996595574555454249598998106424824380926180723520452880692608167459267019671) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1130814784825034322475381413461707212910441240404089656153030397926717548130177879294121991975718960911837717576095096396263534237*i+10566870714702813509020551008831905782146289737058525351571276633902215169601666812201100645413814828903414934279004714003752461327)*x + (13025523113091441661453330976546090025854741398223745688192655727696803919214782125627592032121237039542952182817409839940175456490*i+17863238381646362601819692203721141473900050651293390638996595574555454249598998106424824380926180723520452880692608167459267019671) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12976064063458762618965837319165321829165295626008944202375136421499989265528133631331251335903397721919345464762821807384695140286*i+19883851762515929441395767563223884307896743885051777347691377190489954880179286447918978252674233692881675524573096936999780253767)*x + (19322493271436549057544668497563676460033932302717699999920086188490221360799175416865118603401538298475650868561341985689358607915*i+990372570867151078110420308261303579214094376158596235928081153616953762680022064230255316644552753066848396037542365194751597137) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12976064063458762618965837319165321829165295626008944202375136421499989265528133631331251335903397721919345464762821807384695140286*i+19883851762515929441395767563223884307896743885051777347691377190489954880179286447918978252674233692881675524573096936999780253767)*x + (19322493271436549057544668497563676460033932302717699999920086188490221360799175416865118603401538298475650868561341985689358607915*i+990372570867151078110420308261303579214094376158596235928081153616953762680022064230255316644552753066848396037542365194751597137) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23507811836548080545695759858960949703207662305919080411634673707215448518667812829711449130214708732751528273852524658178175438262*i+1964983472990084484778497432057332449986820922872400838527413726389519512264832753208482936616726475728876147710881307859913587739)*x + (434721304683317843595598004648500306132557333502586831200980369123204792963885789646207943260175205761738650666776984857989655685*i+7861610646198882243008243503440872606624129835830215580857645666186287641892045103078664946153980241170823219993691681293309369661) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23507811836548080545695759858960949703207662305919080411634673707215448518667812829711449130214708732751528273852524658178175438262*i+1964983472990084484778497432057332449986820922872400838527413726389519512264832753208482936616726475728876147710881307859913587739)*x + (434721304683317843595598004648500306132557333502586831200980369123204792963885789646207943260175205761738650666776984857989655685*i+7861610646198882243008243503440872606624129835830215580857645666186287641892045103078664946153980241170823219993691681293309369661) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12745596564170184787309554854166269677390644270595901064203605601692301274102518993336974403325939819159582766050667242104061644915*i+18020253774221731724802122659275687000001012917724465082353099027053156080373218711065227140280114982448440251801316485695381844915)*x + (13676172245737212394493664982915299735963125261143050737440023310772922283537471178432135302897630352676386094467491418733349104783*i+19721057626873760587309883494734510588103042579567330815718644665786640697711110103791477507078868935821662170165729319293120069040) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12745596564170184787309554854166269677390644270595901064203605601692301274102518993336974403325939819159582766050667242104061644915*i+18020253774221731724802122659275687000001012917724465082353099027053156080373218711065227140280114982448440251801316485695381844915)*x + (13676172245737212394493664982915299735963125261143050737440023310772922283537471178432135302897630352676386094467491418733349104783*i+19721057626873760587309883494734510588103042579567330815718644665786640697711110103791477507078868935821662170165729319293120069040) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23527187240632338180837298413350407543981636525691838159138356885084835742145369192945403656990122665881789235357122370112233829582*i+11568323375296990920383914000336624637531343736957778263267005454279019176233073789499097805529213347616653003415719849894403460014)*x + (21009278040171319873565288084820948215293300777078270911186350889673870991077916175165951783649090483461772484690218268693283537645*i+21030741208059533844869071377754464638407859934946244097627921996025903090237564373076918373029505163215341462263061846726076571064) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23527187240632338180837298413350407543981636525691838159138356885084835742145369192945403656990122665881789235357122370112233829582*i+11568323375296990920383914000336624637531343736957778263267005454279019176233073789499097805529213347616653003415719849894403460014)*x + (21009278040171319873565288084820948215293300777078270911186350889673870991077916175165951783649090483461772484690218268693283537645*i+21030741208059533844869071377754464638407859934946244097627921996025903090237564373076918373029505163215341462263061846726076571064) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6262323659476390050970444401019952964307732990892903422408444506356600428486079754761640439438186665354859389025197688656243104483*i+1995739254601101032832986707169735992356416107401265883672653817305948334179118771717988847768557971962628567303928965329655236901)*x + (17445412827917237395215123773772095045551455951134870900553022229872475378127744034363436185698646687749381952928508722909759909283*i+833599506953402115493089539127115706221256902312769017067138002796017166524761055114546409576322227033095211955824742113653408906) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6262323659476390050970444401019952964307732990892903422408444506356600428486079754761640439438186665354859389025197688656243104483*i+1995739254601101032832986707169735992356416107401265883672653817305948334179118771717988847768557971962628567303928965329655236901)*x + (17445412827917237395215123773772095045551455951134870900553022229872475378127744034363436185698646687749381952928508722909759909283*i+833599506953402115493089539127115706221256902312769017067138002796017166524761055114546409576322227033095211955824742113653408906) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2136767415892463148224820679635497998464944138025255025313851441652379305256933052991578907155817585869545837010819667190725765395*i+5586869905093272217979063787744222896664565910985419394393310322187559261212043427548418587682962468460710650370369655854178207167)*x + (13273183097338707977245771564389421820970554283622021808435228793226266777912809690751314625044245872705116275422771697192673947488*i+12297188351747256505857138346421120343116220957263830046434882419501181498932570920337992076573224701884127173211258956341924300928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2136767415892463148224820679635497998464944138025255025313851441652379305256933052991578907155817585869545837010819667190725765395*i+5586869905093272217979063787744222896664565910985419394393310322187559261212043427548418587682962468460710650370369655854178207167)*x + (13273183097338707977245771564389421820970554283622021808435228793226266777912809690751314625044245872705116275422771697192673947488*i+12297188351747256505857138346421120343116220957263830046434882419501181498932570920337992076573224701884127173211258956341924300928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17609959246527155268944735256460180386265769726607690311220500187593299827367349365351706264499443578388891490143355664147258921534*i+1039728439172638542535051534371539561937622823088855691797619489752152344326700248843654201547344194050088073557928698230629069566)*x + (13680746140575590396491889592188757387013538552333948953758095617511711476192627426338704914560951486372974174282362512893021958401*i+14255187996047350119661181561750973500427419943995010322318639579318570421955825428324708207323158771986203148944658308537221288848) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17609959246527155268944735256460180386265769726607690311220500187593299827367349365351706264499443578388891490143355664147258921534*i+1039728439172638542535051534371539561937622823088855691797619489752152344326700248843654201547344194050088073557928698230629069566)*x + (13680746140575590396491889592188757387013538552333948953758095617511711476192627426338704914560951486372974174282362512893021958401*i+14255187996047350119661181561750973500427419943995010322318639579318570421955825428324708207323158771986203148944658308537221288848) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6651485717603236771542413453490555716875246824742899404181037063070084748164994819867211967704584009030401657345815974812583810905*i+18288862701591312372493990431791939674369299117121145093529121413820571459650713481111324349708155152068184430662673178303519731659)*x + (9051711204228720055804633391323577605218460807024115236307882598062490313852188701464728224621427758377073356864622947626124254670*i+19369563861857824249047585871748088169228913663688862599204989254726351887061802959432044002084357184415307026465205510721059895948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6651485717603236771542413453490555716875246824742899404181037063070084748164994819867211967704584009030401657345815974812583810905*i+18288862701591312372493990431791939674369299117121145093529121413820571459650713481111324349708155152068184430662673178303519731659)*x + (9051711204228720055804633391323577605218460807024115236307882598062490313852188701464728224621427758377073356864622947626124254670*i+19369563861857824249047585871748088169228913663688862599204989254726351887061802959432044002084357184415307026465205510721059895948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9812477819271758543416191398221457920584233191536865665865829754546074693429940443117040420683613927649101348883962880287255928138*i+2141756965365503346763756230288232988659785176623638840662237398816547220471783583843762852235591501837660851735318314168777330868)*x + (17749418716083588418781252916910246908159562368309051611374357894277200375344712545349191608024082589051373865580271086474280302938*i+21397117826973917054132232423049200830511073609172046597799567744190850500960366202125748174203721588707293435848864449728360639273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9812477819271758543416191398221457920584233191536865665865829754546074693429940443117040420683613927649101348883962880287255928138*i+2141756965365503346763756230288232988659785176623638840662237398816547220471783583843762852235591501837660851735318314168777330868)*x + (17749418716083588418781252916910246908159562368309051611374357894277200375344712545349191608024082589051373865580271086474280302938*i+21397117826973917054132232423049200830511073609172046597799567744190850500960366202125748174203721588707293435848864449728360639273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4367175510405445123719235465641105280395628084346368297268570497282764339047342127845828441888691085350084108721632900351408916449*i+13342949523860272338101320957836760890191240149247340683523252390576537943767805550836389907414809821471854197357283121935127233887)*x + (12326056043963266568447739627242827181321058655046598566046206769667912072868653279644667828994190734054874818051029690137208282842*i+1593981411982821333357459457490108592282702853877602133124053982843574836802332078454516987474130675705250379823509969498020488384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4367175510405445123719235465641105280395628084346368297268570497282764339047342127845828441888691085350084108721632900351408916449*i+13342949523860272338101320957836760890191240149247340683523252390576537943767805550836389907414809821471854197357283121935127233887)*x + (12326056043963266568447739627242827181321058655046598566046206769667912072868653279644667828994190734054874818051029690137208282842*i+1593981411982821333357459457490108592282702853877602133124053982843574836802332078454516987474130675705250379823509969498020488384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9604636326678045975163210789997389493746793646232548818242744978119232929284754646059698591667761483745608425299179638604725751186*i+24321626809228589329578003918327855115292384630014724979799372223082906300260321109462814435258508014989442449865094259356619937110)*x + (3536518419488701179381280679078494663921761829210787066367325016829049076158689647361809725938641966102858010604930822324334707548*i+5469263240642217680306795613729630043152463837917905616442052470417005603851956121477077930313053568693378984985929893384478216430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9604636326678045975163210789997389493746793646232548818242744978119232929284754646059698591667761483745608425299179638604725751186*i+24321626809228589329578003918327855115292384630014724979799372223082906300260321109462814435258508014989442449865094259356619937110)*x + (3536518419488701179381280679078494663921761829210787066367325016829049076158689647361809725938641966102858010604930822324334707548*i+5469263240642217680306795613729630043152463837917905616442052470417005603851956121477077930313053568693378984985929893384478216430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18933443949032947381316052383682335768878060464815459485115036153433616247952670693581614210594911378104835794322897240775912590404*i+2531925674219675299038970032489751604365034020606675160706633677904553763925103218786486660614230016489101969025821903653965974630)*x + (4206500670554225953033635689618589268755850460915979576883468939832382929217122253703152225813320180866167527233289932822769250538*i+13810301009489125275339856495920691310980859166549895875433656111202327514341232715206495885688236323792997815522621394699166836106) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18933443949032947381316052383682335768878060464815459485115036153433616247952670693581614210594911378104835794322897240775912590404*i+2531925674219675299038970032489751604365034020606675160706633677904553763925103218786486660614230016489101969025821903653965974630)*x + (4206500670554225953033635689618589268755850460915979576883468939832382929217122253703152225813320180866167527233289932822769250538*i+13810301009489125275339856495920691310980859166549895875433656111202327514341232715206495885688236323792997815522621394699166836106) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11154838706409351295994954263745287678945108609516857808633838475011917045517631954064086015681754778662416418490627304480868508192*i+19435184666620792857724613201293249799588565217126116197685244432623764770614746500911837580592054479516545595961097935928141324453)*x + (11752464549436156219920223200508697530574336149742557051652850881128325456498263822375181305837159836532557188101670781600156398461*i+2871780843345849344742568526361201934530653863620890723107713840107063630657954172495309956183330205224876661306090934349965155271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11154838706409351295994954263745287678945108609516857808633838475011917045517631954064086015681754778662416418490627304480868508192*i+19435184666620792857724613201293249799588565217126116197685244432623764770614746500911837580592054479516545595961097935928141324453)*x + (11752464549436156219920223200508697530574336149742557051652850881128325456498263822375181305837159836532557188101670781600156398461*i+2871780843345849344742568526361201934530653863620890723107713840107063630657954172495309956183330205224876661306090934349965155271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21970322447821053824672096272292600211479495663108895314358476046671914212359063192528415087371123616196402810674726389875455017655*i+24200195111758487946407336662086391012269874951503829624252462469681532553146217233330213314794844584059793427527088620955694333632)*x + (8702534821885183757865253478622930399155415966601892348822467399105451626495626370869759724666082260550820778856626407433758424611*i+21555496365151434024449043345833832042250262488447043909152837606627844784184593463821044170165127711430908641244544070352256856377) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21970322447821053824672096272292600211479495663108895314358476046671914212359063192528415087371123616196402810674726389875455017655*i+24200195111758487946407336662086391012269874951503829624252462469681532553146217233330213314794844584059793427527088620955694333632)*x + (8702534821885183757865253478622930399155415966601892348822467399105451626495626370869759724666082260550820778856626407433758424611*i+21555496365151434024449043345833832042250262488447043909152837606627844784184593463821044170165127711430908641244544070352256856377) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22413670284929031565605814561408117014768355417380652381699759013263307733458500608252103069880991257682037052646163509107343309956*i+22160578076003433287369045266896273057772186305110251496283998234891897323105041340466126120516287557713820339711676409241329729684)*x + (22589739443868617522912187506148099179795552636863881017515500125932239562526055233724762274414993186330802145030972576820134170771*i+3343515285436730844317875583298589099613515511659479242644539408414348537433903823736551763043136132385336493179385574483458458246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22413670284929031565605814561408117014768355417380652381699759013263307733458500608252103069880991257682037052646163509107343309956*i+22160578076003433287369045266896273057772186305110251496283998234891897323105041340466126120516287557713820339711676409241329729684)*x + (22589739443868617522912187506148099179795552636863881017515500125932239562526055233724762274414993186330802145030972576820134170771*i+3343515285436730844317875583298589099613515511659479242644539408414348537433903823736551763043136132385336493179385574483458458246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1078266476306373005963897314508138667001918196687610131604148673200655057024846978468867199334999978916709612572876201242672572512*i+17175374747655953526646399992208177009766962287187015259237682148522477883120015979933293587897818773330329280866160163184665594080)*x + (4311533123790375032808402453416796980572333078056077465859719535210949328098716361800264549379117467950004217475498764240981322377*i+20072253743778443515747317054117929241891172504378251903547241213557330346369797947113252130905106814264541068293636947192630963650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1078266476306373005963897314508138667001918196687610131604148673200655057024846978468867199334999978916709612572876201242672572512*i+17175374747655953526646399992208177009766962287187015259237682148522477883120015979933293587897818773330329280866160163184665594080)*x + (4311533123790375032808402453416796980572333078056077465859719535210949328098716361800264549379117467950004217475498764240981322377*i+20072253743778443515747317054117929241891172504378251903547241213557330346369797947113252130905106814264541068293636947192630963650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17469772524951192024499312552532232135063966726775006411315858471722217409744777856813594794821355490136834500772989424629066055467*i+2978324192061789231311709934685367588766147541607729149150967177389593072273300112549012957356576775483173053569051334742409560579)*x + (22610568743808830235984638491616908520917946419490592977168558292400219849135810731276267036181709828374212468157625333704175729384*i+918929462835417302511447124344838758824781511783314863598584335711155079655105234641988344639551110932217832583231731935184089222) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17469772524951192024499312552532232135063966726775006411315858471722217409744777856813594794821355490136834500772989424629066055467*i+2978324192061789231311709934685367588766147541607729149150967177389593072273300112549012957356576775483173053569051334742409560579)*x + (22610568743808830235984638491616908520917946419490592977168558292400219849135810731276267036181709828374212468157625333704175729384*i+918929462835417302511447124344838758824781511783314863598584335711155079655105234641988344639551110932217832583231731935184089222) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (97269045231441174006702464221599231395191338318966688088628738252485015757923878981302202183726283429050874035633592802910378475*i+21671992276927960171016304456688199478220164101822948782631162918719744323075211383505406998878942486626642298142958841785040090320)*x + (21038562233504078142843702863723190591179574401224879812078031445502947199093129512567887270277983954161520539226980883318257741138*i+9649879914441750835174056463340986235766063003525255031203564275643009557430197322138027177373307747997959861923182945655298797179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (97269045231441174006702464221599231395191338318966688088628738252485015757923878981302202183726283429050874035633592802910378475*i+21671992276927960171016304456688199478220164101822948782631162918719744323075211383505406998878942486626642298142958841785040090320)*x + (21038562233504078142843702863723190591179574401224879812078031445502947199093129512567887270277983954161520539226980883318257741138*i+9649879914441750835174056463340986235766063003525255031203564275643009557430197322138027177373307747997959861923182945655298797179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17967549958695856024757724453567946218608447559472819994470470842597174210891458049981457577708218587018044373555467169200410337939*i+12345879428295573063701832968483945317188383824034994557294730680532119049116728471020072985341055232105447761777901658332911389401)*x + (2834421948795261911540690252199982327765189287618693568605277842723297549993140883041443141546749572592373085538584586646477156023*i+14524856311126224690391041217791823822535868793580168025726072342927068705329331180941920193949268965547693832935657657819898576464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17967549958695856024757724453567946218608447559472819994470470842597174210891458049981457577708218587018044373555467169200410337939*i+12345879428295573063701832968483945317188383824034994557294730680532119049116728471020072985341055232105447761777901658332911389401)*x + (2834421948795261911540690252199982327765189287618693568605277842723297549993140883041443141546749572592373085538584586646477156023*i+14524856311126224690391041217791823822535868793580168025726072342927068705329331180941920193949268965547693832935657657819898576464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18606712430317695831701041769768521209453729795061725591480400257258225998506342969197037454013624708648008174482716081394795288942*i+12882092585716756962870696024854611256560591268631520139537494260366384287434956034633883229291383223750003023757569525298235378965)*x + (14120867986271805139662750151865582750303871738352810232067325257726622221019463705555289079539155133015993980734626968445607303197*i+21022097733070528393698977245882216916911629753848435558864136132049237358674510482180857423945135146584009022434590282188365714143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18606712430317695831701041769768521209453729795061725591480400257258225998506342969197037454013624708648008174482716081394795288942*i+12882092585716756962870696024854611256560591268631520139537494260366384287434956034633883229291383223750003023757569525298235378965)*x + (14120867986271805139662750151865582750303871738352810232067325257726622221019463705555289079539155133015993980734626968445607303197*i+21022097733070528393698977245882216916911629753848435558864136132049237358674510482180857423945135146584009022434590282188365714143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7111453911944399986716060489452660060764311088169703580381326366294831748852052375908769072633999555105199658350567036063455936032*i+23292731273102686650365385259356680586147081124983755309294599234321196815802833206509643897408330039989873826032918330709430686739)*x + (12360331323352389519505958512895110794735095193901463872579081731000427323771689558492006305339873182777345222832119138791325453408*i+10276272040581612623347841575713762549519956709775092945447082472106943204902910965519840494896250692347158725722798702534776750510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7111453911944399986716060489452660060764311088169703580381326366294831748852052375908769072633999555105199658350567036063455936032*i+23292731273102686650365385259356680586147081124983755309294599234321196815802833206509643897408330039989873826032918330709430686739)*x + (12360331323352389519505958512895110794735095193901463872579081731000427323771689558492006305339873182777345222832119138791325453408*i+10276272040581612623347841575713762549519956709775092945447082472106943204902910965519840494896250692347158725722798702534776750510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22116869927121802514921324794378958937602342894876941901257713366599811741305383450811596124421606677282380408834132340040812482261*i+3911812293919215121616657825870338353148189440426653112698695903089695877683230058144942284474645799863095946455896210190038038998)*x + (739054677327099378123615456473058711151706888448218621201951021241704364984751344379745116179823632152158514490611195642114869408*i+4592317853156946154789195359412155163093513657317776502469444466840773257762087521283014910117459349036729372263700727715947382950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22116869927121802514921324794378958937602342894876941901257713366599811741305383450811596124421606677282380408834132340040812482261*i+3911812293919215121616657825870338353148189440426653112698695903089695877683230058144942284474645799863095946455896210190038038998)*x + (739054677327099378123615456473058711151706888448218621201951021241704364984751344379745116179823632152158514490611195642114869408*i+4592317853156946154789195359412155163093513657317776502469444466840773257762087521283014910117459349036729372263700727715947382950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23811594058734177823359642078143038204715180705170006501596425351506592489038655461747891994121024524239968089101215321430586942477*i+6103649699919446636770818050960100149380838252966927834965733680461684054195938411029433636423921956345281390798927443310210488680)*x + (18243271166303386240860821818540501929852117925679477192504396808474337610947660870106370158182294080075746317617198954360494377837*i+10516651821032227060503764624126010431576580447597573357422988023399747862754975451233181974749428096077626813362538740892119877872) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23811594058734177823359642078143038204715180705170006501596425351506592489038655461747891994121024524239968089101215321430586942477*i+6103649699919446636770818050960100149380838252966927834965733680461684054195938411029433636423921956345281390798927443310210488680)*x + (18243271166303386240860821818540501929852117925679477192504396808474337610947660870106370158182294080075746317617198954360494377837*i+10516651821032227060503764624126010431576580447597573357422988023399747862754975451233181974749428096077626813362538740892119877872) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9813285159946073592669609177113156807060475465606179000418548555261069220416539933951755122617529150726846294929408330428613604461*i+23851695875658504942967867869674703708522473420408733080853724112517275273247210514593063885809880516407355335925450376304559145599)*x + (15913481945497691908018974062530956290631018390043680393900154864082795608767875152377197813416677539303898430297956713150772563670*i+1734653518534741392314558945914348857656230808009878942061911047272669806960735196071169205776571746537978897667270032777662327782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9813285159946073592669609177113156807060475465606179000418548555261069220416539933951755122617529150726846294929408330428613604461*i+23851695875658504942967867869674703708522473420408733080853724112517275273247210514593063885809880516407355335925450376304559145599)*x + (15913481945497691908018974062530956290631018390043680393900154864082795608767875152377197813416677539303898430297956713150772563670*i+1734653518534741392314558945914348857656230808009878942061911047272669806960735196071169205776571746537978897667270032777662327782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (607031343868957642412969426604973232835707323669971243468094362149311658049226368926929428667703584710878641185745257380082692958*i+22119731539168466158164126001193089714616220395609074646169764365833220671420666522315088537007578843336292854030138554535274091537)*x + (1787117255674288189047385255445579457972201225865735844794427819914831793257099540118654607291587285046497019824998720728683210600*i+7610742252998836991656253042835169807507495942772772736504644465567049984403944008517332871360902652069050010321596107467109392314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (607031343868957642412969426604973232835707323669971243468094362149311658049226368926929428667703584710878641185745257380082692958*i+22119731539168466158164126001193089714616220395609074646169764365833220671420666522315088537007578843336292854030138554535274091537)*x + (1787117255674288189047385255445579457972201225865735844794427819914831793257099540118654607291587285046497019824998720728683210600*i+7610742252998836991656253042835169807507495942772772736504644465567049984403944008517332871360902652069050010321596107467109392314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5600353946763439694383135483066471357262141962152638611266032399296174052090167981725564487242325429486992513091952954187317017721*i+5553859817698415927003780712940422574219382603970567341991506488581605007022853850696758434977949150865314846576220944016637784358)*x + (18972292924981391468194355086459501104399144369237297787757637633528880521643228349237698241889018492079755778612562816857971113110*i+10015420717116512867215916197036620053620038862392641690043943663737727372584297773877570458348647473286702741698313203223705979732) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5600353946763439694383135483066471357262141962152638611266032399296174052090167981725564487242325429486992513091952954187317017721*i+5553859817698415927003780712940422574219382603970567341991506488581605007022853850696758434977949150865314846576220944016637784358)*x + (18972292924981391468194355086459501104399144369237297787757637633528880521643228349237698241889018492079755778612562816857971113110*i+10015420717116512867215916197036620053620038862392641690043943663737727372584297773877570458348647473286702741698313203223705979732) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3523294310007232887399617314936172441132237992332162407333533056252287036449138848638032425880486685853942397145158303378440469197*i+13792624229513977457762696959565567554687700870880475751087504496077148502978770778624135042220132142423157837818350000612443815711)*x + (9649939136351174175414826168023257183490900396445162280022703336385922704942781225852854051166445351359638250597563598311303153394*i+24105472855604941029249140714774636293030906113340564154514797710713831133856114652761512468666940336293468422488842290549759665803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3523294310007232887399617314936172441132237992332162407333533056252287036449138848638032425880486685853942397145158303378440469197*i+13792624229513977457762696959565567554687700870880475751087504496077148502978770778624135042220132142423157837818350000612443815711)*x + (9649939136351174175414826168023257183490900396445162280022703336385922704942781225852854051166445351359638250597563598311303153394*i+24105472855604941029249140714774636293030906113340564154514797710713831133856114652761512468666940336293468422488842290549759665803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3775549201576283186264199966524301049206431150690835624067175425609766177808511773905643764034191788838462183813581155006236106558*i+2602782186718899397395425061479676494160957850403548625685999304643250833286950406364286814212939187957381097804399415848480228515)*x + (16508991723918207091578450425846454200210774257951928091961958870151310836606588655276147507958488328223562560625327170598744166160*i+247259428343003851019233502631800999736810963825758556524337506987564110912884185995455707112628171818482251366779183428126702238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3775549201576283186264199966524301049206431150690835624067175425609766177808511773905643764034191788838462183813581155006236106558*i+2602782186718899397395425061479676494160957850403548625685999304643250833286950406364286814212939187957381097804399415848480228515)*x + (16508991723918207091578450425846454200210774257951928091961958870151310836606588655276147507958488328223562560625327170598744166160*i+247259428343003851019233502631800999736810963825758556524337506987564110912884185995455707112628171818482251366779183428126702238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7117116709648851084684100279520881312243235541321514443426669944211328365406445891621738839634104560230330421655603020183565093650*i+10661855490034532210959598518308105731687434579314349551615771827829207124301209755370614098824127688669982288447364626171670872281)*x + (7323728554979175105391070861627984211316686800606335311667349751733703053951162680489902599266998333687593061451602786123008650918*i+203718628749349520106391995236888620129854730881633517515828655929486742234801381178500879280028340354773583120330631939201189730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7117116709648851084684100279520881312243235541321514443426669944211328365406445891621738839634104560230330421655603020183565093650*i+10661855490034532210959598518308105731687434579314349551615771827829207124301209755370614098824127688669982288447364626171670872281)*x + (7323728554979175105391070861627984211316686800606335311667349751733703053951162680489902599266998333687593061451602786123008650918*i+203718628749349520106391995236888620129854730881633517515828655929486742234801381178500879280028340354773583120330631939201189730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23287570463283191157032563927216303836631568663892344640494899304543904540304573170852628017978886424896069620289803386992473816728*i+13207256005086091692278062076915973633882689969596603842880368237643851779110224854021524691734078852595365312301465033994723359023)*x + (21196445073933067868643168101070314812330963515078861976956060975714683075480697980225274109050686595378387870375929695232152255734*i+10111048676433504408672794078703140844017459052538146723818274062308766627918962648649784832842627842523175739288467224554560485487) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23287570463283191157032563927216303836631568663892344640494899304543904540304573170852628017978886424896069620289803386992473816728*i+13207256005086091692278062076915973633882689969596603842880368237643851779110224854021524691734078852595365312301465033994723359023)*x + (21196445073933067868643168101070314812330963515078861976956060975714683075480697980225274109050686595378387870375929695232152255734*i+10111048676433504408672794078703140844017459052538146723818274062308766627918962648649784832842627842523175739288467224554560485487) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5718312661713929045044004118248333391501748449913876712312757325316914222711658009963036803922559479964132621228640060878474532795*i+20541856871698894414432999444857779766973771848936852010387945263462864418351480616939802498821032017132830680332997437999105604659)*x + (15885469776734772823461061192787728607725010274306280805250327885261375397307363562073019271709267038096543813113761295507296150191*i+7362801801734092666438453378802755445570739418538837595280830671902824694769271464247404491064484290390119939910697205597384935578) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5718312661713929045044004118248333391501748449913876712312757325316914222711658009963036803922559479964132621228640060878474532795*i+20541856871698894414432999444857779766973771848936852010387945263462864418351480616939802498821032017132830680332997437999105604659)*x + (15885469776734772823461061192787728607725010274306280805250327885261375397307363562073019271709267038096543813113761295507296150191*i+7362801801734092666438453378802755445570739418538837595280830671902824694769271464247404491064484290390119939910697205597384935578) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18280377978642443601039515807581267620186331836763927441231373371039724751509221309325699802584002253129677681438918619380322141996*i+11476288700549701415159287567681783178466370156293366181177603509288036310322802277887299569746942705984911028724984094916684560851)*x + (11425617619171291487305910595500451216366295428711753305752957837454353916398190067590854682273532399772278356434485821945057914829*i+1345491558913893964551724690557056941731032562893402199113681481933246523573427351215251759755976139797802457329535983391477991110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18280377978642443601039515807581267620186331836763927441231373371039724751509221309325699802584002253129677681438918619380322141996*i+11476288700549701415159287567681783178466370156293366181177603509288036310322802277887299569746942705984911028724984094916684560851)*x + (11425617619171291487305910595500451216366295428711753305752957837454353916398190067590854682273532399772278356434485821945057914829*i+1345491558913893964551724690557056941731032562893402199113681481933246523573427351215251759755976139797802457329535983391477991110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6821694510950501176320198187533316509203951092654710039534346429050098333906350335667981916915101483663306134813221656593226933198*i+14212894464975547863157374097766762775405831101172424251685347202793471912260329006456059279161952088226008774445049478767388690084)*x + (9744255396324137181998846393238744602175890832885278473583547316395404458967249757327372267477961845989476820784057899889792287718*i+4936193334959745175432366775085078550708315320389176563858739519164176396095702373893073385422423639039603712516713907728018464252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6821694510950501176320198187533316509203951092654710039534346429050098333906350335667981916915101483663306134813221656593226933198*i+14212894464975547863157374097766762775405831101172424251685347202793471912260329006456059279161952088226008774445049478767388690084)*x + (9744255396324137181998846393238744602175890832885278473583547316395404458967249757327372267477961845989476820784057899889792287718*i+4936193334959745175432366775085078550708315320389176563858739519164176396095702373893073385422423639039603712516713907728018464252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16438146504036687954272119671689725215145106204211633525781981605556860947766116204105801179509996733137008117621459273232769722798*i+23991539191623125251983070140563206390588175475295686760471518191552761384138822499109740999694533692989316445900272361440605081927)*x + (308371942128974044094748183643307334480358315278623798566943727959479248734977458854653976006615303243337787098878965985779056610*i+4914394771878938817577176825520173904502734699250504135770471030992947368255912372494287314295508284859865032024054217847351733883) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16438146504036687954272119671689725215145106204211633525781981605556860947766116204105801179509996733137008117621459273232769722798*i+23991539191623125251983070140563206390588175475295686760471518191552761384138822499109740999694533692989316445900272361440605081927)*x + (308371942128974044094748183643307334480358315278623798566943727959479248734977458854653976006615303243337787098878965985779056610*i+4914394771878938817577176825520173904502734699250504135770471030992947368255912372494287314295508284859865032024054217847351733883) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16408637915969563055302881031099192708903593811126578336837997114417626448278656717347109682098390451000961523500390236947175285828*i+8882372423811965256555440441152487231868701751369473886411440063733338621724623562322419356307702083015963900955337809655836526664)*x + (16063946977360591984530253949464221980154201085212863683169077237302537720755984298216760505558272910083448593238190534639382469506*i+7149775997641728365905050491005183863874030256614795764976014714112773634889486351635975931097302629279372933442251934920167303529) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16408637915969563055302881031099192708903593811126578336837997114417626448278656717347109682098390451000961523500390236947175285828*i+8882372423811965256555440441152487231868701751369473886411440063733338621724623562322419356307702083015963900955337809655836526664)*x + (16063946977360591984530253949464221980154201085212863683169077237302537720755984298216760505558272910083448593238190534639382469506*i+7149775997641728365905050491005183863874030256614795764976014714112773634889486351635975931097302629279372933442251934920167303529) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16503089043143922006742414300784529389363863725163160750038642866041037284511397570178050816939862457911315831074295169280158251043*i+5860752373066242403030671598101647235173275332559117044347140040128847036425613085111719892086832809184752617881351445763155794687)*x + (11435105798375707727788705440251294438626316034750200655042446019908737787680306457329209648880664249068369508044036129394621373446*i+17188603720378700320971225760908212915844246686434738609853325763421658493574737984575459129014648136021156346483881664481482085912) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16503089043143922006742414300784529389363863725163160750038642866041037284511397570178050816939862457911315831074295169280158251043*i+5860752373066242403030671598101647235173275332559117044347140040128847036425613085111719892086832809184752617881351445763155794687)*x + (11435105798375707727788705440251294438626316034750200655042446019908737787680306457329209648880664249068369508044036129394621373446*i+17188603720378700320971225760908212915844246686434738609853325763421658493574737984575459129014648136021156346483881664481482085912) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18122381396813628762268461085509517171444378860240166327443568380358544694414790595008703967287832800287539181975622587379488318565*i+9095779500747094034551718289333833903559072452862037894212394070771321614801208647903397345026046076074915260268172481712716454626)*x + (4646769169768434537612437380782604093948435421995025250859851619506649031714102375316522496949311554281407312413428932797864784051*i+10402654543598755235966434308970882400513230327473211468691837172650899048879398199464096820955662646256917902443640131195141654925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18122381396813628762268461085509517171444378860240166327443568380358544694414790595008703967287832800287539181975622587379488318565*i+9095779500747094034551718289333833903559072452862037894212394070771321614801208647903397345026046076074915260268172481712716454626)*x + (4646769169768434537612437380782604093948435421995025250859851619506649031714102375316522496949311554281407312413428932797864784051*i+10402654543598755235966434308970882400513230327473211468691837172650899048879398199464096820955662646256917902443640131195141654925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11936262129718172913843560105322555841207076879970779696031142071451873417201249679958391329006608344234899902024079366036182075135*i+12406827681734065495904452567771240301037764871926944929880437854131195454725542476684211660528627465600768240873296661846316737937)*x + (10225055994188812082134136908540250275727383036257142790467440742209543689236872611631994544337573319972581251864831341599060169695*i+11034413467159624250917427709891646938489904396920315917388806482480518036149840849199134608709134590869312898130738225120897036018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11936262129718172913843560105322555841207076879970779696031142071451873417201249679958391329006608344234899902024079366036182075135*i+12406827681734065495904452567771240301037764871926944929880437854131195454725542476684211660528627465600768240873296661846316737937)*x + (10225055994188812082134136908540250275727383036257142790467440742209543689236872611631994544337573319972581251864831341599060169695*i+11034413467159624250917427709891646938489904396920315917388806482480518036149840849199134608709134590869312898130738225120897036018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13799226927337838343268461315588279126127579673791498185648325819479390113939769392521040821694959745651259290730281120968747226850*i+7954381640222089710742163193882302210376708011087460669227950919034363359509733700330556986576939102929338523071692141584077472204)*x + (16081528689171970828418490936584440394574453681642928752427340146403854636154393985543413597675276995988898729903767389260558009625*i+2484342295921170513326117325384918899962997953654040826480129406757041915625223044925677124760060453817174594392208589430385536362) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13799226927337838343268461315588279126127579673791498185648325819479390113939769392521040821694959745651259290730281120968747226850*i+7954381640222089710742163193882302210376708011087460669227950919034363359509733700330556986576939102929338523071692141584077472204)*x + (16081528689171970828418490936584440394574453681642928752427340146403854636154393985543413597675276995988898729903767389260558009625*i+2484342295921170513326117325384918899962997953654040826480129406757041915625223044925677124760060453817174594392208589430385536362) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1082182170266434820231648877664689812968696072482381524546975140292898693445125666595446152058433719100230990124789595823477211886*i+24391075790160463817625661318737219923876126981027656818460312727198803700554428043472362897499078304476464225434658309395513616059)*x + (2338902233231148417264068635169961227919531140557607155778914486805031821080650832318560869488566219636738126859727417493888157261*i+23253419576476567545862687280388501296614420011320967989850470409294702654204797433263699300423430663989794534269579883832565907021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1082182170266434820231648877664689812968696072482381524546975140292898693445125666595446152058433719100230990124789595823477211886*i+24391075790160463817625661318737219923876126981027656818460312727198803700554428043472362897499078304476464225434658309395513616059)*x + (2338902233231148417264068635169961227919531140557607155778914486805031821080650832318560869488566219636738126859727417493888157261*i+23253419576476567545862687280388501296614420011320967989850470409294702654204797433263699300423430663989794534269579883832565907021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22023241476838041335715376307862444005792089400200162011758765722156642033278129899032811890828770851241990657193921645257629465550*i+22375320765302275565593359496750373209960214771066320597954964185345533633645114156410919666141547765303038420527963034543592093378)*x + (9944903843778331500453628747590343497636872566722421703811332488461634447613667730034103735684267630840510649361959111339300864203*i+18294978876636593067779033287103381138734368244278336790267595672061297630806856959308918036804314644799576392743361354207720405120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22023241476838041335715376307862444005792089400200162011758765722156642033278129899032811890828770851241990657193921645257629465550*i+22375320765302275565593359496750373209960214771066320597954964185345533633645114156410919666141547765303038420527963034543592093378)*x + (9944903843778331500453628747590343497636872566722421703811332488461634447613667730034103735684267630840510649361959111339300864203*i+18294978876636593067779033287103381138734368244278336790267595672061297630806856959308918036804314644799576392743361354207720405120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7298466814099930884783738814204005561664321774741144692825641548041869265250355692311756594082449826454415367993361612414129379719*i+1327331887978370568397492583700732359689267613400171201399515629745378026643332086407578086826326739702648888964440070838319566525)*x + (6922382476151481897821560281370635365836019318408946262043856863538254722111636412534394349074282954561424327614151916234207593498*i+18029448879495346311309276609025733211347640418837483904997119113522730316843054829014212321212899524763248713841210274042377125693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7298466814099930884783738814204005561664321774741144692825641548041869265250355692311756594082449826454415367993361612414129379719*i+1327331887978370568397492583700732359689267613400171201399515629745378026643332086407578086826326739702648888964440070838319566525)*x + (6922382476151481897821560281370635365836019318408946262043856863538254722111636412534394349074282954561424327614151916234207593498*i+18029448879495346311309276609025733211347640418837483904997119113522730316843054829014212321212899524763248713841210274042377125693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10414718652359406429233757344181947428247670035831502699670023124371177721008881733998554412747522280993926879195234241864829159969*i+5739038915644408332654938686314457854944308938654891736263183169797265305500851103514037391867786963451642533444969350260563914451)*x + (9250686208310164895398777219147262952066592789656842967711371892433872343174815198789985374968290505202262796882952863741069818441*i+442394632889803518226530015197900658429108973473552541458080616575572154274751254108447323683763564891644088851580854964080537441) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10414718652359406429233757344181947428247670035831502699670023124371177721008881733998554412747522280993926879195234241864829159969*i+5739038915644408332654938686314457854944308938654891736263183169797265305500851103514037391867786963451642533444969350260563914451)*x + (9250686208310164895398777219147262952066592789656842967711371892433872343174815198789985374968290505202262796882952863741069818441*i+442394632889803518226530015197900658429108973473552541458080616575572154274751254108447323683763564891644088851580854964080537441) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18665405664805438666443029493914079932655718610314180507663109065771568449715176688060446646784744165628506960868827448301115770003*i+22852457062636509005957531926944702595887190183020145760134986620109327470518539434286726119927716002326386468244852241525017335617)*x + (11452704296252730220459827841149267860394919295814491426463340389406399527501756324264045315055863834372656855530766045241035930623*i+7523431031400895813629623970698859812105823115475496286180788025255619910551011837524014987811356597643184501372777328657542430757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18665405664805438666443029493914079932655718610314180507663109065771568449715176688060446646784744165628506960868827448301115770003*i+22852457062636509005957531926944702595887190183020145760134986620109327470518539434286726119927716002326386468244852241525017335617)*x + (11452704296252730220459827841149267860394919295814491426463340389406399527501756324264045315055863834372656855530766045241035930623*i+7523431031400895813629623970698859812105823115475496286180788025255619910551011837524014987811356597643184501372777328657542430757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20769250572099777255518939178771859091003110432060938562319985110684514949728051468912270769150013906837316583194390985708833638992*i+20449630327500159371836836401499395797319960756213306819720748693820873576901721392049078841695164074297668621999937817226264061517)*x + (3877941800471186044232395752545929934437292098747790774359532728503648071520310268657702491147706333100357441165933126449038918927*i+11580920693805501857484265845832259776154296610057352415431282848889168959993310431939030616095985315362846947933344596093331925946) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20769250572099777255518939178771859091003110432060938562319985110684514949728051468912270769150013906837316583194390985708833638992*i+20449630327500159371836836401499395797319960756213306819720748693820873576901721392049078841695164074297668621999937817226264061517)*x + (3877941800471186044232395752545929934437292098747790774359532728503648071520310268657702491147706333100357441165933126449038918927*i+11580920693805501857484265845832259776154296610057352415431282848889168959993310431939030616095985315362846947933344596093331925946) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [86]:
S4 = randint(0, l_A^n_A - 1)
S6 = randint(0, l_A^n_A - 1)
R4 = P0 + S4 * Q0
R6 = P0 + S6 * Q0
R4, R4.order() == l_A^n_A, R6, R6.order() == l_A^n_A
Out[86]:
((18657910314799618760891693301238133407122953138651017309816883169885757629868799856032434716454215340065816674799973896855175532210*i + 19274984076556275290214391228467267803431450806814199725270717045996787932706091936669356563913132258432204846421510772115625485886 : 13639772904882428221711781103754967430873098563405064767885204122157295778804900715289039605535377578997842700921921471336527045445*i + 8762044973188820540782188514317568746823343406274751076026500707628182840610040511254200071215516462733351421442047039678318714061 : 1),
 True,
 (19515432718705543984632812652334860922558227301136330971030503895175552255255657412773072011572510506239942879943740972817687896004*i + 14708190154494715568104645607878578152685256427487065240760196630141685100147690213463662472620158665136799085356233771211603326297 : 14730379707745269045516257451850929101537934846307883017345704925023589087779669497771259961400475818775742937940886046556772213590*i + 4571744924592119415711540277104094414799626045340759366372408458136537416013179462240851172568783566948405541536472788702902191174 : 1),
 True)
In [87]:
Phi4 = isogeny_walk (E, R4, l_A, n_A)
Phi4
Out[87]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 7340296971894359839450285360851195821277331163816789674709422736847804885110998221234891973520575185927754926015293367825470070776*x + 1439826482742894054964917547457080045750142597135655530569616094082099265984182299434221821464149529991753591844965720155841845176 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 7340296971894359839450285360851195821277331163816789674709422736847804885110998221234891973520575185927754926015293367825470070776*x + 1439826482742894054964917547457080045750142597135655530569616094082099265984182299434221821464149529991753591844965720155841845176 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16837585681671908583734401043107587935231028053452818256329174614070921831702419943507250930093087657914723607620388456087043450931*i+17183825424358795451234278224745775153324419986827914049733189959219801487335030539173594418027939781552356280751870431744601169842)*x + (13642982643268944289777989279683600632680331938583954182051964933435605844890107370606046013719380201243181687120357219800070791464*i+12892526877074111695047466894173659136557953011171482769980535106682517403465798699667322113101365361878979429157291320970309029979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16837585681671908583734401043107587935231028053452818256329174614070921831702419943507250930093087657914723607620388456087043450931*i+17183825424358795451234278224745775153324419986827914049733189959219801487335030539173594418027939781552356280751870431744601169842)*x + (13642982643268944289777989279683600632680331938583954182051964933435605844890107370606046013719380201243181687120357219800070791464*i+12892526877074111695047466894173659136557953011171482769980535106682517403465798699667322113101365361878979429157291320970309029979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14339525268951533365533854974400264020350873652582414794365961751518008841471892532037407810963758694397380523010250031568264649674*i+6480325347868498961672142226629016070297455918429441236075671579244516903012380879264033692833431353544550965852272098752990940857)*x + (16566170088449013066263439502131241198584193803747952796577945093944284479215480435904128776653771150656182834567276766816761889648*i+22839919829875511818202250374825355047187759424001929874201816994084011939095399570404560090483403546999016048781693682005256576277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14339525268951533365533854974400264020350873652582414794365961751518008841471892532037407810963758694397380523010250031568264649674*i+6480325347868498961672142226629016070297455918429441236075671579244516903012380879264033692833431353544550965852272098752990940857)*x + (16566170088449013066263439502131241198584193803747952796577945093944284479215480435904128776653771150656182834567276766816761889648*i+22839919829875511818202250374825355047187759424001929874201816994084011939095399570404560090483403546999016048781693682005256576277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17198896171257273900053197875916475702781717240525887638632727760995429485077034263491519422558889677383345392350081872417054894856*i+4140949484775115770047579110703877980794698468796451179495414251457440534571810542990420087895733035699223006272804331753759454768)*x + (12864770145384242511945691964894162549000389229420453876666519157086461860284756676045540509021295530175523625901849105038896446778*i+9938466938597919911816665993506135284668736756415320098793102879176577922298933568680398601865550427871597436970525330876873472246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17198896171257273900053197875916475702781717240525887638632727760995429485077034263491519422558889677383345392350081872417054894856*i+4140949484775115770047579110703877980794698468796451179495414251457440534571810542990420087895733035699223006272804331753759454768)*x + (12864770145384242511945691964894162549000389229420453876666519157086461860284756676045540509021295530175523625901849105038896446778*i+9938466938597919911816665993506135284668736756415320098793102879176577922298933568680398601865550427871597436970525330876873472246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17039188894241473916858240430777956133325218947300560107188885149290589452454406385976726512732534468251378826394606138036773340292*i+4161249845912064770343318687744599692370646118862199145472746941205563729114442782795629188755128168604225117909932939439718275388)*x + (17071150467366486097988242330195361102357642026368047683646408394132454559361554757850473250808072106687308733955374418847466486368*i+7349386395907815445219181401135765489379711476047023234072605058070950458756360320520638217241330721579854501652944048109511908463) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17039188894241473916858240430777956133325218947300560107188885149290589452454406385976726512732534468251378826394606138036773340292*i+4161249845912064770343318687744599692370646118862199145472746941205563729114442782795629188755128168604225117909932939439718275388)*x + (17071150467366486097988242330195361102357642026368047683646408394132454559361554757850473250808072106687308733955374418847466486368*i+7349386395907815445219181401135765489379711476047023234072605058070950458756360320520638217241330721579854501652944048109511908463) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13434458464167411996771263427730550011988767827402339177370968705826675860651215858487061668730179545376724708755913371427059980768*i+4220697879138341839419174423624838335756744606453604268583403283665482185206679325677642729163929866548284335600884589014135402771)*x + (8915729382707456460463721495819446756385918392006308429381768532761511913130577779113495982018756154774648901925709673729132899657*i+128028683140880430062131624497523716298960122431925211351812215530889003664619459533489324728322224234922488232783072113174050226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13434458464167411996771263427730550011988767827402339177370968705826675860651215858487061668730179545376724708755913371427059980768*i+4220697879138341839419174423624838335756744606453604268583403283665482185206679325677642729163929866548284335600884589014135402771)*x + (8915729382707456460463721495819446756385918392006308429381768532761511913130577779113495982018756154774648901925709673729132899657*i+128028683140880430062131624497523716298960122431925211351812215530889003664619459533489324728322224234922488232783072113174050226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24373983314870505788819319591578235407808464217048230425816675443529902334196414594588727415609115804852779701025806724278501967994*i+3871409367116738178988751840476430742343838513666033437104681725080957080938564688556973154569293811567559630463973004930523849254)*x + (7044720466432665658126722482753236051731493931368693189712429001993430584788180453551293453714208030958011919449903798133783633720*i+8681764766942135040982955779965253198111687460325106354709891660512861445595746844283026643946613602390739652434321293117572019396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24373983314870505788819319591578235407808464217048230425816675443529902334196414594588727415609115804852779701025806724278501967994*i+3871409367116738178988751840476430742343838513666033437104681725080957080938564688556973154569293811567559630463973004930523849254)*x + (7044720466432665658126722482753236051731493931368693189712429001993430584788180453551293453714208030958011919449903798133783633720*i+8681764766942135040982955779965253198111687460325106354709891660512861445595746844283026643946613602390739652434321293117572019396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8514312660037848753031439347319267889981504897038877780399441029633102534271535128982562250966428551171556487686089329418429871289*i+3028774518206460335328247684414769324193938202855945949489689672288245396833460748170975961156695763773041850834784566418683229235)*x + (17537001556498784819738964860970918481780958147879249763797563310118559859969131354991669382138057337074376574215285403005529594066*i+19228521717240799787483448450869871294084780316683580052171755926355295849722856815667654356047964778792458515046075390544056069082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8514312660037848753031439347319267889981504897038877780399441029633102534271535128982562250966428551171556487686089329418429871289*i+3028774518206460335328247684414769324193938202855945949489689672288245396833460748170975961156695763773041850834784566418683229235)*x + (17537001556498784819738964860970918481780958147879249763797563310118559859969131354991669382138057337074376574215285403005529594066*i+19228521717240799787483448450869871294084780316683580052171755926355295849722856815667654356047964778792458515046075390544056069082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7493552884347734865841160024598276545227059001547319752859972055923891303594491364240506193032024588385541248876828685975997323076*i+18014468837410466243688977009740760723954076244621676745774189531199943478840476043942753110464942589490091411516103108193453383081)*x + (13046478208222845157066415205448433229800360376365916220367431998209524603936851841191616673102265108844566216733393569916639825813*i+20815833302271423676826586173756888659365077428085236994334966046753150027263726219738757968719079831333312814210587084070668042923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7493552884347734865841160024598276545227059001547319752859972055923891303594491364240506193032024588385541248876828685975997323076*i+18014468837410466243688977009740760723954076244621676745774189531199943478840476043942753110464942589490091411516103108193453383081)*x + (13046478208222845157066415205448433229800360376365916220367431998209524603936851841191616673102265108844566216733393569916639825813*i+20815833302271423676826586173756888659365077428085236994334966046753150027263726219738757968719079831333312814210587084070668042923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22666061429253115431050536546032244846395435294672664970207796927056737907649941016694466323718451951328761356899027614092378980203*i+8867764502279307181751423591135905931067282019108364542591543643717937647277190084409125244200898786124255551991888138970954758058)*x + (22051635761549504933810413196987259524858553075552636212687931016710611917695312933127457614148062673642989789930262190235901875659*i+1588837412775227451072424302520345499848657420716992856769778326861203680067601418142937517861232739486137367320900988522765005281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22666061429253115431050536546032244846395435294672664970207796927056737907649941016694466323718451951328761356899027614092378980203*i+8867764502279307181751423591135905931067282019108364542591543643717937647277190084409125244200898786124255551991888138970954758058)*x + (22051635761549504933810413196987259524858553075552636212687931016710611917695312933127457614148062673642989789930262190235901875659*i+1588837412775227451072424302520345499848657420716992856769778326861203680067601418142937517861232739486137367320900988522765005281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2627786943944263538023722641709016510841950748837836703438722342651990100007229497458774102691342743000871872402949042209683932444*i+21530465457003992610453085111546593024298226082349299925680697843718590193107093389633194062262680354379220407392316381247994636816)*x + (9066893975463578348647318123056849852197252831838837437542230412895924451925187618306206192194384852893720511854930614744572837476*i+21928871381014672567677329346317831668895554135064879756357115704162507468099052816945051431845534190864922061569718623769710905062) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2627786943944263538023722641709016510841950748837836703438722342651990100007229497458774102691342743000871872402949042209683932444*i+21530465457003992610453085111546593024298226082349299925680697843718590193107093389633194062262680354379220407392316381247994636816)*x + (9066893975463578348647318123056849852197252831838837437542230412895924451925187618306206192194384852893720511854930614744572837476*i+21928871381014672567677329346317831668895554135064879756357115704162507468099052816945051431845534190864922061569718623769710905062) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16458290851486634185374148191900631552860408968333361066488802759131442251709455920401382400038513799561813655678106431068942344458*i+5449926899725897216511805900519147296397213476316324986316191421043190391022993180163658134673760656244803093054667877165598404117)*x + (1076726778222205261135591203008178639450454096785302090050308799650941317678441142426105581404073325994751168842158865083959027774*i+8802519537722746541350450125415559406325639655016540854472128595092110329992870722374615256783708224390738150056266791221340848071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16458290851486634185374148191900631552860408968333361066488802759131442251709455920401382400038513799561813655678106431068942344458*i+5449926899725897216511805900519147296397213476316324986316191421043190391022993180163658134673760656244803093054667877165598404117)*x + (1076726778222205261135591203008178639450454096785302090050308799650941317678441142426105581404073325994751168842158865083959027774*i+8802519537722746541350450125415559406325639655016540854472128595092110329992870722374615256783708224390738150056266791221340848071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13386127512577067583847557171617460460843853936325555706381828335925278128547977941719129893725922809477369677807275995603473088188*i+10509409685630384493997845253534170555100213959071839034862276051538332513920452357645386029306223435279962441638417008653351221110)*x + (6709144941000027314107321199213220789971204526862477564716209446823672640940666699520085190849830942075034053483227972290410471676*i+20058220848851700565051911223940899400008825417775625083577410233863034664493020582588675059838270202124238197327766779025607355991) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13386127512577067583847557171617460460843853936325555706381828335925278128547977941719129893725922809477369677807275995603473088188*i+10509409685630384493997845253534170555100213959071839034862276051538332513920452357645386029306223435279962441638417008653351221110)*x + (6709144941000027314107321199213220789971204526862477564716209446823672640940666699520085190849830942075034053483227972290410471676*i+20058220848851700565051911223940899400008825417775625083577410233863034664493020582588675059838270202124238197327766779025607355991) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6269356729996381615956062186158711721351818520088443897151667706544747322566422746919164560765775386135991023698624709672996930421*i+10246033037107013504148403288630230662358661657658579591965095004738215348349173115203251970631809565076505610359872233706903949909)*x + (11459264511032388181268351829337680565063450252222284473040813576196042373357207234540349424110063063267260878329372029017743230631*i+14993085143211678608525813084214492954328526672926524635389438040561717571450331921357867634390828467842606671735137652969189506606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6269356729996381615956062186158711721351818520088443897151667706544747322566422746919164560765775386135991023698624709672996930421*i+10246033037107013504148403288630230662358661657658579591965095004738215348349173115203251970631809565076505610359872233706903949909)*x + (11459264511032388181268351829337680565063450252222284473040813576196042373357207234540349424110063063267260878329372029017743230631*i+14993085143211678608525813084214492954328526672926524635389438040561717571450331921357867634390828467842606671735137652969189506606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13334084838298242224915459655564238777528882283845543759543408559930446502865363655753625629688900205156741607751625552510334663073*i+9416274701101239447497093633572497610894612311761370334200825611265499908663698083044108552921339207563478343895695819171371198797)*x + (7924251081433550774486683292880653522731033995705416381802458759452917749581313824422288007357959624356153795134766053831149536786*i+14605940498057181301871372268018226163385415684193453419369930703072865589539306176981493356144125195965546642287522564601511714053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13334084838298242224915459655564238777528882283845543759543408559930446502865363655753625629688900205156741607751625552510334663073*i+9416274701101239447497093633572497610894612311761370334200825611265499908663698083044108552921339207563478343895695819171371198797)*x + (7924251081433550774486683292880653522731033995705416381802458759452917749581313824422288007357959624356153795134766053831149536786*i+14605940498057181301871372268018226163385415684193453419369930703072865589539306176981493356144125195965546642287522564601511714053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4771055502421687398571544795583793236114770534369787309518460810737707901100564400011021666338648477649370035481526866239483693456*i+5066640088639198462221251594355018058979350066780170699719761856034774397695940653040231700023088974780534778548202945075923455163)*x + (22657611026450854626046253436924900633101156145111704297775807003019989948980163999851525750966369963204436201542359205731978704998*i+9428043903804179925290546140581984546805141400442715561869568979936173803406178861340040342542852958780990536758995477119036679652) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4771055502421687398571544795583793236114770534369787309518460810737707901100564400011021666338648477649370035481526866239483693456*i+5066640088639198462221251594355018058979350066780170699719761856034774397695940653040231700023088974780534778548202945075923455163)*x + (22657611026450854626046253436924900633101156145111704297775807003019989948980163999851525750966369963204436201542359205731978704998*i+9428043903804179925290546140581984546805141400442715561869568979936173803406178861340040342542852958780990536758995477119036679652) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7323930814218006880572531562657520199204479129198877616036344368705779965318346437533413189900156172876312053663711047428244551049*i+7419435449921302385301468583532531816821710387414388984979098349743207786176954035661365587293498668793458087812008112574155911653)*x + (6921823086959178229996724908828666677427135729011828415983190218733682362626531894546848617225674689905493062392639004583251771415*i+14933320270506162159569003959676979852773024504399520726331643663623278292981808897315265304118461638666210654680493056322619861868) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7323930814218006880572531562657520199204479129198877616036344368705779965318346437533413189900156172876312053663711047428244551049*i+7419435449921302385301468583532531816821710387414388984979098349743207786176954035661365587293498668793458087812008112574155911653)*x + (6921823086959178229996724908828666677427135729011828415983190218733682362626531894546848617225674689905493062392639004583251771415*i+14933320270506162159569003959676979852773024504399520726331643663623278292981808897315265304118461638666210654680493056322619861868) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5640791693834078877698499764133639980038032875856624522339002015083570340412238148620195810144256744148607297451652850886129261162*i+6458988239496241533820102609090507677238776099530758200638309105316325904916073422520256692123826413175126578228960938991006495975)*x + (1105629666420135141128429183258309672984372704546954982751467223030654818394278508794676485961070701023445892315383362913444216632*i+7907018541689889710753128472828966513126426585672597776261339003522029850286965516348511572135966113769264551774698724016265918877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5640791693834078877698499764133639980038032875856624522339002015083570340412238148620195810144256744148607297451652850886129261162*i+6458988239496241533820102609090507677238776099530758200638309105316325904916073422520256692123826413175126578228960938991006495975)*x + (1105629666420135141128429183258309672984372704546954982751467223030654818394278508794676485961070701023445892315383362913444216632*i+7907018541689889710753128472828966513126426585672597776261339003522029850286965516348511572135966113769264551774698724016265918877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16577549723085140051035058024901802823852761518665833235489846071161490600698487512202262269602037463209307565542769308818904397022*i+19887384233891887777983888231120742988917485312886716430269422541306645505767856628132153432582211127587884372536065377284515008706)*x + (9438403808166113583238279670551822416515483047158139924417176652247284491070129106694012197490035810454624762173954528887775926582*i+8233760163363325362181881899958085697799861688710095159889873570427141682275162970667609123822385272718190013321015479997864324255) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16577549723085140051035058024901802823852761518665833235489846071161490600698487512202262269602037463209307565542769308818904397022*i+19887384233891887777983888231120742988917485312886716430269422541306645505767856628132153432582211127587884372536065377284515008706)*x + (9438403808166113583238279670551822416515483047158139924417176652247284491070129106694012197490035810454624762173954528887775926582*i+8233760163363325362181881899958085697799861688710095159889873570427141682275162970667609123822385272718190013321015479997864324255) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13349230579871283178064307171180215342182799249843039762525474071977379594338749082962758108144986528217764567076214648229247800393*i+7671938185302558585640904940271157100267401505817768445610151418728188953453393759809737443428855805544882238264766304944046353767)*x + (6592835299794045434320460476099791275715834604835961858983968235832456257507807199451016712869057463043767218171347548696007655751*i+21251589365856450048653980352307328537846996418537431767802896330400910580915594388054308596508884887010329766171728988872293634353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13349230579871283178064307171180215342182799249843039762525474071977379594338749082962758108144986528217764567076214648229247800393*i+7671938185302558585640904940271157100267401505817768445610151418728188953453393759809737443428855805544882238264766304944046353767)*x + (6592835299794045434320460476099791275715834604835961858983968235832456257507807199451016712869057463043767218171347548696007655751*i+21251589365856450048653980352307328537846996418537431767802896330400910580915594388054308596508884887010329766171728988872293634353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4564761330685873602439548914245609574899038076886666005314137495514163445086357274728449419054254532387497191865839463096514406411*i+1832881910424205028921567256737003357840287067713524749276556209478791433586326823061820817460431769457766352568109494651631045659)*x + (19461936995966579285285073611241889993897830230757357542335048496637942801942227027422570910163128005495978035897098134126473784772*i+20473342271770539674468797646494860635926129687928280175604308344762803986067714157306165886747052432866208953454262566729895220215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4564761330685873602439548914245609574899038076886666005314137495514163445086357274728449419054254532387497191865839463096514406411*i+1832881910424205028921567256737003357840287067713524749276556209478791433586326823061820817460431769457766352568109494651631045659)*x + (19461936995966579285285073611241889993897830230757357542335048496637942801942227027422570910163128005495978035897098134126473784772*i+20473342271770539674468797646494860635926129687928280175604308344762803986067714157306165886747052432866208953454262566729895220215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16227618829198262048163889508548726492621115741678051147095148557558907700622455385378270202757614608125092487975972158113178218841*i+15844307707516878349137607760398132414297159845933852843684244461842309227959103576278721145770315434046624967903853117369007599700)*x + (7198143607538408926149862078434349305320225045142256764634241905532279232129541749224917122000690500773992999009216478332438318991*i+19012693880111153330557898097609104188382406648750388146131142043864388791525202286079733280592724395706685084809326377952942486486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16227618829198262048163889508548726492621115741678051147095148557558907700622455385378270202757614608125092487975972158113178218841*i+15844307707516878349137607760398132414297159845933852843684244461842309227959103576278721145770315434046624967903853117369007599700)*x + (7198143607538408926149862078434349305320225045142256764634241905532279232129541749224917122000690500773992999009216478332438318991*i+19012693880111153330557898097609104188382406648750388146131142043864388791525202286079733280592724395706685084809326377952942486486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9113150186330521101124649959278656714075495322573688707831486351493608435866976485455345483808671240254658757948433794959680043310*i+19269337851584770821291544115111546610084282204656752998510794872881665875713643661093529666603071664092566216690230162634050857169)*x + (6184767719592425943196408367958826590433651694209772218176713490451884138310750343650998448207874483094552689949937859649208510538*i+16409123986541339003409399416114613629597582128370016454363277382272038515541937668042903534188902174955129372245672467564296341989) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9113150186330521101124649959278656714075495322573688707831486351493608435866976485455345483808671240254658757948433794959680043310*i+19269337851584770821291544115111546610084282204656752998510794872881665875713643661093529666603071664092566216690230162634050857169)*x + (6184767719592425943196408367958826590433651694209772218176713490451884138310750343650998448207874483094552689949937859649208510538*i+16409123986541339003409399416114613629597582128370016454363277382272038515541937668042903534188902174955129372245672467564296341989) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (681629204247002951012870245942013598637107518954545534353621521705515586583159627280512853810831382312973205240396114399313910032*i+6813265941585257316741049988905961997658081279876528158116702783890211618122322902061843376502595020199209922936767277220845482119)*x + (3562460858405400633277624611577634763486473709866064797520429926569050140833043815552352314097048660443038146739335149262106829582*i+6762337995396463351338616557314951741785127455697939057415803541456095011379064872546256621130846586000815655711105732542251012832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (681629204247002951012870245942013598637107518954545534353621521705515586583159627280512853810831382312973205240396114399313910032*i+6813265941585257316741049988905961997658081279876528158116702783890211618122322902061843376502595020199209922936767277220845482119)*x + (3562460858405400633277624611577634763486473709866064797520429926569050140833043815552352314097048660443038146739335149262106829582*i+6762337995396463351338616557314951741785127455697939057415803541456095011379064872546256621130846586000815655711105732542251012832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1391341076432342744550315587826245573909325338087846880146279535436638447723455461351369912013595561363432083357880171883794266952*i+12893090860871102221451176006311049589797324028640370598717196327558024161480753612879016985742859103286221373527655414593997421140)*x + (13686644571755599380282726766071347549479893916251912490382299756025211101753332671016024355700577369777556604856791149448324275600*i+262067084776984085504967182979550625029208103602663863084555979838712546790163634991221517284016012789236113584576839762401974317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1391341076432342744550315587826245573909325338087846880146279535436638447723455461351369912013595561363432083357880171883794266952*i+12893090860871102221451176006311049589797324028640370598717196327558024161480753612879016985742859103286221373527655414593997421140)*x + (13686644571755599380282726766071347549479893916251912490382299756025211101753332671016024355700577369777556604856791149448324275600*i+262067084776984085504967182979550625029208103602663863084555979838712546790163634991221517284016012789236113584576839762401974317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4593564278811112867392515370926768291683108672401254894684838305793349102148811063535943438287234922482207611087035244924867434178*i+11672284163577426599610927267097048993449352534887005316410339543343285987910386749098371089090230458356114218957599851569567865389)*x + (11534757639003156348045147268360170509418103200244179452479515315935025408096562404706737875078379249883383711467422583575816987599*i+17946101616702948058083018625737033367908154937184324991786603235283981202208118394449414444364262438321565005426941723307651800191) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4593564278811112867392515370926768291683108672401254894684838305793349102148811063535943438287234922482207611087035244924867434178*i+11672284163577426599610927267097048993449352534887005316410339543343285987910386749098371089090230458356114218957599851569567865389)*x + (11534757639003156348045147268360170509418103200244179452479515315935025408096562404706737875078379249883383711467422583575816987599*i+17946101616702948058083018625737033367908154937184324991786603235283981202208118394449414444364262438321565005426941723307651800191) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12387571220475849757340715928252426300666017314999980547152106925999206148081145375955354392191195519748378092045903713142384321158*i+19855052017050233211547761189226819115670446113374817451330966574687567289611485596277394496973270274142043470765803026236107118882)*x + (9679797323833435504307385566034419199206237575637559743163442797183518502856940488045981345478351762950108983824873101763279560998*i+124293290719554232952083412695591828016279439789739690960225514485704870384176143659272218147162501357369030832340650036129947085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12387571220475849757340715928252426300666017314999980547152106925999206148081145375955354392191195519748378092045903713142384321158*i+19855052017050233211547761189226819115670446113374817451330966574687567289611485596277394496973270274142043470765803026236107118882)*x + (9679797323833435504307385566034419199206237575637559743163442797183518502856940488045981345478351762950108983824873101763279560998*i+124293290719554232952083412695591828016279439789739690960225514485704870384176143659272218147162501357369030832340650036129947085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12979887293575367060763224184493838312920495312428886391418454512041404486688722924142721468468386716298578991176423294174870015469*i+12652680454094128696375246066470210471656255169627871740305660943880740687875928837516203450022108723324717431628027396299023999427)*x + (16263799097997556343197527588764903253870616264618339011863350165207718039729622970125783110812107264522319798546464270611937172676*i+1384187519902735355386379469246570480930681399338587588720019104545708951016622362127453934065220042803379048016755145578036540179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12979887293575367060763224184493838312920495312428886391418454512041404486688722924142721468468386716298578991176423294174870015469*i+12652680454094128696375246066470210471656255169627871740305660943880740687875928837516203450022108723324717431628027396299023999427)*x + (16263799097997556343197527588764903253870616264618339011863350165207718039729622970125783110812107264522319798546464270611937172676*i+1384187519902735355386379469246570480930681399338587588720019104545708951016622362127453934065220042803379048016755145578036540179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6185751886546240307778036193483438985711482496291389467960188054910130523791384788487108768469457821260680175087086984803037827045*i+2593571895913648257872391418730403233036462582812664207710146046070815766553683901706828781261806761216513972373965873062352380696)*x + (17427958868614734784820533770976553659779548992462086814530411472958389213391080297294108480762408929496026588237662097505194899002*i+10680457164194445517534953516607556369135581824897088977327634308007612212864043726963682862805397618294666721216507127499915821288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6185751886546240307778036193483438985711482496291389467960188054910130523791384788487108768469457821260680175087086984803037827045*i+2593571895913648257872391418730403233036462582812664207710146046070815766553683901706828781261806761216513972373965873062352380696)*x + (17427958868614734784820533770976553659779548992462086814530411472958389213391080297294108480762408929496026588237662097505194899002*i+10680457164194445517534953516607556369135581824897088977327634308007612212864043726963682862805397618294666721216507127499915821288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11191229042604089023442941119692174047548009917129102497987991439986171862004433063579238533496632840890207038221982146958372860450*i+4228039653276634909316513551640463514291875629019647029900663541839036085868784098788625485514091850552417979254404225140829997092)*x + (19122238362185881365404855172142613285294169981188069456454748798851281174670023127267707434377992955899296740231376507402092160764*i+2626142277990144595527296493097369324847482902741266915094701052703775674994273311886410376282668070231297723046254300804343246192) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11191229042604089023442941119692174047548009917129102497987991439986171862004433063579238533496632840890207038221982146958372860450*i+4228039653276634909316513551640463514291875629019647029900663541839036085868784098788625485514091850552417979254404225140829997092)*x + (19122238362185881365404855172142613285294169981188069456454748798851281174670023127267707434377992955899296740231376507402092160764*i+2626142277990144595527296493097369324847482902741266915094701052703775674994273311886410376282668070231297723046254300804343246192) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8626297690361946712321420660920068441852250476393418074924787840570825288550142822078229639059799753765854047196251658494240784732*i+20150885641479173576870377062740659189465048945130955248129461806222751962917799347623306503984280500835666463515550470278506285145)*x + (12373210984070692453503574548066553264872717752855740530024620483614011070947382827076913124377101109613625180960521512726686808138*i+14657733510001361269064095610349789888893351192922878748692124432329994914437072768626564307673665834753735137054198473161322031528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8626297690361946712321420660920068441852250476393418074924787840570825288550142822078229639059799753765854047196251658494240784732*i+20150885641479173576870377062740659189465048945130955248129461806222751962917799347623306503984280500835666463515550470278506285145)*x + (12373210984070692453503574548066553264872717752855740530024620483614011070947382827076913124377101109613625180960521512726686808138*i+14657733510001361269064095610349789888893351192922878748692124432329994914437072768626564307673665834753735137054198473161322031528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (776771096926529378546547165884741649681983285152974140869797694691177820811844528103429961867910742544797082584238264599314080247*i+1489756938473502817275536015911774532075543690631727512220276616421704393044194187712109806796513621036325395707886410577370712283)*x + (13100976162458469713662356917454757647543932405782448432413184157610474534557753067743790543728019734309905260998607963046355058087*i+20546357291935403975757415699957352989265141323658747800251924300636489722495943474610494008656636831048699152061240583089018895179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (776771096926529378546547165884741649681983285152974140869797694691177820811844528103429961867910742544797082584238264599314080247*i+1489756938473502817275536015911774532075543690631727512220276616421704393044194187712109806796513621036325395707886410577370712283)*x + (13100976162458469713662356917454757647543932405782448432413184157610474534557753067743790543728019734309905260998607963046355058087*i+20546357291935403975757415699957352989265141323658747800251924300636489722495943474610494008656636831048699152061240583089018895179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8406948869047286862299641484841934106932095266723812432684703941327805878238083830211963217596853769559843687525886511657704475658*i+23720730269283320328067968770025093931924556311161308087911036708813956612727268392573805287073625231585589024496593975285364080129)*x + (13072572093489366327658761859620891321924562395114420540508899332088230035875158339347385075372368534790930590399860576360673729338*i+5162486523862216971229724397244104595877085538408848326711998228371539945516109688744082873243300620160917922031968265323665212560) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8406948869047286862299641484841934106932095266723812432684703941327805878238083830211963217596853769559843687525886511657704475658*i+23720730269283320328067968770025093931924556311161308087911036708813956612727268392573805287073625231585589024496593975285364080129)*x + (13072572093489366327658761859620891321924562395114420540508899332088230035875158339347385075372368534790930590399860576360673729338*i+5162486523862216971229724397244104595877085538408848326711998228371539945516109688744082873243300620160917922031968265323665212560) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4154826366363340188476097280295875070623476282017570151035480323270104051955015850079676248290595352015441892078231800838113941862*i+23864086224550252486184309088750504555054344913739665583908667527060734034282507153550170383319680042386964639972689714880878794139)*x + (17423183818969068364398239099313586267815417986460331610343681494731549098305687408509238281017998961624243816618495914202681463896*i+16546108722218447459908781664008524498664997098632796384500514670986179024551947073383829767344557793578891656229258276962393981747) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4154826366363340188476097280295875070623476282017570151035480323270104051955015850079676248290595352015441892078231800838113941862*i+23864086224550252486184309088750504555054344913739665583908667527060734034282507153550170383319680042386964639972689714880878794139)*x + (17423183818969068364398239099313586267815417986460331610343681494731549098305687408509238281017998961624243816618495914202681463896*i+16546108722218447459908781664008524498664997098632796384500514670986179024551947073383829767344557793578891656229258276962393981747) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23204868640212293107650299168939328457856738793022501176105701991301194746342790891512881043010329686687038561292705860508417803317*i+9996237859035550329251546411233519127691544529266155508795192747843531432910089037236353872188405193097074166809023559016079014906)*x + (18917756088276033346033819024082154123076993846366807053910933204917326328993385940753949417992459932081279379544733749234855350262*i+6569434515276385460052212925161714837710828180948902063180044248088376767856472027472018002481788818385006177256752015071419695360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23204868640212293107650299168939328457856738793022501176105701991301194746342790891512881043010329686687038561292705860508417803317*i+9996237859035550329251546411233519127691544529266155508795192747843531432910089037236353872188405193097074166809023559016079014906)*x + (18917756088276033346033819024082154123076993846366807053910933204917326328993385940753949417992459932081279379544733749234855350262*i+6569434515276385460052212925161714837710828180948902063180044248088376767856472027472018002481788818385006177256752015071419695360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10519609227858848196684005127921297411204959324026466336342518979776745914779770926961120843450383704660664524830710624940417893928*i+11625543066158680223719842753577441211616179971993432789715522058740633355769480694949680714888922924353582766582324843563847484465)*x + (348076154598789651788389182604117548696683242121100561245289346811380493715056587710016470861228315519795929401951362425862032760*i+19785093029137070817994111288673237136723847147301829588716847914065035090113255528380075764082044069142563901230873856122213717041) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10519609227858848196684005127921297411204959324026466336342518979776745914779770926961120843450383704660664524830710624940417893928*i+11625543066158680223719842753577441211616179971993432789715522058740633355769480694949680714888922924353582766582324843563847484465)*x + (348076154598789651788389182604117548696683242121100561245289346811380493715056587710016470861228315519795929401951362425862032760*i+19785093029137070817994111288673237136723847147301829588716847914065035090113255528380075764082044069142563901230873856122213717041) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13950702756992417982391084069990414479065189139347067111699596533487535968421635507796147543460415411393086459653991620275162667294*i+5279532308996880165465963324079804216078039637700846197100820181695389839681818965449921833789377851363140852038243756713536775168)*x + (3270233533891938549677909416682401535563256675578090709230288390646128904867681051245758879511846577924598140864370895077046186942*i+1255437231117885292815371274779188461526640130503021568533657689589375343689817352979232307514944904048134844258503861479257250756) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13950702756992417982391084069990414479065189139347067111699596533487535968421635507796147543460415411393086459653991620275162667294*i+5279532308996880165465963324079804216078039637700846197100820181695389839681818965449921833789377851363140852038243756713536775168)*x + (3270233533891938549677909416682401535563256675578090709230288390646128904867681051245758879511846577924598140864370895077046186942*i+1255437231117885292815371274779188461526640130503021568533657689589375343689817352979232307514944904048134844258503861479257250756) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15137390886955111186507670162239284816456860174257017822187010156334262812743899488695448699655145609025302331409824794458852995792*i+10352547912701789918766067731975726439766574531518273627909490752606416529579280436818811117534041140394549289223426097159853590043)*x + (23911142553207069081668257555675763699963659741173212913712315081301069088917278400307036327226650799854144061318112201181994135246*i+17937879903019186660689016978463915439217281548427469609696063069258091361164719153244311890754068916904274486561683822998509838372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15137390886955111186507670162239284816456860174257017822187010156334262812743899488695448699655145609025302331409824794458852995792*i+10352547912701789918766067731975726439766574531518273627909490752606416529579280436818811117534041140394549289223426097159853590043)*x + (23911142553207069081668257555675763699963659741173212913712315081301069088917278400307036327226650799854144061318112201181994135246*i+17937879903019186660689016978463915439217281548427469609696063069258091361164719153244311890754068916904274486561683822998509838372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9195233547884673811685887872949922363331654086980590698641570901881583923297838753428976161319300717915005048935855815491898880897*i+3564566023486724666141566487948115993705398511748952874951779391577017370045060052204859859079274562848533042464291061518725265492)*x + (22216431967170147718769035680472678613323855517705257061837023880318387129548392219799640022477698021657919323738562292829375967867*i+13670333342309391210009473577020159295673677504474232536350696445427956301621563056261495521603661463762400735682160115727996601153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9195233547884673811685887872949922363331654086980590698641570901881583923297838753428976161319300717915005048935855815491898880897*i+3564566023486724666141566487948115993705398511748952874951779391577017370045060052204859859079274562848533042464291061518725265492)*x + (22216431967170147718769035680472678613323855517705257061837023880318387129548392219799640022477698021657919323738562292829375967867*i+13670333342309391210009473577020159295673677504474232536350696445427956301621563056261495521603661463762400735682160115727996601153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8130453360946557194805671545190533751358714249183204851447376871729273315008203933940150658630592048438808612351145896323705498910*i+7488932049783435799932945650148849205581798951407763310566521738671832729952066863432590075011253356534494518721564631690823837921)*x + (3035733297820877710444709119210846149138646751980082622372646399728108390248548860136676937311482380913663161025137962987917238118*i+12445575472614374402454991084562555699503157161814626206057223580953775044804632875511057639437412824685671013417732193215345674575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8130453360946557194805671545190533751358714249183204851447376871729273315008203933940150658630592048438808612351145896323705498910*i+7488932049783435799932945650148849205581798951407763310566521738671832729952066863432590075011253356534494518721564631690823837921)*x + (3035733297820877710444709119210846149138646751980082622372646399728108390248548860136676937311482380913663161025137962987917238118*i+12445575472614374402454991084562555699503157161814626206057223580953775044804632875511057639437412824685671013417732193215345674575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17644537440520612056326151412713825326617131863000362288295029041021898702935501446067690792094005199346372263391219310078304723522*i+16184104336405843336056630857193350371717186397503896500381243122792137806615221190855494526064702717262047361097624586212060113087)*x + (21389918746233381349080505409640856411005449390913915486417642428697196369095739486679276905529548938683001219933387698510314403938*i+5496520140958746642985217116592539131765794786801938341793290284066947849182073420503623222757026647434003644296844067918629899609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17644537440520612056326151412713825326617131863000362288295029041021898702935501446067690792094005199346372263391219310078304723522*i+16184104336405843336056630857193350371717186397503896500381243122792137806615221190855494526064702717262047361097624586212060113087)*x + (21389918746233381349080505409640856411005449390913915486417642428697196369095739486679276905529548938683001219933387698510314403938*i+5496520140958746642985217116592539131765794786801938341793290284066947849182073420503623222757026647434003644296844067918629899609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5588084795124627258896358379546175464402650439307560016386887123661085438634571631491866146890220517926071063020223963504820034532*i+3302000670952608629999660158264316070003956772587146874550336806558680296829064092670905234976057553484943569666610198321092051546)*x + (20138772140308324123648659320959992325397829447918185383529820005456138664129731051651166189472231961457851695640399243176691884563*i+12155548401482716649050818543396481377820929520615208277761887086461888334589383704614078291062091579396096588435625227709632876293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5588084795124627258896358379546175464402650439307560016386887123661085438634571631491866146890220517926071063020223963504820034532*i+3302000670952608629999660158264316070003956772587146874550336806558680296829064092670905234976057553484943569666610198321092051546)*x + (20138772140308324123648659320959992325397829447918185383529820005456138664129731051651166189472231961457851695640399243176691884563*i+12155548401482716649050818543396481377820929520615208277761887086461888334589383704614078291062091579396096588435625227709632876293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8424725085199441128399175291122521007536140275827269139345844418966425458372694652716200877763928748143557805270739564547516956460*i+23142225970467428957260118330474040947302758206901993482689505778260048125616562473418180969200766722478926227309768916806401226756)*x + (19868651524100200863458846088427946304063623478296448351705249947052528677649396234766383165871213446441502776015950250972905533204*i+21462037265762485700266638045013532147652981451264055996826604781295718006583442895074086910504743216550927284907123473673457845466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8424725085199441128399175291122521007536140275827269139345844418966425458372694652716200877763928748143557805270739564547516956460*i+23142225970467428957260118330474040947302758206901993482689505778260048125616562473418180969200766722478926227309768916806401226756)*x + (19868651524100200863458846088427946304063623478296448351705249947052528677649396234766383165871213446441502776015950250972905533204*i+21462037265762485700266638045013532147652981451264055996826604781295718006583442895074086910504743216550927284907123473673457845466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23982599589437052890942736701871781597186468290330827860358700214913403753103685846765328661607031756264854615790117876193885884695*i+24250596166150039519200326014286783577267302059668111086365637622888508311121296847541979426206886961089782873734594115914422839043)*x + (12851971653424573329820967001690254039965772138824237659374559206200753470987148891446302095424367092852734146359133055607551628854*i+8512639953187752936738966921953309586045082434838780247885948605367431719560590253927780813954451174309170521564024347734902523870) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23982599589437052890942736701871781597186468290330827860358700214913403753103685846765328661607031756264854615790117876193885884695*i+24250596166150039519200326014286783577267302059668111086365637622888508311121296847541979426206886961089782873734594115914422839043)*x + (12851971653424573329820967001690254039965772138824237659374559206200753470987148891446302095424367092852734146359133055607551628854*i+8512639953187752936738966921953309586045082434838780247885948605367431719560590253927780813954451174309170521564024347734902523870) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9999635387985781144935325121296018915643279342851204698973766406298415946268863265949845093707363219957892388685270378085611698870*i+12773588834718299864195101199107520454596826629602283977006930320786925438814319413687367726190852766253976156028428179649757420963)*x + (18771300745266952764092148015234714770785102322980083723379370900414910090374590069757118940784019118626884428428314361634901260138*i+18400983198867669065735540698958750376714503929751715688606926491811619320310992207259380334987290309127398626122355445482757874481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9999635387985781144935325121296018915643279342851204698973766406298415946268863265949845093707363219957892388685270378085611698870*i+12773588834718299864195101199107520454596826629602283977006930320786925438814319413687367726190852766253976156028428179649757420963)*x + (18771300745266952764092148015234714770785102322980083723379370900414910090374590069757118940784019118626884428428314361634901260138*i+18400983198867669065735540698958750376714503929751715688606926491811619320310992207259380334987290309127398626122355445482757874481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4243169171692819830819458213719863557984185880251647469533444205497756828421699999849244728764683607315986283718081222581366490252*i+22896592506584801423180554943349315058992760895788440308592439754421110773496146759100685368227248781416529309202211661843788585534)*x + (20723555920889302854410513807461478847893698190722957078874283383106593888505100760334221705621887451311065056401277281029359252053*i+9019384917336398986763155605109462949821723856199198333916683105309367868442135665648213726948026625367965910153340376503332014957) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4243169171692819830819458213719863557984185880251647469533444205497756828421699999849244728764683607315986283718081222581366490252*i+22896592506584801423180554943349315058992760895788440308592439754421110773496146759100685368227248781416529309202211661843788585534)*x + (20723555920889302854410513807461478847893698190722957078874283383106593888505100760334221705621887451311065056401277281029359252053*i+9019384917336398986763155605109462949821723856199198333916683105309367868442135665648213726948026625367965910153340376503332014957) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13080074949960464703936098558355155138440200810344646197890343709592318453380687361856688017384254830194008914657572922578862267218*i+13566324271789930121274944545119685500565076250559006019011982003224602791361510657432388552544139722090616562249137715850094348358)*x + (23112013087667566719111711511574001420707557294271949813512837893025177094639550763887924411990116877426616060016381525876268001315*i+10193684305603305740551521775126971557992025412619495474994156969690580395937304012329165218446945618889814237170634592874070841518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13080074949960464703936098558355155138440200810344646197890343709592318453380687361856688017384254830194008914657572922578862267218*i+13566324271789930121274944545119685500565076250559006019011982003224602791361510657432388552544139722090616562249137715850094348358)*x + (23112013087667566719111711511574001420707557294271949813512837893025177094639550763887924411990116877426616060016381525876268001315*i+10193684305603305740551521775126971557992025412619495474994156969690580395937304012329165218446945618889814237170634592874070841518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7956935978630386229014337871139750952639251157717086076640605451183744416595404554045213905965307631942118954740707230975971524669*i+19702024136152050061399218983198845701477011598596470456729095993218193296574868575121130453292745845523333195092160552638965532964)*x + (19471959691045185685283564618039916457165699092566816054944800413062201000125631483893969498012363846544571200482261350120089624291*i+17197799681737045565028997284599958656136090742454652458961136992349837025605644125514086546629789478522862537417991753190422164648) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7956935978630386229014337871139750952639251157717086076640605451183744416595404554045213905965307631942118954740707230975971524669*i+19702024136152050061399218983198845701477011598596470456729095993218193296574868575121130453292745845523333195092160552638965532964)*x + (19471959691045185685283564618039916457165699092566816054944800413062201000125631483893969498012363846544571200482261350120089624291*i+17197799681737045565028997284599958656136090742454652458961136992349837025605644125514086546629789478522862537417991753190422164648) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1837659811305859348901229791482215090570521104928055662252085389329105571989125195117922643339597942052538208709109926165052585922*i+13512163159414125461465475089177605893660315276218697477532165690046759231713804273230104808300636010360419301578973807222126625113)*x + (17078961193610298234280663849322321172847193554478808106061719627267178237843863902474490834719526628747833726320584807098363941094*i+24103663494344236006441051196090109016951105196757015671246863253479432322589724426407782017346708725369032129698620035533406252304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1837659811305859348901229791482215090570521104928055662252085389329105571989125195117922643339597942052538208709109926165052585922*i+13512163159414125461465475089177605893660315276218697477532165690046759231713804273230104808300636010360419301578973807222126625113)*x + (17078961193610298234280663849322321172847193554478808106061719627267178237843863902474490834719526628747833726320584807098363941094*i+24103663494344236006441051196090109016951105196757015671246863253479432322589724426407782017346708725369032129698620035533406252304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7061199848889546781304977274315817074254566580168603195678174078076779937353188120003462209183597561763914382421882001863561723952*i+10450627893706565898686388644215600744526687112376636767037552775130784132905908227370614417829910838972122822160448852056893035973)*x + (467781101254127801093946117827925330246621706582912752879739578946329494937236728055240873031532353321705466142167379403914456466*i+24068828592766033381246123281365351469381463812901435227855223698586982767224892923516058758238511076155417148370184639460172764499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7061199848889546781304977274315817074254566580168603195678174078076779937353188120003462209183597561763914382421882001863561723952*i+10450627893706565898686388644215600744526687112376636767037552775130784132905908227370614417829910838972122822160448852056893035973)*x + (467781101254127801093946117827925330246621706582912752879739578946329494937236728055240873031532353321705466142167379403914456466*i+24068828592766033381246123281365351469381463812901435227855223698586982767224892923516058758238511076155417148370184639460172764499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2415389052786236519072411384139744652539266759220093460690433321972397159514756438982139499120852430320084168916902729360091334192*i+24433739111350772159143804117143385354834803311406554010448013336903815008576975333627717554152274073410775038112604538642922332225)*x + (645491560520950142678472325324489462066227700138150190856264924190373186749361787427522952159763088260451768658124102424174354635*i+1791518527667860841897740330067239419032586896000218349764356797267094263478647594068802898637124273280580657028604568158048846241) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2415389052786236519072411384139744652539266759220093460690433321972397159514756438982139499120852430320084168916902729360091334192*i+24433739111350772159143804117143385354834803311406554010448013336903815008576975333627717554152274073410775038112604538642922332225)*x + (645491560520950142678472325324489462066227700138150190856264924190373186749361787427522952159763088260451768658124102424174354635*i+1791518527667860841897740330067239419032586896000218349764356797267094263478647594068802898637124273280580657028604568158048846241) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11965975048429049253358797389331520371568527406121739740801240641508043588247137544078539454903804046016126926804977154374081767198*i+10809972582995868797713836031025266886702411101099477948612931973111708152703052516426780327385838432881834302012829696054013460407)*x + (12391701238542069029101457936778737281989582544397306029447185028241727920537619519923755283899800671626235298776042517153160554099*i+7958372358426674860726055718231782747060070254977238396724067560102554085843440728154171223548132794031870185601670753048598239006) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11965975048429049253358797389331520371568527406121739740801240641508043588247137544078539454903804046016126926804977154374081767198*i+10809972582995868797713836031025266886702411101099477948612931973111708152703052516426780327385838432881834302012829696054013460407)*x + (12391701238542069029101457936778737281989582544397306029447185028241727920537619519923755283899800671626235298776042517153160554099*i+7958372358426674860726055718231782747060070254977238396724067560102554085843440728154171223548132794031870185601670753048598239006) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17687569448314888732110627871522414336339717972113117968887225678719317894866278154369638506595138174855433541388469496755576092176*i+5724914853375095527201204262622036494357405576780215491708749727981928900832670362582845641174527003200313894353171383159716589200)*x + (11302366726397621795201351660556006989211227201069712774544296979127520576663093046856769612468714040874220972191815041330749993455*i+382821773919797256142723287844670260102833268666021362502306506747619687323477216781225003364126711072755164427837321419592686656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17687569448314888732110627871522414336339717972113117968887225678719317894866278154369638506595138174855433541388469496755576092176*i+5724914853375095527201204262622036494357405576780215491708749727981928900832670362582845641174527003200313894353171383159716589200)*x + (11302366726397621795201351660556006989211227201069712774544296979127520576663093046856769612468714040874220972191815041330749993455*i+382821773919797256142723287844670260102833268666021362502306506747619687323477216781225003364126711072755164427837321419592686656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12427780990115723643955398407117766064454708391450899519641858608229461110633307084736588473254345107356110624085149156991279305803*i+10682038157442335799528977609876682380245322073684972734922532854231159462807674259673674239109152842043476223678773526186110050833)*x + (3207569813445790642207466790080570249037377843183975557376509587638400485239549194163629183931535852582899285209606866738264166806*i+6598369902181806770898775240438396567239124865243878743210572419223163636553374602464260334296548546400103293826856609526607268627) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12427780990115723643955398407117766064454708391450899519641858608229461110633307084736588473254345107356110624085149156991279305803*i+10682038157442335799528977609876682380245322073684972734922532854231159462807674259673674239109152842043476223678773526186110050833)*x + (3207569813445790642207466790080570249037377843183975557376509587638400485239549194163629183931535852582899285209606866738264166806*i+6598369902181806770898775240438396567239124865243878743210572419223163636553374602464260334296548546400103293826856609526607268627) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1421541946121407885489673581289160010670014214398769263853607884947828457794299250700619960565794256289873518424894314810953711979*i+14781237310429857231000158563300242299245880712569666765688006657051456161245232098968799954553484019568710420369074282952338022788)*x + (11474485812670614923164456231360801895689626448116947044701605888069437890095906997522338004722228090623456031520634513766394016636*i+1464775006667672794416182215943425880695323427164762884830944735148493346480519741115949238949018228478130415857124014582719669275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1421541946121407885489673581289160010670014214398769263853607884947828457794299250700619960565794256289873518424894314810953711979*i+14781237310429857231000158563300242299245880712569666765688006657051456161245232098968799954553484019568710420369074282952338022788)*x + (11474485812670614923164456231360801895689626448116947044701605888069437890095906997522338004722228090623456031520634513766394016636*i+1464775006667672794416182215943425880695323427164762884830944735148493346480519741115949238949018228478130415857124014582719669275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14087574707886766440093807198712381790043763904148450422497596123825113156258301008086260263389914507233437027711557433016340953078*i+19055990126232236923687297220829614743649430161669928075169671364820594916027451141920521926526318444263217047659931717236832267402)*x + (8092359905087675002715082430523589674704896032317124910048308825935432742371290102116925796241281900350135165152079324224702903786*i+21946937957024719235915566835760902212737360315528963406638743888808057562658381776446700061898090026051258159979972531495191359039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14087574707886766440093807198712381790043763904148450422497596123825113156258301008086260263389914507233437027711557433016340953078*i+19055990126232236923687297220829614743649430161669928075169671364820594916027451141920521926526318444263217047659931717236832267402)*x + (8092359905087675002715082430523589674704896032317124910048308825935432742371290102116925796241281900350135165152079324224702903786*i+21946937957024719235915566835760902212737360315528963406638743888808057562658381776446700061898090026051258159979972531495191359039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (744932152795600785615034833220559543153987509859033991211589861416125792702605500517523512259223817512375967262037237595007552206*i+18182048398765791990625401027898587750497220765614035284826049573231180678287860194379763443775454116479326564241569386585506166775)*x + (13336013639580715445326011727441503536440228693264964346029156632815066852864527963701697118338247883786036295231326284018098941924*i+15145372690853928167930175483407210069737491885208233069300333120343364791033038643406757061730879038320029103694082859975121856897) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (744932152795600785615034833220559543153987509859033991211589861416125792702605500517523512259223817512375967262037237595007552206*i+18182048398765791990625401027898587750497220765614035284826049573231180678287860194379763443775454116479326564241569386585506166775)*x + (13336013639580715445326011727441503536440228693264964346029156632815066852864527963701697118338247883786036295231326284018098941924*i+15145372690853928167930175483407210069737491885208233069300333120343364791033038643406757061730879038320029103694082859975121856897) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9857737971951214160920071066209026649460882765702548022099364774511060400339711636132047394745216387004810256877818874626908823096*i+10859851089390659328344617854084903512478570850258094291625217812027476115857261186445928812138793252323707492029470645205272917787)*x + (23012487354149986396988438582914640772955406959643749201860571163750404759250613406419929882114023092441116922827545450270186669513*i+24385943609330266204890509448741256932244050920096945496953544078690927687113902848751877577830346608169454856851030646178829963654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9857737971951214160920071066209026649460882765702548022099364774511060400339711636132047394745216387004810256877818874626908823096*i+10859851089390659328344617854084903512478570850258094291625217812027476115857261186445928812138793252323707492029470645205272917787)*x + (23012487354149986396988438582914640772955406959643749201860571163750404759250613406419929882114023092441116922827545450270186669513*i+24385943609330266204890509448741256932244050920096945496953544078690927687113902848751877577830346608169454856851030646178829963654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6421380337183322461592745815675794605182255479523274948292576614282593279232138842380554923191023952787623186201914300510287806752*i+9114968288635204788747116765028033755670595775956522730946783711381054664016227856343076602950175618061135012968214920257333610824)*x + (18109625920064791218572742991864779602153282045828729338309897041656062704202653521604152315935362165516964116729225335090694307849*i+6353984795173449564093487305239114651062069449164334124946094778184592665901944956495419283974129014664837849042939734563237424185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6421380337183322461592745815675794605182255479523274948292576614282593279232138842380554923191023952787623186201914300510287806752*i+9114968288635204788747116765028033755670595775956522730946783711381054664016227856343076602950175618061135012968214920257333610824)*x + (18109625920064791218572742991864779602153282045828729338309897041656062704202653521604152315935362165516964116729225335090694307849*i+6353984795173449564093487305239114651062069449164334124946094778184592665901944956495419283974129014664837849042939734563237424185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16857769250130143496624120106139805001159166501027474018549766156129034666954071134104443857205646535099737161764935750027076832951*i+7924934881087482268547027632180726873283409121453425049165495928239538611360966721349722081553196758101621830807870078719832396355)*x + (14113218780348090075452810926376711703763843425509627116917819119815572946981845726356209469434825731820545499023265640119585060382*i+21476517534651455706264659401070577121196473947588952383575542428322145711909048813799207556392600552412880134319595833762120106612) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16857769250130143496624120106139805001159166501027474018549766156129034666954071134104443857205646535099737161764935750027076832951*i+7924934881087482268547027632180726873283409121453425049165495928239538611360966721349722081553196758101621830807870078719832396355)*x + (14113218780348090075452810926376711703763843425509627116917819119815572946981845726356209469434825731820545499023265640119585060382*i+21476517534651455706264659401070577121196473947588952383575542428322145711909048813799207556392600552412880134319595833762120106612) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16293173781511475331323209058300928665433374983335997465028384285652976233743895623557488229240639789506518948323938233676474325320*i+9194547267077670163814726812031382061618433493621016979698910740061226109187064407792652962262776347295812068362025417031338447753)*x + (13258571201923901207183143916727713808977455641871212253355942800336150151459514368413288770508614004901366207434347161179724648975*i+17875956889719091497551475389555204015902216300450949570539169669778701864967082834372661204483915753774561768369656408454769889650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16293173781511475331323209058300928665433374983335997465028384285652976233743895623557488229240639789506518948323938233676474325320*i+9194547267077670163814726812031382061618433493621016979698910740061226109187064407792652962262776347295812068362025417031338447753)*x + (13258571201923901207183143916727713808977455641871212253355942800336150151459514368413288770508614004901366207434347161179724648975*i+17875956889719091497551475389555204015902216300450949570539169669778701864967082834372661204483915753774561768369656408454769889650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16001623215366244085662439675143142915552993514127506838484963334054303854568015310833106609626516931019181539108684135532890473963*i+12481650464859920114939072183189547978178504684629155298594507511201688219137015903336397842380337239419034532817434678653060863289)*x + (3342158414092654284648648945900997777315297684486460899564509443750936305102245298407261469136988440021389176373755011616245631448*i+4239551533121850488051192700303053750699396925762557565661437039716654703817223960965702893232132869014123580765401444655552725393) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16001623215366244085662439675143142915552993514127506838484963334054303854568015310833106609626516931019181539108684135532890473963*i+12481650464859920114939072183189547978178504684629155298594507511201688219137015903336397842380337239419034532817434678653060863289)*x + (3342158414092654284648648945900997777315297684486460899564509443750936305102245298407261469136988440021389176373755011616245631448*i+4239551533121850488051192700303053750699396925762557565661437039716654703817223960965702893232132869014123580765401444655552725393) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21107398059407812883439365730171236106647441511869087217736050784946623712974426947224430645444323994102441729859671044990125259459*i+21641284396936164466481954713779378512940738958224981623727092958574008673265331218116300515948972700758707678653439213406153350448)*x + (9970910551833444058784667340657242649091726372402098050008622639044551626179611017773153630793012176142070931306673826314432961747*i+18577995665820022929673058482503409343198453361211125314706934826608187731660752618921419049641582277862926296709969640338747346951) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21107398059407812883439365730171236106647441511869087217736050784946623712974426947224430645444323994102441729859671044990125259459*i+21641284396936164466481954713779378512940738958224981623727092958574008673265331218116300515948972700758707678653439213406153350448)*x + (9970910551833444058784667340657242649091726372402098050008622639044551626179611017773153630793012176142070931306673826314432961747*i+18577995665820022929673058482503409343198453361211125314706934826608187731660752618921419049641582277862926296709969640338747346951) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7174316549685545513391036440301081482755008188935440536651515473634751054485021163584398341136188327657944364964780701760461834334*i+6076032704087169637538461742605770550025655235351708297490521541565692222738723486045356700619127736062846503314705214700877073209)*x + (2970376414002064875757108842079122672890724004295844836631152824439962109031767565877192495834208493960010104298359583898356190718*i+19596224090989571179542794506727375113963939139702668860338803213445216321837594657111587854379088090793696104906116613036664366589) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7174316549685545513391036440301081482755008188935440536651515473634751054485021163584398341136188327657944364964780701760461834334*i+6076032704087169637538461742605770550025655235351708297490521541565692222738723486045356700619127736062846503314705214700877073209)*x + (2970376414002064875757108842079122672890724004295844836631152824439962109031767565877192495834208493960010104298359583898356190718*i+19596224090989571179542794506727375113963939139702668860338803213445216321837594657111587854379088090793696104906116613036664366589) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3431002380658133776277458857112815746501822307089120004827069823988122203294506844118241875194708595205173861453582741428690953742*i+21779719189953059689104767047706870480494889736969223494933276124657024628631713625426397741827730803169523366522701783134058079313)*x + (15628115461075391755393239556179594584254485000226636741080424021018002620563639384402700071267904442771333554759596983840998127593*i+1371536699664107888561292751502024335612746119773804862020029602544041179452919987975787037309306444462811255042312530467522683401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3431002380658133776277458857112815746501822307089120004827069823988122203294506844118241875194708595205173861453582741428690953742*i+21779719189953059689104767047706870480494889736969223494933276124657024628631713625426397741827730803169523366522701783134058079313)*x + (15628115461075391755393239556179594584254485000226636741080424021018002620563639384402700071267904442771333554759596983840998127593*i+1371536699664107888561292751502024335612746119773804862020029602544041179452919987975787037309306444462811255042312530467522683401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20553679354305726149182526675637224739757704596659300166890201843381383733940823027669723528960414781316617137508620062335638002292*i+21369947140530218341751879570434730651285996253725537382894764608149310111169566514975989151557564721447304631177411363856807856900)*x + (23334995635069487933253280133473678485042125409491277508437913978755499570837185353574736501605089593471159506662909935128975431045*i+1242133563656412131202099187147414681156132206035613440510636561131176513912341572279585055835670073820126493179628485497072142490) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20553679354305726149182526675637224739757704596659300166890201843381383733940823027669723528960414781316617137508620062335638002292*i+21369947140530218341751879570434730651285996253725537382894764608149310111169566514975989151557564721447304631177411363856807856900)*x + (23334995635069487933253280133473678485042125409491277508437913978755499570837185353574736501605089593471159506662909935128975431045*i+1242133563656412131202099187147414681156132206035613440510636561131176513912341572279585055835670073820126493179628485497072142490) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7694133760830116855787224581901248122096891339243599417257611500011713271644715911594346373680503984265888073751665201756018191665*i+20960827882303088916909459871920751275590546363686689515473699984179184607529331486602073568599074700572728878065098100338540738800)*x + (8093580468150941696076193207437540127716119495750734781528309948932505175361935767193644517507127842539947178673326299311057617926*i+16678933289337835005115135353625683387728091517516339805976300744041800893168902315069556444606354553166829891530783421038960541369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7694133760830116855787224581901248122096891339243599417257611500011713271644715911594346373680503984265888073751665201756018191665*i+20960827882303088916909459871920751275590546363686689515473699984179184607529331486602073568599074700572728878065098100338540738800)*x + (8093580468150941696076193207437540127716119495750734781528309948932505175361935767193644517507127842539947178673326299311057617926*i+16678933289337835005115135353625683387728091517516339805976300744041800893168902315069556444606354553166829891530783421038960541369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18845761596421833180737422555269131800617752549211805534185154441459602021487439134819999787989446664045255775646372046518522206809*i+19848459588517740114601674176004206841473814090468751629934395753948187654993394797340465929459171078558487621714774407454799500827)*x + (7765987582320271865154884280401442462216004740287693895340028822588633792121031107700177418475025439823966279632953174002913376103*i+4535808770653671099879382833396095322692981284812149777543704563871984777104393715321609386956524384758316199717273356893392134647) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18845761596421833180737422555269131800617752549211805534185154441459602021487439134819999787989446664045255775646372046518522206809*i+19848459588517740114601674176004206841473814090468751629934395753948187654993394797340465929459171078558487621714774407454799500827)*x + (7765987582320271865154884280401442462216004740287693895340028822588633792121031107700177418475025439823966279632953174002913376103*i+4535808770653671099879382833396095322692981284812149777543704563871984777104393715321609386956524384758316199717273356893392134647) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13295200683081942991322833559732148721064083639072567334300954740305386434834530959700818293660394351060861271612411840954069288781*i+22132629553936850909317388015365007281143167184156239620210536340807890320889824255500290463333599267303486271487886580359977759058)*x + (12192457584872124471710354398062413532226307105201701002810406627479293649546267945553948762160857535971607755920678534688446520540*i+3992301633719578051644050814683517442647365276879522471573568659188865461914591458540098200626382558604662535383075249836716342533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13295200683081942991322833559732148721064083639072567334300954740305386434834530959700818293660394351060861271612411840954069288781*i+22132629553936850909317388015365007281143167184156239620210536340807890320889824255500290463333599267303486271487886580359977759058)*x + (12192457584872124471710354398062413532226307105201701002810406627479293649546267945553948762160857535971607755920678534688446520540*i+3992301633719578051644050814683517442647365276879522471573568659188865461914591458540098200626382558604662535383075249836716342533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18503744557174760830510419858101128388067470720333771781829449751169799565974520711628729452344715444560568027297488058009696052400*i+13942284473303799511591103414521582165438496379671428009520584933186397003846099936039613515961553428765354198020815027495432042825)*x + (14684313794816504822624393334658439041405212509727296015675904654274962661464240726317938561950922606190565281391208886163586528326*i+1849583405661589453470495236776040500961675004582178694744651285383599857596123138605735900545556427254330960220805337996741785979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18503744557174760830510419858101128388067470720333771781829449751169799565974520711628729452344715444560568027297488058009696052400*i+13942284473303799511591103414521582165438496379671428009520584933186397003846099936039613515961553428765354198020815027495432042825)*x + (14684313794816504822624393334658439041405212509727296015675904654274962661464240726317938561950922606190565281391208886163586528326*i+1849583405661589453470495236776040500961675004582178694744651285383599857596123138605735900545556427254330960220805337996741785979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6745630825312999226469503194356462145052309658157168937388950944575043397670350009307408104826134322156549079672503278200738901833*i+15068955063380070024956931718635773309518779462640765365686908437161732037426739021926008870713903529266718295508708290297497141839)*x + (10902762501322079263235770661208810629989860522082136422930275209152755987845308715066298678915576147811520345200910339151936697813*i+17393094152721647537800834987824431680074595257831854137301065599589694329909699039894534457696150755275451735661620250738511793930) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6745630825312999226469503194356462145052309658157168937388950944575043397670350009307408104826134322156549079672503278200738901833*i+15068955063380070024956931718635773309518779462640765365686908437161732037426739021926008870713903529266718295508708290297497141839)*x + (10902762501322079263235770661208810629989860522082136422930275209152755987845308715066298678915576147811520345200910339151936697813*i+17393094152721647537800834987824431680074595257831854137301065599589694329909699039894534457696150755275451735661620250738511793930) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (857133882015687600385361667114837027986852217326717186242115517486778864899432128678784062516354050404542761061743473078173595182*i+23953831722612788319690999120628972228906640058834048996830962028024611901868326981853423627390580294038503457279737742522960892233)*x + (4059010194963604531801964075953289566849312734895673911342549786647889635938642036862739380976649042174553011274235279270142363552*i+2325680891330141258357120848261825875407016511318803648111932794075368424324112832964362199024152520049869480848847257130672268370) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (857133882015687600385361667114837027986852217326717186242115517486778864899432128678784062516354050404542761061743473078173595182*i+23953831722612788319690999120628972228906640058834048996830962028024611901868326981853423627390580294038503457279737742522960892233)*x + (4059010194963604531801964075953289566849312734895673911342549786647889635938642036862739380976649042174553011274235279270142363552*i+2325680891330141258357120848261825875407016511318803648111932794075368424324112832964362199024152520049869480848847257130672268370) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13152011418620960424600999301739797016950693095064593146001266070287767788811734514001368369880296962685792862754212760855895818587*i+16227363663690663158439732050179314341162526259850730373338679783060005353325052204230974107298943839839781418669673858004206761682)*x + (15793112855192714074831458443057883818885316848229836829045760869604459463383036410456961699691973508395402034547279994386541424759*i+1343276575825834692172330679604381056507538198797363086571323214944145772013369216593570296497343059210560575375743234701830161709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13152011418620960424600999301739797016950693095064593146001266070287767788811734514001368369880296962685792862754212760855895818587*i+16227363663690663158439732050179314341162526259850730373338679783060005353325052204230974107298943839839781418669673858004206761682)*x + (15793112855192714074831458443057883818885316848229836829045760869604459463383036410456961699691973508395402034547279994386541424759*i+1343276575825834692172330679604381056507538198797363086571323214944145772013369216593570296497343059210560575375743234701830161709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23424879051563111071866977332016741719224891968677707955576599101378129867484513753752682489321463012246712496943513854658320212975*i+14063851621847314500230827183272781941533356366279584863516035311435518800666919613663318759827750867129179578893460287486990071709)*x + (19935822344809619165519859518388308001039059209393483033596426169644252596536433153760371818398707625174652248464579981935394971212*i+3886637799427031794506670293872561134349079876886509931076087028625379356058706084309330678069255073560948561538334277639403358672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23424879051563111071866977332016741719224891968677707955576599101378129867484513753752682489321463012246712496943513854658320212975*i+14063851621847314500230827183272781941533356366279584863516035311435518800666919613663318759827750867129179578893460287486990071709)*x + (19935822344809619165519859518388308001039059209393483033596426169644252596536433153760371818398707625174652248464579981935394971212*i+3886637799427031794506670293872561134349079876886509931076087028625379356058706084309330678069255073560948561538334277639403358672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23592137490286053699027615751394182404044569737990104981090495171825520688452236604645473142430694952302656506830646573360126936840*i+12466493796565428553279735992054841400025534466101841071890081026540239148330185099087611655657369898891389707421249517634302612457)*x + (18804029084172051976602594965181480157746240519307055029433253748099104134174843957828316447587442430814985979915494595542777994465*i+14210707588568425776019708715803817631181823599048642045106469068184276441370574512127978190158660920711198821682294932532964901366) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23592137490286053699027615751394182404044569737990104981090495171825520688452236604645473142430694952302656506830646573360126936840*i+12466493796565428553279735992054841400025534466101841071890081026540239148330185099087611655657369898891389707421249517634302612457)*x + (18804029084172051976602594965181480157746240519307055029433253748099104134174843957828316447587442430814985979915494595542777994465*i+14210707588568425776019708715803817631181823599048642045106469068184276441370574512127978190158660920711198821682294932532964901366) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1434664745901517041682459848413529896684328438031806169404660802810031593002221601773687180349794954965187838725582547652404862323*i+24060998975319034824125106444668245478595795575160335876989130513097710400495897217270528273697376423596308400068532090513142014553)*x + (23837523085017093264620288602788437331440364128509858798292429530234695306266661420293520464949472513182187930946042835267176718922*i+3349363837641820182411497094003050933290185315454093673170861427623298179836415926009290268276523546827597049988070775958462492806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1434664745901517041682459848413529896684328438031806169404660802810031593002221601773687180349794954965187838725582547652404862323*i+24060998975319034824125106444668245478595795575160335876989130513097710400495897217270528273697376423596308400068532090513142014553)*x + (23837523085017093264620288602788437331440364128509858798292429530234695306266661420293520464949472513182187930946042835267176718922*i+3349363837641820182411497094003050933290185315454093673170861427623298179836415926009290268276523546827597049988070775958462492806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11714085505435515782885080604241264133792688942280678613757478675863391220269920717276396550423306111649562541847023047197690624965*i+16923240732222291040071633997835929794989013885611373492113705449626822833301740301891917840982022558272447893971475252855813501962)*x + (16291940581963002247919304022375383684195098557027596211995761875386566582931919022041743615530341791721963639679553502487957355761*i+13361828855304074670821645369501700678939889189631023180708398363746996991490498122958360753533476818163824907144413406940742574120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11714085505435515782885080604241264133792688942280678613757478675863391220269920717276396550423306111649562541847023047197690624965*i+16923240732222291040071633997835929794989013885611373492113705449626822833301740301891917840982022558272447893971475252855813501962)*x + (16291940581963002247919304022375383684195098557027596211995761875386566582931919022041743615530341791721963639679553502487957355761*i+13361828855304074670821645369501700678939889189631023180708398363746996991490498122958360753533476818163824907144413406940742574120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22000808529803158631922133032873673940809424893062433367128172073843688670871575422871064970124159938517179000834084792594198894294*i+22599890534444854282828798210532808147588930568183932921270213853858868656237663501361910621472637334898362428594583212078136217918)*x + (9071082136937693342439948233299292056738408072147086015490201826768521004087515803224704644202464069914372770787042622194354933720*i+7478792621206245389347789885158725361470106176143571495350984182639420067256297210828734080652330033096475382263580042228849246171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22000808529803158631922133032873673940809424893062433367128172073843688670871575422871064970124159938517179000834084792594198894294*i+22599890534444854282828798210532808147588930568183932921270213853858868656237663501361910621472637334898362428594583212078136217918)*x + (9071082136937693342439948233299292056738408072147086015490201826768521004087515803224704644202464069914372770787042622194354933720*i+7478792621206245389347789885158725361470106176143571495350984182639420067256297210828734080652330033096475382263580042228849246171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23510257428035390526761900940070256308958941852416868112141502015493261300848364021004552217645536783841586542411907275391768561682*i+8339628123769680959906916977663517368002914002470996142805270714225007176275655031320031788699984386557985867776883705271023146383)*x + (7266188180725953544768223536909924050761101009536935531394210124645126874768262357661459427423065112441833363158480323390122985811*i+9802178671852979732624378419431012624485286850104045229373965602354365426638757523729153697266729850178597110793048362496089624001) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23510257428035390526761900940070256308958941852416868112141502015493261300848364021004552217645536783841586542411907275391768561682*i+8339628123769680959906916977663517368002914002470996142805270714225007176275655031320031788699984386557985867776883705271023146383)*x + (7266188180725953544768223536909924050761101009536935531394210124645126874768262357661459427423065112441833363158480323390122985811*i+9802178671852979732624378419431012624485286850104045229373965602354365426638757523729153697266729850178597110793048362496089624001) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3344872512797679839825876308880456764726701110951547110011744325653080829704137892306385015016883189091027596043496594234796897108*i+22726857986375270104545390665787608915452794472159037416998620579679566490733749538500842152901471115069712745411890242729805077303)*x + (9693442847773711313433997433087061608074920178105096870380824359535424954911595203289385192741960110480736472267441548481621886021*i+17853035226627621428007843756369852779394871202117808978003300073294495800090908304744769398120958819870564716829611388307607747347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3344872512797679839825876308880456764726701110951547110011744325653080829704137892306385015016883189091027596043496594234796897108*i+22726857986375270104545390665787608915452794472159037416998620579679566490733749538500842152901471115069712745411890242729805077303)*x + (9693442847773711313433997433087061608074920178105096870380824359535424954911595203289385192741960110480736472267441548481621886021*i+17853035226627621428007843756369852779394871202117808978003300073294495800090908304744769398120958819870564716829611388307607747347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15740188769044000496121120148899810315033322833158475036842554411144110220429725759492484679208958126674329495806409449437858544566*i+14629747080219270328392830781790991906472418583227490390967379343445421391170980447318603287522538409016857145919957114664148143735)*x + (4985131735537116987723906615349407016349944414065885163443177338827628195876066446167866171030624112855452064800338570282884931477*i+15827844943530802536566394998311630938290306945697626901221819540106465250288845994361391838437596212255659734627048859914587728679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15740188769044000496121120148899810315033322833158475036842554411144110220429725759492484679208958126674329495806409449437858544566*i+14629747080219270328392830781790991906472418583227490390967379343445421391170980447318603287522538409016857145919957114664148143735)*x + (4985131735537116987723906615349407016349944414065885163443177338827628195876066446167866171030624112855452064800338570282884931477*i+15827844943530802536566394998311630938290306945697626901221819540106465250288845994361391838437596212255659734627048859914587728679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21967609999992208672302433998054739474212162038149759363096433050564478337965466011903201179337077698069029955050547737835815705356*i+11315667146492076812954711041179485020401565323129407800483681386080832089244072591054880834172815326058829227130493539138558795411)*x + (20344547515313906346731892457664457168474522089993526217099687488003049843662972240540852314448896275949067860291484443768471819340*i+3096463515384828482415677088543073689059351242183770107906273674281243379115459402432003153338807092364763646330970123659956298466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21967609999992208672302433998054739474212162038149759363096433050564478337965466011903201179337077698069029955050547737835815705356*i+11315667146492076812954711041179485020401565323129407800483681386080832089244072591054880834172815326058829227130493539138558795411)*x + (20344547515313906346731892457664457168474522089993526217099687488003049843662972240540852314448896275949067860291484443768471819340*i+3096463515384828482415677088543073689059351242183770107906273674281243379115459402432003153338807092364763646330970123659956298466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9396569539729069483064731485304960473983977226744434867988863231739993555222822474519319845794426105746798672424553422318030555860*i+12371724101339170717280469791308097729962413796266320930635471324494774467370098700451866560676457635676406518251429247437752119368)*x + (11902601876417917995408175079110586561113847063548145558610856737405280070483311449463981491283062869159604486110184314770929748776*i+17252972692651166221378497341112487425794340447652910118699994306533468550196142922661325826846920805841522275244484108406610726107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9396569539729069483064731485304960473983977226744434867988863231739993555222822474519319845794426105746798672424553422318030555860*i+12371724101339170717280469791308097729962413796266320930635471324494774467370098700451866560676457635676406518251429247437752119368)*x + (11902601876417917995408175079110586561113847063548145558610856737405280070483311449463981491283062869159604486110184314770929748776*i+17252972692651166221378497341112487425794340447652910118699994306533468550196142922661325826846920805841522275244484108406610726107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13393014669385597033647142409306420980051448790357146393207363989893426400746405049598917187558077509960381494013750270234632843224*i+12850792105359222856555834400752890184820929112494101901490163414579824748158498323190453286943784149233652026021150814087939999305)*x + (24436687315861746466635121768174919421680255869561487803995612125424196622706341765974005843658368460640663582290496898455409476992*i+1390491560710404192763667762510449753155203532528691347136191650970021073300716199611705385814832765640194262670745900581351286831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13393014669385597033647142409306420980051448790357146393207363989893426400746405049598917187558077509960381494013750270234632843224*i+12850792105359222856555834400752890184820929112494101901490163414579824748158498323190453286943784149233652026021150814087939999305)*x + (24436687315861746466635121768174919421680255869561487803995612125424196622706341765974005843658368460640663582290496898455409476992*i+1390491560710404192763667762510449753155203532528691347136191650970021073300716199611705385814832765640194262670745900581351286831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (995872982429533286407299845231701364148377176030436282702021732200931911661712944452285018419473207871433236713474214027269187252*i+9205757996543267472943020954112537994426323221081734382405151982431473335848814044974464426547324824831069032931937895717097667990)*x + (14675157584317225967350260026019969321998905103487273193723691267223488119288974909473033478604299669089362462796301154838874823385*i+8374568934060955273882198303102199588300603809631762133582992915497518588303201748920420700489974306397179198123802371129187663663) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (995872982429533286407299845231701364148377176030436282702021732200931911661712944452285018419473207871433236713474214027269187252*i+9205757996543267472943020954112537994426323221081734382405151982431473335848814044974464426547324824831069032931937895717097667990)*x + (14675157584317225967350260026019969321998905103487273193723691267223488119288974909473033478604299669089362462796301154838874823385*i+8374568934060955273882198303102199588300603809631762133582992915497518588303201748920420700489974306397179198123802371129187663663) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21647093607935471570940874537929018664506443428647099031064641804546654480080429727872926509192870294727716652810551692851982338523*i+18253217115998366646434337508405260358732923058129761894677312680463760871995668488114201991420762640907137612113639403301113788607)*x + (17469288850258062697337245898445617574180331343871251195521342437231430838649353553377221729085737971078758344620867561915304880658*i+262382193376546951512767050135138721556035015532903426894612531001032300027496982041704486244937472297809828486240210808775520784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21647093607935471570940874537929018664506443428647099031064641804546654480080429727872926509192870294727716652810551692851982338523*i+18253217115998366646434337508405260358732923058129761894677312680463760871995668488114201991420762640907137612113639403301113788607)*x + (17469288850258062697337245898445617574180331343871251195521342437231430838649353553377221729085737971078758344620867561915304880658*i+262382193376546951512767050135138721556035015532903426894612531001032300027496982041704486244937472297809828486240210808775520784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2639934949117469856143442318519189181539837013896862867591942672921243738829847016065670208764187158477489362875909343324510862996*i+13749851476637140109618708246225882770015403020675188098212853597278539188738501037627000826041750796043950815276014884857425923691)*x + (22135982676522463150964070834931718218816452347288416450268155952813805453440368629696973874572169891867574148206356165066466857794*i+5836546245785821641445610014916350161446427183936656860714976891848675678219782160070917488577071240954533305487880459658991753765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2639934949117469856143442318519189181539837013896862867591942672921243738829847016065670208764187158477489362875909343324510862996*i+13749851476637140109618708246225882770015403020675188098212853597278539188738501037627000826041750796043950815276014884857425923691)*x + (22135982676522463150964070834931718218816452347288416450268155952813805453440368629696973874572169891867574148206356165066466857794*i+5836546245785821641445610014916350161446427183936656860714976891848675678219782160070917488577071240954533305487880459658991753765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (950983332323285713221549634851191467312727995885081164974768718255123441241060985686666963313234138892827705676902052490737669880*i+2905310152663473245289190890574225743513388558478782717397466689198547418359343588976715334306927472700783357014822749062499481749)*x + (14696892604066685421692286796160933961133253695746149906593758240624417700084683866378444577333344082813557566935963075828099080022*i+18103655442129544056342894664454208454324160547554910759918237513737029964226710297932784691419388623310527617839809101455206709821) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (950983332323285713221549634851191467312727995885081164974768718255123441241060985686666963313234138892827705676902052490737669880*i+2905310152663473245289190890574225743513388558478782717397466689198547418359343588976715334306927472700783357014822749062499481749)*x + (14696892604066685421692286796160933961133253695746149906593758240624417700084683866378444577333344082813557566935963075828099080022*i+18103655442129544056342894664454208454324160547554910759918237513737029964226710297932784691419388623310527617839809101455206709821) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17208405150612209515993820531951834209095403361684455969434279255011670848913475192553398778395606986818910112628256104482691855289*i+4606438467345777696413411887938372991738139393401020593716906766589653573803508881074559283951546928399589973224527630872549251321)*x + (19492731622472096949640981642902277284891698136282581401719191124037346305863337443723849201098870729816822887342938241303275600066*i+2249129479791793363581351319091322856500940623014374830750789307712458864834350300694905280657588732880292029572305710568683879204) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17208405150612209515993820531951834209095403361684455969434279255011670848913475192553398778395606986818910112628256104482691855289*i+4606438467345777696413411887938372991738139393401020593716906766589653573803508881074559283951546928399589973224527630872549251321)*x + (19492731622472096949640981642902277284891698136282581401719191124037346305863337443723849201098870729816822887342938241303275600066*i+2249129479791793363581351319091322856500940623014374830750789307712458864834350300694905280657588732880292029572305710568683879204) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4729778140831066057937363958391908151970009860370760837696193825839246232939661672328553348012895230364216955853081583133160611736*i+15542300230587771296380804608554908903526120188778838894832801818340154215408439257160645239793912893560447843205537272936344645870)*x + (571512673558091184885722841980830880735722949453669413118806729717240133426598240944950802248163456626961454451834103888177034102*i+8255534231960373416629002826825261759546067038877428279439300794896874143362077261098604269480604845153927607761255879913026608249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4729778140831066057937363958391908151970009860370760837696193825839246232939661672328553348012895230364216955853081583133160611736*i+15542300230587771296380804608554908903526120188778838894832801818340154215408439257160645239793912893560447843205537272936344645870)*x + (571512673558091184885722841980830880735722949453669413118806729717240133426598240944950802248163456626961454451834103888177034102*i+8255534231960373416629002826825261759546067038877428279439300794896874143362077261098604269480604845153927607761255879913026608249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2108262835273620934551123489151831240144934067700459245042122560908112131371149202829723617838439827732394137571775118699494682276*i+970573328762313990220906147604319170487509190160543811467656807834252884901224469305168017685117358491607220810854766082418886507)*x + (1738013812962390797839204778445379823845416397131732127978637677120806921305687841357802598268783059483328487346616336287308230435*i+21814182093152055145412551523113518601416596265243543092926563303343097136696715617043880032112617602405893633773335719806410251528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2108262835273620934551123489151831240144934067700459245042122560908112131371149202829723617838439827732394137571775118699494682276*i+970573328762313990220906147604319170487509190160543811467656807834252884901224469305168017685117358491607220810854766082418886507)*x + (1738013812962390797839204778445379823845416397131732127978637677120806921305687841357802598268783059483328487346616336287308230435*i+21814182093152055145412551523113518601416596265243543092926563303343097136696715617043880032112617602405893633773335719806410251528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15907380079511294689491925891054913876379709406344376193664901714187520286429972925441236790544445764728582044091561434908910321777*i+13504862281879769428851488393565047056703528415781721926513829283333645942391009465336210623499359551473721265244176951460979107580)*x + (8502390181207700854096355650780204647567489829071268189224193020872988332954010503184933168366020487272182605882352361941282044607*i+15298079041685974866385942142479179728248201174203270408974589133107635481674632626396615106839653605791833431888232517577203302274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15907380079511294689491925891054913876379709406344376193664901714187520286429972925441236790544445764728582044091561434908910321777*i+13504862281879769428851488393565047056703528415781721926513829283333645942391009465336210623499359551473721265244176951460979107580)*x + (8502390181207700854096355650780204647567489829071268189224193020872988332954010503184933168366020487272182605882352361941282044607*i+15298079041685974866385942142479179728248201174203270408974589133107635481674632626396615106839653605791833431888232517577203302274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20822330900237055822978702483356916474053945470021145933690471064884920200111787765055065884295220964443996813342824517163848669965*i+1643509910990478369412254041848108824848482249945638564431022825690853098929472687213667077399289150833400350340845698310780529511)*x + (12050686773655174674924700008423395391496713558118859628499047478129538937783532323485334689530894239624768773780086016920416519397*i+19947769114689584695534409564028919257173800026084732735676140686110981436607321117791496207761783755768303913221801927201974960003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20822330900237055822978702483356916474053945470021145933690471064884920200111787765055065884295220964443996813342824517163848669965*i+1643509910990478369412254041848108824848482249945638564431022825690853098929472687213667077399289150833400350340845698310780529511)*x + (12050686773655174674924700008423395391496713558118859628499047478129538937783532323485334689530894239624768773780086016920416519397*i+19947769114689584695534409564028919257173800026084732735676140686110981436607321117791496207761783755768303913221801927201974960003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3029108116821553446951055182289151660041618045850795638011680628066494585720790425415598839398132340053906262826298003739989114539*i+7870144473643196179972410345361045223065619755991165164563006377805622921323655026057553004792715435686045697182564272980469182223)*x + (1513205723564628866140401878146764217013525661921978802628486465392327610706465755742841254151695098087881902989044080378136007945*i+9320311502860669604902632904351943474279194816226940863615872252998002553615004506414349537455070894930863749753069308948182699374) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3029108116821553446951055182289151660041618045850795638011680628066494585720790425415598839398132340053906262826298003739989114539*i+7870144473643196179972410345361045223065619755991165164563006377805622921323655026057553004792715435686045697182564272980469182223)*x + (1513205723564628866140401878146764217013525661921978802628486465392327610706465755742841254151695098087881902989044080378136007945*i+9320311502860669604902632904351943474279194816226940863615872252998002553615004506414349537455070894930863749753069308948182699374) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10096559292785504618552523142816187752212905626088793453996564532900385653464678817611035871627212907119246637863442740940897216531*i+18158852600719916697686069956488169996649671023644280772333527926742535192162957232517705208012973185798605727534333107484173600238)*x + (5111286704101986459582518835003942111874389823568781407709337778354216904629715163421838982189534936658849609234281809043866330987*i+8188096782904277037001280910294750675532012277285485404603459493581654671055163124725425568118202033303009906194553691564680662546) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10096559292785504618552523142816187752212905626088793453996564532900385653464678817611035871627212907119246637863442740940897216531*i+18158852600719916697686069956488169996649671023644280772333527926742535192162957232517705208012973185798605727534333107484173600238)*x + (5111286704101986459582518835003942111874389823568781407709337778354216904629715163421838982189534936658849609234281809043866330987*i+8188096782904277037001280910294750675532012277285485404603459493581654671055163124725425568118202033303009906194553691564680662546) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5402173302493210551487430415533165295733016065053229901020279523949405151092336399484754569807536449177693585347878233131151551346*i+8999709800315660575780786114178071467732193248182457938693067342219507478016382960994423762801874182053997114713521470324281295055)*x + (21113562395676762579376923185718043062482255495494347837423984062564226598452385104773612865268967541558327181298382934368775282309*i+12633716821526761270603549252676573871293053333776766777966669476586324061541019932354498944594790129284671450414826380073727806730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5402173302493210551487430415533165295733016065053229901020279523949405151092336399484754569807536449177693585347878233131151551346*i+8999709800315660575780786114178071467732193248182457938693067342219507478016382960994423762801874182053997114713521470324281295055)*x + (21113562395676762579376923185718043062482255495494347837423984062564226598452385104773612865268967541558327181298382934368775282309*i+12633716821526761270603549252676573871293053333776766777966669476586324061541019932354498944594790129284671450414826380073727806730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23737631020281342661586891106689943793696170613653776444423006279852905530396531642046385239101905525276152786864794899127625715772*i+13773809002119277853353501514356182037444786385116101647990736297694904724962287513521866300266908142775918180720881819573119810516)*x + (19083094307817728396585136321713837986082868827797434739806678634395791018763162766439931144689706723282946915906044129215672845658*i+7845764594350861336332534547213665357288130833807657705155196755615682606484907188299842984524653270966489219685172736536039624212) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23737631020281342661586891106689943793696170613653776444423006279852905530396531642046385239101905525276152786864794899127625715772*i+13773809002119277853353501514356182037444786385116101647990736297694904724962287513521866300266908142775918180720881819573119810516)*x + (19083094307817728396585136321713837986082868827797434739806678634395791018763162766439931144689706723282946915906044129215672845658*i+7845764594350861336332534547213665357288130833807657705155196755615682606484907188299842984524653270966489219685172736536039624212) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7661250579006881900867444351122261432302738359624840658212353854351123328067700792100509570338822949550840496463792924872889729106*i+9511512271695588116143577668280501496670986498174630960544375508564481600960134001977583411178744378323115828675248072276563716267)*x + (13169101331977417882118957358061487525431510732368300661100633582936122249389717856104549088760922916037267932062001365267188255145*i+3632920499960196488274609134720967561486737791042878542585352986251234367040089062870681220390604766163103197600573976874291808778) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7661250579006881900867444351122261432302738359624840658212353854351123328067700792100509570338822949550840496463792924872889729106*i+9511512271695588116143577668280501496670986498174630960544375508564481600960134001977583411178744378323115828675248072276563716267)*x + (13169101331977417882118957358061487525431510732368300661100633582936122249389717856104549088760922916037267932062001365267188255145*i+3632920499960196488274609134720967561486737791042878542585352986251234367040089062870681220390604766163103197600573976874291808778) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2876702484914130624715046000225823801332857850278272373489101927234719574453882355316372882253923079654220045682733992317055689088*i+14026400142705975546917126573594568808248258706741597835992737136549735487315946364028591057764553894883655058920879673060772463360)*x + (1534714004436589549290699942629804785574472039565661573102186065953484372071494216276377727175659189832446349049933101196620764600*i+12628028324479760026207938164847821785496627244033162701507468101138231311773701724618888473115503107629640673181905695432068209735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2876702484914130624715046000225823801332857850278272373489101927234719574453882355316372882253923079654220045682733992317055689088*i+14026400142705975546917126573594568808248258706741597835992737136549735487315946364028591057764553894883655058920879673060772463360)*x + (1534714004436589549290699942629804785574472039565661573102186065953484372071494216276377727175659189832446349049933101196620764600*i+12628028324479760026207938164847821785496627244033162701507468101138231311773701724618888473115503107629640673181905695432068209735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4877242902127521832559311645862580616394752185161896734709891040938179965186820963879905383712638899009840027570110882068751563919*i+8158563031875286563448012738061598820088661941190191707912889538060386500428490461291724146240023314741948412332125268598166434509)*x + (8944740447183261506989907699068902650926411329147379764226770239485769753965689970070921527074064377901657899929081160708620030677*i+3250364063263797158857763104916360373307247838796479450051680533519933117551632208408926248809954565470329028058258973926762962152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4877242902127521832559311645862580616394752185161896734709891040938179965186820963879905383712638899009840027570110882068751563919*i+8158563031875286563448012738061598820088661941190191707912889538060386500428490461291724146240023314741948412332125268598166434509)*x + (8944740447183261506989907699068902650926411329147379764226770239485769753965689970070921527074064377901657899929081160708620030677*i+3250364063263797158857763104916360373307247838796479450051680533519933117551632208408926248809954565470329028058258973926762962152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10405926107974193788752567812009962515311802163722935541648243293278744854120574578552895536835185743125445041875597619754457923097*i+21848641530030383776845668995552080013498703738672308330867730386485999923876165294019904782539094159199998860685576079877741870195)*x + (6023414955104279627151770885161299066333948085278988513453429890415882047947898109561710717175611254256983444176620644948028783135*i+3077359977813585640192544030475840092034396505341284754006565621707758939883978557208432956286874031157507119675065671946860763179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10405926107974193788752567812009962515311802163722935541648243293278744854120574578552895536835185743125445041875597619754457923097*i+21848641530030383776845668995552080013498703738672308330867730386485999923876165294019904782539094159199998860685576079877741870195)*x + (6023414955104279627151770885161299066333948085278988513453429890415882047947898109561710717175611254256983444176620644948028783135*i+3077359977813585640192544030475840092034396505341284754006565621707758939883978557208432956286874031157507119675065671946860763179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8987420067837540479329329932136223410910731741493723697131294578258174967229750086376309176614266877430344873933231411029746975744*i+6792429139078153147903223914746167367049176440390543526581011188415580598385165243146501598216541551472750418062829677990014644575)*x + (14389835222759270319982177753010277497056184794940025830360950779602167570502729061812184474052004945832731509516455641945408139693*i+18249003549487615517682456030518874711708371357775627534267634587536232388100706167042515913641868088945378257185735610893904052404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8987420067837540479329329932136223410910731741493723697131294578258174967229750086376309176614266877430344873933231411029746975744*i+6792429139078153147903223914746167367049176440390543526581011188415580598385165243146501598216541551472750418062829677990014644575)*x + (14389835222759270319982177753010277497056184794940025830360950779602167570502729061812184474052004945832731509516455641945408139693*i+18249003549487615517682456030518874711708371357775627534267634587536232388100706167042515913641868088945378257185735610893904052404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1061329314178350496333228029777248789245334164671620137761749311038172468882177409839899463600145418288721405521718764032116440380*i+10848924348475950991464880988528253753653619595235939794786834714130073593798900463730660176354553049485987925515955507288918935672)*x + (24215156217018105209494469700265345723362118322387736338039287289195520746639017985763559627704890044742438791356198210362809745802*i+20800313640470025184347440768839035442355758016650483402741774173228525039223377662674858172637953629993831155451164990582958766265) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1061329314178350496333228029777248789245334164671620137761749311038172468882177409839899463600145418288721405521718764032116440380*i+10848924348475950991464880988528253753653619595235939794786834714130073593798900463730660176354553049485987925515955507288918935672)*x + (24215156217018105209494469700265345723362118322387736338039287289195520746639017985763559627704890044742438791356198210362809745802*i+20800313640470025184347440768839035442355758016650483402741774173228525039223377662674858172637953629993831155451164990582958766265) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1934483100496736507626804943689214891998631741335341406711842939197273756307013460370573323868097791278688123186450453595768211888*i+16974317714061328642634233109277691234188487171077556070140872869287834858195177109835416698362791140236808241213475608545177611325)*x + (14050604911021345646722924073369814415778479534947214621778423774142273106412803459418205178693274985071820079583344988583047484377*i+16026082775101446898858357845048180913113240546596537484992086607483869499822662807204879291085232988115299159967477543917003073564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1934483100496736507626804943689214891998631741335341406711842939197273756307013460370573323868097791278688123186450453595768211888*i+16974317714061328642634233109277691234188487171077556070140872869287834858195177109835416698362791140236808241213475608545177611325)*x + (14050604911021345646722924073369814415778479534947214621778423774142273106412803459418205178693274985071820079583344988583047484377*i+16026082775101446898858357845048180913113240546596537484992086607483869499822662807204879291085232988115299159967477543917003073564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7884732110925007549476588055360704201895410657057471426056419455735798055713682000776745205993179709423068795599699176440866197952*i+12535329825709307118359578870133107876968805943630090773549367291324602829741512723137007556814610011353109035711621329959929834058)*x + (11046037920504777681365035058880378804016671213236542468423884144986539705605223437543917285024602825778764994444040652382302120783*i+5797845558605659688583273960581397058723770569901592799492174082299624167291425486776365616572703823131969079422507638046583408107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7884732110925007549476588055360704201895410657057471426056419455735798055713682000776745205993179709423068795599699176440866197952*i+12535329825709307118359578870133107876968805943630090773549367291324602829741512723137007556814610011353109035711621329959929834058)*x + (11046037920504777681365035058880378804016671213236542468423884144986539705605223437543917285024602825778764994444040652382302120783*i+5797845558605659688583273960581397058723770569901592799492174082299624167291425486776365616572703823131969079422507638046583408107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15823889211959746315918589016488324873646460543555476764876586743819564529398192702778202022704686527654186899177893013214107952581*i+7547933016263301305779432610783646890160104892772890687998994407760757085994405836928826701712210535969520194456529193394898606955)*x + (16305005401501371806067951317596771870346168343413783865369309995766331252164410089755494771586536978258401483744776875349906279852*i+17881388790455955796824861027288859368654600068323294061477159050742496176574880178000096531143076885603896158424822407597752653111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15823889211959746315918589016488324873646460543555476764876586743819564529398192702778202022704686527654186899177893013214107952581*i+7547933016263301305779432610783646890160104892772890687998994407760757085994405836928826701712210535969520194456529193394898606955)*x + (16305005401501371806067951317596771870346168343413783865369309995766331252164410089755494771586536978258401483744776875349906279852*i+17881388790455955796824861027288859368654600068323294061477159050742496176574880178000096531143076885603896158424822407597752653111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17884673560747851122732256962965110925030187379101231626176469947229949364329716477014219865611305720829014330930536024832610671358*i+8517834145998151887725712090778597285220927366675196433743437928463757413214064384872412267911310361922727907433361423119791512436)*x + (19857264753891314205650274716258589974282572880600715557359274434403590672283502970877893002670429466139354063285738946914507175872*i+1172290898181837261758969445352941747227302138270336157615899849219189610523390485075067244905224706721946986431441065451332967918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17884673560747851122732256962965110925030187379101231626176469947229949364329716477014219865611305720829014330930536024832610671358*i+8517834145998151887725712090778597285220927366675196433743437928463757413214064384872412267911310361922727907433361423119791512436)*x + (19857264753891314205650274716258589974282572880600715557359274434403590672283502970877893002670429466139354063285738946914507175872*i+1172290898181837261758969445352941747227302138270336157615899849219189610523390485075067244905224706721946986431441065451332967918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17593059486293617417997702968421663975262802699183861268217538190616330613833658700860766388023758699790120778126350865542832347529*i+19452909931451289022153780005106873167947106435944737870390742566190906268823370023057529779892438650886287030016715703766178922937)*x + (17649950199620639430553351471823975166682127105788535955283892221891835677283520707449569247744277140163454758687597333961362449344*i+23265331552915999267919719150786772192331101307724243938713032091275842800955964925569235038813178997647171525588742878719959125042) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17593059486293617417997702968421663975262802699183861268217538190616330613833658700860766388023758699790120778126350865542832347529*i+19452909931451289022153780005106873167947106435944737870390742566190906268823370023057529779892438650886287030016715703766178922937)*x + (17649950199620639430553351471823975166682127105788535955283892221891835677283520707449569247744277140163454758687597333961362449344*i+23265331552915999267919719150786772192331101307724243938713032091275842800955964925569235038813178997647171525588742878719959125042) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16980114072639912435725216133278941795684611438181165325933919244429878570852505930851162610159223195271978444204420220689744461816*i+14544384057459225772833636317918429019219978185170903394964564268436636693542482645153390810008437112037974289896375021010288272852)*x + (2088011482818507444648562810031551883007688649110995347786458559281521170874404563918909958136178530920835238367900542562149556446*i+17295824853281906548565917698673533082972968052102689857742233453305486665747136953382021399894650246342333011280465990743546281233) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16980114072639912435725216133278941795684611438181165325933919244429878570852505930851162610159223195271978444204420220689744461816*i+14544384057459225772833636317918429019219978185170903394964564268436636693542482645153390810008437112037974289896375021010288272852)*x + (2088011482818507444648562810031551883007688649110995347786458559281521170874404563918909958136178530920835238367900542562149556446*i+17295824853281906548565917698673533082972968052102689857742233453305486665747136953382021399894650246342333011280465990743546281233) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13494514313164029491647912194990221847759287844344655938687529650644248918465674747346909572305521738929860390026120623096789506284*i+2109290644087226616788998714996293487259570230899434974491420884294051071358066428263337991293495783352266207351649543369479535962)*x + (7441617819912642815950218004955132210760683193688013706931156792577680869157807092865734888139538487448577802963651705437594033293*i+12687962017391050417444014149474711173164551764734936547882896082916621549005319896492287594419941008768094209859548671254528044733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13494514313164029491647912194990221847759287844344655938687529650644248918465674747346909572305521738929860390026120623096789506284*i+2109290644087226616788998714996293487259570230899434974491420884294051071358066428263337991293495783352266207351649543369479535962)*x + (7441617819912642815950218004955132210760683193688013706931156792577680869157807092865734888139538487448577802963651705437594033293*i+12687962017391050417444014149474711173164551764734936547882896082916621549005319896492287594419941008768094209859548671254528044733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21319422009773573110759910390818282390336289181358978960092688535951128021959595943915312544958650260152711944039244579445369791909*i+19512325211515625805550497933827610979733244274711018020248628982829543612696950412692473469255938466986107485117793500482543201767)*x + (7432857120729520350430460485210405889971348446437439874141217303287878154606616772195582239695588384686099194005820181252172478585*i+9034343081118886567799673249226853975390969797347958291947679783044380433900687177425001017243132182580244670661977086167471943172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21319422009773573110759910390818282390336289181358978960092688535951128021959595943915312544958650260152711944039244579445369791909*i+19512325211515625805550497933827610979733244274711018020248628982829543612696950412692473469255938466986107485117793500482543201767)*x + (7432857120729520350430460485210405889971348446437439874141217303287878154606616772195582239695588384686099194005820181252172478585*i+9034343081118886567799673249226853975390969797347958291947679783044380433900687177425001017243132182580244670661977086167471943172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10404932954670405121552650454636178222957786421756158848225785798987405651742594777312946986621547172626435236430633955846282213312*i+21552440309878986137608246270333586479554305141438853643427102895568453103835467629008044930245099225107573091502195689056627524500)*x + (3052723703840892833573627899855580988871315506090650830279148918906359933942390927432371928093547026695130322724395208917100028533*i+14661959099344891395130686220524641877017670509146874014953210264571552743144041569075828923398502933498445817387905211879644113220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10404932954670405121552650454636178222957786421756158848225785798987405651742594777312946986621547172626435236430633955846282213312*i+21552440309878986137608246270333586479554305141438853643427102895568453103835467629008044930245099225107573091502195689056627524500)*x + (3052723703840892833573627899855580988871315506090650830279148918906359933942390927432371928093547026695130322724395208917100028533*i+14661959099344891395130686220524641877017670509146874014953210264571552743144041569075828923398502933498445817387905211879644113220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9730799915490776022144083196036015956415850279622152352345718111973058890051714133764141164578697160235561789353944696370187921439*i+10564364687846776070436749872643549829556606968461601185733277393194266618826310468374984398019757316523443901564325519145382357877)*x + (3521720964476370478506601688903437950939141080859603758803342148013514655252746178549966550362421634516727516609303246987338202493*i+4145291242903741173836486322063150198839927666397018516077473914641551109299747954154761895725952921868280205736028918246855048032) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9730799915490776022144083196036015956415850279622152352345718111973058890051714133764141164578697160235561789353944696370187921439*i+10564364687846776070436749872643549829556606968461601185733277393194266618826310468374984398019757316523443901564325519145382357877)*x + (3521720964476370478506601688903437950939141080859603758803342148013514655252746178549966550362421634516727516609303246987338202493*i+4145291242903741173836486322063150198839927666397018516077473914641551109299747954154761895725952921868280205736028918246855048032) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14475444064453934311211484770048265684045104306738974494036763820641000019525814368441327618716484997192798767692572796719801967556*i+17669205388856064562144280546322130273275565046152816793416458384992495675810056937922633495544493862378093510288218018708347883817)*x + (6161286453791145425243693083912539270096493363322189912374727423675912338743718900139435727843957601246482478285679586592085840577*i+21203539749326723603967842679169950711325805048010599311575965513942409758106800373522193157761438666762211875988976789809414308317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14475444064453934311211484770048265684045104306738974494036763820641000019525814368441327618716484997192798767692572796719801967556*i+17669205388856064562144280546322130273275565046152816793416458384992495675810056937922633495544493862378093510288218018708347883817)*x + (6161286453791145425243693083912539270096493363322189912374727423675912338743718900139435727843957601246482478285679586592085840577*i+21203539749326723603967842679169950711325805048010599311575965513942409758106800373522193157761438666762211875988976789809414308317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18296206547469497505846072668452974256538164197756635844774315326760163629029999379378256466913542586016963708044991635815046671128*i+17301556890894645748003333125100052003183107099084553554618054358245272323176200073886937001540460991803054491396056730661720098619)*x + (18235905441455286984092499922861334839559269842490656064082018002572125865456925474957435023997401363656877969938117536220879647966*i+17764827081525876818485491842833269597610321914906502649584181588129549511352640077092570788204533147810113487853914045130418738564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18296206547469497505846072668452974256538164197756635844774315326760163629029999379378256466913542586016963708044991635815046671128*i+17301556890894645748003333125100052003183107099084553554618054358245272323176200073886937001540460991803054491396056730661720098619)*x + (18235905441455286984092499922861334839559269842490656064082018002572125865456925474957435023997401363656877969938117536220879647966*i+17764827081525876818485491842833269597610321914906502649584181588129549511352640077092570788204533147810113487853914045130418738564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7263732523214964721012273595033464539504387327720237174355428524069624503329044396844309524511881339158673751188765476366612701815*i+7128906487028109728334299427352537754299899736686563239369786025092713397612139502648871030252243494471865342066374173469818490781)*x + (13869649919367759108948542621253045357153113924927290214887700730509184212415921972040326780020085872338859185587116500887394490944*i+2331626028323615709993132371648171921562109723440334627016255212047797501574038120829480209385676810101036208321144126728585812995) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7263732523214964721012273595033464539504387327720237174355428524069624503329044396844309524511881339158673751188765476366612701815*i+7128906487028109728334299427352537754299899736686563239369786025092713397612139502648871030252243494471865342066374173469818490781)*x + (13869649919367759108948542621253045357153113924927290214887700730509184212415921972040326780020085872338859185587116500887394490944*i+2331626028323615709993132371648171921562109723440334627016255212047797501574038120829480209385676810101036208321144126728585812995) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19733537844177659408446901635224759777641041190263260309695086533569026437768307382985053560275690305998643889318928129050638923016*i+12428168408894552431276469691996343698154829346846086231465692399823504051694718474309279841321509646031306010154204836485723956427)*x + (14675034784963679304058428424681411769942866862798437851036811039561637935963096755904337661599830125497701504555455683428561619081*i+13039458255897152956903833167540594616079213425513613571619159524764470827657958175467917815570716648083190528310419076041071540169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19733537844177659408446901635224759777641041190263260309695086533569026437768307382985053560275690305998643889318928129050638923016*i+12428168408894552431276469691996343698154829346846086231465692399823504051694718474309279841321509646031306010154204836485723956427)*x + (14675034784963679304058428424681411769942866862798437851036811039561637935963096755904337661599830125497701504555455683428561619081*i+13039458255897152956903833167540594616079213425513613571619159524764470827657958175467917815570716648083190528310419076041071540169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6995898350069926862141271337348996625384805516521365859112129575887953744817865145267181476206670983072636925256316653108754168473*i+4841403954949847982473896430495744604962872047683147166336301309551407837346351979285472777471641866075470713816762068536009493112)*x + (14600893006024891793921822062515693763272245330916968143072354642241430647758646941700899728787469700399118072999506179147906938679*i+17510784866062262239294510557030501304448353504456995581065379793567700651447726014709613385815307699767446603171543409521304934804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6995898350069926862141271337348996625384805516521365859112129575887953744817865145267181476206670983072636925256316653108754168473*i+4841403954949847982473896430495744604962872047683147166336301309551407837346351979285472777471641866075470713816762068536009493112)*x + (14600893006024891793921822062515693763272245330916968143072354642241430647758646941700899728787469700399118072999506179147906938679*i+17510784866062262239294510557030501304448353504456995581065379793567700651447726014709613385815307699767446603171543409521304934804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16635203889459377819800225645123585526960762151550268806328692714949151267501509446745919070083677837718772829103870086951505640903*i+10012989234482894556243467104664379126340956726199843976398306285117214611175622505961200779147739887876059063492575962915532580545)*x + (3643688279744175507293190151329341405777887136057366350953277694637524447877091533001579294441280847532376011339230397782085720174*i+20763187673575744073631455416702042616180462843470097046039479055835536549383977565005003177577986472575758823282697266567933263627) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16635203889459377819800225645123585526960762151550268806328692714949151267501509446745919070083677837718772829103870086951505640903*i+10012989234482894556243467104664379126340956726199843976398306285117214611175622505961200779147739887876059063492575962915532580545)*x + (3643688279744175507293190151329341405777887136057366350953277694637524447877091533001579294441280847532376011339230397782085720174*i+20763187673575744073631455416702042616180462843470097046039479055835536549383977565005003177577986472575758823282697266567933263627) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11954038079459446689080473646084750088373922502202382420443082831159910879764327384287687460709213179010671630247127936115029518847*i+20026886498329862926744048072546868123048521647422331377544909899697014830476079426329023667228232649401812531396911198418982121625)*x + (14292402295579722659531324079779434285513586430134055486739758584511634236046929426619443421799379372262922771051920052566550546207*i+5943927292613048962533453761377181306497593815569134667711185368284001371597461399162994006023595427068010662843466192173630511210) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11954038079459446689080473646084750088373922502202382420443082831159910879764327384287687460709213179010671630247127936115029518847*i+20026886498329862926744048072546868123048521647422331377544909899697014830476079426329023667228232649401812531396911198418982121625)*x + (14292402295579722659531324079779434285513586430134055486739758584511634236046929426619443421799379372262922771051920052566550546207*i+5943927292613048962533453761377181306497593815569134667711185368284001371597461399162994006023595427068010662843466192173630511210) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18260588208768774296404061178560178032394008452829895222287909399117418205585374881110496332327660119757298149102911992170413752793*i+18300350065036055551187558900998989120519719188713768703283405422932533607763633880113932785401460355477322533648798944117432539456)*x + (10386101033133649148414305571704320022561941645209003980941215493971742514481404887404632293330684164286909499690490448765047098701*i+17101363641854742142979372900497254259814168220900177958835925279763370177528410440566688748379213239476433286841146449860858650041) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18260588208768774296404061178560178032394008452829895222287909399117418205585374881110496332327660119757298149102911992170413752793*i+18300350065036055551187558900998989120519719188713768703283405422932533607763633880113932785401460355477322533648798944117432539456)*x + (10386101033133649148414305571704320022561941645209003980941215493971742514481404887404632293330684164286909499690490448765047098701*i+17101363641854742142979372900497254259814168220900177958835925279763370177528410440566688748379213239476433286841146449860858650041) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17524835155299894239280652216230127763778839422277057838112754545465970776394081512269250430067489159909640027046920543132916805370*i+17377747375570180338336319669658008898069940648198653306376892519625874263211771742554172057798647444105405164455514856189612664343)*x + (3303645968588073400114281206694778718892319289758074143625997741771947993527716154883565301240518716115886953778690900727418268152*i+11367581332788568396779515663897657792496866020873417317811443672924572573429690851561197864864054878574963900080440026511081405820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17524835155299894239280652216230127763778839422277057838112754545465970776394081512269250430067489159909640027046920543132916805370*i+17377747375570180338336319669658008898069940648198653306376892519625874263211771742554172057798647444105405164455514856189612664343)*x + (3303645968588073400114281206694778718892319289758074143625997741771947993527716154883565301240518716115886953778690900727418268152*i+11367581332788568396779515663897657792496866020873417317811443672924572573429690851561197864864054878574963900080440026511081405820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23673810765346985863036224814397338202379105692883826856229774362854769140500953414398708940273250233176130825665384061225329841503*i+14696875814902841866793752701380629315030361479734835405294289678160268584594518947079280546410661353487054069887776205160092830048)*x + (14338159004261454918892079359786600524654431304764876092630716872249627441094317077299578300347111938311367532768015693914662091002*i+1777367989793249693396272606798591098772631448907412173226802869699021015888867252835711231465848546980808792302294945555233404736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23673810765346985863036224814397338202379105692883826856229774362854769140500953414398708940273250233176130825665384061225329841503*i+14696875814902841866793752701380629315030361479734835405294289678160268584594518947079280546410661353487054069887776205160092830048)*x + (14338159004261454918892079359786600524654431304764876092630716872249627441094317077299578300347111938311367532768015693914662091002*i+1777367989793249693396272606798591098772631448907412173226802869699021015888867252835711231465848546980808792302294945555233404736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21753892636751179459683514321495264182857353804859666789538634000843989752276386542297788478481684060532136205831899280958023566244*i+10557242533819008620968403906156616654754823397415376808826258817485439453712679451629804038600492653515197954808727531530193466295)*x + (10485782840223608591476213192365013511188884942468402084282670331447348161572056550637244405732741137777104233448839661198147918005*i+11115525713444942369189195035353599544714559489637245987953342944919942759585794976409407333619479530447159680927078755476666823992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21753892636751179459683514321495264182857353804859666789538634000843989752276386542297788478481684060532136205831899280958023566244*i+10557242533819008620968403906156616654754823397415376808826258817485439453712679451629804038600492653515197954808727531530193466295)*x + (10485782840223608591476213192365013511188884942468402084282670331447348161572056550637244405732741137777104233448839661198147918005*i+11115525713444942369189195035353599544714559489637245987953342944919942759585794976409407333619479530447159680927078755476666823992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13971359664174345212189217934979077098339516111827103131077669341338795191339242979282007315128137122395347759377566634952880998340*i+5445217934619317125851800280358706008542503292940130725778008938487182109554002583496644498781653691588011253997555135855191577587)*x + (7854257624846623209733223619642791504245382941722240808802226571237226203885555257578190237524617280029184253855613442033639619376*i+17322044113811221572802758201583392576374739061038960726487432951484983007620074694420550262099788452196683893605283985287670739408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13971359664174345212189217934979077098339516111827103131077669341338795191339242979282007315128137122395347759377566634952880998340*i+5445217934619317125851800280358706008542503292940130725778008938487182109554002583496644498781653691588011253997555135855191577587)*x + (7854257624846623209733223619642791504245382941722240808802226571237226203885555257578190237524617280029184253855613442033639619376*i+17322044113811221572802758201583392576374739061038960726487432951484983007620074694420550262099788452196683893605283985287670739408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21337257325623527370815383749498446446233429607324864172145714912653197792140462029291046363078007514224345985848151610521298804849*i+17792123310905994533558703839691696278935552703354192279936574585426824821138773868967225177384003092362560935323471744042842455414)*x + (15658583561694694643681420183493976203496941327916993242414503251737393763273526998375472379664334010751024464360834385782357278021*i+11492041291185630602049974920059759293123963284022989476142129332148669235780861487727887845831165822111741737875626255764938139178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21337257325623527370815383749498446446233429607324864172145714912653197792140462029291046363078007514224345985848151610521298804849*i+17792123310905994533558703839691696278935552703354192279936574585426824821138773868967225177384003092362560935323471744042842455414)*x + (15658583561694694643681420183493976203496941327916993242414503251737393763273526998375472379664334010751024464360834385782357278021*i+11492041291185630602049974920059759293123963284022989476142129332148669235780861487727887845831165822111741737875626255764938139178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1333148387652805716133558951084520646200398079021913860663121845076479671284761963497597205709762646913858330593151495285053483054*i+20156696606429257602147153045948151495785076324309326991534418158690076916070227569115201842088267222757993207932295678702359736928)*x + (12198160199331944438440239975445972917678412398452076431984263136960613635371161196161408645041637484649193041932169319979629518361*i+17852248163397010588500352539851268224513844567309821889955582420627829409770982086837069124458648138192196929701350900246451085983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1333148387652805716133558951084520646200398079021913860663121845076479671284761963497597205709762646913858330593151495285053483054*i+20156696606429257602147153045948151495785076324309326991534418158690076916070227569115201842088267222757993207932295678702359736928)*x + (12198160199331944438440239975445972917678412398452076431984263136960613635371161196161408645041637484649193041932169319979629518361*i+17852248163397010588500352539851268224513844567309821889955582420627829409770982086837069124458648138192196929701350900246451085983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10887762608761348730482034685912028308488022659597455252447630756034631207837325709245908183125617802796833811128149614982100149520*i+8312739910214245394875786255255915021562894895247848378175858295139254080126339903475144745183440062154614838935216828154537442861)*x + (7531138239840893554903384928377968374857089099660005191527531322786636170050145505486501432383559820323249089169206190934468353992*i+12549901709609902021349935976957219252067095471188342723084551498265701757538158462998965390804675004934510450194977323838415996240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10887762608761348730482034685912028308488022659597455252447630756034631207837325709245908183125617802796833811128149614982100149520*i+8312739910214245394875786255255915021562894895247848378175858295139254080126339903475144745183440062154614838935216828154537442861)*x + (7531138239840893554903384928377968374857089099660005191527531322786636170050145505486501432383559820323249089169206190934468353992*i+12549901709609902021349935976957219252067095471188342723084551498265701757538158462998965390804675004934510450194977323838415996240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (601424505313891129301371959408219620328367196542823048277731404437867688107442559773257267194068106405015491912492467345138039749*i+18718914722670499228390629839447724285405865637983282279779709817887960431604151173913105743956510723199679738669412800403346792877)*x + (19059155888202011467136929243049464484240819225587030859966618343510613253935026614054182826143240487989228255779346067565717638405*i+9693799408090542389586645628918779076370035398169363408225183447942645477114181120319587039404995593950363424129248736025977399129) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (601424505313891129301371959408219620328367196542823048277731404437867688107442559773257267194068106405015491912492467345138039749*i+18718914722670499228390629839447724285405865637983282279779709817887960431604151173913105743956510723199679738669412800403346792877)*x + (19059155888202011467136929243049464484240819225587030859966618343510613253935026614054182826143240487989228255779346067565717638405*i+9693799408090542389586645628918779076370035398169363408225183447942645477114181120319587039404995593950363424129248736025977399129) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7577992657613599884311589892046841558289228944586892021627424032552361354797752885422338012504556186716197998947839583297330116719*i+10857201789376809557876206680600153388363947147516952813946534836648653609710923322257267815332602132067948818707933239857814575777)*x + (11482376410108962934108878462990611757933482135976058218036728258849265733695403414023218846702289086465444725030624367404528494773*i+22283483865983751194426247074247479424695580607097769246984424854623472807844269062878940226464185299831640702199493423091197692532) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7577992657613599884311589892046841558289228944586892021627424032552361354797752885422338012504556186716197998947839583297330116719*i+10857201789376809557876206680600153388363947147516952813946534836648653609710923322257267815332602132067948818707933239857814575777)*x + (11482376410108962934108878462990611757933482135976058218036728258849265733695403414023218846702289086465444725030624367404528494773*i+22283483865983751194426247074247479424695580607097769246984424854623472807844269062878940226464185299831640702199493423091197692532) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21305953907974494940649351076197093597387910235664453058243196722990057629361359062507074163055450586224635606288591179808704966069*i+19984161297782071891134869508316171510633065659982221559626604136405542134017716636330644251184061461220868917366033179698117422796)*x + (21765205906817499146668265713618756948253471949547825773942009695872432103286345862345637024827446734056306498788193170687057671373*i+14643729976486013118362515289771341884465429291842481614632197877691878555516527195552160936180084103624485198659159693280639459579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21305953907974494940649351076197093597387910235664453058243196722990057629361359062507074163055450586224635606288591179808704966069*i+19984161297782071891134869508316171510633065659982221559626604136405542134017716636330644251184061461220868917366033179698117422796)*x + (21765205906817499146668265713618756948253471949547825773942009695872432103286345862345637024827446734056306498788193170687057671373*i+14643729976486013118362515289771341884465429291842481614632197877691878555516527195552160936180084103624485198659159693280639459579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2626965551516593157007262503100279198463917406384980546875851790967649250658542092361439430545094892568970252500967332096381245424*i+15925244648991463368383826098642024825876597767811288605308429508421139350642733330127206191831376617571342485442619772642420965618)*x + (10127276302647824067496868189234807784756309006804826940148203910288367895605885080787555177675620671528448796921904784681099982260*i+14451407157796763594655762512458137901610312599542643027330113047062812604478982887073774743646743211155217972232929651747957140542) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2626965551516593157007262503100279198463917406384980546875851790967649250658542092361439430545094892568970252500967332096381245424*i+15925244648991463368383826098642024825876597767811288605308429508421139350642733330127206191831376617571342485442619772642420965618)*x + (10127276302647824067496868189234807784756309006804826940148203910288367895605885080787555177675620671528448796921904784681099982260*i+14451407157796763594655762512458137901610312599542643027330113047062812604478982887073774743646743211155217972232929651747957140542) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16790934144823738650163518433263711962575198549711447345592712827659843773328615979585114571725511065421100200349122709877713976914*i+10835977722891398507868836593102732592732862565566185085051738685447263927340108784415064627831046546892742772652288378464296427413)*x + (14297915465362367391235336696223313592812763266072355066251920597228326464406580957345568528736958589013305482175477819590935023908*i+4976115170748166584834372791734699059503860273128385274468677137583287978209814328831849792971345779431707781522848740724165695709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16790934144823738650163518433263711962575198549711447345592712827659843773328615979585114571725511065421100200349122709877713976914*i+10835977722891398507868836593102732592732862565566185085051738685447263927340108784415064627831046546892742772652288378464296427413)*x + (14297915465362367391235336696223313592812763266072355066251920597228326464406580957345568528736958589013305482175477819590935023908*i+4976115170748166584834372791734699059503860273128385274468677137583287978209814328831849792971345779431707781522848740724165695709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22971752561269629655609855718217928893619920102764510818371878435980680206453351592146772942618314436609445321239926367310482592619*i+15173298959730421854318809194213527316296946657321075776222187227992083704151443564996078814638663471981895663020995018964085191987)*x + (18586335420885951141728293678278139081961287325659793574623529476432690328408158791745903058821867715580554560199791684524592014130*i+13107697157226763120686726299356528655857763074739873660233453797042105143611578048069780658024698907660574737397796515285601567471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22971752561269629655609855718217928893619920102764510818371878435980680206453351592146772942618314436609445321239926367310482592619*i+15173298959730421854318809194213527316296946657321075776222187227992083704151443564996078814638663471981895663020995018964085191987)*x + (18586335420885951141728293678278139081961287325659793574623529476432690328408158791745903058821867715580554560199791684524592014130*i+13107697157226763120686726299356528655857763074739873660233453797042105143611578048069780658024698907660574737397796515285601567471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11775420343419665743873184541614340896989867050877842252387488432648731410361056480638068089138365788695237217436036862013831680550*i+12792548775704356846701889422522704681803446844457639150722304212831367538063234568329013028326182838399770387478771483968669721009)*x + (7515751820419333623089092922899663863468692752803712542959479884168530067954074390259795076982451179894691079347242435125488924415*i+8359990090339874112171618979764841471346502142737198536957000199640139856463758515533348390659484282833933923928070009812718619018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11775420343419665743873184541614340896989867050877842252387488432648731410361056480638068089138365788695237217436036862013831680550*i+12792548775704356846701889422522704681803446844457639150722304212831367538063234568329013028326182838399770387478771483968669721009)*x + (7515751820419333623089092922899663863468692752803712542959479884168530067954074390259795076982451179894691079347242435125488924415*i+8359990090339874112171618979764841471346502142737198536957000199640139856463758515533348390659484282833933923928070009812718619018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1045781936761120829261234325760350840837703643611494297589663822503024029752869160274125161016043028233361092978470129075842932054*i+3900179596049671520020331154131918893685288964414784999057468315346056073526938929603022011027909386363255515524630704801627147851)*x + (17434041390761294537944991993624590329138457215408684360274446498369848236050360654802214047968296827705461962339779983964112156787*i+10015589059055885134792610235252476302950533851066549730071083626238241178737742863682931308256366791345571326939736226984076483893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1045781936761120829261234325760350840837703643611494297589663822503024029752869160274125161016043028233361092978470129075842932054*i+3900179596049671520020331154131918893685288964414784999057468315346056073526938929603022011027909386363255515524630704801627147851)*x + (17434041390761294537944991993624590329138457215408684360274446498369848236050360654802214047968296827705461962339779983964112156787*i+10015589059055885134792610235252476302950533851066549730071083626238241178737742863682931308256366791345571326939736226984076483893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7386328884122871968737870210676922528899303137917648441461738582480680090312487892404895469105258618191956937643294263462897367264*i+18745967047755460817362703700164264552872358722734167432895252913807119202788090832767952270298189230815167320507518537105168782862)*x + (1131075871963186700138511134127398930755539801865513553953019398146441061370810921207993158689324904878050506880938387514726387922*i+18461757991588687076287508329385449045381137119300634157159284846891973498844195464496311928136703772756256492411992547863680552700) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7386328884122871968737870210676922528899303137917648441461738582480680090312487892404895469105258618191956937643294263462897367264*i+18745967047755460817362703700164264552872358722734167432895252913807119202788090832767952270298189230815167320507518537105168782862)*x + (1131075871963186700138511134127398930755539801865513553953019398146441061370810921207993158689324904878050506880938387514726387922*i+18461757991588687076287508329385449045381137119300634157159284846891973498844195464496311928136703772756256492411992547863680552700) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10524619060610698934103273187201007505726724185489798244975642420861242836320603863714200861075955936125478992637483687785129416824*i+4479730406521183846953771512721944786651466978683045815094527565522451561370062502214018328446768530358633964851117022155253278284)*x + (9487767726556340115741908912990645613918479089376838875527389271773507178001979881116079409379083471967148882761057922933078435233*i+11754564383198212214114882860511513099703448923189266255237917669833127814064808518534643655669297238113067034429797224366319206107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10524619060610698934103273187201007505726724185489798244975642420861242836320603863714200861075955936125478992637483687785129416824*i+4479730406521183846953771512721944786651466978683045815094527565522451561370062502214018328446768530358633964851117022155253278284)*x + (9487767726556340115741908912990645613918479089376838875527389271773507178001979881116079409379083471967148882761057922933078435233*i+11754564383198212214114882860511513099703448923189266255237917669833127814064808518534643655669297238113067034429797224366319206107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5089204044844788896990214177949727106501067049677078758926016635233185371284864808095757117160963863851920753566310700731429836132*i+6744462781187155076077517748281600653450950644684362607388027769358646481775373546477542642669698215128597604423650782729100790587)*x + (1036994641011353219084787531790144242628603915269945972005874949951707743064775414969927316196529016706673741030922349752701264531*i+20357449116616082449594655549788791783401560413226932844749455004653762228905136873880149156656430458631255841284771671644403816449) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5089204044844788896990214177949727106501067049677078758926016635233185371284864808095757117160963863851920753566310700731429836132*i+6744462781187155076077517748281600653450950644684362607388027769358646481775373546477542642669698215128597604423650782729100790587)*x + (1036994641011353219084787531790144242628603915269945972005874949951707743064775414969927316196529016706673741030922349752701264531*i+20357449116616082449594655549788791783401560413226932844749455004653762228905136873880149156656430458631255841284771671644403816449) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11507032822160214624563456200518088114963971656896556244314322240659426655945545408602636009242930674741984935406885204507050771644*i+10829309194095602589019349605824516470823551712789594479993904636200369857868829350592493005263393951978403553655789253411468354503)*x + (20796521613192761574800060366539472246946384242175955885525539550391677095907519470891392160648435982813776511432603957429051182879*i+10859427213820904993805168304912530502223272757284190336221686004119380238336373505933670934022343391189584065225630757847084108397) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11507032822160214624563456200518088114963971656896556244314322240659426655945545408602636009242930674741984935406885204507050771644*i+10829309194095602589019349605824516470823551712789594479993904636200369857868829350592493005263393951978403553655789253411468354503)*x + (20796521613192761574800060366539472246946384242175955885525539550391677095907519470891392160648435982813776511432603957429051182879*i+10859427213820904993805168304912530502223272757284190336221686004119380238336373505933670934022343391189584065225630757847084108397) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13428389316437197138491201599028892714551118461111706110379344198182121398629388204462566001515491827013638695982787690463883881636*i+19228256582511035904702461530035249067630508858107677608676478556500766913500342957149009991014972608909809302229741194717219977496)*x + (3624525625389491026250079030657855887975934706270692049926716936396934721169868522340048141044159893685004781446840428675988864992*i+15958603355083682084101414160067054788159671028760934503837925282581808169900552626574432401845117513226599219926707402665144597015) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13428389316437197138491201599028892714551118461111706110379344198182121398629388204462566001515491827013638695982787690463883881636*i+19228256582511035904702461530035249067630508858107677608676478556500766913500342957149009991014972608909809302229741194717219977496)*x + (3624525625389491026250079030657855887975934706270692049926716936396934721169868522340048141044159893685004781446840428675988864992*i+15958603355083682084101414160067054788159671028760934503837925282581808169900552626574432401845117513226599219926707402665144597015) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7329347966485384422367830924528810303540014392961717672456119468760146161098883928105090761444738144702695912152648047351465522097*i+7819302706768045417030048826909606077782267330267248835945955911186266631831337433589402737666191141151969588699561588441084029205)*x + (8792180335087467345001568714290712147297412380959943738263067980753916598857744345285882941870558674033184511324435754624831703058*i+21647503343259873625402079801353739509630837348662465483802007592339265892645264909003369041565154644380468251369338280427228135893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7329347966485384422367830924528810303540014392961717672456119468760146161098883928105090761444738144702695912152648047351465522097*i+7819302706768045417030048826909606077782267330267248835945955911186266631831337433589402737666191141151969588699561588441084029205)*x + (8792180335087467345001568714290712147297412380959943738263067980753916598857744345285882941870558674033184511324435754624831703058*i+21647503343259873625402079801353739509630837348662465483802007592339265892645264909003369041565154644380468251369338280427228135893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22825059890003202387569328359248002610338192458617620164998057908777889178242140478021920965522557697164382247862236389471009188056*i+9882442918210556503590535874587662591298613246972202503674281593562266707996820230563774204735736274859037969750328953162865541227)*x + (7234323453444990658014705070358529416126059097385496288760293159440842500665755522424922064711895385522460914645073478131291779061*i+13170334767535087117632782281285020868624955749977058954433209210975973722896600386896691787947901678746444008126525697113823428034) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22825059890003202387569328359248002610338192458617620164998057908777889178242140478021920965522557697164382247862236389471009188056*i+9882442918210556503590535874587662591298613246972202503674281593562266707996820230563774204735736274859037969750328953162865541227)*x + (7234323453444990658014705070358529416126059097385496288760293159440842500665755522424922064711895385522460914645073478131291779061*i+13170334767535087117632782281285020868624955749977058954433209210975973722896600386896691787947901678746444008126525697113823428034) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2848482575877138719091284196879245952907599472198035156019684783808262497476464285901321387715587256133499549794996099068234665496*i+15321727684197018562026275028956471975524025293154735981735992137083373353219149576777736262484991869944273298989962089528888945115)*x + (12355785338461534321515958980750909684404540328491377485968640258994763360955038111655435784575882108017731985381397485378172420544*i+6170990902460216276858218794970606786905746194600879331858581346767632165263576412898438823822836478233210834384785188824877109330) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2848482575877138719091284196879245952907599472198035156019684783808262497476464285901321387715587256133499549794996099068234665496*i+15321727684197018562026275028956471975524025293154735981735992137083373353219149576777736262484991869944273298989962089528888945115)*x + (12355785338461534321515958980750909684404540328491377485968640258994763360955038111655435784575882108017731985381397485378172420544*i+6170990902460216276858218794970606786905746194600879331858581346767632165263576412898438823822836478233210834384785188824877109330) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21927321315055550430609447454125839885223432247193087784026258940355188992094602027573465726866849372091026237771974623407000105055*i+23696442131944119522766113637212411058339275647095666503555003987002428988724261046268760462990047900057062285511637686645535470353)*x + (14517794694433200378526040679701410228314896190719713794537554393645076036282871749885694566934075580717517362745155281955109720916*i+12163512558906761243081197764791634780263530970761571714754838508984904154403334058401445893233532217925148239377570009210360836623) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21927321315055550430609447454125839885223432247193087784026258940355188992094602027573465726866849372091026237771974623407000105055*i+23696442131944119522766113637212411058339275647095666503555003987002428988724261046268760462990047900057062285511637686645535470353)*x + (14517794694433200378526040679701410228314896190719713794537554393645076036282871749885694566934075580717517362745155281955109720916*i+12163512558906761243081197764791634780263530970761571714754838508984904154403334058401445893233532217925148239377570009210360836623) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23671990197289293308696535159925954589523858756310068345624969342419393675821271337307886084042176723291359691600436842605565072122*i+12623169789881204421908267587107983136431203633019416886886979555130500016168519966280578666207287446067549320864755178151438209247)*x + (10779551050451134575273320274047932747263126240049319069198694694257151975407076501299488262582364647344277742121198837639580469714*i+5028320081805271313601657511629810244420053278395372495225590165469364426121286018452125229030106522969639477931568879628241156548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23671990197289293308696535159925954589523858756310068345624969342419393675821271337307886084042176723291359691600436842605565072122*i+12623169789881204421908267587107983136431203633019416886886979555130500016168519966280578666207287446067549320864755178151438209247)*x + (10779551050451134575273320274047932747263126240049319069198694694257151975407076501299488262582364647344277742121198837639580469714*i+5028320081805271313601657511629810244420053278395372495225590165469364426121286018452125229030106522969639477931568879628241156548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9124845780053071416431144052988876219442830647731825203720382417634093355010538765061520274358518294144367547711451166604080864914*i+18143940774182544586235002551611666890920789211178538271377924941472771553375197736768601956927902979903400110990224727375400634947)*x + (17787299479799999972444902569007016948678166674447488042878184326222929573859549452066761554793664858550913399884898733698446872309*i+489576383323765324516027535701295273768475531482678511613691919663419402111742563263096359355715553089383482884294743862146962337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9124845780053071416431144052988876219442830647731825203720382417634093355010538765061520274358518294144367547711451166604080864914*i+18143940774182544586235002551611666890920789211178538271377924941472771553375197736768601956927902979903400110990224727375400634947)*x + (17787299479799999972444902569007016948678166674447488042878184326222929573859549452066761554793664858550913399884898733698446872309*i+489576383323765324516027535701295273768475531482678511613691919663419402111742563263096359355715553089383482884294743862146962337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18495188399371623275217144770664980547817708886982569812815378397746753852336400650159847899529176769172634437530308088720471768431*i+17920500887646151511729448722544010553130318489673945315523575758808125121725172164902130049955057742415536502325788021002628119160)*x + (10621965942323058610865654849888588632344338201619782652286524465389830056983145812376652201587234640618372248517002784879298604209*i+8626092213448583427868614711361341017444694920923598174776593328551650480669720420842581459403894240188064695496507301024158808777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18495188399371623275217144770664980547817708886982569812815378397746753852336400650159847899529176769172634437530308088720471768431*i+17920500887646151511729448722544010553130318489673945315523575758808125121725172164902130049955057742415536502325788021002628119160)*x + (10621965942323058610865654849888588632344338201619782652286524465389830056983145812376652201587234640618372248517002784879298604209*i+8626092213448583427868614711361341017444694920923598174776593328551650480669720420842581459403894240188064695496507301024158808777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18513190677104969894543496794989200917980243227599281587753215114306609923478516575416409275617246359369356701131054061569120213699*i+12069244660936219060042954118239664628347998119143608728213415959053825285883166686749213051556194728247101295284941444796524255009)*x + (11347094527755705114442461466471372683431188578680840574953819850536741550587451248054313921755734368726164136673124562415121610613*i+15205622989246681323771916380006122616116271465208058181687829273094056954971742433781366432933389599289407975984048133865034225178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18513190677104969894543496794989200917980243227599281587753215114306609923478516575416409275617246359369356701131054061569120213699*i+12069244660936219060042954118239664628347998119143608728213415959053825285883166686749213051556194728247101295284941444796524255009)*x + (11347094527755705114442461466471372683431188578680840574953819850536741550587451248054313921755734368726164136673124562415121610613*i+15205622989246681323771916380006122616116271465208058181687829273094056954971742433781366432933389599289407975984048133865034225178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22053142974442551407262596180529266258596548753565409614438215774660628267931511435687910103975941490705245078286280830508333767945*i+2400671110914002690638030168188805789576956290332313228863905058171443261587178005527539694763864360386637574133560105161663584788)*x + (13389439377491096411146192130707957723045499006784117795432955192995865872537238800979581336533241651668272214165445841430471773626*i+23603331280241009057563531117488931372124537711714675658424828714988034749126747568021837135818118408850469834764707504992315579773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22053142974442551407262596180529266258596548753565409614438215774660628267931511435687910103975941490705245078286280830508333767945*i+2400671110914002690638030168188805789576956290332313228863905058171443261587178005527539694763864360386637574133560105161663584788)*x + (13389439377491096411146192130707957723045499006784117795432955192995865872537238800979581336533241651668272214165445841430471773626*i+23603331280241009057563531117488931372124537711714675658424828714988034749126747568021837135818118408850469834764707504992315579773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14494416432559760909259614925446914087834895346276342203419548417419497866678485395965415016185894330331297775914861558356532965153*i+3134372182188423465369713201271489193280077618674760402686207847981866909653987318277819006845798162077732411583562816555709048287)*x + (17495808279776084804019190743766888182284199902143960593923849538781187393726607929508883749469124747281758551649372050481637074397*i+18560972135636268004479817589070823767636859450668869467287811011861321046810270251642067888016131687767805926110954701577185128575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14494416432559760909259614925446914087834895346276342203419548417419497866678485395965415016185894330331297775914861558356532965153*i+3134372182188423465369713201271489193280077618674760402686207847981866909653987318277819006845798162077732411583562816555709048287)*x + (17495808279776084804019190743766888182284199902143960593923849538781187393726607929508883749469124747281758551649372050481637074397*i+18560972135636268004479817589070823767636859450668869467287811011861321046810270251642067888016131687767805926110954701577185128575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9571730056539948272859277929268564231894152431401265878703097864924978933004707110187708855827645411116389660855236117169924320811*i+15260661534428229771408914947433436943616544791246287439425125934948000228103298636677947451576271519846157512431693668047507950294)*x + (13303266910098002312607230634783664828194779368008360515709999180676752676322737229092625834028930380311942125014561155351467173064*i+10181412146469411592972936549760563405128334802999655700238297052100799092529865774763518174215787461215029174247399731355241676144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9571730056539948272859277929268564231894152431401265878703097864924978933004707110187708855827645411116389660855236117169924320811*i+15260661534428229771408914947433436943616544791246287439425125934948000228103298636677947451576271519846157512431693668047507950294)*x + (13303266910098002312607230634783664828194779368008360515709999180676752676322737229092625834028930380311942125014561155351467173064*i+10181412146469411592972936549760563405128334802999655700238297052100799092529865774763518174215787461215029174247399731355241676144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1892338260921189952745111141448726594528615050563668590194863303922815255001734326725453992861771607943349979896183371954511157685*i+454916926799338279143981258538055590473349195636863246750667114333735276649721329724666470235150443142168700659219962204243242158)*x + (13979536695277020097557485535087316944206335966536784529026171039579363726087275812910905569443615381508373956037312306460528013441*i+13388755845474120963457026221184498353842872884703301179688260624039141437067965921411589352343123315815063012350462622548386565968) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1892338260921189952745111141448726594528615050563668590194863303922815255001734326725453992861771607943349979896183371954511157685*i+454916926799338279143981258538055590473349195636863246750667114333735276649721329724666470235150443142168700659219962204243242158)*x + (13979536695277020097557485535087316944206335966536784529026171039579363726087275812910905569443615381508373956037312306460528013441*i+13388755845474120963457026221184498353842872884703301179688260624039141437067965921411589352343123315815063012350462622548386565968) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11815693590154794110941302171244939203358761304436010649372162081618822512165447676349298953966877501669670491775710049428976355512*i+7151638592180578318690099362777721450780220081626681562283857240613822426847193147645942780504841627526662518518027865073551948878)*x + (21754381058644866447718834757586812302220407708711102368406998452086338162814382464232760203022638125336446655141925682844029814452*i+11228888617550351936481219635462874561796954555372581435726326199947432445509105739984384325791490668324072533770197726878260960355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11815693590154794110941302171244939203358761304436010649372162081618822512165447676349298953966877501669670491775710049428976355512*i+7151638592180578318690099362777721450780220081626681562283857240613822426847193147645942780504841627526662518518027865073551948878)*x + (21754381058644866447718834757586812302220407708711102368406998452086338162814382464232760203022638125336446655141925682844029814452*i+11228888617550351936481219635462874561796954555372581435726326199947432445509105739984384325791490668324072533770197726878260960355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7658269623409563260788844144264874671565055119892356485143379646641973494416614895064638940802806001202405298003479326864761576186*i+17441160610133798646422249043976337556615437861213739307985586767929612812655989134689494434443559009200924852466190991149141050353)*x + (9993476453095431662100280870371409330889188599997880085283141454610687140178519096151504541750687816014417028117608855580205545781*i+6593880097108245435693341087428259141833284533063748988322143972438009437144047747229469715632148267255445755106624111408439967566) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7658269623409563260788844144264874671565055119892356485143379646641973494416614895064638940802806001202405298003479326864761576186*i+17441160610133798646422249043976337556615437861213739307985586767929612812655989134689494434443559009200924852466190991149141050353)*x + (9993476453095431662100280870371409330889188599997880085283141454610687140178519096151504541750687816014417028117608855580205545781*i+6593880097108245435693341087428259141833284533063748988322143972438009437144047747229469715632148267255445755106624111408439967566) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11964086373213098291832723660027550151781146743198420236004911642939106512890268745543137832070606633096292058411213090891000075823*i+14299202599144755975311515097531740006803867213914638238921313624414203733791897826274208363761830612502846927826324834186959752223)*x + (23450559427166493940178860729736161557521315877663236394736381859245965050538235125162298766264500095817693069183588120225772643446*i+2774928317187000110854186342297763452016725666964593953571738028519607879056025150446539737848756597895665246778622589656655379561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11964086373213098291832723660027550151781146743198420236004911642939106512890268745543137832070606633096292058411213090891000075823*i+14299202599144755975311515097531740006803867213914638238921313624414203733791897826274208363761830612502846927826324834186959752223)*x + (23450559427166493940178860729736161557521315877663236394736381859245965050538235125162298766264500095817693069183588120225772643446*i+2774928317187000110854186342297763452016725666964593953571738028519607879056025150446539737848756597895665246778622589656655379561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8914363295323006363477589787922719241973112801952597096979524153943407041457536209066032606305107080797799719144780387971796781045*i+8338200121555902472169697485565773448781344077467705401082453587409422208820366824107688441312975139017184146345097289460236231129)*x + (6991788777448321134285716494637432797287366930019715896070737324493261748945204234788844449777116915300501694934990684282663540068*i+21602720014141572388918330734676240331672411611350071952300313685767175481955723991600127343795997935165541480433379888224290387606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8914363295323006363477589787922719241973112801952597096979524153943407041457536209066032606305107080797799719144780387971796781045*i+8338200121555902472169697485565773448781344077467705401082453587409422208820366824107688441312975139017184146345097289460236231129)*x + (6991788777448321134285716494637432797287366930019715896070737324493261748945204234788844449777116915300501694934990684282663540068*i+21602720014141572388918330734676240331672411611350071952300313685767175481955723991600127343795997935165541480433379888224290387606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9958405028775139516971512198995885969784707800063196327665580847933029357690525481135767438583293971148987897933073859159341894296*i+21380626827480422250688516388317002747605807108887205466769082886247875598339974180709983371864903120396222941687056800476904081634)*x + (5642554766147584938713412606643704208801587502486341562863312837984436648149491735145986446567850568272652670408651852155064051201*i+15973968317667743025992685990948710656711031806489647431460859564159360284404099379868798251475569317253320770550515945795177018943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9958405028775139516971512198995885969784707800063196327665580847933029357690525481135767438583293971148987897933073859159341894296*i+21380626827480422250688516388317002747605807108887205466769082886247875598339974180709983371864903120396222941687056800476904081634)*x + (5642554766147584938713412606643704208801587502486341562863312837984436648149491735145986446567850568272652670408651852155064051201*i+15973968317667743025992685990948710656711031806489647431460859564159360284404099379868798251475569317253320770550515945795177018943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15073197508110631516607814583873708682234687799735349039810788982084418132129585853046475926587858455019565897235614274261531622212*i+5974106446609497593424043125202204595823302523480091186631815704695134260971597538119464438598327090508920233610080096424419769552)*x + (16545519081874754063434465328316402967820744774463780384974745815288167104549095685379839097605770680878606115072288224702264452090*i+6102506393765535344402228262595470726718703701379180206626648067988253373274881855992032951628035800358454947128296208939631695791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15073197508110631516607814583873708682234687799735349039810788982084418132129585853046475926587858455019565897235614274261531622212*i+5974106446609497593424043125202204595823302523480091186631815704695134260971597538119464438598327090508920233610080096424419769552)*x + (16545519081874754063434465328316402967820744774463780384974745815288167104549095685379839097605770680878606115072288224702264452090*i+6102506393765535344402228262595470726718703701379180206626648067988253373274881855992032951628035800358454947128296208939631695791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13249025425531876262504551762597963331392857718644731938655950933503950085830896889439025498552294722237209901039792816774776861292*i+2049802378179400364279874334397593202659231982903199095584824674208308992142856470428541331687513763862774216520137757183016332172)*x + (4379388432387351208017974209792836531073226622294119650983754300651682334646991327394726231811222953866654265869093552849265668666*i+218621659631866880463169637350185830556879038722305708715008880937307500471787940528055348318215115010968178700835080419986542764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13249025425531876262504551762597963331392857718644731938655950933503950085830896889439025498552294722237209901039792816774776861292*i+2049802378179400364279874334397593202659231982903199095584824674208308992142856470428541331687513763862774216520137757183016332172)*x + (4379388432387351208017974209792836531073226622294119650983754300651682334646991327394726231811222953866654265869093552849265668666*i+218621659631866880463169637350185830556879038722305708715008880937307500471787940528055348318215115010968178700835080419986542764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (441447931002343790526863443004580853730243563190140693334018987635640834612982216513825458019904723012181552603907284617911766100*i+7370731109888764955750511315414824019639607192470407414729505173846814036357271943274514750065260563450911719989685657516523141329)*x + (3403061697948335372678699558204352659644896760079542238780684346072611143384181393084625167081079017500303007122059609162494440433*i+13231414759291511110696065841467402989468150620868093477618968597472884492771540385086654697222579556539534250437689905313598829645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (441447931002343790526863443004580853730243563190140693334018987635640834612982216513825458019904723012181552603907284617911766100*i+7370731109888764955750511315414824019639607192470407414729505173846814036357271943274514750065260563450911719989685657516523141329)*x + (3403061697948335372678699558204352659644896760079542238780684346072611143384181393084625167081079017500303007122059609162494440433*i+13231414759291511110696065841467402989468150620868093477618968597472884492771540385086654697222579556539534250437689905313598829645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1050688239922913852857796233566502848888734870904472709131925621923703845844674858662039676238083580704724707076182130444512439744*i+22741526537398605382589701070007651516488065865762425608120954428967544099494247336660499681097167737795179080223913881740794846597)*x + (22654553065854493759503286626288154295052309025094828447949964293743701578820349441390477315062389937842469864670990550290752211260*i+23726701194229357166822488169181321831481479210608891055693608048120942562208153886023847491825253538427494724749734914624212772340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1050688239922913852857796233566502848888734870904472709131925621923703845844674858662039676238083580704724707076182130444512439744*i+22741526537398605382589701070007651516488065865762425608120954428967544099494247336660499681097167737795179080223913881740794846597)*x + (22654553065854493759503286626288154295052309025094828447949964293743701578820349441390477315062389937842469864670990550290752211260*i+23726701194229357166822488169181321831481479210608891055693608048120942562208153886023847491825253538427494724749734914624212772340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11169424005288288256380898760812485701653494085420544934784583907967046349710669276434547066199596825785555146416697313098239364257*i+3233883254081392450140954976365586757976641540302305669931169610162851112810977569758418682053541651342430813048486432559693146582)*x + (1079120966765043694824798810729599711121642874824985033642304544206951992904152693117162470043053586313484866450707438717423815237*i+21568784910930818660878083304693387421845476216733822568972747116901607016170531130213861981502705335559004534642929122590511862455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11169424005288288256380898760812485701653494085420544934784583907967046349710669276434547066199596825785555146416697313098239364257*i+3233883254081392450140954976365586757976641540302305669931169610162851112810977569758418682053541651342430813048486432559693146582)*x + (1079120966765043694824798810729599711121642874824985033642304544206951992904152693117162470043053586313484866450707438717423815237*i+21568784910930818660878083304693387421845476216733822568972747116901607016170531130213861981502705335559004534642929122590511862455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3256463722170526204601982779862059510345621182932576791289042003432555966817655252412588660561835016569477694428622457977984690448*i+4026249916639878828030573723130135558980376792788982215509187596434536654727522260408549521670349701248080221637423347479350052599)*x + (13767219108718640437162332464308934696716539528066100205499057738672970738159175290764955105048344424157586860136853223505000271249*i+6018232668804890218051758916232781265686040820947438565135712331565884450277904614554951829904075201376308750021728314557694953622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3256463722170526204601982779862059510345621182932576791289042003432555966817655252412588660561835016569477694428622457977984690448*i+4026249916639878828030573723130135558980376792788982215509187596434536654727522260408549521670349701248080221637423347479350052599)*x + (13767219108718640437162332464308934696716539528066100205499057738672970738159175290764955105048344424157586860136853223505000271249*i+6018232668804890218051758916232781265686040820947438565135712331565884450277904614554951829904075201376308750021728314557694953622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21423449694908524021205231404652885354079718657266322843502199139203201813915915972650953375821128615820943612401113124401291885927*i+16790143352053251112964678857864503648207416581755807773888310052936562397594886657277418810810716833466462701792902193449075300988)*x + (284546236798865719009707560689700431403688148177829192381111710725553850444212946329090618024374944869122197925606065552711594221*i+23830005062763772754536669042397501879417446822384049595548416869069889730971638453865797543815636503845318146229276654954483561084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21423449694908524021205231404652885354079718657266322843502199139203201813915915972650953375821128615820943612401113124401291885927*i+16790143352053251112964678857864503648207416581755807773888310052936562397594886657277418810810716833466462701792902193449075300988)*x + (284546236798865719009707560689700431403688148177829192381111710725553850444212946329090618024374944869122197925606065552711594221*i+23830005062763772754536669042397501879417446822384049595548416869069889730971638453865797543815636503845318146229276654954483561084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20728071565938773104140540586128968524883045801067500467649078516770392937749586223584737995961328309115723764257212758565630898870*i+12204466912426145528947670875251000140694657811943829634239801824720611325536700236249044507466358035152795476488627295153217703781)*x + (15149479833823222196623798921407456463085854019462188113999686831861817402230928834135162596978792622116377474754933594370696075393*i+14749677636304344735826007118466391026795861078144532216680192374133157278911897058826573346120791409190419575919878574946421841514) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20728071565938773104140540586128968524883045801067500467649078516770392937749586223584737995961328309115723764257212758565630898870*i+12204466912426145528947670875251000140694657811943829634239801824720611325536700236249044507466358035152795476488627295153217703781)*x + (15149479833823222196623798921407456463085854019462188113999686831861817402230928834135162596978792622116377474754933594370696075393*i+14749677636304344735826007118466391026795861078144532216680192374133157278911897058826573346120791409190419575919878574946421841514) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10448587734855129638253589251793094337244576038206165657677749483166037208581894087770934558120992360013606754463440828354723305357*i+14481392193230995830119279824558355553025717506421598926865316008917426878450142020549030767470689448230769580164520158495083272932)*x + (16754890271701237017198197028147594966399925684962302102501991978347082853545946773056904316877228743734778738013113423813506088941*i+4594032072975169505694418369279312057676908172700335088897859871353231772589943430330606404094080677689627993785671225131868185104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10448587734855129638253589251793094337244576038206165657677749483166037208581894087770934558120992360013606754463440828354723305357*i+14481392193230995830119279824558355553025717506421598926865316008917426878450142020549030767470689448230769580164520158495083272932)*x + (16754890271701237017198197028147594966399925684962302102501991978347082853545946773056904316877228743734778738013113423813506088941*i+4594032072975169505694418369279312057676908172700335088897859871353231772589943430330606404094080677689627993785671225131868185104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3991980946700848289731640708316872337585192508654318701202759369355611779046968652170867355934480299422002492757612229530581769264*i+23544674825463729811835410468169404011472225997619708305174465434441486001376170823467110881726660456655351651974006049330798159117)*x + (18283412237561501863492725868446879925046232850186214330585447683702993421199109750905978561308441416102215335143550344261837060875*i+3445275438027097847064206271984097340396615676638085231086294011324819565986219357234625557095277387015963222210733090675993306206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3991980946700848289731640708316872337585192508654318701202759369355611779046968652170867355934480299422002492757612229530581769264*i+23544674825463729811835410468169404011472225997619708305174465434441486001376170823467110881726660456655351651974006049330798159117)*x + (18283412237561501863492725868446879925046232850186214330585447683702993421199109750905978561308441416102215335143550344261837060875*i+3445275438027097847064206271984097340396615676638085231086294011324819565986219357234625557095277387015963222210733090675993306206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10330159425635059255586388665976195286528780951771379286750819688193915454235082164429617383236842488408369035692873458410648443754*i+15998556988380846991129311899177464225118102166144489558350741685847774914976546912832063886536445973736011204124084254004757290405)*x + (7245593635164481245033386923904436671121891842474995713343726321030113237321318361706195592317646262522663788590676626531836499019*i+11324301022831486845246968653969125826887785521135831141481385291806921326736109474097632312788194498121113727422323697136351296169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10330159425635059255586388665976195286528780951771379286750819688193915454235082164429617383236842488408369035692873458410648443754*i+15998556988380846991129311899177464225118102166144489558350741685847774914976546912832063886536445973736011204124084254004757290405)*x + (7245593635164481245033386923904436671121891842474995713343726321030113237321318361706195592317646262522663788590676626531836499019*i+11324301022831486845246968653969125826887785521135831141481385291806921326736109474097632312788194498121113727422323697136351296169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19174540725490603725537975051549466555899801774185945048674594072043147477162061730448924129823997434230737393072003727694236698909*i+22807134610562343884239920074835247317674034538197914603130403017720907026525176921684571638126010316781645683328367586528082628597)*x + (8957612421416161605208909482688346009910613249230686405419714581045216922128267630492172495635715019717467614494738569820725127940*i+7832463488856770147179293492879668949640809139081038574977825827630256304137668036293669002800607016958336565260227587616667931999) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19174540725490603725537975051549466555899801774185945048674594072043147477162061730448924129823997434230737393072003727694236698909*i+22807134610562343884239920074835247317674034538197914603130403017720907026525176921684571638126010316781645683328367586528082628597)*x + (8957612421416161605208909482688346009910613249230686405419714581045216922128267630492172495635715019717467614494738569820725127940*i+7832463488856770147179293492879668949640809139081038574977825827630256304137668036293669002800607016958336565260227587616667931999) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17888115772144474850038710579926078342530095491830552572468231449374130833237178440691634126591193360070718586340139008257737571422*i+4615314811974012679067726242286575190799851695507549056554330986094745754497843902068939900957082716444010574203683776677760472870)*x + (1967647059795682224280155470033784584971873428126191886497853029672291594203283582424495477453287704499204677620268351420410328189*i+8888406753792244881551399483980355487813325310860930483130690646440420511711156853716061816926535356588590822605160822040212882285) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17888115772144474850038710579926078342530095491830552572468231449374130833237178440691634126591193360070718586340139008257737571422*i+4615314811974012679067726242286575190799851695507549056554330986094745754497843902068939900957082716444010574203683776677760472870)*x + (1967647059795682224280155470033784584971873428126191886497853029672291594203283582424495477453287704499204677620268351420410328189*i+8888406753792244881551399483980355487813325310860930483130690646440420511711156853716061816926535356588590822605160822040212882285) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13257476638068850162024346679601741086905727342530708485109968144855533018961404161996259923964265927978624549379437869686652070873*i+2334229032291048740709154271815267418744101730406019376179513926059037490792723493672970720553853443517963920806065698454546647628)*x + (545170244370415553261170862607893213034189920478761480490497059129409890008653987434359308863900741785627880437191317301905555406*i+18392990812656414261542885252144905127688223275964410443086795974650938010924106890879802747329121592961959557050381637216083410651) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13257476638068850162024346679601741086905727342530708485109968144855533018961404161996259923964265927978624549379437869686652070873*i+2334229032291048740709154271815267418744101730406019376179513926059037490792723493672970720553853443517963920806065698454546647628)*x + (545170244370415553261170862607893213034189920478761480490497059129409890008653987434359308863900741785627880437191317301905555406*i+18392990812656414261542885252144905127688223275964410443086795974650938010924106890879802747329121592961959557050381637216083410651) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472655118949060499895500211887296177570979103481943079185661097342166883792992462832398350928554696631456537390179055406519362129*i+16773922399319601647123764214658584213362003044026981126170187909553732832077414416395340685909709462596640164811096231924282370740)*x + (8441142830958747621249278831418466298959183847070451935554266532849927105921760016207950159994960313961301926549407296201161083978*i+8544685497917380749030672133052500335591100693718430032484798850521285670676128337390069776252559957114860981888864372815353940341) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472655118949060499895500211887296177570979103481943079185661097342166883792992462832398350928554696631456537390179055406519362129*i+16773922399319601647123764214658584213362003044026981126170187909553732832077414416395340685909709462596640164811096231924282370740)*x + (8441142830958747621249278831418466298959183847070451935554266532849927105921760016207950159994960313961301926549407296201161083978*i+8544685497917380749030672133052500335591100693718430032484798850521285670676128337390069776252559957114860981888864372815353940341) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24339411171561616738309656574785088565227595931846798194685390002796769566550978588417797766209378787528720294509290601514358532185*i+2534114865135856417276173572194468688332790252980865392483411291233065920661718843195123776065233729684551701472561357634796555717)*x + (15299051284049707426173159270976058330712745884937177865937029744697933841272771278622855359537608538867781273102217830382877602980*i+17341459578183960370216387304369285344077867190453828433269874057877334773783306570919846838226245683783974427732510693303127426834) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24339411171561616738309656574785088565227595931846798194685390002796769566550978588417797766209378787528720294509290601514358532185*i+2534114865135856417276173572194468688332790252980865392483411291233065920661718843195123776065233729684551701472561357634796555717)*x + (15299051284049707426173159270976058330712745884937177865937029744697933841272771278622855359537608538867781273102217830382877602980*i+17341459578183960370216387304369285344077867190453828433269874057877334773783306570919846838226245683783974427732510693303127426834) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5446765878040037983655933731020068263291996721553499540513109018716277687397751409131474012382905826423709122995540876469569913183*i+8216114796178046183191178897487549643105723078779641995116979724835554760795822459178501523394319430837900553674076617584870223014)*x + (22484025085599701294964956362334798789258973953683816449257204870684318452071996396182284552562817920155222900176075986246256306346*i+22445705066582537458185410997852387820429024050728883330338909079234423866834492636282114107340073211202328134271332846168243514850) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5446765878040037983655933731020068263291996721553499540513109018716277687397751409131474012382905826423709122995540876469569913183*i+8216114796178046183191178897487549643105723078779641995116979724835554760795822459178501523394319430837900553674076617584870223014)*x + (22484025085599701294964956362334798789258973953683816449257204870684318452071996396182284552562817920155222900176075986246256306346*i+22445705066582537458185410997852387820429024050728883330338909079234423866834492636282114107340073211202328134271332846168243514850) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5148786423595747495859827899028066548759863640748641415236842959625167325562995720875619231448793014747512027029556688821473915942*i+19155472751789949270940799187319715387336010566637748057923274498182975670437095396096600403652545405264996710539522505811125892014)*x + (9590458412717472934354819156424440482700793525898684209830053098685765317243487105513439870371855850584670877130046985104549716376*i+23896710132011832428625305900397667944177366463083327857958175277249268323773728429984867224286805143067776129393465884775259343470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5148786423595747495859827899028066548759863640748641415236842959625167325562995720875619231448793014747512027029556688821473915942*i+19155472751789949270940799187319715387336010566637748057923274498182975670437095396096600403652545405264996710539522505811125892014)*x + (9590458412717472934354819156424440482700793525898684209830053098685765317243487105513439870371855850584670877130046985104549716376*i+23896710132011832428625305900397667944177366463083327857958175277249268323773728429984867224286805143067776129393465884775259343470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22407313603506274082947837554050090019788620413624325301896545031469019379476000096115484590642340516530976686543817245979664298281*i+12416664719355960517376086970121655018869678393039006636055029420536521351544170600426840204984611892085229306135874965899028547282)*x + (7332142570305486961141507180929925049083243739271779123683023815330126955062595399372393139237772743304311708203231419399162984395*i+24374904589258853098549228670661600369560752262773402194610311083834739417396378054876982433900527128155491930153293930342616293540) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22407313603506274082947837554050090019788620413624325301896545031469019379476000096115484590642340516530976686543817245979664298281*i+12416664719355960517376086970121655018869678393039006636055029420536521351544170600426840204984611892085229306135874965899028547282)*x + (7332142570305486961141507180929925049083243739271779123683023815330126955062595399372393139237772743304311708203231419399162984395*i+24374904589258853098549228670661600369560752262773402194610311083834739417396378054876982433900527128155491930153293930342616293540) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13327450658939823467006555710831952351225915814302823647808794261656700832766848834739504062686936329611746915975943702256137906269*i+10230534864953977537500619365045200760116747447757878951075658833161424447421232195460339086170240398275324079814184355307150469712)*x + (24130681817336773370131748106726842941763714779651898916816718661936481721146561494585999547033461714760505133916011515917810919935*i+11890775660558664633898016931810257634936638774854039313898936372200119841341861684731094618169096341286975709492791977744188004960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13327450658939823467006555710831952351225915814302823647808794261656700832766848834739504062686936329611746915975943702256137906269*i+10230534864953977537500619365045200760116747447757878951075658833161424447421232195460339086170240398275324079814184355307150469712)*x + (24130681817336773370131748106726842941763714779651898916816718661936481721146561494585999547033461714760505133916011515917810919935*i+11890775660558664633898016931810257634936638774854039313898936372200119841341861684731094618169096341286975709492791977744188004960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1962301848927109651452234360205788892736940145773235462739363706398931294449982708715156882003220118134533273425392024831773377678*i+122448422683103043589343402658394978144856436498792626170589579743931521782173052834410111680252943841689007147921703562387449441)*x + (3644097757608733413815108254357164156238933378840441808411999604702242516867443966396655171536562963079668702258787679323022496862*i+12807217636796579931982922877209216728366271805012899927930062516695283245407232667390750010005603884045849237560005659793051476893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1962301848927109651452234360205788892736940145773235462739363706398931294449982708715156882003220118134533273425392024831773377678*i+122448422683103043589343402658394978144856436498792626170589579743931521782173052834410111680252943841689007147921703562387449441)*x + (3644097757608733413815108254357164156238933378840441808411999604702242516867443966396655171536562963079668702258787679323022496862*i+12807217636796579931982922877209216728366271805012899927930062516695283245407232667390750010005603884045849237560005659793051476893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2467332475134462256419468962530479402046785797050465678752887884030112900579044161193993500830349548636906247206080476543554494705*i+69369462041819736559998969560279624206449103081009787946420077212651048809918224299768750117361966405771041002606354299019020663)*x + (20479328948552211694270239044934903192957077413209785368179086684905404387584358192773261688270954740770169641511813480292856974183*i+8118213190699298417007639923592356040114439022991759450593397677707441360627385656834674863025558599907447558499993213598313888956) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2467332475134462256419468962530479402046785797050465678752887884030112900579044161193993500830349548636906247206080476543554494705*i+69369462041819736559998969560279624206449103081009787946420077212651048809918224299768750117361966405771041002606354299019020663)*x + (20479328948552211694270239044934903192957077413209785368179086684905404387584358192773261688270954740770169641511813480292856974183*i+8118213190699298417007639923592356040114439022991759450593397677707441360627385656834674863025558599907447558499993213598313888956) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6851655268863190587121453617325145037573640786550956314757130537606819713721026646797887199231219236905094822986069105945539632600*i+5660829311832872619082741783022314098703994097074068735594743173201645317557349355510410533497921555536292536618928176254422653608)*x + (20119345881984619601109896065767424291361383777712455000415337541227549824235461076136841894093989449982061264232148120037365446067*i+7081258173811755379817478193079080198722430865141929113172344281689769743569256067864580196488341212289940144585138205078652484424) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6851655268863190587121453617325145037573640786550956314757130537606819713721026646797887199231219236905094822986069105945539632600*i+5660829311832872619082741783022314098703994097074068735594743173201645317557349355510410533497921555536292536618928176254422653608)*x + (20119345881984619601109896065767424291361383777712455000415337541227549824235461076136841894093989449982061264232148120037365446067*i+7081258173811755379817478193079080198722430865141929113172344281689769743569256067864580196488341212289940144585138205078652484424) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15572547321151010032430680166713883938689125889384075479348456520545855134801787823617449638944029551804049507726559383564548463594*i+21646921298642833799333391640375041613840765900295756721368812398102327428511246035744366876459988659033249166080867847976487367392)*x + (14345758552976722926458957721711096380436470000623900610563617869589246033138564063244634019147808431563723602279896432364224226319*i+5333443176461256931672717900802943099919320380833567223973302440177994671194499914593029770894562798141943374514637341436064994444) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15572547321151010032430680166713883938689125889384075479348456520545855134801787823617449638944029551804049507726559383564548463594*i+21646921298642833799333391640375041613840765900295756721368812398102327428511246035744366876459988659033249166080867847976487367392)*x + (14345758552976722926458957721711096380436470000623900610563617869589246033138564063244634019147808431563723602279896432364224226319*i+5333443176461256931672717900802943099919320380833567223973302440177994671194499914593029770894562798141943374514637341436064994444) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17012265971328488605013748943565372572842414460091956078466718489826876985534842282196189727184420552734312156869065143649047798450*i+12030908291908064729213703315468404281931955754781615285243619610393238841600051567634524061793593651764770320911000586110692855044)*x + (4441899662742359266407547624591725967279815892498816935731049367494164581656787190690506073047389494936854778675441708120142724982*i+22915249173579685620495061195574498109051202293135075203122003600487903449820540053402813297180327935616960849399904252057336431085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17012265971328488605013748943565372572842414460091956078466718489826876985534842282196189727184420552734312156869065143649047798450*i+12030908291908064729213703315468404281931955754781615285243619610393238841600051567634524061793593651764770320911000586110692855044)*x + (4441899662742359266407547624591725967279815892498816935731049367494164581656787190690506073047389494936854778675441708120142724982*i+22915249173579685620495061195574498109051202293135075203122003600487903449820540053402813297180327935616960849399904252057336431085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6014381629228264047282329377575862485407586997405605165563546565865042492177350349674363051618997809954580176652160311501538724661*i+15037724442210541703537140151273342947443027462967730476046879716248893963293221710698551253580005609193011754074994682145751027149)*x + (21370683280775279695680352914278128804551960435537455256686948460358713462663458558568784428337750618421773615207526745247945103929*i+13215131785713842860477036690867649143924169087132824500701176071086483348811217178030009582982418826851761914160447042152212397288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6014381629228264047282329377575862485407586997405605165563546565865042492177350349674363051618997809954580176652160311501538724661*i+15037724442210541703537140151273342947443027462967730476046879716248893963293221710698551253580005609193011754074994682145751027149)*x + (21370683280775279695680352914278128804551960435537455256686948460358713462663458558568784428337750618421773615207526745247945103929*i+13215131785713842860477036690867649143924169087132824500701176071086483348811217178030009582982418826851761914160447042152212397288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24209822870837639864854793313931995917227187181888407583877916640042139454290995813339421158405400621024448932276706010864844554380*i+23180816730692380543873495665774754846599292844957776104357074444009935117966709520299080258796694386067049617183226446166640414137)*x + (7233417405988143101355565685789106926480544122020811822254000475275887596070057885702854831903433389015822595282298116345963741048*i+2315678332463534043168000313666602196173943184631499858328605160055770431688933796507200887150321298888284154689732846789113939282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24209822870837639864854793313931995917227187181888407583877916640042139454290995813339421158405400621024448932276706010864844554380*i+23180816730692380543873495665774754846599292844957776104357074444009935117966709520299080258796694386067049617183226446166640414137)*x + (7233417405988143101355565685789106926480544122020811822254000475275887596070057885702854831903433389015822595282298116345963741048*i+2315678332463534043168000313666602196173943184631499858328605160055770431688933796507200887150321298888284154689732846789113939282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12213463741564670338690394664489704086113641231967490581938989400640594584536050757280894885212869659670696847612328618816367609146*i+1793643080469903330210769723319734229100509301274513490715737869475340138676924752283512732741741494414080306312531179411179557411)*x + (11273970219949920323927516421175989642765703112487823455528521009569884255051718496798508952877432621842238491613691459747280918318*i+15537785940316204849469320373114447849551534895015363419409278503225436316904667758472103460291953036986654022394269332947855841503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12213463741564670338690394664489704086113641231967490581938989400640594584536050757280894885212869659670696847612328618816367609146*i+1793643080469903330210769723319734229100509301274513490715737869475340138676924752283512732741741494414080306312531179411179557411)*x + (11273970219949920323927516421175989642765703112487823455528521009569884255051718496798508952877432621842238491613691459747280918318*i+15537785940316204849469320373114447849551534895015363419409278503225436316904667758472103460291953036986654022394269332947855841503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13952951678564058255132772526870843359964665050634944793719087516478860312617419236584354183558890695155599645858711425306295471043*i+5814622425255486938785118134262923495418220384091872203322733454607675618725235012058762879010855231989686993082279785562864948126)*x + (15441341690229697017444132436521249934372272469623985650930106890078207308575761749875133241535783007173985487348972204374031618214*i+8332745867797927161932118921859639445458783134125698820850795152770279629200493664622769694815712700729559092550259537716939167085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13952951678564058255132772526870843359964665050634944793719087516478860312617419236584354183558890695155599645858711425306295471043*i+5814622425255486938785118134262923495418220384091872203322733454607675618725235012058762879010855231989686993082279785562864948126)*x + (15441341690229697017444132436521249934372272469623985650930106890078207308575761749875133241535783007173985487348972204374031618214*i+8332745867797927161932118921859639445458783134125698820850795152770279629200493664622769694815712700729559092550259537716939167085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8641839563583196391270203582058005047937711090856012526727064709764016848121999914506886655187924993980140804490308183011603298666*i+13671035683763968455680773638583718047095787669051398839456441181511940962806233314520993932619283578364276868886820745188929000232)*x + (14909040380209733680753069212852888302953186921524507700527312476279974357905141701889351165334071201905888843364290344564568969061*i+16641660780684899353543915466474645176293791918989706144408891580113883843779539567706536734566128747655206780178172232800536516113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8641839563583196391270203582058005047937711090856012526727064709764016848121999914506886655187924993980140804490308183011603298666*i+13671035683763968455680773638583718047095787669051398839456441181511940962806233314520993932619283578364276868886820745188929000232)*x + (14909040380209733680753069212852888302953186921524507700527312476279974357905141701889351165334071201905888843364290344564568969061*i+16641660780684899353543915466474645176293791918989706144408891580113883843779539567706536734566128747655206780178172232800536516113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21805613792198397453569314262465698429277857440219982699951711146484973074211821812585157267163820313169128080343420097535555933618*i+15013191741130691728748316375057541479791556747318581890603555201419046364012533156967160604720222476097898122001662654166832579616)*x + (12552548195386983695522688707388165859632099607164239522084852046230496854873304874802948495923518727085322308825972420102760196649*i+846621726184359214310685325852959284242098019336041863087282318655781582331148686300358705989159516838836667378552429948949985274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21805613792198397453569314262465698429277857440219982699951711146484973074211821812585157267163820313169128080343420097535555933618*i+15013191741130691728748316375057541479791556747318581890603555201419046364012533156967160604720222476097898122001662654166832579616)*x + (12552548195386983695522688707388165859632099607164239522084852046230496854873304874802948495923518727085322308825972420102760196649*i+846621726184359214310685325852959284242098019336041863087282318655781582331148686300358705989159516838836667378552429948949985274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9025927351375711455048383153907388941136992463333275564358614377484257221163880018837690067754174563861207774105768387435498320666*i+22683731582880205206810260507199129893172204830689834521581950246402188028789062801063878245088691714192424768601958014850492508390)*x + (10034698910030334776075687918038181417060590690649537028910569441112681224799016313824768684238261975390392161993732315081867929340*i+3411664532895862970970474448718041223743438959976350205374551902379385729203412705136114922899013943238699612850889111753377495510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9025927351375711455048383153907388941136992463333275564358614377484257221163880018837690067754174563861207774105768387435498320666*i+22683731582880205206810260507199129893172204830689834521581950246402188028789062801063878245088691714192424768601958014850492508390)*x + (10034698910030334776075687918038181417060590690649537028910569441112681224799016313824768684238261975390392161993732315081867929340*i+3411664532895862970970474448718041223743438959976350205374551902379385729203412705136114922899013943238699612850889111753377495510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14597744293898686943886388733564121409132962263633670294416811023571119709160986076670691474063068279763928439288675805031431766690*i+16020601484550280789266549215100950581943219752185543083259981709623922132876472993621173249762998865046676837611836050644275951581)*x + (11641538405578879197252552049886533950938806391093106278160252443346402558355748346471457300493112212627288070280625461704671680316*i+5501129765628478840910273038683383038979438609780910076480726275345526485095983761919309525750737023651808644057923703634402981301) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14597744293898686943886388733564121409132962263633670294416811023571119709160986076670691474063068279763928439288675805031431766690*i+16020601484550280789266549215100950581943219752185543083259981709623922132876472993621173249762998865046676837611836050644275951581)*x + (11641538405578879197252552049886533950938806391093106278160252443346402558355748346471457300493112212627288070280625461704671680316*i+5501129765628478840910273038683383038979438609780910076480726275345526485095983761919309525750737023651808644057923703634402981301) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5567422735645692555379896521132148542730649036220322481232197974183304837768586748305225987887278643858014172494739570771668812494*i+6847140615910218326957557627609145876138976698162796970071524339993688244328330425855699204282735009496692047288221053973837528834)*x + (23311833933025857190698989100237184993452571213482307355388285466141919457583053174069853082753729440592159366758032393728129064365*i+2827442474881998661648634162888556216774430523579597931301836492464664469677159221138398802905773386757358586924352642792514322548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5567422735645692555379896521132148542730649036220322481232197974183304837768586748305225987887278643858014172494739570771668812494*i+6847140615910218326957557627609145876138976698162796970071524339993688244328330425855699204282735009496692047288221053973837528834)*x + (23311833933025857190698989100237184993452571213482307355388285466141919457583053174069853082753729440592159366758032393728129064365*i+2827442474881998661648634162888556216774430523579597931301836492464664469677159221138398802905773386757358586924352642792514322548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7658057244330747099141934853532423116589646354249532120050284905236371108576867136707691908856548804719053456554160491784169373948*i+12805801431445645752284415641251917401632767467027664743959504822393955388638409876189043810782857197263342581508777666466363304911)*x + (15288722774902060217188739156861707854697073291980265111258785227660012640700293387206786541847507522828479258180057840634680796303*i+22904218755099762594669108094511438146385549745143402182431380839274785373011990798793378099528354092161889328879734757358039648704) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7658057244330747099141934853532423116589646354249532120050284905236371108576867136707691908856548804719053456554160491784169373948*i+12805801431445645752284415641251917401632767467027664743959504822393955388638409876189043810782857197263342581508777666466363304911)*x + (15288722774902060217188739156861707854697073291980265111258785227660012640700293387206786541847507522828479258180057840634680796303*i+22904218755099762594669108094511438146385549745143402182431380839274785373011990798793378099528354092161889328879734757358039648704) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14467423518982857711862189350362812109772008879036385372348108135371878129476628758273077684234698401413916569936959438108847848175*i+18641452286598171321964743831182647402403516493681479747687811706346763738668790015053396688501112833032688888277833279140097064046)*x + (3717471828881571160950035299976577590600464141372669717011104893262916442748019724757913606495968365058150012330662551438507907274*i+11408194395909584598144718225568490009674321206517636809201272063305965397730086984210480698587147438350919874975972709493037699683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14467423518982857711862189350362812109772008879036385372348108135371878129476628758273077684234698401413916569936959438108847848175*i+18641452286598171321964743831182647402403516493681479747687811706346763738668790015053396688501112833032688888277833279140097064046)*x + (3717471828881571160950035299976577590600464141372669717011104893262916442748019724757913606495968365058150012330662551438507907274*i+11408194395909584598144718225568490009674321206517636809201272063305965397730086984210480698587147438350919874975972709493037699683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15806287745196807891724205552746106404343079587469060750041747731625742079690584149821848843484834925461218655233293055356819432051*i+14715308534779434340562683524900445333956260899668501205975665041917388014873638852796378542796547026835689551650203890552681768454)*x + (3232307160737668533737458230264515557511305178713283773224123014420438437480137248901970553491139098161398144263974858718469353540*i+13616687474811617804020345241119698849669353321471956012721766528312071731473718362219710529353351841786357638131530310582533609090) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15806287745196807891724205552746106404343079587469060750041747731625742079690584149821848843484834925461218655233293055356819432051*i+14715308534779434340562683524900445333956260899668501205975665041917388014873638852796378542796547026835689551650203890552681768454)*x + (3232307160737668533737458230264515557511305178713283773224123014420438437480137248901970553491139098161398144263974858718469353540*i+13616687474811617804020345241119698849669353321471956012721766528312071731473718362219710529353351841786357638131530310582533609090) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4852880616377896641093923839100414714714398360935074004712617259461877072164957578547425630874916196545846125346214983810626658592*i+12052811882186015868125606321605433836541295241190734526780294573513560022831858633156634555414496640301149639236841703526707420953)*x + (17600687791322538496159610338259936293703613020850327199866976776865135481240221760276508874332053876897584387528637055194411585336*i+6990671630842314457604881550924671564656940234493261661687647614209978193026808214845748358635977374563177442556817914494003536806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4852880616377896641093923839100414714714398360935074004712617259461877072164957578547425630874916196545846125346214983810626658592*i+12052811882186015868125606321605433836541295241190734526780294573513560022831858633156634555414496640301149639236841703526707420953)*x + (17600687791322538496159610338259936293703613020850327199866976776865135481240221760276508874332053876897584387528637055194411585336*i+6990671630842314457604881550924671564656940234493261661687647614209978193026808214845748358635977374563177442556817914494003536806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (619763163605674014800748008101458658617153069854423764931119058083985621456212012855090555215638652283807596437033869885702322967*i+19996877748420735424108626055178051307847742392000501307155671254091367610696087769049204428084393992314382850175572181536554429367)*x + (11159515907622438454514660987736079606601303417320962235330994592496994291788269790018416416808842853948599953282541068011017032933*i+2344684531979942314996440953324783917807647243061049757551991994958013071220917985327989486671833390981696606807903810166173736782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (619763163605674014800748008101458658617153069854423764931119058083985621456212012855090555215638652283807596437033869885702322967*i+19996877748420735424108626055178051307847742392000501307155671254091367610696087769049204428084393992314382850175572181536554429367)*x + (11159515907622438454514660987736079606601303417320962235330994592496994291788269790018416416808842853948599953282541068011017032933*i+2344684531979942314996440953324783917807647243061049757551991994958013071220917985327989486671833390981696606807903810166173736782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21646706807824189409838863944506537151168650802018007679090316053123513254811078588850957336518682805305318986925794057059535238607*i+2678723304953823910738003369868618010887542969364337856166660835946191601703359716817445258967578310138529229545926669948064615587)*x + (14185979684766617780947938621562962299579538040997833026849029558449807195104944209336254441969350553206123027563252115596156768210*i+1571229398990731906049515600934115654597244067465605868269043139239991804439447573274821485936861082726326550913640188209415209812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21646706807824189409838863944506537151168650802018007679090316053123513254811078588850957336518682805305318986925794057059535238607*i+2678723304953823910738003369868618010887542969364337856166660835946191601703359716817445258967578310138529229545926669948064615587)*x + (14185979684766617780947938621562962299579538040997833026849029558449807195104944209336254441969350553206123027563252115596156768210*i+1571229398990731906049515600934115654597244067465605868269043139239991804439447573274821485936861082726326550913640188209415209812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19113469826467461536875565063305886954050640933316484777341237001669479543237191347186166571706976870364918801031435622854196699390*i+206386511670573603431485407272201480124149991370161462344186097597767452743472950585536372115906009674844599513604375596816310550)*x + (6333923503960770005098423074534377460465605165876457387438649376275465134144260773241960692918228948177773293101967544168785878708*i+6275630416228791662208160070506195829025999753415400191583720692045467115606297422700323952708526139169448296586502342214849576085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19113469826467461536875565063305886954050640933316484777341237001669479543237191347186166571706976870364918801031435622854196699390*i+206386511670573603431485407272201480124149991370161462344186097597767452743472950585536372115906009674844599513604375596816310550)*x + (6333923503960770005098423074534377460465605165876457387438649376275465134144260773241960692918228948177773293101967544168785878708*i+6275630416228791662208160070506195829025999753415400191583720692045467115606297422700323952708526139169448296586502342214849576085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2326071968406765424316379724706651953791640369385486450210592899942261560216186208271680792949549777038460268495011491329161121923*i+8462367502034194023235853007124692897090556972362572865165179178452569899687328177785509695039061820744233126460324533809595412818)*x + (19830516397867186741102881668006784063188857445503196371122295948498472375573034054573564036880763275473172349862471047721224154215*i+16908150258530869893435857718527262989173137206283159289752228232163860413130114705815780201803255391883113018561513597944449491480) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2326071968406765424316379724706651953791640369385486450210592899942261560216186208271680792949549777038460268495011491329161121923*i+8462367502034194023235853007124692897090556972362572865165179178452569899687328177785509695039061820744233126460324533809595412818)*x + (19830516397867186741102881668006784063188857445503196371122295948498472375573034054573564036880763275473172349862471047721224154215*i+16908150258530869893435857718527262989173137206283159289752228232163860413130114705815780201803255391883113018561513597944449491480) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6778599641500536499306090809333907437077349945288758148956828581835155677979408008220422432088198254464618516833265165336237794257*i+22051236218865265943987627549312599294201113870081983089715429102543076292538322953940400057209955015208440470712715273475816249305)*x + (22356791629151248488221017111844371219406051086624936299625002657299163385402230935531545389920097937959021060314827447534559114217*i+19101935952839372786648749073646630540356930335411813963675218736329691440978754498006217768516713410568810808055076195419629728678) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6778599641500536499306090809333907437077349945288758148956828581835155677979408008220422432088198254464618516833265165336237794257*i+22051236218865265943987627549312599294201113870081983089715429102543076292538322953940400057209955015208440470712715273475816249305)*x + (22356791629151248488221017111844371219406051086624936299625002657299163385402230935531545389920097937959021060314827447534559114217*i+19101935952839372786648749073646630540356930335411813963675218736329691440978754498006217768516713410568810808055076195419629728678) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18946437889844080476758580650720146658975903570025215256588024818187297234068891046723849864328751454586392191886057541781911802434*i+5760777408382504585184404587364227281078912972344901423546511792580785898128948173263124307467915375616613851713646922210975644158)*x + (5090893431669356166202945563210067130959225880361469201039838782278532967668873009819487445043473749025927908834290436705071614074*i+1843285269468587936324171103321318682799426259828097014034914894021359686687735340011946109263456859439909994319300030679651385012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18946437889844080476758580650720146658975903570025215256588024818187297234068891046723849864328751454586392191886057541781911802434*i+5760777408382504585184404587364227281078912972344901423546511792580785898128948173263124307467915375616613851713646922210975644158)*x + (5090893431669356166202945563210067130959225880361469201039838782278532967668873009819487445043473749025927908834290436705071614074*i+1843285269468587936324171103321318682799426259828097014034914894021359686687735340011946109263456859439909994319300030679651385012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15808540320004775553660579058764637398910513755945893792170909240049058538709499982728146310782297018174337727558665031539321399157*i+405002877607241499665434407639042102273672092112022921972519879573156347159969942987264363812414595932114092162801633356226141835)*x + (6883035841810986601876258128649249321535687972266451057085210476316987359205650038141805974088477984065056461758139643151596003838*i+17535978681378415798786240404770973938865756080228847929781466015767795118685133332113637220755687618076731983669990131850307192979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15808540320004775553660579058764637398910513755945893792170909240049058538709499982728146310782297018174337727558665031539321399157*i+405002877607241499665434407639042102273672092112022921972519879573156347159969942987264363812414595932114092162801633356226141835)*x + (6883035841810986601876258128649249321535687972266451057085210476316987359205650038141805974088477984065056461758139643151596003838*i+17535978681378415798786240404770973938865756080228847929781466015767795118685133332113637220755687618076731983669990131850307192979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12063802455646271548289996195749081197211011994332433056537492224035710024146001637982530776034445950300287093836933586548153094121*i+7715331430687231971658742098568170717800192895485125688295934876855898056836184834494125838412360277701204381301018213812493304044)*x + (15699585566327767129780971311335703940195781977998782741177757191992328706246820622949152108920598567084316360185951785099205827272*i+15041319060540778390691155873222566928754960119162792627420100311690569993005893710481153911102351078085238621199428970007760900027) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12063802455646271548289996195749081197211011994332433056537492224035710024146001637982530776034445950300287093836933586548153094121*i+7715331430687231971658742098568170717800192895485125688295934876855898056836184834494125838412360277701204381301018213812493304044)*x + (15699585566327767129780971311335703940195781977998782741177757191992328706246820622949152108920598567084316360185951785099205827272*i+15041319060540778390691155873222566928754960119162792627420100311690569993005893710481153911102351078085238621199428970007760900027) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15115770051842639239399746188753651430545217425332192187456803851107644457080235635192866868772468788729630514739062954169874438973*i+3019666563126373299770947584805687211422040609033768826864927352230285037478792843073784950584932086227978738832139044089794012321)*x + (20997137950336231160934828930846939723576647278919609074931254316991990191523602695141170744583269478242129877079368138057234908679*i+11456964931460753738530352615918371260446125563521129587335600106552340251199406014732389095840185650121775722792445889225383313784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15115770051842639239399746188753651430545217425332192187456803851107644457080235635192866868772468788729630514739062954169874438973*i+3019666563126373299770947584805687211422040609033768826864927352230285037478792843073784950584932086227978738832139044089794012321)*x + (20997137950336231160934828930846939723576647278919609074931254316991990191523602695141170744583269478242129877079368138057234908679*i+11456964931460753738530352615918371260446125563521129587335600106552340251199406014732389095840185650121775722792445889225383313784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14567741676572469432327505853646998773201810874102063989228234164987905491367072543088381296418450986130883354830476901614446234469*i+15458556790767178738604183857551705645793759300556088002276337946887714485188174648620072597516993693138888456355437386087215644675)*x + (14375372226224255199112602988983006191481440186706683583521145189533659595506636485464467087169107060353950649076361331256552434504*i+14835026636229862101474220694808055169712313384720542112173074605065581172966677543651039038570071562092736764776904697827098959536) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14567741676572469432327505853646998773201810874102063989228234164987905491367072543088381296418450986130883354830476901614446234469*i+15458556790767178738604183857551705645793759300556088002276337946887714485188174648620072597516993693138888456355437386087215644675)*x + (14375372226224255199112602988983006191481440186706683583521145189533659595506636485464467087169107060353950649076361331256552434504*i+14835026636229862101474220694808055169712313384720542112173074605065581172966677543651039038570071562092736764776904697827098959536) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18761737245259222353535874334617101810300092674170625794121150061512460555381375807831529436941968675374817398865578715999255969873*i+178652608385292949786104625461373767647458542186875001148914777543300514976295922566429172858190702021301393048806922279210931736)*x + (14837830485938674914083958528296849733207294783663689872791437403359062267653533404442372014704201236493671582885458432323396925619*i+9780423187507807857488113629678690171742473405897465431352932869581284395605444220808074349926575546252200300447924710362613174346) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18761737245259222353535874334617101810300092674170625794121150061512460555381375807831529436941968675374817398865578715999255969873*i+178652608385292949786104625461373767647458542186875001148914777543300514976295922566429172858190702021301393048806922279210931736)*x + (14837830485938674914083958528296849733207294783663689872791437403359062267653533404442372014704201236493671582885458432323396925619*i+9780423187507807857488113629678690171742473405897465431352932869581284395605444220808074349926575546252200300447924710362613174346) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23982756140180036908695189973246124509891436910883446047368644615730681613770286740574072637095182024524057643375579990791268260240*i+21868079206658319625518405317062959473077901388154418116871813299577771770376129601483978962092821747804868054572191773286833714559)*x + (11049308569131944382834508923550028685790405603078373023489013008287171923127266053794209095426673304753973051316658734281045479648*i+16240661487898996632989866005126045656163955900744373482120976608433343738237490504917593374721625576249074166515221027374796474697) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23982756140180036908695189973246124509891436910883446047368644615730681613770286740574072637095182024524057643375579990791268260240*i+21868079206658319625518405317062959473077901388154418116871813299577771770376129601483978962092821747804868054572191773286833714559)*x + (11049308569131944382834508923550028685790405603078373023489013008287171923127266053794209095426673304753973051316658734281045479648*i+16240661487898996632989866005126045656163955900744373482120976608433343738237490504917593374721625576249074166515221027374796474697) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3107346039803250164439456808118533306152931067912922085954125429111532814810990625619532259153985429290796018636593404369626513647*i+10794578585662531637898954685720712384845710855692977834267190186970365604983729270610215320443213731253131051849766756852263860642)*x + (19051476073416657345564787034838525923768239075975913774405753633967835797731627856574060963855708177759187988948027389692618542295*i+20489847997711142056970056648449840252249516939494912060239142934443320826410127988950826709622983644945342337790627711365437264123) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3107346039803250164439456808118533306152931067912922085954125429111532814810990625619532259153985429290796018636593404369626513647*i+10794578585662531637898954685720712384845710855692977834267190186970365604983729270610215320443213731253131051849766756852263860642)*x + (19051476073416657345564787034838525923768239075975913774405753633967835797731627856574060963855708177759187988948027389692618542295*i+20489847997711142056970056648449840252249516939494912060239142934443320826410127988950826709622983644945342337790627711365437264123) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (355122934300595117138145985530151212120047328212017528345025130109855320711108306204084386242109336193397566209731484103906666520*i+12380134903876470328495684314375775125554558959686227344076502193879714960219610550361359273370548963950790702706574359069686403693)*x + (3935759171220683886249515365973640815049975703589829635598422759726485639841089386714297631894698925923709727721997585228988196053*i+22361282105746043186295585830609209645841554913292574173016036425969146440053642564884002051520203324629062107937463681999458150721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (355122934300595117138145985530151212120047328212017528345025130109855320711108306204084386242109336193397566209731484103906666520*i+12380134903876470328495684314375775125554558959686227344076502193879714960219610550361359273370548963950790702706574359069686403693)*x + (3935759171220683886249515365973640815049975703589829635598422759726485639841089386714297631894698925923709727721997585228988196053*i+22361282105746043186295585830609209645841554913292574173016036425969146440053642564884002051520203324629062107937463681999458150721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13668948076372528466939541708060254460859869688470502951435933700132136731960682028158731245198367905082825306990593292805454813156*i+2894849827002713808586682336870621807599467071706984802533709000940803391676277378490077437537602275092390913007707049283549847705)*x + (22334572442101659053114969790105081672490666122654194744355040286309228100443991126115193054654550017867290626813014523366371691115*i+15067982621118800920495883055469402584928022507699217614442765544741182333720072581249512012194974419435457511906944913652463514779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13668948076372528466939541708060254460859869688470502951435933700132136731960682028158731245198367905082825306990593292805454813156*i+2894849827002713808586682336870621807599467071706984802533709000940803391676277378490077437537602275092390913007707049283549847705)*x + (22334572442101659053114969790105081672490666122654194744355040286309228100443991126115193054654550017867290626813014523366371691115*i+15067982621118800920495883055469402584928022507699217614442765544741182333720072581249512012194974419435457511906944913652463514779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7193470633166866670732097324037738408628845298598715841812521706998932666435336434772376347417647688526394738546227310708279975672*i+16219307454626755495648173217978465523922533814825311630991870215655536307721277014928641216866589156293999569964113698828348681737)*x + (8405908830818588461840169931957092891163504415104186185832205925346119804732673045854296323851179692516708990592115437349477165097*i+21300237038866845222599743938506243487881651860071356365560769424495694896676423572476526410163842807041045485397097905513062043022) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7193470633166866670732097324037738408628845298598715841812521706998932666435336434772376347417647688526394738546227310708279975672*i+16219307454626755495648173217978465523922533814825311630991870215655536307721277014928641216866589156293999569964113698828348681737)*x + (8405908830818588461840169931957092891163504415104186185832205925346119804732673045854296323851179692516708990592115437349477165097*i+21300237038866845222599743938506243487881651860071356365560769424495694896676423572476526410163842807041045485397097905513062043022) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14803457926863958534252537784809068158492355200775025122688331817854364202950527318999490884924660886923860582754273727830295558693*i+17218395308199912092806079997209377255118296451154299222173028117270728259060039798257949101015705240206519726747798994895917598297)*x + (22266888435744454219380601763674083426286912112986614274323604719219604928259704540918326723539527978911979093547354693241592545750*i+7086440262729281076002475598885639140983263637977954566216773890372106736621075808244313073510717352249364755267873036572147454947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14803457926863958534252537784809068158492355200775025122688331817854364202950527318999490884924660886923860582754273727830295558693*i+17218395308199912092806079997209377255118296451154299222173028117270728259060039798257949101015705240206519726747798994895917598297)*x + (22266888435744454219380601763674083426286912112986614274323604719219604928259704540918326723539527978911979093547354693241592545750*i+7086440262729281076002475598885639140983263637977954566216773890372106736621075808244313073510717352249364755267873036572147454947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3514251836077200942465512597335987085992213461203706272042271053701183807997444922842985347088864855280268576114648928666237947169*i+14924800235908090998401257565612796409929449937772463526023307949107362297238458122542670204397250945377922770024557272497864088683)*x + (7743748156064524391606517048895926806139193074228194377102777999067483983425355116734007321119735667173335606197075926949953569274*i+17093532397278336554224024932880512496177928092476689540704623489043537568438861527794378538090350003485784444906750517339917152683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3514251836077200942465512597335987085992213461203706272042271053701183807997444922842985347088864855280268576114648928666237947169*i+14924800235908090998401257565612796409929449937772463526023307949107362297238458122542670204397250945377922770024557272497864088683)*x + (7743748156064524391606517048895926806139193074228194377102777999067483983425355116734007321119735667173335606197075926949953569274*i+17093532397278336554224024932880512496177928092476689540704623489043537568438861527794378538090350003485784444906750517339917152683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14634546789082560735750417665595678553316773565449506229178472698507225484641105841224367112615659120165291704974272199581471647875*i+42073614510875929050079396123990351795533526214811317585314789363131352149783332835965147364938247399321675526386776984669940920)*x + (17577350187888015045192065461938943214592587149607950863009557734242510898232854302222627411161892258275824413134290856448322668809*i+9358936102772481626928254178516944713022012025483733127514132373922035209405447251932917395921861813626774356859432431848915322162) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14634546789082560735750417665595678553316773565449506229178472698507225484641105841224367112615659120165291704974272199581471647875*i+42073614510875929050079396123990351795533526214811317585314789363131352149783332835965147364938247399321675526386776984669940920)*x + (17577350187888015045192065461938943214592587149607950863009557734242510898232854302222627411161892258275824413134290856448322668809*i+9358936102772481626928254178516944713022012025483733127514132373922035209405447251932917395921861813626774356859432431848915322162) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [88]:
Phi6 = isogeny_walk (E, R6, l_A, n_A)
Phi6
Out[88]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733563*x + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733543 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733563*x + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733543 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 76*x + 136 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 76*x + 136 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 716*x + (7168*i+1416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 716*x + (7168*i+1416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 5429956635679820238544507876784153799119369852804205466212715770360309099796328365598969540573061427300653757813961693326104602783*x + (9552585862836349576221257039873805077152974492974761613556810233271094874803288140457790198897121520298034821108831735669147011349*i+10859913271359640477089015753568307598238739705608410932425431540720618199592656731197939081146122854601307515627923386652209205550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 5429956635679820238544507876784153799119369852804205466212715770360309099796328365598969540573061427300653757813961693326104602783*x + (9552585862836349576221257039873805077152974492974761613556810233271094874803288140457790198897121520298034821108831735669147011349*i+10859913271359640477089015753568307598238739705608410932425431540720618199592656731197939081146122854601307515627923386652209205550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 19840662107705133042241603906457999048263707182192416666679820767510013094420200950485146327722057881513279062879395216255613732936*x + (7088270604488146563034716136011412743667742346864863808802870569623773757096163184166704018070232678360420256451775328759160300453*i+15241900554065044532574062801458504477441634120623236822033834198814804949508425175000075983615497317127839099065905493168912732289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 19840662107705133042241603906457999048263707182192416666679820767510013094420200950485146327722057881513279062879395216255613732936*x + (7088270604488146563034716136011412743667742346864863808802870569623773757096163184166704018070232678360420256451775328759160300453*i+15241900554065044532574062801458504477441634120623236822033834198814804949508425175000075983615497317127839099065905493168912732289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5123587609499155167335164537088816340638859311344668437487543659993909389656107413540997397912857567692230537604310013194783836922*i+12929187577181527712272647086561292945989504598490123713787624063681538854751297999723477265770937285720686369938438702980113106325)*x + (11795628540379625131463171320964971610675373025322260465629310661512980487776309587844591042921360209437372342713245152056097426326*i+6503481151687967741203081555077085636939080799748644840361386666013397153032799662123155257374557423864609476880339515196027206088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5123587609499155167335164537088816340638859311344668437487543659993909389656107413540997397912857567692230537604310013194783836922*i+12929187577181527712272647086561292945989504598490123713787624063681538854751297999723477265770937285720686369938438702980113106325)*x + (11795628540379625131463171320964971610675373025322260465629310661512980487776309587844591042921360209437372342713245152056097426326*i+6503481151687967741203081555077085636939080799748644840361386666013397153032799662123155257374557423864609476880339515196027206088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1768359548081866397964464575041860478037850615208974753749821426981280011913308570179787093336904796687038538626388986979024286560*i+3384671825265070177464006760525410611417999935345802885326590617563327288879185161480741464272172967378819742455568594654673969498)*x + (430436441718084362557910176554539032084688472549104814430247557511177809624558027477817632135981398668591805086273818850366315128*i+13092197789004704573610183120419399796715797246694905257675219993133735455440889605501020814642969018021414323675300871919481153924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1768359548081866397964464575041860478037850615208974753749821426981280011913308570179787093336904796687038538626388986979024286560*i+3384671825265070177464006760525410611417999935345802885326590617563327288879185161480741464272172967378819742455568594654673969498)*x + (430436441718084362557910176554539032084688472549104814430247557511177809624558027477817632135981398668591805086273818850366315128*i+13092197789004704573610183120419399796715797246694905257675219993133735455440889605501020814642969018021414323675300871919481153924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3190978212567458597739375744296727494645503426867940691048420714202196882686603370002113001836110740746099668292740036251126772075*i+23995599189756547284322287430293423206567467074101472346076098071939399051207903134135948189839295839958191665798599490084888977615)*x + (19503356256745343257654967775410290109655814577803685986165747188760521419421712771533088844980809868906260239623005602382462812291*i+16871002376126988661026717219081365393808967432306025714230390515739915287271406368378920384582659490970974397904405054554812030248) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3190978212567458597739375744296727494645503426867940691048420714202196882686603370002113001836110740746099668292740036251126772075*i+23995599189756547284322287430293423206567467074101472346076098071939399051207903134135948189839295839958191665798599490084888977615)*x + (19503356256745343257654967775410290109655814577803685986165747188760521419421712771533088844980809868906260239623005602382462812291*i+16871002376126988661026717219081365393808967432306025714230390515739915287271406368378920384582659490970974397904405054554812030248) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18782575427696502023259237863303437427754064852843104940026449960497212261776469566697696020381389925113437281302036439289527840115*i+7954129748156658717388358103116009223838461676006133771049285799657303592680521089034403400631336622193895526110838590153261662296)*x + (22120801587610602889121802230977988732662976058513302574655425543698986016746375848214678960085993191162259864001627739349482872351*i+21099178235098202342700195127621085707406882765962255942433848154873054346602008946196430766034977918036924343690692810557900250038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18782575427696502023259237863303437427754064852843104940026449960497212261776469566697696020381389925113437281302036439289527840115*i+7954129748156658717388358103116009223838461676006133771049285799657303592680521089034403400631336622193895526110838590153261662296)*x + (22120801587610602889121802230977988732662976058513302574655425543698986016746375848214678960085993191162259864001627739349482872351*i+21099178235098202342700195127621085707406882765962255942433848154873054346602008946196430766034977918036924343690692810557900250038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7848441197872928931696691794588312628875728065876070814620320060152137857482172113802543015079542977196836780210564340876276910672*i+9560492696101881311248355187935876514424076250733906380053509968475497943274787250559153578606324447095337228593879156007386940924)*x + (5575425221865300620464726757636801673479559160047466139704535704024130960131689927995556311624929910945273759786670196163027348680*i+9371519007734235671122461246113545400260982869987017420196710422792420640234412283440491768858944155723936040249851964028732384277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7848441197872928931696691794588312628875728065876070814620320060152137857482172113802543015079542977196836780210564340876276910672*i+9560492696101881311248355187935876514424076250733906380053509968475497943274787250559153578606324447095337228593879156007386940924)*x + (5575425221865300620464726757636801673479559160047466139704535704024130960131689927995556311624929910945273759786670196163027348680*i+9371519007734235671122461246113545400260982869987017420196710422792420640234412283440491768858944155723936040249851964028732384277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21746333639882171003086987499443613252200284710449854992358301083911245295272427584613549140585479777755520854496910320935225352981*i+15154501873162940295397931297786131441919818993160393237605865854472309866839428064735490317520138630894433527390947524436183974184)*x + (21928846939530205115154580574746306263609832752222223043427923796173278246984483855652220077604961339716060903586094095724494417531*i+14251810905229958586098598371519110587445748188022851715395819994704201179761354567022063154680863064812341436217127765310657634646) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21746333639882171003086987499443613252200284710449854992358301083911245295272427584613549140585479777755520854496910320935225352981*i+15154501873162940295397931297786131441919818993160393237605865854472309866839428064735490317520138630894433527390947524436183974184)*x + (21928846939530205115154580574746306263609832752222223043427923796173278246984483855652220077604961339716060903586094095724494417531*i+14251810905229958586098598371519110587445748188022851715395819994704201179761354567022063154680863064812341436217127765310657634646) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17262817576964033604412174497848513002225209832630937875461196677176467734868285199524197417058494071510136021039668149737217043492*i+5569402201875330688469818911816528346475512892028138546761147586899090205419859007786991619677351225429518366520931688999427178725)*x + (22041014965861351374915213891804957083839709866505725873888397385785425454365327943835553678708565098345424218364325385886881684154*i+3638269301531113544498085906710661331690306278677798788280484169111641236405721055932971990302235838568385021699110116994638780655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17262817576964033604412174497848513002225209832630937875461196677176467734868285199524197417058494071510136021039668149737217043492*i+5569402201875330688469818911816528346475512892028138546761147586899090205419859007786991619677351225429518366520931688999427178725)*x + (22041014965861351374915213891804957083839709866505725873888397385785425454365327943835553678708565098345424218364325385886881684154*i+3638269301531113544498085906710661331690306278677798788280484169111641236405721055932971990302235838568385021699110116994638780655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17278796490972044473985446163218207752785546847019516610514950947585244807535209442972971061741271496144206828671312853407732629489*i+9029668080194822044788192666607386717293769144675294429553136613467691579805292665275696746680252682624863276038775155946284573581)*x + (19330477419901831390559745047851321311717497059587923242728952114664664109988022096537298820398364933305749662718251349939754006630*i+10036807955413180832148347866519969547649401438618026980946607712911027432551379485099306120134260424851830626511641386518060488093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17278796490972044473985446163218207752785546847019516610514950947585244807535209442972971061741271496144206828671312853407732629489*i+9029668080194822044788192666607386717293769144675294429553136613467691579805292665275696746680252682624863276038775155946284573581)*x + (19330477419901831390559745047851321311717497059587923242728952114664664109988022096537298820398364933305749662718251349939754006630*i+10036807955413180832148347866519969547649401438618026980946607712911027432551379485099306120134260424851830626511641386518060488093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1632220640893297746856242133445162465837798293058052774039617656933768897483983116989633286466749922675646624213677365569906595440*i+3255481398387557112183538775919363185458536911445593895642766179312723802835230729024753182436006000029978080936500962145903225669)*x + (682265708983968917416716950502757146142748925504967796121708474416549259553438744289494822298064021051319265135352357265677021447*i+15590868397151667440566839232027376169242167163357057184498643306929947349210387416744217862141613129824383438523428044762759417417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1632220640893297746856242133445162465837798293058052774039617656933768897483983116989633286466749922675646624213677365569906595440*i+3255481398387557112183538775919363185458536911445593895642766179312723802835230729024753182436006000029978080936500962145903225669)*x + (682265708983968917416716950502757146142748925504967796121708474416549259553438744289494822298064021051319265135352357265677021447*i+15590868397151667440566839232027376169242167163357057184498643306929947349210387416744217862141613129824383438523428044762759417417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21082405774532358805137035809877699553363645960925668257558532819967515583489668126708921106653757854846042809735271404174480086480*i+18640282075188085413036464609622285462568671076776957792845310643751497819012978444124020243626308575094678341592844974419629076667)*x + (21030595595603985936678060243315449896761486997309167104999321242527660223329229696971819838369305574427729076332849420605593245598*i+17996657212093930043427521091814035725427095597581955676032938965079966240532786888065328225890701967239631558189597726798878259382) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21082405774532358805137035809877699553363645960925668257558532819967515583489668126708921106653757854846042809735271404174480086480*i+18640282075188085413036464609622285462568671076776957792845310643751497819012978444124020243626308575094678341592844974419629076667)*x + (21030595595603985936678060243315449896761486997309167104999321242527660223329229696971819838369305574427729076332849420605593245598*i+17996657212093930043427521091814035725427095597581955676032938965079966240532786888065328225890701967239631558189597726798878259382) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4852420889396389376724781583675770881406567280289388659720191543483654305456804027388972926833156008619368853656916333882909235581*i+17288418565999420056459366975068777511722753869741008835187028638258411658426045010777660807878851395824943714752656439478312482787)*x + (3245067623701930686798675285715463362041078242598005708667517207191321538660231839889483332152205411407985400479227697683905897507*i+16733905463959938195141799566404308737366424342601714119062259880505245569750435586004376457246294264156348010839630938748618250860) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4852420889396389376724781583675770881406567280289388659720191543483654305456804027388972926833156008619368853656916333882909235581*i+17288418565999420056459366975068777511722753869741008835187028638258411658426045010777660807878851395824943714752656439478312482787)*x + (3245067623701930686798675285715463362041078242598005708667517207191321538660231839889483332152205411407985400479227697683905897507*i+16733905463959938195141799566404308737366424342601714119062259880505245569750435586004376457246294264156348010839630938748618250860) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20588282082080993201874938413472364213824378126432082547577198566019144888524663521707888023982968589307659612556360277956496712846*i+626625853385327282311033772646960092246768143125847087498923926640714809281974717672762895453224732023790178377380180628232897231)*x + (3549655240853499418747187423185730358167247026231559096757872318524951368972449222483926088520473903302090756943906149084266669366*i+9082476014939907706256761231756427403015736980609913053757628551980314009823008463611955699444130666488174610889088194649110195967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20588282082080993201874938413472364213824378126432082547577198566019144888524663521707888023982968589307659612556360277956496712846*i+626625853385327282311033772646960092246768143125847087498923926640714809281974717672762895453224732023790178377380180628232897231)*x + (3549655240853499418747187423185730358167247026231559096757872318524951368972449222483926088520473903302090756943906149084266669366*i+9082476014939907706256761231756427403015736980609913053757628551980314009823008463611955699444130666488174610889088194649110195967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7092766638971925206527287202960385483741982344394750591488828938770685012625828244828484643716669723691838848495644180038051002265*i+21172854392869762754096605428530198595525903325337890248509760457477668181688402063042226967839020158104460636193529223162350952366)*x + (11087242824170885467738678205820424424311565602972606449426301791228756920513577036340493235427455683997031792247059828854259661389*i+4977786252964865406405775979865682399095683670382793090485103413557491419979303669699406121549319191412437327572223527592338012782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7092766638971925206527287202960385483741982344394750591488828938770685012625828244828484643716669723691838848495644180038051002265*i+21172854392869762754096605428530198595525903325337890248509760457477668181688402063042226967839020158104460636193529223162350952366)*x + (11087242824170885467738678205820424424311565602972606449426301791228756920513577036340493235427455683997031792247059828854259661389*i+4977786252964865406405775979865682399095683670382793090485103413557491419979303669699406121549319191412437327572223527592338012782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7004882055304421821195299347995728283388941937906652503958394858914410337730536610675812078799909748573286031180183187200637792623*i+340320645754477029434439403665789802577597795317345137621755251309865237412662975726103721662336703088934559436002968779721415827)*x + (9685639897133536095213631038077830482103997903432442274225165541499919527280115242075258098016678411404734226020569233659410517836*i+6618425142141456902756657132624144485104366337948910533191195242672565394061557844137871413005424572765910251470121634537548117808) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7004882055304421821195299347995728283388941937906652503958394858914410337730536610675812078799909748573286031180183187200637792623*i+340320645754477029434439403665789802577597795317345137621755251309865237412662975726103721662336703088934559436002968779721415827)*x + (9685639897133536095213631038077830482103997903432442274225165541499919527280115242075258098016678411404734226020569233659410517836*i+6618425142141456902756657132624144485104366337948910533191195242672565394061557844137871413005424572765910251470121634537548117808) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21786545256963515062246636507542781743922431448665319811557469694804069632382164020428977949865895540953541207787701419784052163833*i+20203459351498502405262700228021067323182470748221834119604415958205172732369995549713903625514332115160560183683266174482812652675)*x + (15023634925540777912618758226641480077829085912158223768174532271292088492606206511826414203021778064505689539407095022068862941562*i+18483671411222999767851490638154177991583621855720549469038007215048024615321869589707415026892018259538272213999500659633273491915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21786545256963515062246636507542781743922431448665319811557469694804069632382164020428977949865895540953541207787701419784052163833*i+20203459351498502405262700228021067323182470748221834119604415958205172732369995549713903625514332115160560183683266174482812652675)*x + (15023634925540777912618758226641480077829085912158223768174532271292088492606206511826414203021778064505689539407095022068862941562*i+18483671411222999767851490638154177991583621855720549469038007215048024615321869589707415026892018259538272213999500659633273491915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11259813581876436038384145624098165022315658911085985805358463531833145899169381162169607441364447724805307202136601292345857150384*i+16134300525357289418533697796888016956781070314994487668420693290886491286378258457614833050824113883173134820396131364204770108799)*x + (8049501616245020545489789652443748711327319305991211063173080652948986770027632450694835118026918774453387105821926204079272832819*i+14015440802980538924029798558179654962203223031438276318440645909401247068773357493529271306790008113809238584824724265534492727125) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11259813581876436038384145624098165022315658911085985805358463531833145899169381162169607441364447724805307202136601292345857150384*i+16134300525357289418533697796888016956781070314994487668420693290886491286378258457614833050824113883173134820396131364204770108799)*x + (8049501616245020545489789652443748711327319305991211063173080652948986770027632450694835118026918774453387105821926204079272832819*i+14015440802980538924029798558179654962203223031438276318440645909401247068773357493529271306790008113809238584824724265534492727125) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18372333466867702905718767974966438532203332205736509667085567107060894405593443651853774081220722442213263910794489034623056655926*i+4243148025027792140911809496979028928554105698171556429882426565021691438979703675663247673611746062358867126229733259071093009660)*x + (11290008400829193516689390081754533589497140733548938184815750160732935102292936198155421714146825449962926775864627508456523799343*i+15919791720347578782619887937211151926476599628583987796899838094708014228496030642387476926899686361710020874345866882159900626178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18372333466867702905718767974966438532203332205736509667085567107060894405593443651853774081220722442213263910794489034623056655926*i+4243148025027792140911809496979028928554105698171556429882426565021691438979703675663247673611746062358867126229733259071093009660)*x + (11290008400829193516689390081754533589497140733548938184815750160732935102292936198155421714146825449962926775864627508456523799343*i+15919791720347578782619887937211151926476599628583987796899838094708014228496030642387476926899686361710020874345866882159900626178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4763424640863145734880398183036822886290952925807107081348472001642121000391228279889843737724570587072465433840480489497075833956*i+20187881415192095729220761549981348710742885091915354861673689999044813015706542578619724263791566067077400650417844346058574251049)*x + (17598199226716313836586226978670776721074871950500706388573581746435588326223872274403174550117031544701416304864869956396536617843*i+17124096789321788877445106031768381013334313620743153674201041340536938925830029236105868676496381144196603229195971612616849578334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4763424640863145734880398183036822886290952925807107081348472001642121000391228279889843737724570587072465433840480489497075833956*i+20187881415192095729220761549981348710742885091915354861673689999044813015706542578619724263791566067077400650417844346058574251049)*x + (17598199226716313836586226978670776721074871950500706388573581746435588326223872274403174550117031544701416304864869956396536617843*i+17124096789321788877445106031768381013334313620743153674201041340536938925830029236105868676496381144196603229195971612616849578334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12500241595372900321435245938305788593435016128307277180757900190901341430527516857670452734542144214919379487182519916722213208820*i+18683181084722760618487105043480427607320917863012132061451691820577694918550005739470600373545864015774080278311002574322526379187)*x + (17006507383856689511354045431058695816423975843262481601744637504758221255641109849140688171367840154861236265895420067075615358761*i+22958763121316205956961119010526692569887664372234864534585292134750666564599759268741279116024378055650633054131758826744488744483) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12500241595372900321435245938305788593435016128307277180757900190901341430527516857670452734542144214919379487182519916722213208820*i+18683181084722760618487105043480427607320917863012132061451691820577694918550005739470600373545864015774080278311002574322526379187)*x + (17006507383856689511354045431058695816423975843262481601744637504758221255641109849140688171367840154861236265895420067075615358761*i+22958763121316205956961119010526692569887664372234864534585292134750666564599759268741279116024378055650633054131758826744488744483) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23822747020142310723061326069477129230355238052772488372660288941120542959902777014715760491457120715061829944282237864558566605596*i+18749859900101573886812174573154789117130391466435067276645726078833071521078723491628529186618692305641685658187778514261586633035)*x + (20277981602505575636705406172082347828429799076086155394503613630051920156838280050405360222472952841751862580683195511488569070532*i+18417489454855368820630277412792763935516940891119785813299969770608364068268956739376439052924584058372522897737591502633609677128) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23822747020142310723061326069477129230355238052772488372660288941120542959902777014715760491457120715061829944282237864558566605596*i+18749859900101573886812174573154789117130391466435067276645726078833071521078723491628529186618692305641685658187778514261586633035)*x + (20277981602505575636705406172082347828429799076086155394503613630051920156838280050405360222472952841751862580683195511488569070532*i+18417489454855368820630277412792763935516940891119785813299969770608364068268956739376439052924584058372522897737591502633609677128) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23695070612587871435826347108765508351907719188568067809023223228346377704185720526473838939588437322256606360247189855713611673230*i+24307397189500631120774069328588753576945781580645601788134125052369050511617223104132062768054034818258694350170299356457214043124)*x + (1026449741638048525217886099702643494680668347916646838360238573495983444195102125580516057432834803032963986021596108462541618872*i+7068220923218524656964726417996337637343717655811820696047372819209842902298662085275783507375725911771835112735636841178649563224) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23695070612587871435826347108765508351907719188568067809023223228346377704185720526473838939588437322256606360247189855713611673230*i+24307397189500631120774069328588753576945781580645601788134125052369050511617223104132062768054034818258694350170299356457214043124)*x + (1026449741638048525217886099702643494680668347916646838360238573495983444195102125580516057432834803032963986021596108462541618872*i+7068220923218524656964726417996337637343717655811820696047372819209842902298662085275783507375725911771835112735636841178649563224) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18145230269372663687701751035705764053905302183632853894915733753227533535253531992902519226722471874683437462808334804913367084979*i+19947424615331337934238329924398563591921397799099912794732613860088073288827132954315358070899954559828841376547078888813881001666)*x + (10231643169662411827032007483808019907672220949004563016095253588877275388544307072840271269500148109017557680884330207054227541126*i+23561593880187806663085005873008471990696803113719118954388330550067444104988843673387713400747453158656553550560579238640040262924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18145230269372663687701751035705764053905302183632853894915733753227533535253531992902519226722471874683437462808334804913367084979*i+19947424615331337934238329924398563591921397799099912794732613860088073288827132954315358070899954559828841376547078888813881001666)*x + (10231643169662411827032007483808019907672220949004563016095253588877275388544307072840271269500148109017557680884330207054227541126*i+23561593880187806663085005873008471990696803113719118954388330550067444104988843673387713400747453158656553550560579238640040262924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15391704001244215822509058597846947883066602139576796976023089758924322751397912338927533472888659151829719678738955864849048864955*i+20586680963685919402081977185175624903752684020937530988844216398031895384772600177704352695777317420505441954954719709647603202642)*x + (19944546084124993033724247218579837560924078861217335651686151363268842029762799103182288219787410537442763465919214647635582609687*i+6458730925524931910972636035046622597017805023387660706474761759108877786104315855037827303752188522329706959611010843113123451406) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15391704001244215822509058597846947883066602139576796976023089758924322751397912338927533472888659151829719678738955864849048864955*i+20586680963685919402081977185175624903752684020937530988844216398031895384772600177704352695777317420505441954954719709647603202642)*x + (19944546084124993033724247218579837560924078861217335651686151363268842029762799103182288219787410537442763465919214647635582609687*i+6458730925524931910972636035046622597017805023387660706474761759108877786104315855037827303752188522329706959611010843113123451406) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13263661929890483442183408106366031504802324535738774030885219800963088921166521679269600141572678329436068355049826394750053530829*i+22929645947706518379790396017405377176996814570286710095370296351432875823491922566996755900990926895669283261704895357993158516906)*x + (7555616970068160354912195107168584633181806479296132674195886289720678641166838068661885225020241232619222496138378502491906869663*i+2426985402742102799272783174235733027113715314145999908698179980949887005461075367959784450578484757081967055904621914181164801548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13263661929890483442183408106366031504802324535738774030885219800963088921166521679269600141572678329436068355049826394750053530829*i+22929645947706518379790396017405377176996814570286710095370296351432875823491922566996755900990926895669283261704895357993158516906)*x + (7555616970068160354912195107168584633181806479296132674195886289720678641166838068661885225020241232619222496138378502491906869663*i+2426985402742102799272783174235733027113715314145999908698179980949887005461075367959784450578484757081967055904621914181164801548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5900551859175271573748763113593099690300118845798559973091337531676767151887478938040168372433098763604525421416228330380915030676*i+11358298258655252566558883922904722490159696467244998155901993237718592758469239906494505451135902856438126043069019933368531907885)*x + (15716502149951240255780487509798107125256938290049497188214091519455365718350104187315127145214053671917523100638406438022790631204*i+3467628837972391304057510984165481647640977386046197173431175870015976843555933106202987169941457146927422059175183015226364290084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5900551859175271573748763113593099690300118845798559973091337531676767151887478938040168372433098763604525421416228330380915030676*i+11358298258655252566558883922904722490159696467244998155901993237718592758469239906494505451135902856438126043069019933368531907885)*x + (15716502149951240255780487509798107125256938290049497188214091519455365718350104187315127145214053671917523100638406438022790631204*i+3467628837972391304057510984165481647640977386046197173431175870015976843555933106202987169941457146927422059175183015226364290084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10766745092911980930775294127248203839520977172146688738675214758001924035527705075047551831323664977448905291252845782576340192678*i+15004219588502929693073029706671720446032802262857978097239921235238773510681597901308408570392947192325615788963568600452979149287)*x + (11585080225712425020422016692090799449327757422876260937479723906518156869088014061820953509297780586106468900872735227270402011051*i+19464639684703854465417946104846966992643699688116561597211984906738922339685841309206604975581288735180128251727446614630235549240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10766745092911980930775294127248203839520977172146688738675214758001924035527705075047551831323664977448905291252845782576340192678*i+15004219588502929693073029706671720446032802262857978097239921235238773510681597901308408570392947192325615788963568600452979149287)*x + (11585080225712425020422016692090799449327757422876260937479723906518156869088014061820953509297780586106468900872735227270402011051*i+19464639684703854465417946104846966992643699688116561597211984906738922339685841309206604975581288735180128251727446614630235549240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18938584066690167538884003417738468809621745447090485602834517946354861602495193033628899276869350818493128633537471015115621523604*i+14252211534376582229219117615370221451652490201663727609529978789080366616162659222780288654658523472784338924297389702762960098766)*x + (22015408530750272320656777679559803356203718265219393479303404044022402765736297579354943294188205687405899841428246448391652307965*i+1909174698829275466032858588974745037350499008930546975154729744215475546232004282366189639721220248074232949094352669851792322866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18938584066690167538884003417738468809621745447090485602834517946354861602495193033628899276869350818493128633537471015115621523604*i+14252211534376582229219117615370221451652490201663727609529978789080366616162659222780288654658523472784338924297389702762960098766)*x + (22015408530750272320656777679559803356203718265219393479303404044022402765736297579354943294188205687405899841428246448391652307965*i+1909174698829275466032858588974745037350499008930546975154729744215475546232004282366189639721220248074232949094352669851792322866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3070074394916100363812576527898658041984374607339814750071355037625147328507160287571073158863396763261826135109581866747516997129*i+258086218611063607856313165361535630651130145587947838570919460868137295601922412820767771388367111482963051662719464718302494299)*x + (19483567357340385911709855962518728347132540929851697906379800231597397038294426040439091574615883620548947298579537740899855289282*i+13784881211714818613247782789999357179677408357195500509763356152139515383188340518564582457355224442766380803698787350820897286650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3070074394916100363812576527898658041984374607339814750071355037625147328507160287571073158863396763261826135109581866747516997129*i+258086218611063607856313165361535630651130145587947838570919460868137295601922412820767771388367111482963051662719464718302494299)*x + (19483567357340385911709855962518728347132540929851697906379800231597397038294426040439091574615883620548947298579537740899855289282*i+13784881211714818613247782789999357179677408357195500509763356152139515383188340518564582457355224442766380803698787350820897286650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6947632245593568916932535321010777585917702554641779816067946306960493708645479207979345402834397956196959070362893423766903670894*i+10287244474419095909433061600264223364633466903182447635111548611344727502904499247120682043739992818401677493465642266830366815938)*x + (15329515389248244818814721685664624022841510340769005174828008696763196174409528135887696453840398735485030637862040941398877419824*i+20819609820925038713733076806426468091440627029856867723809322946193349162161416902154581735431237235994538018092904760856460302790) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6947632245593568916932535321010777585917702554641779816067946306960493708645479207979345402834397956196959070362893423766903670894*i+10287244474419095909433061600264223364633466903182447635111548611344727502904499247120682043739992818401677493465642266830366815938)*x + (15329515389248244818814721685664624022841510340769005174828008696763196174409528135887696453840398735485030637862040941398877419824*i+20819609820925038713733076806426468091440627029856867723809322946193349162161416902154581735431237235994538018092904760856460302790) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24027300510673941629682114121605420565916578650235231392488183461058343611630701603883576554019262444620519647875085765392190721951*i+3880032186797279465317555830789149988262298112920060438792246596316412185386828584064050952637088636353317203434708224062600328484)*x + (6361562230900979551869840394146330655669252439319960698390171876467721946795277165793742326779905759601296252231640561060710067609*i+13433121983293818704475625545011681661001901415449978135123403063328244785748223830030084514056975112314130611011468979352288474275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24027300510673941629682114121605420565916578650235231392488183461058343611630701603883576554019262444620519647875085765392190721951*i+3880032186797279465317555830789149988262298112920060438792246596316412185386828584064050952637088636353317203434708224062600328484)*x + (6361562230900979551869840394146330655669252439319960698390171876467721946795277165793742326779905759601296252231640561060710067609*i+13433121983293818704475625545011681661001901415449978135123403063328244785748223830030084514056975112314130611011468979352288474275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21630529153171804527301796180519970960675765994617408916027687538840081688682443898203787369950566680924524822034150496050531045965*i+23318147398171849902355010277296861409216944973647470474563547532159984444023974379338671966743069716998294952016470327464717292335)*x + (21622668358319964982083366783109095634616137582391287322892134322154202963285044150073776471747372117053173329292381794029505153649*i+19626358218564466155912361438061238897131719012777891138338540126983071117793586174800315863935413701156969175636362835713516878029) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21630529153171804527301796180519970960675765994617408916027687538840081688682443898203787369950566680924524822034150496050531045965*i+23318147398171849902355010277296861409216944973647470474563547532159984444023974379338671966743069716998294952016470327464717292335)*x + (21622668358319964982083366783109095634616137582391287322892134322154202963285044150073776471747372117053173329292381794029505153649*i+19626358218564466155912361438061238897131719012777891138338540126983071117793586174800315863935413701156969175636362835713516878029) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9905050632600499823573152348719210090740827160637328171202727017823075445125920513493266091471553899511549170592479511560174692999*i+20309729077726465630741544005723243684179049456505582806070173654044152756156735650566733273260442626542657479912816283396100666273)*x + (17079887174544685228345647618970251427840620639666877730968560478735703325250408057791828303397889014697956498051678810050245698198*i+20986051569788849386797616784235155369280742166013332986643729291733048957636555288439072325029685561656794712288765175081983221594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9905050632600499823573152348719210090740827160637328171202727017823075445125920513493266091471553899511549170592479511560174692999*i+20309729077726465630741544005723243684179049456505582806070173654044152756156735650566733273260442626542657479912816283396100666273)*x + (17079887174544685228345647618970251427840620639666877730968560478735703325250408057791828303397889014697956498051678810050245698198*i+20986051569788849386797616784235155369280742166013332986643729291733048957636555288439072325029685561656794712288765175081983221594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12343335443678059582726316513592105329611272637532832535300944703804100138159049031112527950491070201629901236547596321821418504479*i+4137446467040743413660205349175714648111866647424951432484318297286602827214650267351662365730349003167411409880419044802801756378)*x + (7007163283887014104674107987756213398677708623824314387443846130497065483365567390972220308217772906400698716694620899951177038789*i+7485536935544661605696154440927981562359767603393906530067377354466055676786497006811816950764971773231762648230952228311902885682) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12343335443678059582726316513592105329611272637532832535300944703804100138159049031112527950491070201629901236547596321821418504479*i+4137446467040743413660205349175714648111866647424951432484318297286602827214650267351662365730349003167411409880419044802801756378)*x + (7007163283887014104674107987756213398677708623824314387443846130497065483365567390972220308217772906400698716694620899951177038789*i+7485536935544661605696154440927981562359767603393906530067377354466055676786497006811816950764971773231762648230952228311902885682) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11382487218265980636064025217772152407789510991234625233390859406927382887958902214254102709288889185951436171825022690337419027729*i+8374451702090107433581772842618069168622793826329753775520307891411251201669628951934784624643976117100193245700764564104140899930)*x + (1209975376340986481461690106238274972346736804839797822092959992217558647464856704601748638550023952801192793903404898022565760418*i+16083612903301892881772594709807927560521255492656179909023100029045185946913962534539581635251959447131773398612065293731950405859) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11382487218265980636064025217772152407789510991234625233390859406927382887958902214254102709288889185951436171825022690337419027729*i+8374451702090107433581772842618069168622793826329753775520307891411251201669628951934784624643976117100193245700764564104140899930)*x + (1209975376340986481461690106238274972346736804839797822092959992217558647464856704601748638550023952801192793903404898022565760418*i+16083612903301892881772594709807927560521255492656179909023100029045185946913962534539581635251959447131773398612065293731950405859) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2666582428604906212594601416165411518576373403681341839570542788465466045586174814170390060793568278233730426469314534662665746428*i+5555340229180699343963951300586782754310528977342288977177968048324555696348304289090036597261671819428922970834999452075649673625)*x + (20338373877643949931432886743332052641357827817525569793104082682332719190959716416838405409498161944237599262163468144767471738670*i+18376201419045606723568257170034279362991734381124447950191771097552509542758551789256163281473846642841807674330777911082631621372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2666582428604906212594601416165411518576373403681341839570542788465466045586174814170390060793568278233730426469314534662665746428*i+5555340229180699343963951300586782754310528977342288977177968048324555696348304289090036597261671819428922970834999452075649673625)*x + (20338373877643949931432886743332052641357827817525569793104082682332719190959716416838405409498161944237599262163468144767471738670*i+18376201419045606723568257170034279362991734381124447950191771097552509542758551789256163281473846642841807674330777911082631621372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24215195550956012255090293777444269142620144230699977142245070884294749660597284700755230615539945385317132752921738082754117961855*i+22284194051712638309422866571555698969760266727291694893866689459789008073361396168443524983460300620961781687384515077427045530430)*x + (12312772983525373689672345538440183344988634248071590492228628343883851012454073405658988614575403392315703949371652296427127214792*i+681433676986042583373669624960252102991478640321406891321982675608519984795599894061273571852597287426186638648828341863161495668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24215195550956012255090293777444269142620144230699977142245070884294749660597284700755230615539945385317132752921738082754117961855*i+22284194051712638309422866571555698969760266727291694893866689459789008073361396168443524983460300620961781687384515077427045530430)*x + (12312772983525373689672345538440183344988634248071590492228628343883851012454073405658988614575403392315703949371652296427127214792*i+681433676986042583373669624960252102991478640321406891321982675608519984795599894061273571852597287426186638648828341863161495668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15368120422881798759911568740326400540021633302369637646175275867351934324037417196853775647167124464201436279201120871926219701763*i+5379741548519881646931324647643988939580792672593664502293152076050363387653824184224714629805161810134034245969807304369016978118)*x + (3343360154067786408571438591133917350934483674163496438067421336154228538778557255125521748344289286389803843763952220544529442961*i+3644163098994053448303260646583133878436135157232455810305061224518854301439110515041793187047828122840923648764159854875017106508) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15368120422881798759911568740326400540021633302369637646175275867351934324037417196853775647167124464201436279201120871926219701763*i+5379741548519881646931324647643988939580792672593664502293152076050363387653824184224714629805161810134034245969807304369016978118)*x + (3343360154067786408571438591133917350934483674163496438067421336154228538778557255125521748344289286389803843763952220544529442961*i+3644163098994053448303260646583133878436135157232455810305061224518854301439110515041793187047828122840923648764159854875017106508) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18739567962484715138334465962556348075814849909505063576586978948336738352460370253358541725866289263741756256536347642789205317083*i+19141872245167364932744481279638333253066507494158932801356387490043888807673734981221123822239487268631686919692884682300892964324)*x + (11618208052659840147290139466177303540532471610490991965338441715395482815370019998928133361299396697659082843927119218885799307926*i+21025126092451612230870056801248781615815151255868727905267118213612245925615002018980463718406730434089710347654280491785098052614) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18739567962484715138334465962556348075814849909505063576586978948336738352460370253358541725866289263741756256536347642789205317083*i+19141872245167364932744481279638333253066507494158932801356387490043888807673734981221123822239487268631686919692884682300892964324)*x + (11618208052659840147290139466177303540532471610490991965338441715395482815370019998928133361299396697659082843927119218885799307926*i+21025126092451612230870056801248781615815151255868727905267118213612245925615002018980463718406730434089710347654280491785098052614) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24138249887406475808780474903569082755988632405263958543300217720875083560762226445964730601871523538759597158488495355233234237655*i+19764232508987696013395878616461512245595689822065697705775521825646689628185412389173179579302909286769558909840650604298069992779)*x + (15479100046415500180292067997824884803762545488671383089989885460650670663570745441511177663321454047108821638959241101746911600211*i+19307098660380919245535162648754080854857590352051758304019474713552226939948539635362298343188023034321975933654768951354376308318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24138249887406475808780474903569082755988632405263958543300217720875083560762226445964730601871523538759597158488495355233234237655*i+19764232508987696013395878616461512245595689822065697705775521825646689628185412389173179579302909286769558909840650604298069992779)*x + (15479100046415500180292067997824884803762545488671383089989885460650670663570745441511177663321454047108821638959241101746911600211*i+19307098660380919245535162648754080854857590352051758304019474713552226939948539635362298343188023034321975933654768951354376308318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17826897997289472875353672799833368795191215236103292860627697864088254330349307112058056549696809156099664765344400021730016170671*i+3535925104187445802547549879970329809144819742298115181822676143543360005881470580336481978182411158122975558400510759070007816107)*x + (11511746429214184549327590406267976403887430192052124405727135619378150814150866320206824642188493134571046258163745082898883270983*i+17686330902104338347732622983659757193124816649996681243204353134624586472132032411872424246760569921830953449226565866003640791963) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17826897997289472875353672799833368795191215236103292860627697864088254330349307112058056549696809156099664765344400021730016170671*i+3535925104187445802547549879970329809144819742298115181822676143543360005881470580336481978182411158122975558400510759070007816107)*x + (11511746429214184549327590406267976403887430192052124405727135619378150814150866320206824642188493134571046258163745082898883270983*i+17686330902104338347732622983659757193124816649996681243204353134624586472132032411872424246760569921830953449226565866003640791963) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2846148769452163315128887072790841925516578794773617796020273376040211470867994073133331768569283858154036577335091694320034086039*i+11919652954843751522013770460940986955429234982448991655654381250423839767514918049499611719483257715817390989065254330362827982011)*x + (21803345288755990357534717575848972614602889728406263777605140017783574230174073392559632531166070058016543577860370597555091930015*i+75718441426197027238758638851723899863551896248190809847773937515482214433377777413473604350524410503085678975495145220268462405) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2846148769452163315128887072790841925516578794773617796020273376040211470867994073133331768569283858154036577335091694320034086039*i+11919652954843751522013770460940986955429234982448991655654381250423839767514918049499611719483257715817390989065254330362827982011)*x + (21803345288755990357534717575848972614602889728406263777605140017783574230174073392559632531166070058016543577860370597555091930015*i+75718441426197027238758638851723899863551896248190809847773937515482214433377777413473604350524410503085678975495145220268462405) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16219192822882969001597111069053153610213894542725240146222797476009436198669696029210330358765384521409890242223509667453361290109*i+21318931133189485944208207840517103814837712441159503383517035728908243272442548727735832438446665391491988771078789760717107637671)*x + (3604890734504707013194529762661454118930920647533905758030517720174540636184004091071038009723007973561030320020857886685518273739*i+5430739865422964926544605460057629416879989040493718349478096363424327305600930289713361093333832105393618115833914126915835174329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16219192822882969001597111069053153610213894542725240146222797476009436198669696029210330358765384521409890242223509667453361290109*i+21318931133189485944208207840517103814837712441159503383517035728908243272442548727735832438446665391491988771078789760717107637671)*x + (3604890734504707013194529762661454118930920647533905758030517720174540636184004091071038009723007973561030320020857886685518273739*i+5430739865422964926544605460057629416879989040493718349478096363424327305600930289713361093333832105393618115833914126915835174329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22347045173484322421099197564407734027658004213650262775583040566332219953073840986785992576216075354395256032290302019362530124448*i+12836644484094492123331217960985276788001700886779955843084717933968296715046463070104760386951490040799745886244329001978029632489)*x + (13102732538283690149647473296494436849239777912225414095706744761881308627824376294572801023000182181358578049136621216136360269028*i+4836412540829152178566450808454823819564396508364086025082201184775345086799973045370429507599927508062066946313663763193929082255) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22347045173484322421099197564407734027658004213650262775583040566332219953073840986785992576216075354395256032290302019362530124448*i+12836644484094492123331217960985276788001700886779955843084717933968296715046463070104760386951490040799745886244329001978029632489)*x + (13102732538283690149647473296494436849239777912225414095706744761881308627824376294572801023000182181358578049136621216136360269028*i+4836412540829152178566450808454823819564396508364086025082201184775345086799973045370429507599927508062066946313663763193929082255) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18738436889355949479392499226930060874270108874417631690889783869175841957977416727225595458698345612837355959363999672050885567008*i+24068894778293308907938552300487944066465604856813167323086703696661835665181510770994936489416958953598600904379299570840484944047)*x + (5441134805176115849398903083647810003767895935388050265924155539240114635460262609703790987529256257271149517320815135498712296342*i+10993656315102571600027717809877560913082733282210904613854072390997235922655435666246768079293569620151401370470001995506074471909) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18738436889355949479392499226930060874270108874417631690889783869175841957977416727225595458698345612837355959363999672050885567008*i+24068894778293308907938552300487944066465604856813167323086703696661835665181510770994936489416958953598600904379299570840484944047)*x + (5441134805176115849398903083647810003767895935388050265924155539240114635460262609703790987529256257271149517320815135498712296342*i+10993656315102571600027717809877560913082733282210904613854072390997235922655435666246768079293569620151401370470001995506074471909) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23078500637028981137427807758244403861283553506405578573641378861953601764099555449762223339065722003547496598774271308350393788014*i+661199959667863965798750199651676673820741944187634401061519546054435144882221221321754486674790899206294140054398332376332412812)*x + (484198795320533400998551097606323390543915687873314655524160042489395149662588432767037408518227969875267295463946396146388604674*i+1840199215910545699929827849371320176272352029873645804779185782582513326801474056158538570144769553991969706006796513857023970917) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23078500637028981137427807758244403861283553506405578573641378861953601764099555449762223339065722003547496598774271308350393788014*i+661199959667863965798750199651676673820741944187634401061519546054435144882221221321754486674790899206294140054398332376332412812)*x + (484198795320533400998551097606323390543915687873314655524160042489395149662588432767037408518227969875267295463946396146388604674*i+1840199215910545699929827849371320176272352029873645804779185782582513326801474056158538570144769553991969706006796513857023970917) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22226653688102467304069446954375772700822347671809346062550883430802112323028877169215818646879106242650382704084333298688085892775*i+2546876357208733172492084266053249367845906792528893976556702042367953711530038145919647871401066504858116993235764069371449015946)*x + (17855288032113665757331128133975096936949698693622806081046824700270519637638404354894281940756748420891529545779796745167578001155*i+1441936025538874829687857391501065346679272710231716909250719566113042301397454916831274722921104593739958182309962973298407710690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22226653688102467304069446954375772700822347671809346062550883430802112323028877169215818646879106242650382704084333298688085892775*i+2546876357208733172492084266053249367845906792528893976556702042367953711530038145919647871401066504858116993235764069371449015946)*x + (17855288032113665757331128133975096936949698693622806081046824700270519637638404354894281940756748420891529545779796745167578001155*i+1441936025538874829687857391501065346679272710231716909250719566113042301397454916831274722921104593739958182309962973298407710690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17764635085518576568334352206839549546821627911076359565270774719454574529572481115956341431574738322702429120313738753196327268166*i+6892406074859911928146557292592684428363911193468807874411486897845770396483073581483802414619968478304633379638969639817754786402)*x + (4026870056980921774102177553774721885246066870328420828165938995753048558366764147044316196866612846614644754444967414427032404184*i+20305771948047207717611789138002177443270226029055843148013639429751385632167408227379052814908899853243101617028537475876835922337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17764635085518576568334352206839549546821627911076359565270774719454574529572481115956341431574738322702429120313738753196327268166*i+6892406074859911928146557292592684428363911193468807874411486897845770396483073581483802414619968478304633379638969639817754786402)*x + (4026870056980921774102177553774721885246066870328420828165938995753048558366764147044316196866612846614644754444967414427032404184*i+20305771948047207717611789138002177443270226029055843148013639429751385632167408227379052814908899853243101617028537475876835922337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23804858437028471564178449811816963251628216843389372833574618479166335321998073299386874204102009662998833630518709158136376002244*i+19534307334937158701725163681596674176021900118610565716011733139292206108900981289509874066862981265877932811121589896197563526135)*x + (15503016242487795776628010135153894187140318586874686335121833885827343081148868696390572992741908066890522175679103474346981346675*i+22944476316101832339672691090235561196960399346732930902170742627664360137328421486908211100884645660029219146898766353915011765726) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23804858437028471564178449811816963251628216843389372833574618479166335321998073299386874204102009662998833630518709158136376002244*i+19534307334937158701725163681596674176021900118610565716011733139292206108900981289509874066862981265877932811121589896197563526135)*x + (15503016242487795776628010135153894187140318586874686335121833885827343081148868696390572992741908066890522175679103474346981346675*i+22944476316101832339672691090235561196960399346732930902170742627664360137328421486908211100884645660029219146898766353915011765726) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20531552494791271405752972552793725984200625392425793610357883493329839065815118935019024727900945478094268945097832528506465686513*i+18887753635392668755480583051969303851333385189078965424410651527689120784990522508928180843111550872303213108614431302545156130363)*x + (1072122757541105361517196269051123617369609717354596994616360307252128066525341680121041241174498482252817293212633554438420201450*i+9244280481064494459075254983741129233956413062751207615952306672212098482123205187478993114354991512433764357098041997913841368759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20531552494791271405752972552793725984200625392425793610357883493329839065815118935019024727900945478094268945097832528506465686513*i+18887753635392668755480583051969303851333385189078965424410651527689120784990522508928180843111550872303213108614431302545156130363)*x + (1072122757541105361517196269051123617369609717354596994616360307252128066525341680121041241174498482252817293212633554438420201450*i+9244280481064494459075254983741129233956413062751207615952306672212098482123205187478993114354991512433764357098041997913841368759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22982400739628536258491759241998285281912964837509016047312138280163991827428906054800262303413764192829579737260034862505234344991*i+4705365467962740653398301516549240827095526720959023469663279017605758608524654508950768119095938875148439245021526451599567411977)*x + (21345331559023594722287725897194660870988560989192565644693444755577756844051256344701407410719125113960488370533711763680276288450*i+6363390392213480193211124504762711604386515944188281323623926213418767090394908773258653652705178965250641907334439510810849704613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22982400739628536258491759241998285281912964837509016047312138280163991827428906054800262303413764192829579737260034862505234344991*i+4705365467962740653398301516549240827095526720959023469663279017605758608524654508950768119095938875148439245021526451599567411977)*x + (21345331559023594722287725897194660870988560989192565644693444755577756844051256344701407410719125113960488370533711763680276288450*i+6363390392213480193211124504762711604386515944188281323623926213418767090394908773258653652705178965250641907334439510810849704613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13495443561775769783344108197796977587098474305350092377815161458915549720534324281017948615310569142013418152567237464880785201072*i+18369988406574516557253320169427742779568460842621544073908081768313205108690883528557402701289343803179421913421961903198657913222)*x + (22789011037886530480519144657076803655958407107081669010344608016449282290788220969988489320927147891766318388644194313719420037740*i+6839619099179585326272683472189679708489014970116094895196024312397126505928831429386187701441834067647557450943280949885942774793) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13495443561775769783344108197796977587098474305350092377815161458915549720534324281017948615310569142013418152567237464880785201072*i+18369988406574516557253320169427742779568460842621544073908081768313205108690883528557402701289343803179421913421961903198657913222)*x + (22789011037886530480519144657076803655958407107081669010344608016449282290788220969988489320927147891766318388644194313719420037740*i+6839619099179585326272683472189679708489014970116094895196024312397126505928831429386187701441834067647557450943280949885942774793) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10759563194107653452918829305992012846391163774614927201494831969049862785988716449033335952720267363288060249024388380524568589101*i+11946915942866589353617127626378263805983675882016527010661506096721464400355613461780720025773664624101417890291964933838523823880)*x + (835013380158512461231766088640764440763090228620428615305042305873097645730001273635622761547555641465322632033510134324214071228*i+13774287523219539946320105223711277496524123803700239382671319688860175011928007506942696422958652330043705921982286549827077134212) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10759563194107653452918829305992012846391163774614927201494831969049862785988716449033335952720267363288060249024388380524568589101*i+11946915942866589353617127626378263805983675882016527010661506096721464400355613461780720025773664624101417890291964933838523823880)*x + (835013380158512461231766088640764440763090228620428615305042305873097645730001273635622761547555641465322632033510134324214071228*i+13774287523219539946320105223711277496524123803700239382671319688860175011928007506942696422958652330043705921982286549827077134212) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8530363604051385505742718565378741681642335682201564490397324288865960631448386261916250137861327128374743076697931816976570205330*i+20521261241891524594208980444013380531202185743200781606362495974546423975091166497223491720038621809551141840896103361900447116638)*x + (14232263633279085298441546059389592083201606531140777573364630261554765142648912960868352708305315159942876053830432445361189023619*i+6507571704667825953052937681811983436436231908353059680509547429819480769990858225036157990534490426755166788920130067545394303268) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8530363604051385505742718565378741681642335682201564490397324288865960631448386261916250137861327128374743076697931816976570205330*i+20521261241891524594208980444013380531202185743200781606362495974546423975091166497223491720038621809551141840896103361900447116638)*x + (14232263633279085298441546059389592083201606531140777573364630261554765142648912960868352708305315159942876053830432445361189023619*i+6507571704667825953052937681811983436436231908353059680509547429819480769990858225036157990534490426755166788920130067545394303268) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21842512486111573415719489256449621864853955506380421706771508464217115308781982034093020890467484833145740515740946323009750885155*i+13316119658626390870271976966418859582496664158770225863318681015521205123613779775885583341711229935198128507224277858971348749124)*x + (24055624697613685623683739459372641695782005569447620229500986074457249818606372989210578133580688417992543258454600964398300538471*i+22608331248814975033441575305180575895696565442068267431409375484141921268406118796459741552326177285257757129734080465413080833449) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21842512486111573415719489256449621864853955506380421706771508464217115308781982034093020890467484833145740515740946323009750885155*i+13316119658626390870271976966418859582496664158770225863318681015521205123613779775885583341711229935198128507224277858971348749124)*x + (24055624697613685623683739459372641695782005569447620229500986074457249818606372989210578133580688417992543258454600964398300538471*i+22608331248814975033441575305180575895696565442068267431409375484141921268406118796459741552326177285257757129734080465413080833449) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15398353551203333933731866048655213151335972666860618752303779647165192214139376713137861090222707326339308346446720942924587287306*i+371584736778615110942032237694082154561806060314920391190417218064686742834396068521499762628441256925957459387949937026881335393)*x + (230309661558413330802760975137308198309192741583191081037029896650517523453459959488424392915521412678891404544004863910981554234*i+5864827149405311501919148859926217895744005716800206534561438327190161759476538311891635364311922825668441531663990043857781775658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15398353551203333933731866048655213151335972666860618752303779647165192214139376713137861090222707326339308346446720942924587287306*i+371584736778615110942032237694082154561806060314920391190417218064686742834396068521499762628441256925957459387949937026881335393)*x + (230309661558413330802760975137308198309192741583191081037029896650517523453459959488424392915521412678891404544004863910981554234*i+5864827149405311501919148859926217895744005716800206534561438327190161759476538311891635364311922825668441531663990043857781775658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2016278921349110668201239156664413739256982912785528037292804971599831569324036176833336101140767317658266767378903436321121286892*i+4049358408788447777041092757620597898506519390422941425165939544308309009630954887663010022577925086642406659257367773318264731178)*x + (4185230760187284676351753495022001050737988416703270330467162442900856915335939010699183313208019235807651623501133596264540057117*i+9371554725430107760352519992996629728313505493118414887485664025153089640590093677702291884457993992701599997133595933973216843822) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2016278921349110668201239156664413739256982912785528037292804971599831569324036176833336101140767317658266767378903436321121286892*i+4049358408788447777041092757620597898506519390422941425165939544308309009630954887663010022577925086642406659257367773318264731178)*x + (4185230760187284676351753495022001050737988416703270330467162442900856915335939010699183313208019235807651623501133596264540057117*i+9371554725430107760352519992996629728313505493118414887485664025153089640590093677702291884457993992701599997133595933973216843822) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21569137153596621676273941366728879767181413676334591463397954051783217856023835607061777731656126640344990154430026132632364720585*i+8089979576596066157996913240028127419231798958867738240184485526464173168733204563602420933012562609789900459523676080388968654740)*x + (290405374255790820292797408829522487345995685259044542586808838967355996087619569605055025985139475757561951596529286489723405561*i+6039795282518223896171757231223643798757708013234833337581997812303973460342868660063075942971008133432942936214737806107235393155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21569137153596621676273941366728879767181413676334591463397954051783217856023835607061777731656126640344990154430026132632364720585*i+8089979576596066157996913240028127419231798958867738240184485526464173168733204563602420933012562609789900459523676080388968654740)*x + (290405374255790820292797408829522487345995685259044542586808838967355996087619569605055025985139475757561951596529286489723405561*i+6039795282518223896171757231223643798757708013234833337581997812303973460342868660063075942971008133432942936214737806107235393155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15921120074374443062122600621546098543060136218940773990278179283109342391518084733545092785584866569185664273999363516316029499551*i+19224256719689119121312573689627045327477641541934792849620063787467525574149845893799637119665866736655478158956589226475405685895)*x + (7130919616930422619900866370305081718158583392412508452657731981774026672058675656074537534404414575990396252391875913182536149540*i+15465403328593415266144633867601360275560312103880084772841377945028369450331180249788266334371485942228515914586679623799730289151) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15921120074374443062122600621546098543060136218940773990278179283109342391518084733545092785584866569185664273999363516316029499551*i+19224256719689119121312573689627045327477641541934792849620063787467525574149845893799637119665866736655478158956589226475405685895)*x + (7130919616930422619900866370305081718158583392412508452657731981774026672058675656074537534404414575990396252391875913182536149540*i+15465403328593415266144633867601360275560312103880084772841377945028369450331180249788266334371485942228515914586679623799730289151) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8999247644326301026950894304977383910528646974805099235718214253632103405116966349995586926330790625706070992398398276329189084262*i+2044047529439746665219258356325807309932172218042332325851065170758620888069365807876976256541342272494886446900741961988500154767)*x + (23418362063441135999922030755106255217285761319129195406013043329252203194850220450838202282119273846276952166778629985594317830818*i+15781039566857576739006870611475414329727492150673776402531046623390952769435448161762698708502502503301792526830983602764366972771) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8999247644326301026950894304977383910528646974805099235718214253632103405116966349995586926330790625706070992398398276329189084262*i+2044047529439746665219258356325807309932172218042332325851065170758620888069365807876976256541342272494886446900741961988500154767)*x + (23418362063441135999922030755106255217285761319129195406013043329252203194850220450838202282119273846276952166778629985594317830818*i+15781039566857576739006870611475414329727492150673776402531046623390952769435448161762698708502502503301792526830983602764366972771) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14987490959882453132302758831869211393160121996348281978561113417320099591064978917040433251121992819571477225635772616453305934358*i+839540553150600925618188794378838409961156189872730196055933971943374355806913083089624124884578326791823712100308026720223901969)*x + (13368610904878558258904612913830424270759666770802548273781423886967083731990383760695511839644389601162074381902659821728752651432*i+20791940865394926530613135992414365864260530578480125290874067709437969815864642898505086351179071151793913108015040049419979003454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14987490959882453132302758831869211393160121996348281978561113417320099591064978917040433251121992819571477225635772616453305934358*i+839540553150600925618188794378838409961156189872730196055933971943374355806913083089624124884578326791823712100308026720223901969)*x + (13368610904878558258904612913830424270759666770802548273781423886967083731990383760695511839644389601162074381902659821728752651432*i+20791940865394926530613135992414365864260530578480125290874067709437969815864642898505086351179071151793913108015040049419979003454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22151234127950082624335905130029547796030846509236226763708263201370789050112973924152212937341199668202370731070005166858215712638*i+8851354536556501948647336125272444060483438285087715691721599682233335438868420576827229477614504381538328376677314433890437149476)*x + (12080569173989018522003452685868101108215227651808898181724220618470986279144709404833162055791448082222025473880535703513902136282*i+8357360632618142600791986107320059276489595036447326975474569636520538560019021185101821437036952224752538491176421166040860128320) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22151234127950082624335905130029547796030846509236226763708263201370789050112973924152212937341199668202370731070005166858215712638*i+8851354536556501948647336125272444060483438285087715691721599682233335438868420576827229477614504381538328376677314433890437149476)*x + (12080569173989018522003452685868101108215227651808898181724220618470986279144709404833162055791448082222025473880535703513902136282*i+8357360632618142600791986107320059276489595036447326975474569636520538560019021185101821437036952224752538491176421166040860128320) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6029613461696339181023668880070370991394602152604517342729950538407936490329263483013883073361197964003932138574197842271865018037*i+16735407848632611903780142687231451756209488458794951775337124619266191572107204524553634770023370182579846023218565542940086190205)*x + (24386915233572699617889080161058370029363954248715497682466639732733636164570931841155579857678180590011457954103511893010449513228*i+11340082238156286204505219050843315515437797829942445706772466095891074846168112086177221860842193640511934218698824640492650354457) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6029613461696339181023668880070370991394602152604517342729950538407936490329263483013883073361197964003932138574197842271865018037*i+16735407848632611903780142687231451756209488458794951775337124619266191572107204524553634770023370182579846023218565542940086190205)*x + (24386915233572699617889080161058370029363954248715497682466639732733636164570931841155579857678180590011457954103511893010449513228*i+11340082238156286204505219050843315515437797829942445706772466095891074846168112086177221860842193640511934218698824640492650354457) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6419035875143929884502252547740065854839649138798948677760860857495493912380687349656761455596944827770668808810866844804426748689*i+20693973984711282225433741725993806605705614383365214359216582402152808879779742377200252883385812231252281841164512375652439825291)*x + (4047615279836310743212509869275553802960989662404856102741213959468837758277980415376931493313405036006959380213354342240091007505*i+14624541432102727064328920468572707491614359856324472979529117001524889197238456689832325737354181667567407951992150211747624153207) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6419035875143929884502252547740065854839649138798948677760860857495493912380687349656761455596944827770668808810866844804426748689*i+20693973984711282225433741725993806605705614383365214359216582402152808879779742377200252883385812231252281841164512375652439825291)*x + (4047615279836310743212509869275553802960989662404856102741213959468837758277980415376931493313405036006959380213354342240091007505*i+14624541432102727064328920468572707491614359856324472979529117001524889197238456689832325737354181667567407951992150211747624153207) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3789003468137546465197053139352850876851570354392865339914927298636204953317432502197543236140107092535556574002689626585410836318*i+2229818008121223326120779218642955717269190043623525713661402372424892507272570465462272933311016815251292755122931487295247640450)*x + (9500828797622197967735039869705438768965749956331594726339755997922579547733806735847015187186335643823467224083679662148591054937*i+12864298085918786637416138916217251152023595908953546586245192814143752824184263908883979316759771752640826735763754837873223893952) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3789003468137546465197053139352850876851570354392865339914927298636204953317432502197543236140107092535556574002689626585410836318*i+2229818008121223326120779218642955717269190043623525713661402372424892507272570465462272933311016815251292755122931487295247640450)*x + (9500828797622197967735039869705438768965749956331594726339755997922579547733806735847015187186335643823467224083679662148591054937*i+12864298085918786637416138916217251152023595908953546586245192814143752824184263908883979316759771752640826735763754837873223893952) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14381819846736417761242805888770714685525283105455861930947748126116851154827986730661534697985065726590744235946251778029990996258*i+2058127187923532028472040807316481997459117218389483559161012459617013711800060114310395184202739462062581313420165025318513886553)*x + (9760789429111545470707395618330586204731433095719389808988806784251984356554006546599971639934388457362730552607603235220513200109*i+15408138103646681967781870309660947218915822094221426872138374612289283662941888464899064772920032898608985301145909269720163546577) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14381819846736417761242805888770714685525283105455861930947748126116851154827986730661534697985065726590744235946251778029990996258*i+2058127187923532028472040807316481997459117218389483559161012459617013711800060114310395184202739462062581313420165025318513886553)*x + (9760789429111545470707395618330586204731433095719389808988806784251984356554006546599971639934388457362730552607603235220513200109*i+15408138103646681967781870309660947218915822094221426872138374612289283662941888464899064772920032898608985301145909269720163546577) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19898073874177317533410209251467798618521343775547490343153310326251083999097338036715697680337672281543439555515987743585013135378*i+21270695739909113291407109948745917974990601014623842377080364692880920774158359716691422758721000182131436362654686141934834617736)*x + (18441017490839046228901675402179781886662805845807989610694042407411191520499121290222237415350721462510927990477319887700786795499*i+8567715607874034176161696767595541605243782567150529783237509983249561348001792897095049490070990652336425797105685018417648258652) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19898073874177317533410209251467798618521343775547490343153310326251083999097338036715697680337672281543439555515987743585013135378*i+21270695739909113291407109948745917974990601014623842377080364692880920774158359716691422758721000182131436362654686141934834617736)*x + (18441017490839046228901675402179781886662805845807989610694042407411191520499121290222237415350721462510927990477319887700786795499*i+8567715607874034176161696767595541605243782567150529783237509983249561348001792897095049490070990652336425797105685018417648258652) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21399963222033229401174981309644923157312408443206779304427606465963256324660480246283758644322424553207203239827974364956043730135*i+7285457900566097849321872874977689722411315119490295696495966854806544156973051026961323848809778335863229067795947892111592582315)*x + (15160695233353845478327658730911646883745490282806024111999622834234227631121918595552130181676061003982507483999582923951118220273*i+6733607441528291179463763241129388772133062783317758643845667456221256647359535136797863183884362499348651135626288934588249789184) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21399963222033229401174981309644923157312408443206779304427606465963256324660480246283758644322424553207203239827974364956043730135*i+7285457900566097849321872874977689722411315119490295696495966854806544156973051026961323848809778335863229067795947892111592582315)*x + (15160695233353845478327658730911646883745490282806024111999622834234227631121918595552130181676061003982507483999582923951118220273*i+6733607441528291179463763241129388772133062783317758643845667456221256647359535136797863183884362499348651135626288934588249789184) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17631591727139618356239694403714797573598841147763635501642542470735835622966679755166644670932953207698171773703150711214828320639*i+2096234694784240000569550175107732623674367997233197454194669939119922885154737696162459379834463678708461698064894379281192920869)*x + (3844943642848901591394099276653030128076917412064916314103371326438898706588240417187906304749779606952040297904313796135357009770*i+1068858317186119667373911693749105960231535561954143369285941065608763986976866955810876886637270350358956088877482843710174727933) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17631591727139618356239694403714797573598841147763635501642542470735835622966679755166644670932953207698171773703150711214828320639*i+2096234694784240000569550175107732623674367997233197454194669939119922885154737696162459379834463678708461698064894379281192920869)*x + (3844943642848901591394099276653030128076917412064916314103371326438898706588240417187906304749779606952040297904313796135357009770*i+1068858317186119667373911693749105960231535561954143369285941065608763986976866955810876886637270350358956088877482843710174727933) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18727011051416487658302917871509396844124913965122914851222146226366334017390333310764554458884238425518583951526408201595725099854*i+17098455350591266339775114904940790478136224320833462529934976337128526433734639215933858350153207457532608459989882361785758753106)*x + (10539079924709165218781465024883664363673849797637841771937596201800372558159264051832375841570416194520755856949265913933952184940*i+19160531581386896775065662720326755268471394850591630788350181927363140504576351036719492797911402213075154332714399523462422035213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18727011051416487658302917871509396844124913965122914851222146226366334017390333310764554458884238425518583951526408201595725099854*i+17098455350591266339775114904940790478136224320833462529934976337128526433734639215933858350153207457532608459989882361785758753106)*x + (10539079924709165218781465024883664363673849797637841771937596201800372558159264051832375841570416194520755856949265913933952184940*i+19160531581386896775065662720326755268471394850591630788350181927363140504576351036719492797911402213075154332714399523462422035213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4336524028359884699281919359661312234355352467033696713499904584358694427668794354425363822167026361044019228555790417266501777494*i+6042373314130357221199852565010799319065968301523917352188132823021760603497092229003334783776382322657791953060907172394985440824)*x + (671954181363500994904346961632755772542321686680028515883298339697289979203127416616205715510624901093372104852627432726344003294*i+8971497470604727595306905036464257113363469541390841820385346682489059172316098481906847397832779513895237946511404534427119455832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4336524028359884699281919359661312234355352467033696713499904584358694427668794354425363822167026361044019228555790417266501777494*i+6042373314130357221199852565010799319065968301523917352188132823021760603497092229003334783776382322657791953060907172394985440824)*x + (671954181363500994904346961632755772542321686680028515883298339697289979203127416616205715510624901093372104852627432726344003294*i+8971497470604727595306905036464257113363469541390841820385346682489059172316098481906847397832779513895237946511404534427119455832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17898595424568425130491124360016764831175994047422681884905998023689550175386528211081698069215615806629480004380180792580348183608*i+15107591290327337752008850670349833644217402458462140468722987231362297004048222710546266239058396085002353803386981802985362268187)*x + (6662154919628745386558612929156619684770816493459901201471413964129292228708656974565662766673151399741438014496541225297533705629*i+18348195456750701403391675038986535294406636409261432975529499423758746555229962930633973718058149831930165030314135815138391507260) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17898595424568425130491124360016764831175994047422681884905998023689550175386528211081698069215615806629480004380180792580348183608*i+15107591290327337752008850670349833644217402458462140468722987231362297004048222710546266239058396085002353803386981802985362268187)*x + (6662154919628745386558612929156619684770816493459901201471413964129292228708656974565662766673151399741438014496541225297533705629*i+18348195456750701403391675038986535294406636409261432975529499423758746555229962930633973718058149831930165030314135815138391507260) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15132960862048666666610301470675412190637927832935362971521507744398650010376900968390918684170493688241651099011122245816652488711*i+638805229529569360680672936784745262899028610352033251605430156789810034016962347535615963032006991086545447076938992707697546804)*x + (6227319249433052999452827422883344199401212265627267499061773716531314200130084350173278517213696581003608019534394146252816724105*i+14613540838452976006625755901385407103653360289399948530270951563738884996229643762270129397991052999913786016073827089720097790866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15132960862048666666610301470675412190637927832935362971521507744398650010376900968390918684170493688241651099011122245816652488711*i+638805229529569360680672936784745262899028610352033251605430156789810034016962347535615963032006991086545447076938992707697546804)*x + (6227319249433052999452827422883344199401212265627267499061773716531314200130084350173278517213696581003608019534394146252816724105*i+14613540838452976006625755901385407103653360289399948530270951563738884996229643762270129397991052999913786016073827089720097790866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4256763807181872357395967659313172414301375158074769247341702699947762332253149070723125677195973333293044980199389868841324156972*i+20785982497008541708873958223162586762095502701799060998470972595566247501074285240710722213702416529513844021053601731087310170417)*x + (9874396557074254604076709521594545080721654216203434786732310636836806239915563429513850065213776801696391247082651080967267350397*i+6811565025658339401578244374721185593923231651552681478471695033391558035335166710500108227799953853170983396510148408396140433406) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4256763807181872357395967659313172414301375158074769247341702699947762332253149070723125677195973333293044980199389868841324156972*i+20785982497008541708873958223162586762095502701799060998470972595566247501074285240710722213702416529513844021053601731087310170417)*x + (9874396557074254604076709521594545080721654216203434786732310636836806239915563429513850065213776801696391247082651080967267350397*i+6811565025658339401578244374721185593923231651552681478471695033391558035335166710500108227799953853170983396510148408396140433406) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2432543546378775569007412422301430394561517535655669333902949696693008668455095264042142179598356882877280046912857439768789799566*i+8922382418264355243820842931603002060926904638898148501597139454676066492604462032338881272818623093261610126514642457386169771249)*x + (20039582801153113503070225209487231628539873650269721854354567174663248129129500911239314226917876971128968728112907884374486431161*i+9612407942390834859078955256245862877261162432061774385896872174429765951971976042536324224274348514259326473203717469648035395079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2432543546378775569007412422301430394561517535655669333902949696693008668455095264042142179598356882877280046912857439768789799566*i+8922382418264355243820842931603002060926904638898148501597139454676066492604462032338881272818623093261610126514642457386169771249)*x + (20039582801153113503070225209487231628539873650269721854354567174663248129129500911239314226917876971128968728112907884374486431161*i+9612407942390834859078955256245862877261162432061774385896872174429765951971976042536324224274348514259326473203717469648035395079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3240769962671861760712995413583821616068843059813149323970041211939054701078371692678428455666414076410892005757268227452102575096*i+12266274399977775712276083335594204338273166370241818826773627390769706625854695502422027905420624447478197220004401121800656334425)*x + (14950073954990603187614496483406131431970745602682223606203668266900513400878861296608008963397232402388671857693222753112330997861*i+17790842045836402596697158710770593761897016933331715539201834174926247619614271727140013400698910983915387543779997038520728882376) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3240769962671861760712995413583821616068843059813149323970041211939054701078371692678428455666414076410892005757268227452102575096*i+12266274399977775712276083335594204338273166370241818826773627390769706625854695502422027905420624447478197220004401121800656334425)*x + (14950073954990603187614496483406131431970745602682223606203668266900513400878861296608008963397232402388671857693222753112330997861*i+17790842045836402596697158710770593761897016933331715539201834174926247619614271727140013400698910983915387543779997038520728882376) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15263862037319703323066583350326332080113298472766411062332048176904980018380991936861256712909815723015514172061205878440992330318*i+5485956018421055961828693221960195933087054600109856593095772403075486601148223095569659530468734934720439934094238213557711350086)*x + (21593966713144355668441575629768736877230272313680389074344428176453218826857938706532676224249975305405125838687989882204713186776*i+14815001903162666606910932963410108878641421115404955008901616989800118414193840158711089737861388893795479868850950828101304439595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15263862037319703323066583350326332080113298472766411062332048176904980018380991936861256712909815723015514172061205878440992330318*i+5485956018421055961828693221960195933087054600109856593095772403075486601148223095569659530468734934720439934094238213557711350086)*x + (21593966713144355668441575629768736877230272313680389074344428176453218826857938706532676224249975305405125838687989882204713186776*i+14815001903162666606910932963410108878641421115404955008901616989800118414193840158711089737861388893795479868850950828101304439595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4038966000953143967878339137939189759623440336021487658754719911238349962485901298732364930354454598788074465555518534752308943210*i+22970164962036775360217857901163099106663941884998790416146144845459472953340015935886332503213140830258028275714840502317003275048)*x + (9642100173545793861500153537491301831283008649346666380968947438623382977667539090224813268563460096902573213041379826406796310059*i+19026424070234713520178959955154047520981747977663433979379512325652934379664514765489328921920789124843743178017276701408527627552) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4038966000953143967878339137939189759623440336021487658754719911238349962485901298732364930354454598788074465555518534752308943210*i+22970164962036775360217857901163099106663941884998790416146144845459472953340015935886332503213140830258028275714840502317003275048)*x + (9642100173545793861500153537491301831283008649346666380968947438623382977667539090224813268563460096902573213041379826406796310059*i+19026424070234713520178959955154047520981747977663433979379512325652934379664514765489328921920789124843743178017276701408527627552) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6521004878048399481036093037046161797252415928696652475614036848059616016208022256439625160068285610147437052026765610649686694210*i+24008302716583910151899634416323543131600537600043605385272138344203640569227202080230980762782124714711163292576803815057919459028)*x + (1364759071765799591827419335951112794345721963958253306630082966384043954032729225299509850417717968789551937138790055924441035304*i+14584375902459651419066730165535038765382750009841175687359744417009078963350204178286625134586867805100743124835326095129333457497) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6521004878048399481036093037046161797252415928696652475614036848059616016208022256439625160068285610147437052026765610649686694210*i+24008302716583910151899634416323543131600537600043605385272138344203640569227202080230980762782124714711163292576803815057919459028)*x + (1364759071765799591827419335951112794345721963958253306630082966384043954032729225299509850417717968789551937138790055924441035304*i+14584375902459651419066730165535038765382750009841175687359744417009078963350204178286625134586867805100743124835326095129333457497) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3439013697282196490549593256442357127255057626851168510657668772738091500072598648781465748168082289586284019044389114493642824245*i+9370108614164890598118859504351157368383941419109757107291340573057946069660951207560927048959140605249581733533296173484883056846)*x + (13011451331354917773237490368563429947084123776167998281909132946383783595011656470133070028279009836835367513826303198769185170733*i+9804991625565012335011124466203814011733230740529675971073754491738970020796063247551793267245029877351683368652761552105083813440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3439013697282196490549593256442357127255057626851168510657668772738091500072598648781465748168082289586284019044389114493642824245*i+9370108614164890598118859504351157368383941419109757107291340573057946069660951207560927048959140605249581733533296173484883056846)*x + (13011451331354917773237490368563429947084123776167998281909132946383783595011656470133070028279009836835367513826303198769185170733*i+9804991625565012335011124466203814011733230740529675971073754491738970020796063247551793267245029877351683368652761552105083813440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20197486386163589022394569209385622577336765544992630800728782044305733931707505041688881064351610526004481463487764665862863834416*i+23053343222976781770015806834940659227182802169123449712562634785689039856894627905205757549641396524611116216689167862961010760364)*x + (19166840979431265488329689723109441576981120790095923070255793240634906252322947863108427035300473407837740663066457978895871722898*i+14429169471804772046685991638739887308767752071650143810716518468599459695701128659952799332086661263815050638397349413870596435215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20197486386163589022394569209385622577336765544992630800728782044305733931707505041688881064351610526004481463487764665862863834416*i+23053343222976781770015806834940659227182802169123449712562634785689039856894627905205757549641396524611116216689167862961010760364)*x + (19166840979431265488329689723109441576981120790095923070255793240634906252322947863108427035300473407837740663066457978895871722898*i+14429169471804772046685991638739887308767752071650143810716518468599459695701128659952799332086661263815050638397349413870596435215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2974061402422245378423143703075047022719312921446486081986255115417186268987527751888979545437868962192927325066175574424382758133*i+22288686829199379246305939460196301579609784706469220845405409111111557471854125516060087389564987558544635313993570528039074518960)*x + (17536049009841374209932045804550767851848480393899100781870450608798444749895489046572446536968206381330778622581319544034649287895*i+1017827010319954004489156121310447493431389051890003251006291636798698691637557516426175503821203714159499337075030315436875981835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2974061402422245378423143703075047022719312921446486081986255115417186268987527751888979545437868962192927325066175574424382758133*i+22288686829199379246305939460196301579609784706469220845405409111111557471854125516060087389564987558544635313993570528039074518960)*x + (17536049009841374209932045804550767851848480393899100781870450608798444749895489046572446536968206381330778622581319544034649287895*i+1017827010319954004489156121310447493431389051890003251006291636798698691637557516426175503821203714159499337075030315436875981835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20452141374467246224347869285468310881308666422210873537203349048808562989027936214691532962927975818354718988479283537068081512570*i+16664138946417517254700000349082989124543075270214919943304530323123352902521112748278536635893144744990701866496769109081199342186)*x + (21733524021540462786528031524175237003438829941099628266312214542621292675288508688214415172370833881848887093602195625647412825408*i+13172434161952581262099045625576725980661994625907416670249714777623193787827379739540768695151050925837551203299743182386189103357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20452141374467246224347869285468310881308666422210873537203349048808562989027936214691532962927975818354718988479283537068081512570*i+16664138946417517254700000349082989124543075270214919943304530323123352902521112748278536635893144744990701866496769109081199342186)*x + (21733524021540462786528031524175237003438829941099628266312214542621292675288508688214415172370833881848887093602195625647412825408*i+13172434161952581262099045625576725980661994625907416670249714777623193787827379739540768695151050925837551203299743182386189103357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7481617699360223212501383901209524121982083065889573790943127606415542094884645030850903070701735278337786680423559719057656873798*i+15057975807969105870242195648790165956246203246013606022746902595981002822181075360578930976264496119332374799278930156596076731786)*x + (268930846364928582526004003064402269330370775745305244600398503002860208145780340710100569672696399773894971642188263811946216579*i+2455940756565638527662386965746594117902279664934748022089953514183359335641328440605963010835513950821441564938790385194917603488) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7481617699360223212501383901209524121982083065889573790943127606415542094884645030850903070701735278337786680423559719057656873798*i+15057975807969105870242195648790165956246203246013606022746902595981002822181075360578930976264496119332374799278930156596076731786)*x + (268930846364928582526004003064402269330370775745305244600398503002860208145780340710100569672696399773894971642188263811946216579*i+2455940756565638527662386965746594117902279664934748022089953514183359335641328440605963010835513950821441564938790385194917603488) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23695484765163634583011885514091412747368049883550211806221533402823558620752237865154319785354212092269683217316042049932766042182*i+18420420500312739805150834585827416040256689101966673378445629085835327949263453522276006074373299534915734200419022417730135837353)*x + (11611298523009409326257136915938843442929133091444764864910566101150042102667647926121032133059795344237311348602564376471592854282*i+9595690703491153263851343807011493262577828403578569881173291231534011908357285091324124365642167274701697879989496954667381538288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23695484765163634583011885514091412747368049883550211806221533402823558620752237865154319785354212092269683217316042049932766042182*i+18420420500312739805150834585827416040256689101966673378445629085835327949263453522276006074373299534915734200419022417730135837353)*x + (11611298523009409326257136915938843442929133091444764864910566101150042102667647926121032133059795344237311348602564376471592854282*i+9595690703491153263851343807011493262577828403578569881173291231534011908357285091324124365642167274701697879989496954667381538288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14103764107644234829872730632734184526837307061070394434529945213437098916394370223359621927327290247256807761402746768153250390389*i+23466980739323181535196773697838579980699514882548773898436946967687323027938607445679679365913394811948303926685352149172630845524)*x + (21563894447856776917368184287435968051770700501512284259126423825833843805983766772019351537216817668595683191692852776252124929234*i+16676810918716856640198169888053763851482421957609521180264038565767382872099648239054864877474311188675371744252738516819428971622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14103764107644234829872730632734184526837307061070394434529945213437098916394370223359621927327290247256807761402746768153250390389*i+23466980739323181535196773697838579980699514882548773898436946967687323027938607445679679365913394811948303926685352149172630845524)*x + (21563894447856776917368184287435968051770700501512284259126423825833843805983766772019351537216817668595683191692852776252124929234*i+16676810918716856640198169888053763851482421957609521180264038565767382872099648239054864877474311188675371744252738516819428971622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6253624319115789759478249218973340563663973441380041512119576083529795951824665217179997507494060062425995305641234881642577248094*i+15684516844871249745226367797188150676488527318516221381786579460343969796010866524896293204958465376174381528394925119907184670695)*x + (10886692589049470889682523854090506297082473529487110526392797627039008818305783726072126156107926045266188560833872290640234792439*i+5426108437407368011752682152383203353890414225357995825597164820101151258306986309620458230545652290683256891062464987241172936039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6253624319115789759478249218973340563663973441380041512119576083529795951824665217179997507494060062425995305641234881642577248094*i+15684516844871249745226367797188150676488527318516221381786579460343969796010866524896293204958465376174381528394925119907184670695)*x + (10886692589049470889682523854090506297082473529487110526392797627039008818305783726072126156107926045266188560833872290640234792439*i+5426108437407368011752682152383203353890414225357995825597164820101151258306986309620458230545652290683256891062464987241172936039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11945834534987245629267225132068098460346486175614497425462228688340189244977285555613757814283246397209658334551971097305579904558*i+97732841518731733765538955266799426179034529353428544515090303852826733565937993300724672945874485145627061321587453766765308467)*x + (8255273389329097973425026221281067100796069464171747826459099714124442380073513453996675884531939506498235078321290800833823315518*i+5761628875957518349129662870029116192451508415888603366631034149226884243405630402186510095722478817146213018277372535946122778773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11945834534987245629267225132068098460346486175614497425462228688340189244977285555613757814283246397209658334551971097305579904558*i+97732841518731733765538955266799426179034529353428544515090303852826733565937993300724672945874485145627061321587453766765308467)*x + (8255273389329097973425026221281067100796069464171747826459099714124442380073513453996675884531939506498235078321290800833823315518*i+5761628875957518349129662870029116192451508415888603366631034149226884243405630402186510095722478817146213018277372535946122778773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11446641210490510286761696141961999429229913933790435533908226841593021562117536262285532165501328771889965205205420586886924404698*i+12959488012349715877912241837298142676261329933165342258043485870650515289309255822907551471316036951046089010300274486554500975740)*x + (21569814162577969302312239429509441581931884604672374468801719416820681123265060159214787978832116117129850153869584951317709010934*i+6482976767577483467648994066487077020247227628891435116712053449367814745702246840317069019184724294063420910927102437306130964948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11446641210490510286761696141961999429229913933790435533908226841593021562117536262285532165501328771889965205205420586886924404698*i+12959488012349715877912241837298142676261329933165342258043485870650515289309255822907551471316036951046089010300274486554500975740)*x + (21569814162577969302312239429509441581931884604672374468801719416820681123265060159214787978832116117129850153869584951317709010934*i+6482976767577483467648994066487077020247227628891435116712053449367814745702246840317069019184724294063420910927102437306130964948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (411243963595086039095489140874349386948591435121700387014389814085862226516340831907723259480290712028947185701920925684542608002*i+16508461851914151310310739560031513270722496858532746655133460520131605547720329626177953653784349379301413055901911846804526320693)*x + (1377351397553284369044817843848045616403860222538365708978663359192754587524070008094978805162194427580311715237299786052770187099*i+24139612946763922993918115134409717755662185851309137981802103166858757480698082018192608445422500989356988399560560454672792636088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (411243963595086039095489140874349386948591435121700387014389814085862226516340831907723259480290712028947185701920925684542608002*i+16508461851914151310310739560031513270722496858532746655133460520131605547720329626177953653784349379301413055901911846804526320693)*x + (1377351397553284369044817843848045616403860222538365708978663359192754587524070008094978805162194427580311715237299786052770187099*i+24139612946763922993918115134409717755662185851309137981802103166858757480698082018192608445422500989356988399560560454672792636088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9222604809683627048964309251931870012890586263624290630419737811877651717323979723462456886996227866069726717517148935039019436852*i+13742266485208624753012403491806534712011499023519951498485292117140433529891806479857038263191603836050689037198537503316531044739)*x + (14366529443356145693659854964548975910682652606541245704094178732126939584724946063158608388663635463927665877250538888492524499450*i+11788607662882081768685667371669300718983348620573447084940886336636635906964442392755174053163838242038145980755026857684519160825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9222604809683627048964309251931870012890586263624290630419737811877651717323979723462456886996227866069726717517148935039019436852*i+13742266485208624753012403491806534712011499023519951498485292117140433529891806479857038263191603836050689037198537503316531044739)*x + (14366529443356145693659854964548975910682652606541245704094178732126939584724946063158608388663635463927665877250538888492524499450*i+11788607662882081768685667371669300718983348620573447084940886336636635906964442392755174053163838242038145980755026857684519160825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23090316653094758695429859617234423934254847312574258632896326295743274797045711095975990913361122202372567388310756380444082362243*i+7681004060386040803120942418429212754521387801832124953432885667683236140655330562144522779607176531616320003342392605891172799862)*x + (18880560953511153088115105245827232414314316939915493770812980009635028511857995273778047780937221592123504047746735324002457033701*i+19533622292996819775672234985810903716439005197648065929026966655770910079433729972273185687198440050670162826876526587285098860497) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23090316653094758695429859617234423934254847312574258632896326295743274797045711095975990913361122202372567388310756380444082362243*i+7681004060386040803120942418429212754521387801832124953432885667683236140655330562144522779607176531616320003342392605891172799862)*x + (18880560953511153088115105245827232414314316939915493770812980009635028511857995273778047780937221592123504047746735324002457033701*i+19533622292996819775672234985810903716439005197648065929026966655770910079433729972273185687198440050670162826876526587285098860497) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1726532207733406439553720495036232175771775177391865493499008859164439852806942761271682382350246073295182226177158334599406377337*i+19291034264114559071117201261579455930823520445077821515252622055565469931171363492902410303492156697830724271551711665797471139054)*x + (23330270922137062549596851632201196041105914819396673018814651737793436019857817556633690026286992663736957160391897352422853691125*i+22299683660219038199667442598606072482873998562248800025806468764138019100113548581418440695527549811128625788296167300319478684784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1726532207733406439553720495036232175771775177391865493499008859164439852806942761271682382350246073295182226177158334599406377337*i+19291034264114559071117201261579455930823520445077821515252622055565469931171363492902410303492156697830724271551711665797471139054)*x + (23330270922137062549596851632201196041105914819396673018814651737793436019857817556633690026286992663736957160391897352422853691125*i+22299683660219038199667442598606072482873998562248800025806468764138019100113548581418440695527549811128625788296167300319478684784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1797332715647118109064552155327155550853443685181924042256786254199165583523321386056118231479160439290158455970564047856634347437*i+10363541668338446506432524063820107411106867035652784157413554561246191053777936816791585846376160312909758576444699042363560759291)*x + (9626856995679370576770912307788347757693872519428940221506242647856770260984902847512675079803174874195275542441240103550661571089*i+9112168292040602971597931060239679829432680674487693294748810912493281426667438727082971798938891706177976908994731118095172062476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1797332715647118109064552155327155550853443685181924042256786254199165583523321386056118231479160439290158455970564047856634347437*i+10363541668338446506432524063820107411106867035652784157413554561246191053777936816791585846376160312909758576444699042363560759291)*x + (9626856995679370576770912307788347757693872519428940221506242647856770260984902847512675079803174874195275542441240103550661571089*i+9112168292040602971597931060239679829432680674487693294748810912493281426667438727082971798938891706177976908994731118095172062476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13382588273797172850682377405480831382709410219790113735590921178800759565342599593823263940156713841873384804432295891107183603803*i+14654202372752367172928177056515254920108666992630135624660276330867380028254333423565496621416548170663133830835380907323273623061)*x + (19212222719936483067951008770871367698429785165923503875098410583623446068592896202708475141642785325172658096842091634585064818992*i+13364882474633088736078057000572210235144966829519480702249514393293348545571142764864928986166527333518811267952196173242727534352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13382588273797172850682377405480831382709410219790113735590921178800759565342599593823263940156713841873384804432295891107183603803*i+14654202372752367172928177056515254920108666992630135624660276330867380028254333423565496621416548170663133830835380907323273623061)*x + (19212222719936483067951008770871367698429785165923503875098410583623446068592896202708475141642785325172658096842091634585064818992*i+13364882474633088736078057000572210235144966829519480702249514393293348545571142764864928986166527333518811267952196173242727534352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4482804903853100014854047091114888923373474220973774647053380353161001609805621610982403567396168251587697826031113551567898570398*i+2855904673135889830878327970413842516447975034541635696254758468068118194130564537377058316232092375713734584303300111898921063191)*x + (14153611457047802188892415017022356238749574963815262429139439256127349011233119158861392088613802174325450618959950530992648927814*i+8484928781962247176027024730723545246470031471884150082090724721270393224522766592274982638656046067687759977636993818620442257953) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4482804903853100014854047091114888923373474220973774647053380353161001609805621610982403567396168251587697826031113551567898570398*i+2855904673135889830878327970413842516447975034541635696254758468068118194130564537377058316232092375713734584303300111898921063191)*x + (14153611457047802188892415017022356238749574963815262429139439256127349011233119158861392088613802174325450618959950530992648927814*i+8484928781962247176027024730723545246470031471884150082090724721270393224522766592274982638656046067687759977636993818620442257953) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4433923789665383449078409450957221613575159995488409648308697127368298068942330610252890721285414180828178667468262875799101648865*i+13836398512123439258031320679257875467537703853472030511580827670383212775015943666736749587850544721724689906957191786903245919918)*x + (6193992060378896096271787082829742359047591329544134425009825944406027602947333050925774844890047998520493598854071472328785230418*i+22601634457769833967607249661258590270205134351013886687528147718925829567821700675851791369936832293760095603713909559237562573252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4433923789665383449078409450957221613575159995488409648308697127368298068942330610252890721285414180828178667468262875799101648865*i+13836398512123439258031320679257875467537703853472030511580827670383212775015943666736749587850544721724689906957191786903245919918)*x + (6193992060378896096271787082829742359047591329544134425009825944406027602947333050925774844890047998520493598854071472328785230418*i+22601634457769833967607249661258590270205134351013886687528147718925829567821700675851791369936832293760095603713909559237562573252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6224536641219829630192754440332617288233295414615981306307084362113420988299020870202002177338645457644851868066910428285680918627*i+4187781133847320329697600387358194880235355262892506400355266629701069087264912796107602742188376231763535508461590550791428395064)*x + (24321229310101154942247678456968609313552251945187466840051352224526811279656148368016230272881533675725218368913719997291617818287*i+4764779194380353125118825355899159822473514117079463161424115107182960421833172198706356831973909934493034168834035833674867373752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6224536641219829630192754440332617288233295414615981306307084362113420988299020870202002177338645457644851868066910428285680918627*i+4187781133847320329697600387358194880235355262892506400355266629701069087264912796107602742188376231763535508461590550791428395064)*x + (24321229310101154942247678456968609313552251945187466840051352224526811279656148368016230272881533675725218368913719997291617818287*i+4764779194380353125118825355899159822473514117079463161424115107182960421833172198706356831973909934493034168834035833674867373752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4398822425820048451819613580455949695185227891802135558799809504457215585848002947191167064052668187721095712011551525882472371529*i+9591752368588506701139075014093822043817299400454122056622256286678117362617354007163333579566920037135755049708554433369501027554)*x + (21713552086626832670302453716699528235127078184825643631820869593213410585481868979558366434492244376377010106730018387663684850377*i+10419168908295293573128068371238860551425914983044456812770400902374114430951968788426341400327266447976100050656824072501953048635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4398822425820048451819613580455949695185227891802135558799809504457215585848002947191167064052668187721095712011551525882472371529*i+9591752368588506701139075014093822043817299400454122056622256286678117362617354007163333579566920037135755049708554433369501027554)*x + (21713552086626832670302453716699528235127078184825643631820869593213410585481868979558366434492244376377010106730018387663684850377*i+10419168908295293573128068371238860551425914983044456812770400902374114430951968788426341400327266447976100050656824072501953048635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22562621985425186560199134092263433338061341690428882369789682685353789653666831134737951962833501562132054118510865437523283100316*i+2620316589371163368507997086476116218794507240757537182101770699003273301944008648762321482447776259176934190631121694642613961515)*x + (14132808603563580375665559854623229199646706670913084912735779212400561304048631413580030879099402441385314766411491595095930596572*i+19780237454917426754138053211453454199890416737522803695467996021122435212784887391718906091876237762673453106989878410155807734064) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22562621985425186560199134092263433338061341690428882369789682685353789653666831134737951962833501562132054118510865437523283100316*i+2620316589371163368507997086476116218794507240757537182101770699003273301944008648762321482447776259176934190631121694642613961515)*x + (14132808603563580375665559854623229199646706670913084912735779212400561304048631413580030879099402441385314766411491595095930596572*i+19780237454917426754138053211453454199890416737522803695467996021122435212784887391718906091876237762673453106989878410155807734064) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12853128186996323155749368502679359628716652692846414290375599817303126956417299956361618490868007513421943577318941401229215703229*i+8245059060220580847261311825365145214809081773986437366771454493386150171598488875432698943093840150591941719989697818635222624163)*x + (20362076539776832573387683952483544078081727031445646038151997443258031723736581106302599753040520567884180070166067833130874816055*i+22653795000179396114512883630265274354534157607007842798783301200226498181259470241673643854925126700562431916093876184408917979451) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12853128186996323155749368502679359628716652692846414290375599817303126956417299956361618490868007513421943577318941401229215703229*i+8245059060220580847261311825365145214809081773986437366771454493386150171598488875432698943093840150591941719989697818635222624163)*x + (20362076539776832573387683952483544078081727031445646038151997443258031723736581106302599753040520567884180070166067833130874816055*i+22653795000179396114512883630265274354534157607007842798783301200226498181259470241673643854925126700562431916093876184408917979451) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10196912588462056967667545558746285462530127666722538323224002405588833012368772812854913367660221118130566608141402369946985266617*i+6676167772106948203876704433408647478092903903339847592743338478706750091689399679307033903123685083979346925773025255545708399747)*x + (6924576622651627760604339302786822820893204873610508505358743575490144982306592617866668892701820014379123036247543225700758936453*i+15535331394186181759234862215279532407323402806665516540658078172746528337107136042504717973951491506194674571679124368316748161399) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10196912588462056967667545558746285462530127666722538323224002405588833012368772812854913367660221118130566608141402369946985266617*i+6676167772106948203876704433408647478092903903339847592743338478706750091689399679307033903123685083979346925773025255545708399747)*x + (6924576622651627760604339302786822820893204873610508505358743575490144982306592617866668892701820014379123036247543225700758936453*i+15535331394186181759234862215279532407323402806665516540658078172746528337107136042504717973951491506194674571679124368316748161399) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7512980082755821229771727667141073480374385198262603825469996311745714312121103121421260133679085935587194939488223439596089903425*i+5303020718348480239496390518159902381021055812564958691045848233005289830386866348659536990927168027715619463963787610492289812566)*x + (21165802488049517404820660664312665569151729127106042772219296212806622428390340358028550778749317343168953415400965821307186463791*i+10325608398812850775269152751842322527819977865176581722989635665028607589153372877427236328898917427984289560681321891477919393839) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7512980082755821229771727667141073480374385198262603825469996311745714312121103121421260133679085935587194939488223439596089903425*i+5303020718348480239496390518159902381021055812564958691045848233005289830386866348659536990927168027715619463963787610492289812566)*x + (21165802488049517404820660664312665569151729127106042772219296212806622428390340358028550778749317343168953415400965821307186463791*i+10325608398812850775269152751842322527819977865176581722989635665028607589153372877427236328898917427984289560681321891477919393839) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19091158356082384871098012630300187319045578047101591899704917380687429886112576463008401378961903433299967595310025515480087810690*i+7756514728880657716504591604772353088581885118938869609859979263250340451216580776320839524026854511393993656253583723681886227294)*x + (7417431119051145219959335869861617904692308564811619751366628749416912068592793656617570698735171791481640190501327030921382568312*i+5086285619001452181938646683190276384215563789695948505991245076903500103633898128312235922578493565259559312583419744732350839996) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19091158356082384871098012630300187319045578047101591899704917380687429886112576463008401378961903433299967595310025515480087810690*i+7756514728880657716504591604772353088581885118938869609859979263250340451216580776320839524026854511393993656253583723681886227294)*x + (7417431119051145219959335869861617904692308564811619751366628749416912068592793656617570698735171791481640190501327030921382568312*i+5086285619001452181938646683190276384215563789695948505991245076903500103633898128312235922578493565259559312583419744732350839996) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20285107671227820522452951936785059252811029159866772965090594014350614338624492334281612571443282310450847143209639812198887795406*i+10248750289291322515756780193059431140845482095105629771285735272048144508598525058433303923640338693677061497721052395128988523986)*x + (12522994173421332148149050935557030690747641925605343522217155363613156845796031486325602911930034459379677518460280322890267649185*i+20233236672788400196833984310657397422355799666991077214040092807105453383992256656669543107116395007897747118051025159996557976998) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20285107671227820522452951936785059252811029159866772965090594014350614338624492334281612571443282310450847143209639812198887795406*i+10248750289291322515756780193059431140845482095105629771285735272048144508598525058433303923640338693677061497721052395128988523986)*x + (12522994173421332148149050935557030690747641925605343522217155363613156845796031486325602911930034459379677518460280322890267649185*i+20233236672788400196833984310657397422355799666991077214040092807105453383992256656669543107116395007897747118051025159996557976998) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5996170219333597152797365708990433263552420182293802845111362728619552283751187634869584322784007750986665876105218985797471293407*i+2169724403351500652317903919368834797456645071282715435203864654177222742649419560155816337611319757019762721460718928474432497861)*x + (4016164718589646335074011877418918703634240523323399911443172852456565609970474700860294960570923886832978836752819989237303299432*i+2294155812677025592474001224263334267890715271617659784934767371910114388158080630537696449981599111242785663328335615917080875658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5996170219333597152797365708990433263552420182293802845111362728619552283751187634869584322784007750986665876105218985797471293407*i+2169724403351500652317903919368834797456645071282715435203864654177222742649419560155816337611319757019762721460718928474432497861)*x + (4016164718589646335074011877418918703634240523323399911443172852456565609970474700860294960570923886832978836752819989237303299432*i+2294155812677025592474001224263334267890715271617659784934767371910114388158080630537696449981599111242785663328335615917080875658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20996083851097122825788525980076770050008208323343910422840364561411000193951464071723312324371415756834986902077477176060992947590*i+10858839598617435708513817802500323187193762235519087217577888604438064883506619489929900967959642304522871893825758212423494451367)*x + (1457874551599431292311239435061569351512688987859634913232171774397834255097001903612295855422264031319386583084219699681536655219*i+10406585694460408910473233905166233226163250051873765112005161984300114706337840878108669973985988477892660481512656983642667899758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20996083851097122825788525980076770050008208323343910422840364561411000193951464071723312324371415756834986902077477176060992947590*i+10858839598617435708513817802500323187193762235519087217577888604438064883506619489929900967959642304522871893825758212423494451367)*x + (1457874551599431292311239435061569351512688987859634913232171774397834255097001903612295855422264031319386583084219699681536655219*i+10406585694460408910473233905166233226163250051873765112005161984300114706337840878108669973985988477892660481512656983642667899758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14324718382629961429690341251179346669324005230695951784437856235681357216113208564300304790027318227399534814227433801426240505618*i+9646295728937515853469008567155756733310128078101984756240009731763697447379741453961856734249053363971457804283363376461599507956)*x + (10175557463958745220121471677696485052915270970684808702107725247795463679979313918446823205100015805499945639163367301433650603262*i+243304621555267429526306304154876622647334202041964367373568112625150874428972274755696704002699103370789483306586586774333069511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14324718382629961429690341251179346669324005230695951784437856235681357216113208564300304790027318227399534814227433801426240505618*i+9646295728937515853469008567155756733310128078101984756240009731763697447379741453961856734249053363971457804283363376461599507956)*x + (10175557463958745220121471677696485052915270970684808702107725247795463679979313918446823205100015805499945639163367301433650603262*i+243304621555267429526306304154876622647334202041964367373568112625150874428972274755696704002699103370789483306586586774333069511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8137585935056333617743981211720485563189706450004857009519887305224070318042656286872402917856876723583602511988632031299830694407*i+7386077012021284136155382500640727809063450539241753902399462207427273192794100172258593099697577394338191061377427847482501044088)*x + (8292828632253497923207754864104504271535224793715861450174301928118042032242120788007836792248315811974944089316482644196244593675*i+10140316921194658862002655408466893791008607289202076097404949477208436349837913754405638646705141632750209149160381699519651371793) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8137585935056333617743981211720485563189706450004857009519887305224070318042656286872402917856876723583602511988632031299830694407*i+7386077012021284136155382500640727809063450539241753902399462207427273192794100172258593099697577394338191061377427847482501044088)*x + (8292828632253497923207754864104504271535224793715861450174301928118042032242120788007836792248315811974944089316482644196244593675*i+10140316921194658862002655408466893791008607289202076097404949477208436349837913754405638646705141632750209149160381699519651371793) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5388732890212140753439361572480492677106038840646852929329542336398181460313738656997684883779630083202853363245877181505074136939*i+16470655918706888384760474691652185705644592549929148300155365031926872196662810627218746941800467130044125276030144820203187901168)*x + (22471966645406081812115482930060693628317418719998434221444426721816615311009834249895736289591520770405267402790993179497948659312*i+2792001945463442734508805378580210481663006215566173846865822885878796967063680279071204674637268151367983407899884352588616867328) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5388732890212140753439361572480492677106038840646852929329542336398181460313738656997684883779630083202853363245877181505074136939*i+16470655918706888384760474691652185705644592549929148300155365031926872196662810627218746941800467130044125276030144820203187901168)*x + (22471966645406081812115482930060693628317418719998434221444426721816615311009834249895736289591520770405267402790993179497948659312*i+2792001945463442734508805378580210481663006215566173846865822885878796967063680279071204674637268151367983407899884352588616867328) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23441297557860518534986181017724999189937493780393802197817642326510823317031897092553604530484385991114348038367131614790557528775*i+14994409188081009174917977725952542843439264426722568086741950916628639084465703078571338524127538239188231661583178239983777760989)*x + (3637959510495337475973488740183239834765481301517205785849114706099222646748913261171287556916229425504181417554190708882104845402*i+20269457970221891217779755029206660447292769021456468105889688408392554401360544270710075712052208897207962426047412326558393137924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23441297557860518534986181017724999189937493780393802197817642326510823317031897092553604530484385991114348038367131614790557528775*i+14994409188081009174917977725952542843439264426722568086741950916628639084465703078571338524127538239188231661583178239983777760989)*x + (3637959510495337475973488740183239834765481301517205785849114706099222646748913261171287556916229425504181417554190708882104845402*i+20269457970221891217779755029206660447292769021456468105889688408392554401360544270710075712052208897207962426047412326558393137924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19799135755548401180201579250884770843845708942914058048073066583342578746169744602403209523837526135479965278515579160900929623187*i+24215145389045545048940138435771349179405876153505427507648661896862046803435325700545454676099648182901995237325026508724776680214)*x + (20217231460558943385521113494614572303311153650590206601913748667930773031190341627081599249092819219855340393082034064182124521249*i+16853315031077939461623569422309342081782526269294652828321064518588642472764958838131687580128555061249620385596623789436523549124) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19799135755548401180201579250884770843845708942914058048073066583342578746169744602403209523837526135479965278515579160900929623187*i+24215145389045545048940138435771349179405876153505427507648661896862046803435325700545454676099648182901995237325026508724776680214)*x + (20217231460558943385521113494614572303311153650590206601913748667930773031190341627081599249092819219855340393082034064182124521249*i+16853315031077939461623569422309342081782526269294652828321064518588642472764958838131687580128555061249620385596623789436523549124) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1912091865735433045677275365969791029696338176472580098356024437174609054430702573583527649344913959091094124741718492476394930828*i+22788557722208927739855589116656083645155544060031630000395524582717592872112938794184784753562781908019777673786537773182303937793)*x + (7432173771129940718213167726611290435602207160091158924594674426710897331555668419561666104319289996824666554684630767646890142487*i+18280879753740072134690409282484071195711285934587883828161957396317344212830426019174260411423548393843846565107404126261622946873) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1912091865735433045677275365969791029696338176472580098356024437174609054430702573583527649344913959091094124741718492476394930828*i+22788557722208927739855589116656083645155544060031630000395524582717592872112938794184784753562781908019777673786537773182303937793)*x + (7432173771129940718213167726611290435602207160091158924594674426710897331555668419561666104319289996824666554684630767646890142487*i+18280879753740072134690409282484071195711285934587883828161957396317344212830426019174260411423548393843846565107404126261622946873) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8193441897927957992659602071154832372944429356234705746432227027357475693187040152579173172085920025639879087393368947189956166012*i+8572405972258937755986121439011103079452743933573794787338325020534617654863928080838316113190045527684405437705418697118882008048)*x + (15162939811232924552209293921313384051320415272847237003616817234999681158688702060241162524799287046937781370077807251108881978672*i+3487086050632215043259426277685977137355363911568486221551926381718764897774607386595801863586852488038133452620346151243402274775) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8193441897927957992659602071154832372944429356234705746432227027357475693187040152579173172085920025639879087393368947189956166012*i+8572405972258937755986121439011103079452743933573794787338325020534617654863928080838316113190045527684405437705418697118882008048)*x + (15162939811232924552209293921313384051320415272847237003616817234999681158688702060241162524799287046937781370077807251108881978672*i+3487086050632215043259426277685977137355363911568486221551926381718764897774607386595801863586852488038133452620346151243402274775) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4621302003351442573209297774706311374070458195459941672202451718286340785804981836942638708763481750241399968920962799674573550501*i+7384713829789935492671395446295814121709921136257273057135495179266523564152089461941450815618165785602062332390579901254042992979)*x + (21137379198646188725556380984003934909708984379850186412406166238351380145787296657799109059040725088061099577566394466425974530323*i+21760552655563509187624731167622340760485668996434051839726197500736177137041346719253322334513027973948973377905299124668021202604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4621302003351442573209297774706311374070458195459941672202451718286340785804981836942638708763481750241399968920962799674573550501*i+7384713829789935492671395446295814121709921136257273057135495179266523564152089461941450815618165785602062332390579901254042992979)*x + (21137379198646188725556380984003934909708984379850186412406166238351380145787296657799109059040725088061099577566394466425974530323*i+21760552655563509187624731167622340760485668996434051839726197500736177137041346719253322334513027973948973377905299124668021202604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15242377244704129410150714580112077523698798598222642240074676361074166993368841973711845127467442228951015263014323730299756153378*i+3271576010591750510162217125680142605404293186268769266558588605825489609109815811373299787914481582278026147901221099535958584231)*x + (21568499447288247061990723679792704821195715303030964921416789354763669228568162842542275706279560757982188434264458948296128060017*i+18632917118643228767978614550892880260984109804514423483283429450477086566170365203966480285093868936708480058558226218678739373896) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15242377244704129410150714580112077523698798598222642240074676361074166993368841973711845127467442228951015263014323730299756153378*i+3271576010591750510162217125680142605404293186268769266558588605825489609109815811373299787914481582278026147901221099535958584231)*x + (21568499447288247061990723679792704821195715303030964921416789354763669228568162842542275706279560757982188434264458948296128060017*i+18632917118643228767978614550892880260984109804514423483283429450477086566170365203966480285093868936708480058558226218678739373896) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10638627168417331433218729241351508618221828491644497422024966031392346567229272040378178410803772074986853451594780077892635230974*i+10276289819399107354688448463509196528723182727731594651876005789255679372715925199836677995873350670841871198272957915609919151837)*x + (1987021529971647636893934662899252188443457713650623915022154646515166502393287557364438353639486540809648494755310082483591759655*i+11536063787366666493960303744878924421658241979767128676530434210251924967954459168624729847962555930087408074112396865613441085714) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10638627168417331433218729241351508618221828491644497422024966031392346567229272040378178410803772074986853451594780077892635230974*i+10276289819399107354688448463509196528723182727731594651876005789255679372715925199836677995873350670841871198272957915609919151837)*x + (1987021529971647636893934662899252188443457713650623915022154646515166502393287557364438353639486540809648494755310082483591759655*i+11536063787366666493960303744878924421658241979767128676530434210251924967954459168624729847962555930087408074112396865613441085714) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4028608727846207068433184467618489201960539926992214238090434928147171639675735743054552183446813804646022552068113266120072717493*i+1438191670271524440919163421408541825713565435979395896841991801779243470889608349844386605572987587208151492487697995911319952771)*x + (9301192798550029681913147194549848018680573743751123863683124209707705377935141509838532906600970245699540777901297629537707137751*i+3588571939681045117910691989736621979603371643348756477462475492797288995026611641105254306530247817251251132266004958829308944684) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4028608727846207068433184467618489201960539926992214238090434928147171639675735743054552183446813804646022552068113266120072717493*i+1438191670271524440919163421408541825713565435979395896841991801779243470889608349844386605572987587208151492487697995911319952771)*x + (9301192798550029681913147194549848018680573743751123863683124209707705377935141509838532906600970245699540777901297629537707137751*i+3588571939681045117910691989736621979603371643348756477462475492797288995026611641105254306530247817251251132266004958829308944684) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10100123004065552782198097244939378314323506528335336050492341719777219576793037510481853167605042803917512312594322415058407046753*i+20818823059408400808894460444412946779938631809516797398340785539006868316509453156919873553903779988065971863790518427659637910385)*x + (16977289314459891237312743637363232596239629888838956034545792005524072039100538988451718198755570537564460285332077703781680782356*i+8959217046089864215008286181976962605602759097775999988420014391921828613559266038729133858401648540567290191747604188273259781817) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10100123004065552782198097244939378314323506528335336050492341719777219576793037510481853167605042803917512312594322415058407046753*i+20818823059408400808894460444412946779938631809516797398340785539006868316509453156919873553903779988065971863790518427659637910385)*x + (16977289314459891237312743637363232596239629888838956034545792005524072039100538988451718198755570537564460285332077703781680782356*i+8959217046089864215008286181976962605602759097775999988420014391921828613559266038729133858401648540567290191747604188273259781817) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22549413629147037481263688751399808171924982039690073534185271309127118942351543125521834039289961973793057365353683747697139302110*i+13479006393949390461349763722252170085819273559063314917946423144449892222647449808686908198911079474170428906958888976420366633488)*x + (5170670392571283026833539988175180606098398388364182149287468655669552329067672227396025078722594154096558867299442737568397165805*i+16821833588442826238699749450560021505451766662145396062708707864961181865228167826313120971792589753926671543700409932827943674886) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22549413629147037481263688751399808171924982039690073534185271309127118942351543125521834039289961973793057365353683747697139302110*i+13479006393949390461349763722252170085819273559063314917946423144449892222647449808686908198911079474170428906958888976420366633488)*x + (5170670392571283026833539988175180606098398388364182149287468655669552329067672227396025078722594154096558867299442737568397165805*i+16821833588442826238699749450560021505451766662145396062708707864961181865228167826313120971792589753926671543700409932827943674886) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20565068527451145606887721775548455082949359162900709480593827106349502507389171631304583134381895115661639870994048069731560402938*i+21947050159622469160435322726008839002779383225389471712079956351107608035246639586879763087128406135477992267926899464055395239215)*x + (4967776579106446154149038666707017034670797485648154713053855725872853940472780707170314203485384703867669544460084382980518198951*i+18677207022634085728244862432329901165154381203812404241651305343386365742225013931652097510071408344376339488689814686439257607312) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20565068527451145606887721775548455082949359162900709480593827106349502507389171631304583134381895115661639870994048069731560402938*i+21947050159622469160435322726008839002779383225389471712079956351107608035246639586879763087128406135477992267926899464055395239215)*x + (4967776579106446154149038666707017034670797485648154713053855725872853940472780707170314203485384703867669544460084382980518198951*i+18677207022634085728244862432329901165154381203812404241651305343386365742225013931652097510071408344376339488689814686439257607312) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12360833506358469017538498554375441092166527309898162293513369670213856361795033918248934114102819576634705240407049476281214802388*i+11499705689571483850707129671803862882378648761361071200602138966470593108615454229378996473067816743075816883804680918920888200777)*x + (18623720495776565142075285360027891437075542618296708866628852682913139538334396027945174314040392134358160555180855612989981710852*i+17991357106924457704165306901586577820644475578085467395096735585987794329967258082499023073638039219270396839004505705627952687685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12360833506358469017538498554375441092166527309898162293513369670213856361795033918248934114102819576634705240407049476281214802388*i+11499705689571483850707129671803862882378648761361071200602138966470593108615454229378996473067816743075816883804680918920888200777)*x + (18623720495776565142075285360027891437075542618296708866628852682913139538334396027945174314040392134358160555180855612989981710852*i+17991357106924457704165306901586577820644475578085467395096735585987794329967258082499023073638039219270396839004505705627952687685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6690727181886825187221128789465339624626735091072877814718680513601631673028015781239174662949674556306971912849585148340177385733*i+22644344840488243003661336665323096041164831620734267569110005970637292135005126933145325901721305198838778143779462537223352723099)*x + (14776569557357872310092954161229062833041165477667137307173970669498356817075763745810261278193720190382113759057921484563181386793*i+14209235257578234846294413392679339514857800795470057250849523856023137199692723100171878816445259796135646357484723014496957093030) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6690727181886825187221128789465339624626735091072877814718680513601631673028015781239174662949674556306971912849585148340177385733*i+22644344840488243003661336665323096041164831620734267569110005970637292135005126933145325901721305198838778143779462537223352723099)*x + (14776569557357872310092954161229062833041165477667137307173970669498356817075763745810261278193720190382113759057921484563181386793*i+14209235257578234846294413392679339514857800795470057250849523856023137199692723100171878816445259796135646357484723014496957093030) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17474423977245653181203326362591064605109200577268018393708590203818691352056383444854722385827094030623869003032954686365492229191*i+22316224367431877767649733138344030079861623778625548135531329318090614436639493668370641592775108978112128820237653917493961597923)*x + (18481303949784259116005986408626395255084755889588880239776669661576216487036308879352838216091550442524749087207935675449119941734*i+14082137582680690050436852523795637786263790691252870267591890423514928781839750611100731679467276740741892817714124967024026585123) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17474423977245653181203326362591064605109200577268018393708590203818691352056383444854722385827094030623869003032954686365492229191*i+22316224367431877767649733138344030079861623778625548135531329318090614436639493668370641592775108978112128820237653917493961597923)*x + (18481303949784259116005986408626395255084755889588880239776669661576216487036308879352838216091550442524749087207935675449119941734*i+14082137582680690050436852523795637786263790691252870267591890423514928781839750611100731679467276740741892817714124967024026585123) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24415761684077537367876228078953074215095089186309293060163872756620393400515030641803146865878000520916925541247105469594616026035*i+12520742429843757455459972450069549335191647063342322011045778837232235144679808986716558119069736831387625680968930028348287415170)*x + (18170958020875271884395221080176852584206332317904280810205253171259310427895451700517366366194495468701679049104649507684165956658*i+12503151806381062240752066483650518094822510593130010629459056961623823323558687712457551748228099075217752665805242715025527640934) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24415761684077537367876228078953074215095089186309293060163872756620393400515030641803146865878000520916925541247105469594616026035*i+12520742429843757455459972450069549335191647063342322011045778837232235144679808986716558119069736831387625680968930028348287415170)*x + (18170958020875271884395221080176852584206332317904280810205253171259310427895451700517366366194495468701679049104649507684165956658*i+12503151806381062240752066483650518094822510593130010629459056961623823323558687712457551748228099075217752665805242715025527640934) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4266575213783422709381528119351220921910243179520795287427112846504626542723088036154451567131629888408826475822652999754847556057*i+5450747954231148489602611921556358492562329308947469933378409955346100090308535568296984755373561170323684149358097909615345108200)*x + (11914802932258062773512766568246088549058955643345468975892408141223452826041199916850501672473036758357323974149057145422333395928*i+15844812972226590631248930208272469123471643708669950437910349215728363557456490023725551763868861060732982746035827067702825574477) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4266575213783422709381528119351220921910243179520795287427112846504626542723088036154451567131629888408826475822652999754847556057*i+5450747954231148489602611921556358492562329308947469933378409955346100090308535568296984755373561170323684149358097909615345108200)*x + (11914802932258062773512766568246088549058955643345468975892408141223452826041199916850501672473036758357323974149057145422333395928*i+15844812972226590631248930208272469123471643708669950437910349215728363557456490023725551763868861060732982746035827067702825574477) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9039947710749297438023532026930227326274990572030889728753585955435069692679168232821466103934955656285860746855386187023377624502*i+17981196006926416168833821900966385193624579889586900290695971100889056329736519668126931046635695288250346736472002606379169720752)*x + (13508981530529267732363572725307900335832420126432778365592482501345116842096918979797965079565380123637979886183574727103694434077*i+22902354375799535008989586713862254249689110085765697570468502318088245005615739506737118890062521081802136075904582536462705977427) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9039947710749297438023532026930227326274990572030889728753585955435069692679168232821466103934955656285860746855386187023377624502*i+17981196006926416168833821900966385193624579889586900290695971100889056329736519668126931046635695288250346736472002606379169720752)*x + (13508981530529267732363572725307900335832420126432778365592482501345116842096918979797965079565380123637979886183574727103694434077*i+22902354375799535008989586713862254249689110085765697570468502318088245005615739506737118890062521081802136075904582536462705977427) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7341238018526990934281228693268031857615497344154363790351677579602979638741709550173715383400089928007234470314475797500893131993*i+14847190657123671533866868208134830032707687310122147295198068514057399716537280124465874506221545975402423933948416399548698816671)*x + (3834699042707482675107530735511750262217950276801799747112507839443638990137706107049697735190485868591631539985977845678011333688*i+9560475073186525822996027294574303675146004194387724333227756514456265898578720591584485894619711383697699653064517763330404460034) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7341238018526990934281228693268031857615497344154363790351677579602979638741709550173715383400089928007234470314475797500893131993*i+14847190657123671533866868208134830032707687310122147295198068514057399716537280124465874506221545975402423933948416399548698816671)*x + (3834699042707482675107530735511750262217950276801799747112507839443638990137706107049697735190485868591631539985977845678011333688*i+9560475073186525822996027294574303675146004194387724333227756514456265898578720591584485894619711383697699653064517763330404460034) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7761137050422112127095901562220148990241703208241689146261778639988807440675246995566591343104083522853645364912423628694944897969*i+184599063821791591608912703885869424958080528597456355459401763820268726881265930343100175404617636796222547086506338129896829553)*x + (2934821847418519737048565379389609134908145102454544940683805203619513513859952924468289673582294753599647670787330604708300843487*i+8316610390119164424798433026209983263010266121124870949531768541228437552713713163054528452708382417436673476672530163072489839823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7761137050422112127095901562220148990241703208241689146261778639988807440675246995566591343104083522853645364912423628694944897969*i+184599063821791591608912703885869424958080528597456355459401763820268726881265930343100175404617636796222547086506338129896829553)*x + (2934821847418519737048565379389609134908145102454544940683805203619513513859952924468289673582294753599647670787330604708300843487*i+8316610390119164424798433026209983263010266121124870949531768541228437552713713163054528452708382417436673476672530163072489839823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18398388374409343124718624578594438656747008074078792391178365827596808283090431334655551926483971212836043926207974023989348796161*i+12148006060822107652642387945154186827634008332693688326299532129769971300697826458587749869385095939569645033359749046749390259636)*x + (3895773488627301486912441515587735680049446992025956179659498564974805735678264234220583534227389044943587842468857101098483796001*i+23910650143371707664454813480033687396320966950339964448219951779928016730503966531695293186191466201565426868721388738854961457297) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18398388374409343124718624578594438656747008074078792391178365827596808283090431334655551926483971212836043926207974023989348796161*i+12148006060822107652642387945154186827634008332693688326299532129769971300697826458587749869385095939569645033359749046749390259636)*x + (3895773488627301486912441515587735680049446992025956179659498564974805735678264234220583534227389044943587842468857101098483796001*i+23910650143371707664454813480033687396320966950339964448219951779928016730503966531695293186191466201565426868721388738854961457297) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24330134508507724728933072864125640919844922915137540656789810932977518977721642416990129963268693124480955397501788781013287221603*i+18265135014815735759536755958171904385604294488302202165698262439121775350877194478036809289646695207154157118905612622135113053422)*x + (7587384730487431939554928327825616850593550613885932163299961900530385929287340909316024326750373977729177599686807459199040256199*i+3087758050426931885239585223848604191724782034935620823979381943078535690099832753257264728540889279600303181304670607495739697014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24330134508507724728933072864125640919844922915137540656789810932977518977721642416990129963268693124480955397501788781013287221603*i+18265135014815735759536755958171904385604294488302202165698262439121775350877194478036809289646695207154157118905612622135113053422)*x + (7587384730487431939554928327825616850593550613885932163299961900530385929287340909316024326750373977729177599686807459199040256199*i+3087758050426931885239585223848604191724782034935620823979381943078535690099832753257264728540889279600303181304670607495739697014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6798975097191585001865697931519480428137959637612053600490315835733069137108378710313994701663817190627000500988087520832857432157*i+11501806741363269540033938515390706274110129970234217966373658833677668473413786231315162119176914294976863104064369563247114794253)*x + (4222772900679497644529702770186690227551409099865128529127197938926942392158944054809476581712536082759731238348439627436993179517*i+3552966982094427536937254940769988437780986571623613861115513623218953481424295740128825597284884031268535681177222958767591390055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6798975097191585001865697931519480428137959637612053600490315835733069137108378710313994701663817190627000500988087520832857432157*i+11501806741363269540033938515390706274110129970234217966373658833677668473413786231315162119176914294976863104064369563247114794253)*x + (4222772900679497644529702770186690227551409099865128529127197938926942392158944054809476581712536082759731238348439627436993179517*i+3552966982094427536937254940769988437780986571623613861115513623218953481424295740128825597284884031268535681177222958767591390055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1595370847970686453701123085377837370776334201503743920178365923652189621197925002851814692955068070957314300324393743860515102806*i+5798539757921624945188292367426711739030203348779458337591689087095107364051686782944748235365321198512302727199556835366511149691)*x + (10928067370814857909399622711022611535405917762119650026555034662368555747556260593213031912403952338578560435293573053573969469354*i+22120124098957658402924007750212147920474367140098552019755034732150435489738045420977310701771868226897610986206640058953045700405) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1595370847970686453701123085377837370776334201503743920178365923652189621197925002851814692955068070957314300324393743860515102806*i+5798539757921624945188292367426711739030203348779458337591689087095107364051686782944748235365321198512302727199556835366511149691)*x + (10928067370814857909399622711022611535405917762119650026555034662368555747556260593213031912403952338578560435293573053573969469354*i+22120124098957658402924007750212147920474367140098552019755034732150435489738045420977310701771868226897610986206640058953045700405) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15512691034715751886213762174743961659708748997306527937517961376321263413886664463364867289929257361037311650775252573832807601269*i+7979713797495856500269216852185267902641524392468777409893970194674262846432955526996082730028096602833965707005772197096197635345)*x + (12258591244900834631712716118387498981333521389030918066493946230463823631421316581547265157116255208710012202659012052690788319793*i+16485087240560071540100180800521528944060231466020739375934504487137262540886922065778069417614207545859404409598333725388650190823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15512691034715751886213762174743961659708748997306527937517961376321263413886664463364867289929257361037311650775252573832807601269*i+7979713797495856500269216852185267902641524392468777409893970194674262846432955526996082730028096602833965707005772197096197635345)*x + (12258591244900834631712716118387498981333521389030918066493946230463823631421316581547265157116255208710012202659012052690788319793*i+16485087240560071540100180800521528944060231466020739375934504487137262540886922065778069417614207545859404409598333725388650190823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2271418164949836983296362692912713199058736387076833093593205686197909095567826721515173074149016897313317363049877936667384384364*i+12028421904814106572330189228224303101447306808274068770577770127956721727086845849995320031937947823491097662178845717694416187578)*x + (19952321839498010221501361126247481285986154161933702639672772760848760154447738638384910053128603812490492368678121054225809339696*i+16880803146351867042495589581714631784379631575310380330495371328273256848738582267233414734541282539237951669340830924888633744773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2271418164949836983296362692912713199058736387076833093593205686197909095567826721515173074149016897313317363049877936667384384364*i+12028421904814106572330189228224303101447306808274068770577770127956721727086845849995320031937947823491097662178845717694416187578)*x + (19952321839498010221501361126247481285986154161933702639672772760848760154447738638384910053128603812490492368678121054225809339696*i+16880803146351867042495589581714631784379631575310380330495371328273256848738582267233414734541282539237951669340830924888633744773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13572086511099359357785879982700878766721855710156210795762186624899241833311620734222046457187867149212756707431830900231900237277*i+18970753689647603727577787276326787268963543766794901113226359932206597212418578811142670011366867975846563486294151095375269567249)*x + (17076765242532997546760907555603306017230853913073552154704718981960203546824154130412538440302413980160243361477079780944019543531*i+17561422605214173518325343284180743848893838000449226148344331735765475070603091977012981683323507800603370789282166701698328358150) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13572086511099359357785879982700878766721855710156210795762186624899241833311620734222046457187867149212756707431830900231900237277*i+18970753689647603727577787276326787268963543766794901113226359932206597212418578811142670011366867975846563486294151095375269567249)*x + (17076765242532997546760907555603306017230853913073552154704718981960203546824154130412538440302413980160243361477079780944019543531*i+17561422605214173518325343284180743848893838000449226148344331735765475070603091977012981683323507800603370789282166701698328358150) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6875392946778302849832568242286496786564755077834008560012515913384929961022938091253035905356319408427595793400929833371517570723*i+12959165349934165855440736132725171627234202995924459231130505641598903468613295610710395757506518306922284301635442572303007060077)*x + (20097736820595192564167563658428104083574471013978529991361277390750792845996944496234951763972539887361727500976440279331391265293*i+12845161224073335865597315020160041408339531832774665798945828018830686904522625810458219409185046198680579004805761603908553203561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6875392946778302849832568242286496786564755077834008560012515913384929961022938091253035905356319408427595793400929833371517570723*i+12959165349934165855440736132725171627234202995924459231130505641598903468613295610710395757506518306922284301635442572303007060077)*x + (20097736820595192564167563658428104083574471013978529991361277390750792845996944496234951763972539887361727500976440279331391265293*i+12845161224073335865597315020160041408339531832774665798945828018830686904522625810458219409185046198680579004805761603908553203561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24248896385788298822909891267755232998447136910741196533928586065409959192179140987972975239483268939603262959818289369063706593149*i+1148210892309341893532757673841442195412561151395211074684090916401149193339421397524238935273713958086173650431892931618583453930)*x + (1470520277505837207197562128562303929893758489721811577175281817988125386419856392434876953486881035039064624984489874878124747136*i+6402855442927269856678665223070429263611111875951617212348472590336079652203552696633058367435869115145979904442135826708700015220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24248896385788298822909891267755232998447136910741196533928586065409959192179140987972975239483268939603262959818289369063706593149*i+1148210892309341893532757673841442195412561151395211074684090916401149193339421397524238935273713958086173650431892931618583453930)*x + (1470520277505837207197562128562303929893758489721811577175281817988125386419856392434876953486881035039064624984489874878124747136*i+6402855442927269856678665223070429263611111875951617212348472590336079652203552696633058367435869115145979904442135826708700015220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6845118656862670881504479823179404268391906456170200197412566768591743950331920091086279459425607993327021561219438667879684432810*i+4006588337833457228944843712875254332252843914504068844681836093209070795848998162089499433530980026283393763892418450931068829005)*x + (2624549149187032584038138010497529889716786971021351219221589625683772830543436715341520866029807813004599281469146859490787268489*i+16312385378633567322310353199397961145145857035221591147770486652627190962304403022460396127892272762440735681485567458216334730987) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6845118656862670881504479823179404268391906456170200197412566768591743950331920091086279459425607993327021561219438667879684432810*i+4006588337833457228944843712875254332252843914504068844681836093209070795848998162089499433530980026283393763892418450931068829005)*x + (2624549149187032584038138010497529889716786971021351219221589625683772830543436715341520866029807813004599281469146859490787268489*i+16312385378633567322310353199397961145145857035221591147770486652627190962304403022460396127892272762440735681485567458216334730987) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21342247500529120027750218135101593190305279954700028844649888193440718353788962846047679150515681771573715365936074688179691589630*i+14506147226237147268822334258765688018789596892757484669440466763595954648818585865085319800804600246651927857852134864611098800554)*x + (1374547096238626645202890541707364617614084878389368378133760653374459108148724278161113125923891179163030400364803705400941910747*i+10081038290381007780877301395032670000418867122838126559176648430347937782412673364644995262580639521153320381684848044886801589660) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21342247500529120027750218135101593190305279954700028844649888193440718353788962846047679150515681771573715365936074688179691589630*i+14506147226237147268822334258765688018789596892757484669440466763595954648818585865085319800804600246651927857852134864611098800554)*x + (1374547096238626645202890541707364617614084878389368378133760653374459108148724278161113125923891179163030400364803705400941910747*i+10081038290381007780877301395032670000418867122838126559176648430347937782412673364644995262580639521153320381684848044886801589660) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17646466646452166576889935396485137135368291765979923487970844511058827345342409740714975420473895393222690813621155500598151300541*i+12015375155198238428797941672625499246893989219717985902216159293170494674019623854197857308949796722427546568742639790133402189221)*x + (22764694617951374628206000006719328392172313291155378390610492384125498957031247460750568163591973575354170495062142469250011351765*i+23709367470286859020747646218705745211273278822955164300084957777428443694730236286450179395495586050567966350119623848279609542221) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17646466646452166576889935396485137135368291765979923487970844511058827345342409740714975420473895393222690813621155500598151300541*i+12015375155198238428797941672625499246893989219717985902216159293170494674019623854197857308949796722427546568742639790133402189221)*x + (22764694617951374628206000006719328392172313291155378390610492384125498957031247460750568163591973575354170495062142469250011351765*i+23709367470286859020747646218705745211273278822955164300084957777428443694730236286450179395495586050567966350119623848279609542221) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8789574622148305372055493435162576869596036619694803436889913553692314322259193453869713396263126841504264212210031042675873655931*i+9133644861543538819100085217336664550412396063841848035617516822367752919735788492312319453957696788263553649934447190616647750674)*x + (8341213180916129727325509794834949803977574251679768694142776087914524368196152880407882639317589915409898635426684768466767916979*i+7410419464652590697241459404970781247920340927524847906275055585229192381674313259711195527532235325552350390362513860669893453993) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8789574622148305372055493435162576869596036619694803436889913553692314322259193453869713396263126841504264212210031042675873655931*i+9133644861543538819100085217336664550412396063841848035617516822367752919735788492312319453957696788263553649934447190616647750674)*x + (8341213180916129727325509794834949803977574251679768694142776087914524368196152880407882639317589915409898635426684768466767916979*i+7410419464652590697241459404970781247920340927524847906275055585229192381674313259711195527532235325552350390362513860669893453993) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8475566762426126015129348182498142044013952811464437212323159580033067980725340163548335006279997734071455589509222169115356844113*i+9608294548774028886095553744527005068767114903015810218295741528462474726262688083670620995076475308330937907959096030537172959261)*x + (7103777833144875548574771076131271806917683608760276632654784191192010585315723254634302620553717586168027079328762475674789364243*i+14019190905358183779558101244137561480895538055432654167291239525543003965380570185363003374216644704963796876254497001721351488595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8475566762426126015129348182498142044013952811464437212323159580033067980725340163548335006279997734071455589509222169115356844113*i+9608294548774028886095553744527005068767114903015810218295741528462474726262688083670620995076475308330937907959096030537172959261)*x + (7103777833144875548574771076131271806917683608760276632654784191192010585315723254634302620553717586168027079328762475674789364243*i+14019190905358183779558101244137561480895538055432654167291239525543003965380570185363003374216644704963796876254497001721351488595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4329939679302696044716175757727219166012441279381587427394536121220279181664415212482003191427701496549644357173889587522621367427*i+16904766608141108529446331336221218512563117621168987301187389419501621803834433762535865503621141473240212935084032705051053383875)*x + (6504213337683651729714955662543449819954608462810236876094876502761613569140172340503401279060970345529120834988091401277170048717*i+15328484936008120981388772222051116316810620181033366458872162046597550615351047253812391160682411211184522417665673556217339515028) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4329939679302696044716175757727219166012441279381587427394536121220279181664415212482003191427701496549644357173889587522621367427*i+16904766608141108529446331336221218512563117621168987301187389419501621803834433762535865503621141473240212935084032705051053383875)*x + (6504213337683651729714955662543449819954608462810236876094876502761613569140172340503401279060970345529120834988091401277170048717*i+15328484936008120981388772222051116316810620181033366458872162046597550615351047253812391160682411211184522417665673556217339515028) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21045886731587182810864783721745496926557960966530258634269092936388074487934113738788921370245167737758976649498620084362187181102*i+13287595510682706057428876196027159699803868146284179810556401298747820897001075166493126948363775222187291825495716076979081641021)*x + (6309910794245831633017276973478970446949418351742477906399463940892026827615628209752983838666264225767955981918553359806690765799*i+1080119873251524125470353028770970070799922867778794221441067050370188790899020375490563581410949337138575292120325636588948003518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21045886731587182810864783721745496926557960966530258634269092936388074487934113738788921370245167737758976649498620084362187181102*i+13287595510682706057428876196027159699803868146284179810556401298747820897001075166493126948363775222187291825495716076979081641021)*x + (6309910794245831633017276973478970446949418351742477906399463940892026827615628209752983838666264225767955981918553359806690765799*i+1080119873251524125470353028770970070799922867778794221441067050370188790899020375490563581410949337138575292120325636588948003518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13851012655277791244610186687677629058486885232347954335273765716063234691472720564738271623468287180621104383304314782497320826510*i+23831615942750934028554511247083236862558677429145898320850799930394404605826690488075830103690214977346588122451885529327426541903)*x + (5529458264302391665756467479370533589884284919753841803823691656464874070159144013653217338677669863445600850189496266595333640189*i+23458945101441201527305411691172607540145161434659810196447976130116851899523558939909652715021309027877872239485869351827453858527) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13851012655277791244610186687677629058486885232347954335273765716063234691472720564738271623468287180621104383304314782497320826510*i+23831615942750934028554511247083236862558677429145898320850799930394404605826690488075830103690214977346588122451885529327426541903)*x + (5529458264302391665756467479370533589884284919753841803823691656464874070159144013653217338677669863445600850189496266595333640189*i+23458945101441201527305411691172607540145161434659810196447976130116851899523558939909652715021309027877872239485869351827453858527) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22255861580735201587745643529104852135705111476921867821992483390297854512882111773806580008442380465292313255185128033269588933178*i+5561516641552955205950093653948852628281625458034045980920962792918235668191008662386108832381195673562589595105668798971832603160)*x + (2156765232423085924448595130489766686636857166341336878746040240227394996330778881981956103407251279450351339760197325778123672662*i+20883808412704202095592007590958261671138348777257844863324283119578124948136448103828563693043880178836225478057297530373849478844) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22255861580735201587745643529104852135705111476921867821992483390297854512882111773806580008442380465292313255185128033269588933178*i+5561516641552955205950093653948852628281625458034045980920962792918235668191008662386108832381195673562589595105668798971832603160)*x + (2156765232423085924448595130489766686636857166341336878746040240227394996330778881981956103407251279450351339760197325778123672662*i+20883808412704202095592007590958261671138348777257844863324283119578124948136448103828563693043880178836225478057297530373849478844) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16202817615971352393656857433631758283431400410707655910150167079227119967837868494819854106113483973599179060012926480027876437812*i+3744088303540657453825907393019788708588001613018706306220020655925820870820539290817750748517192020352211126630900082487319212717)*x + (3633610058921320730103934622689088690060768143674081354901747257196427806919309431804204302847784299490566108577706709709610922035*i+21774642242885995060108115306377676112638878833563365978778085805440964785422279507383649635939305516568343860291686387384728520499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16202817615971352393656857433631758283431400410707655910150167079227119967837868494819854106113483973599179060012926480027876437812*i+3744088303540657453825907393019788708588001613018706306220020655925820870820539290817750748517192020352211126630900082487319212717)*x + (3633610058921320730103934622689088690060768143674081354901747257196427806919309431804204302847784299490566108577706709709610922035*i+21774642242885995060108115306377676112638878833563365978778085805440964785422279507383649635939305516568343860291686387384728520499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7729714726668857757325855277876836939804433738526435303624068881114780855568787739664109130418791626145519797752900867342433390929*i+8829542713994617592584757108365516178526147550312036860793277579687045954684194933448974367042286441692861267219619412356001872114)*x + (15476925939000163747809035480737968780909673882277238162466919952514984175215676928858239836240730235213677216117408752020255006109*i+12026210334019852061870550205993243469072129559363083794855326701614628154183363292023403730469466085173394523543481311270446489406) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7729714726668857757325855277876836939804433738526435303624068881114780855568787739664109130418791626145519797752900867342433390929*i+8829542713994617592584757108365516178526147550312036860793277579687045954684194933448974367042286441692861267219619412356001872114)*x + (15476925939000163747809035480737968780909673882277238162466919952514984175215676928858239836240730235213677216117408752020255006109*i+12026210334019852061870550205993243469072129559363083794855326701614628154183363292023403730469466085173394523543481311270446489406) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13619388223160674146443836762558596902363889931785250950579333314872089927057573734742992742767530484593679792066891697391095904577*i+1354089953160751549584512346962225622624543155393574144988621558708992606410806037805408133271589117444134575579160296222237652298)*x + (19029859207717306838280394040863156091647780346635330955772979437038895071524980109423359980492695367006769876026003305446109915439*i+14145903515154393420392509110897637001778856436502586567442061249599366413405676774953844839307707940762827595043840675585847235408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13619388223160674146443836762558596902363889931785250950579333314872089927057573734742992742767530484593679792066891697391095904577*i+1354089953160751549584512346962225622624543155393574144988621558708992606410806037805408133271589117444134575579160296222237652298)*x + (19029859207717306838280394040863156091647780346635330955772979437038895071524980109423359980492695367006769876026003305446109915439*i+14145903515154393420392509110897637001778856436502586567442061249599366413405676774953844839307707940762827595043840675585847235408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7522520755129717633998713900911394319672057633447765790779210845578483497954787506200573314861557072469259987517868182044440156144*i+9882807027902457595164605850642004255831639427889581136876164700074575251545511107706557651820963695628794325478468889294874230239)*x + (11737814082000336523503432254104967760694984206400912093718900099427852585668053053825473745107586186632248777129448553834279475157*i+22809379530314455115236855406698479001648205185398480789601646034431381040011034073035104928869493608784714034257762568090918952066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7522520755129717633998713900911394319672057633447765790779210845578483497954787506200573314861557072469259987517868182044440156144*i+9882807027902457595164605850642004255831639427889581136876164700074575251545511107706557651820963695628794325478468889294874230239)*x + (11737814082000336523503432254104967760694984206400912093718900099427852585668053053825473745107586186632248777129448553834279475157*i+22809379530314455115236855406698479001648205185398480789601646034431381040011034073035104928869493608784714034257762568090918952066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7694919689716458599871626379552374013060526052894232537564552227315330147855721885329131881868260024418587499929058802559243593801*i+20010012750227028011258634327659187402843665202466300337041291988791088139648881341177977145504710519631356378354459498676049499847)*x + (2496707333053495406367802568307988942398338180327788049705607106591413961060716762408295438601731586714423386690046234209155479050*i+8352429335875643764503569256002649554708197861782809575093807029937859753790695732333356756533267939167811120229318638786288906785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7694919689716458599871626379552374013060526052894232537564552227315330147855721885329131881868260024418587499929058802559243593801*i+20010012750227028011258634327659187402843665202466300337041291988791088139648881341177977145504710519631356378354459498676049499847)*x + (2496707333053495406367802568307988942398338180327788049705607106591413961060716762408295438601731586714423386690046234209155479050*i+8352429335875643764503569256002649554708197861782809575093807029937859753790695732333356756533267939167811120229318638786288906785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4692044849702265377347199637990280768646213347301337698000451419740192563072786750713519412328500059112081644833825537727421534167*i+19716862328412713498485130878553172496935801084431088104220768801144896171127559770421440011732773037255649412299237201201206080592)*x + (7983919483879577964486052742637072774497321213805094870736256527280965021511777689151925159479738589089672881035452667862553048479*i+9552986297676920243873980541625222522886631300894012338500043768330764558435258377818235368045079469979474239681470994187685114983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4692044849702265377347199637990280768646213347301337698000451419740192563072786750713519412328500059112081644833825537727421534167*i+19716862328412713498485130878553172496935801084431088104220768801144896171127559770421440011732773037255649412299237201201206080592)*x + (7983919483879577964486052742637072774497321213805094870736256527280965021511777689151925159479738589089672881035452667862553048479*i+9552986297676920243873980541625222522886631300894012338500043768330764558435258377818235368045079469979474239681470994187685114983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18929493577395219590342277734996948339690277862141734359020156794898438578286699965837452450305621375208883403698692200465431809893*i+1460839103159870591594995846675220173477632414811013319503232863851752389033944073604932683059665195505588427863291477509502723981)*x + (14629447223422306575281049892929638219169835874624624001888976836230267784594248905793250520534169322104683265498448484360817533769*i+13065997961478342027409821901057318815138238917159396104515793238752481290241879480535381824160816473670296825280571686656460534721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18929493577395219590342277734996948339690277862141734359020156794898438578286699965837452450305621375208883403698692200465431809893*i+1460839103159870591594995846675220173477632414811013319503232863851752389033944073604932683059665195505588427863291477509502723981)*x + (14629447223422306575281049892929638219169835874624624001888976836230267784594248905793250520534169322104683265498448484360817533769*i+13065997961478342027409821901057318815138238917159396104515793238752481290241879480535381824160816473670296825280571686656460534721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14217080498847232598482599396780963411775594134931939743811706499752171561894058797922319220537136191222271470361137493447533843553*i+9511888260269917190453968448730927985553687441727834981850937098436644946392652379183854621675250319024760646525525243863125426302)*x + (1448693388195768196728215679737882863014792502018167868945702908938006511444683019162861029879985750267930106665770650433966806174*i+5478339491877231147513104725832309971185750608857556396474095702328179881228176923686926027010740343393066991814388141829758268920) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14217080498847232598482599396780963411775594134931939743811706499752171561894058797922319220537136191222271470361137493447533843553*i+9511888260269917190453968448730927985553687441727834981850937098436644946392652379183854621675250319024760646525525243863125426302)*x + (1448693388195768196728215679737882863014792502018167868945702908938006511444683019162861029879985750267930106665770650433966806174*i+5478339491877231147513104725832309971185750608857556396474095702328179881228176923686926027010740343393066991814388141829758268920) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4251175482415003346668367392318464782262873402824370422872782014390285486201412391831382385559294658289364494558423660603599665638*i+21443601431947309882392018386428168810731857501649514590425451403550150448037255851588422544029646324513050972427927156525393698739)*x + (1449174101321189700675994891288134480727933332060028546033240554558781082713776211213763026031475640081277219095911011242026249828*i+9542143806349010343872844383534468595173980480361188236774095713221635816105939319826258558568191283808138483555049998584230245283) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4251175482415003346668367392318464782262873402824370422872782014390285486201412391831382385559294658289364494558423660603599665638*i+21443601431947309882392018386428168810731857501649514590425451403550150448037255851588422544029646324513050972427927156525393698739)*x + (1449174101321189700675994891288134480727933332060028546033240554558781082713776211213763026031475640081277219095911011242026249828*i+9542143806349010343872844383534468595173980480361188236774095713221635816105939319826258558568191283808138483555049998584230245283) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1709991161612501020782828781659503868513195174209378260552157670517443023016965716016062814427387192846838822174753818812178490190*i+5757031749541109279657607698394951961901483956084349751334430356118068266995939048114841882961886447122781564041684538423865124782)*x + (22765964876478342608954434496594940843086997963593367734060221818765417415019919091560131377130665809548902649112123088976112753693*i+5990980797396932679152948567950552838374530898481742359494670214286128157965797190042277216860204167186878000821804246071896254249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1709991161612501020782828781659503868513195174209378260552157670517443023016965716016062814427387192846838822174753818812178490190*i+5757031749541109279657607698394951961901483956084349751334430356118068266995939048114841882961886447122781564041684538423865124782)*x + (22765964876478342608954434496594940843086997963593367734060221818765417415019919091560131377130665809548902649112123088976112753693*i+5990980797396932679152948567950552838374530898481742359494670214286128157965797190042277216860204167186878000821804246071896254249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1183655105928388703648750934869742983000753851783318259938003179717825321421341298451898315701665373330591582932043558336728740250*i+22887082774283273264062055441233958490207534171703641803536528410088480995331700494184512842898318955479278865380361693784714376101)*x + (1011641863139237287299430924303733640302382447754155301307698261562659412603114440894441896368995586288949822192724804245660680823*i+16168829102885427398957251683132196744770046226309255940589098461628125541060366479459992200046082908281634907563774625088855105907) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1183655105928388703648750934869742983000753851783318259938003179717825321421341298451898315701665373330591582932043558336728740250*i+22887082774283273264062055441233958490207534171703641803536528410088480995331700494184512842898318955479278865380361693784714376101)*x + (1011641863139237287299430924303733640302382447754155301307698261562659412603114440894441896368995586288949822192724804245660680823*i+16168829102885427398957251683132196744770046226309255940589098461628125541060366479459992200046082908281634907563774625088855105907) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23487027439307980817749246694114666991951430577070906278280959210458745079612366334968104127456627242165300836395587332996777579613*i+19827355232352278009866458417213973858727404275971603705299811123395316589046414645047056643095127959420982729036092496665405769507)*x + (14918013991516981432476172481593566968674375786718920753951606710675699073149292642502896259415965842947400170087281626841509884495*i+8689013745723939574602707712378648407295582629966272058754026477382204965977607213431755728318250782039642166507631291168646422804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23487027439307980817749246694114666991951430577070906278280959210458745079612366334968104127456627242165300836395587332996777579613*i+19827355232352278009866458417213973858727404275971603705299811123395316589046414645047056643095127959420982729036092496665405769507)*x + (14918013991516981432476172481593566968674375786718920753951606710675699073149292642502896259415965842947400170087281626841509884495*i+8689013745723939574602707712378648407295582629966272058754026477382204965977607213431755728318250782039642166507631291168646422804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23158455393791383879650163495608702748265869706423294199033848307630981006771364115525609349780528209962958278884740406431564165241*i+11626876734095464579558050460006194200150061412360520438780620462143885982270377338553145997805086850617635244802826797266940357090)*x + (20814309712320770603982012579149707378261744467369239383809087565608616077460549457918794469183002272325388732637450803425057635486*i+22610496353782597074082425045890549345812762837554765558372090730994593746384850100136110111005277628877258195402857339115813316455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23158455393791383879650163495608702748265869706423294199033848307630981006771364115525609349780528209962958278884740406431564165241*i+11626876734095464579558050460006194200150061412360520438780620462143885982270377338553145997805086850617635244802826797266940357090)*x + (20814309712320770603982012579149707378261744467369239383809087565608616077460549457918794469183002272325388732637450803425057635486*i+22610496353782597074082425045890549345812762837554765558372090730994593746384850100136110111005277628877258195402857339115813316455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14956647105196030074862845815674646441220170814577048811752314305686862511253289265083119245994411591551191178152819967698314998289*i+20120208941161392085950332673640634250591990954447102867127937528696282806852061715750444346017607097857407161971469845429172158691)*x + (9814712955041916997980241186948362401211474271517661608443835785539386711509127739096109705177364416676137681701693135939574696402*i+10595404964861518825039177291391634572161964552887987439451627451759382401663681343313641735583078341649536300631777185349128094523) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14956647105196030074862845815674646441220170814577048811752314305686862511253289265083119245994411591551191178152819967698314998289*i+20120208941161392085950332673640634250591990954447102867127937528696282806852061715750444346017607097857407161971469845429172158691)*x + (9814712955041916997980241186948362401211474271517661608443835785539386711509127739096109705177364416676137681701693135939574696402*i+10595404964861518825039177291391634572161964552887987439451627451759382401663681343313641735583078341649536300631777185349128094523) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19059570142411720138086294656891121342808036521329016310558142816541632673649852318823600030943560133524980381968068280951074899665*i+9551171135858255065378460889860198587207019254703125824534308498698866572646760910424493325860052229927132111604833523538407818782)*x + (1647804872612534922956082710516754935569650835226626032311997302581181892969705319201673903728868899629041530800677146433776509160*i+4941100762913462186278211636369512331826769031379016891397072432241090170813396906129529569357042115234462626492576452424869657380) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19059570142411720138086294656891121342808036521329016310558142816541632673649852318823600030943560133524980381968068280951074899665*i+9551171135858255065378460889860198587207019254703125824534308498698866572646760910424493325860052229927132111604833523538407818782)*x + (1647804872612534922956082710516754935569650835226626032311997302581181892969705319201673903728868899629041530800677146433776509160*i+4941100762913462186278211636369512331826769031379016891397072432241090170813396906129529569357042115234462626492576452424869657380) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14665635773784484573713196697829148906574086694953532583280252889974864461723761446881427165936791876233256576655099849902544399757*i+24408646006530353032000569701065811140994313898998486132589911409467229934965482011464898850768320000611255717677082671572551646089)*x + (19800328994270275301833198129336255308152057132618419672824593027756381854391926231889718946889900220708226874038461276000971682551*i+11936096234802057794274424234984334166127638650350929553330339391772048353731839874589569829367721981571972157177348407260730865200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14665635773784484573713196697829148906574086694953532583280252889974864461723761446881427165936791876233256576655099849902544399757*i+24408646006530353032000569701065811140994313898998486132589911409467229934965482011464898850768320000611255717677082671572551646089)*x + (19800328994270275301833198129336255308152057132618419672824593027756381854391926231889718946889900220708226874038461276000971682551*i+11936096234802057794274424234984334166127638650350929553330339391772048353731839874589569829367721981571972157177348407260730865200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17031096996869261227301908893050116251513987002246363579250122096408721569006140436340067334793812410385924121722111447639443408407*i+1762864744349051895450829164908768282045681761427729297390722653446854275934718325466641908727496599311915405959299587551192196201)*x + (24435855887614463393080838656279181809005779877428258516620723976517564599900111244158941155082068652860122672946585113513631374831*i+4310936328480263796370230061046876018290970807467705122494659696777963264170960601131883477165165227954984693726423254518791253206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17031096996869261227301908893050116251513987002246363579250122096408721569006140436340067334793812410385924121722111447639443408407*i+1762864744349051895450829164908768282045681761427729297390722653446854275934718325466641908727496599311915405959299587551192196201)*x + (24435855887614463393080838656279181809005779877428258516620723976517564599900111244158941155082068652860122672946585113513631374831*i+4310936328480263796370230061046876018290970807467705122494659696777963264170960601131883477165165227954984693726423254518791253206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3851504566355303585545287859904690426446391123455669046149834777178894172353951831564433279961130763872166686312481152665202524427*i+7901931017298853783558471849039854687692065180388397045859249321292726498896885114138479005029592082938744929795809749604543425690)*x + (4574252108955360309952894323234548542309958856168145591652801718996514083543004840155361018086237269961977522595820504242581142974*i+21257875822869785370900232659856638351952703693796190732083545555187804691553051587523267646078266497664938093049025680316654918091) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3851504566355303585545287859904690426446391123455669046149834777178894172353951831564433279961130763872166686312481152665202524427*i+7901931017298853783558471849039854687692065180388397045859249321292726498896885114138479005029592082938744929795809749604543425690)*x + (4574252108955360309952894323234548542309958856168145591652801718996514083543004840155361018086237269961977522595820504242581142974*i+21257875822869785370900232659856638351952703693796190732083545555187804691553051587523267646078266497664938093049025680316654918091) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6638552325164611415659407886537008500446714326086063830642592825410070630042524292420645991456762264948000394800935059356792779072*i+9151365965569211928548516528053677557534763066746562667106349275752519316165194889054345384809038543474934316125651538253868164356)*x + (9859521842627993535673235755435781840370306380045475712436460750119161267517191542945455770498485134002823912227943147599789485186*i+10334448844250705542756683929327677857385197521853161333580465017544411342697994715180357511289992631863045622574978386048770213464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6638552325164611415659407886537008500446714326086063830642592825410070630042524292420645991456762264948000394800935059356792779072*i+9151365965569211928548516528053677557534763066746562667106349275752519316165194889054345384809038543474934316125651538253868164356)*x + (9859521842627993535673235755435781840370306380045475712436460750119161267517191542945455770498485134002823912227943147599789485186*i+10334448844250705542756683929327677857385197521853161333580465017544411342697994715180357511289992631863045622574978386048770213464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6452767628895569290669733485397031526104090648441784582415491282843949747665644419280244786513823650147884486845208810461505409159*i+16705285622124483581525354704163959858912086924591978345800879989472948882848167073310576603540348979338143213225609931082329758270)*x + (7505912228443549787024956844817262761933603152832139303112485047870940867380242312721668687010525506070181502585998295567185628401*i+1661881102388207349349252953720116890468501635231224531937039630722645612825732682306993833995878648204955160081170300623799422881) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6452767628895569290669733485397031526104090648441784582415491282843949747665644419280244786513823650147884486845208810461505409159*i+16705285622124483581525354704163959858912086924591978345800879989472948882848167073310576603540348979338143213225609931082329758270)*x + (7505912228443549787024956844817262761933603152832139303112485047870940867380242312721668687010525506070181502585998295567185628401*i+1661881102388207349349252953720116890468501635231224531937039630722645612825732682306993833995878648204955160081170300623799422881) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17727966223624606881914721970885059240334534240080135715285705915158970223935360967110958668609848439881894758488647872780126532745*i+13840714330613593790608365353796302109698617596540020065184365817557009607848041583037073457604544093235095424497207654215647968161)*x + (24267911031458595075408095796841846699276136675455485431763686974879307615060406817467257151358917378449349864733054235762740224362*i+11862005672849796865226407844631136133182694130106765942549148681202240590372549435622430506316104196859164466887988328971962362462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17727966223624606881914721970885059240334534240080135715285705915158970223935360967110958668609848439881894758488647872780126532745*i+13840714330613593790608365353796302109698617596540020065184365817557009607848041583037073457604544093235095424497207654215647968161)*x + (24267911031458595075408095796841846699276136675455485431763686974879307615060406817467257151358917378449349864733054235762740224362*i+11862005672849796865226407844631136133182694130106765942549148681202240590372549435622430506316104196859164466887988328971962362462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8641158940192101077666364485550474950180207033134469408622539096371090164365364028430656010577708607577833426695204128472984255153*i+23426583191920495590142281983262268019509681037391847743939902031036358754626759223055634922580213099338738264813837602546804445735)*x + (2689132505271142533032340891816913025287723459119943300628031643176372222664724119335658902589625383856418211661367885380052164205*i+12841563775656925230783975504911918464475865188286713656785776075465668826948862156989927971792326555706903633163084321204795998805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8641158940192101077666364485550474950180207033134469408622539096371090164365364028430656010577708607577833426695204128472984255153*i+23426583191920495590142281983262268019509681037391847743939902031036358754626759223055634922580213099338738264813837602546804445735)*x + (2689132505271142533032340891816913025287723459119943300628031643176372222664724119335658902589625383856418211661367885380052164205*i+12841563775656925230783975504911918464475865188286713656785776075465668826948862156989927971792326555706903633163084321204795998805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1702243106759021198044837614397589818814077143996236360085668383929557334805938030193206155329368105392288564618429382829366323910*i+15348859760356676376240014202744834090699291758995897220314554582251851403457920158869901915294292512222993749046262817283087145125)*x + (6458783602081275110113815554641985174238697692253691291700689946143163989699542834331114081070453550303148712588646276872520602924*i+22318074826794575376376834033628993103459188381208261926347499064642449256470874507499696571045481676447112606145702870574593561164) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1702243106759021198044837614397589818814077143996236360085668383929557334805938030193206155329368105392288564618429382829366323910*i+15348859760356676376240014202744834090699291758995897220314554582251851403457920158869901915294292512222993749046262817283087145125)*x + (6458783602081275110113815554641985174238697692253691291700689946143163989699542834331114081070453550303148712588646276872520602924*i+22318074826794575376376834033628993103459188381208261926347499064642449256470874507499696571045481676447112606145702870574593561164) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9020908446040046234907320234397939927992395846658155993801470045047572798978016862772044495627188929849171162765124766691689953434*i+22900734773498375657103312608169860267083616583610501053318722937795979884188285221656187357195711912168839263096737836945667766231)*x + (1622779730802883638944876642840251954454945779217732525395009885818947383460701532303905357191686731609373968735001057275325753216*i+9712033186806989662510111338728223976677296427449827630616565070167486997195248816906543905670034779060519653549725239945223270408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9020908446040046234907320234397939927992395846658155993801470045047572798978016862772044495627188929849171162765124766691689953434*i+22900734773498375657103312608169860267083616583610501053318722937795979884188285221656187357195711912168839263096737836945667766231)*x + (1622779730802883638944876642840251954454945779217732525395009885818947383460701532303905357191686731609373968735001057275325753216*i+9712033186806989662510111338728223976677296427449827630616565070167486997195248816906543905670034779060519653549725239945223270408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21139324655455896861906382970906598713591954613253139785203551703009935814183253601607037001912889975264176455594725758654949534066*i+6024723717816073426450031342088926619425304449430573872346440544974418973972670784117359695250619730811364083493573046236984034457)*x + (15892691908957519994941027770752608097365685014049258018937896690004353271942818117886225325627275561134904385340604791133587193157*i+23732345998935665974974037340289813160989333012405712309314894850727770437667876962641248731999901105197283257255683005404979024931) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21139324655455896861906382970906598713591954613253139785203551703009935814183253601607037001912889975264176455594725758654949534066*i+6024723717816073426450031342088926619425304449430573872346440544974418973972670784117359695250619730811364083493573046236984034457)*x + (15892691908957519994941027770752608097365685014049258018937896690004353271942818117886225325627275561134904385340604791133587193157*i+23732345998935665974974037340289813160989333012405712309314894850727770437667876962641248731999901105197283257255683005404979024931) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17859365368782651035389038558448564950658329095003953719676902475675737724362895281604489243172502897077169812952247199248410927127*i+23864212002676693891546027440815018888419484711625792434169907166636511526465098018458304467316943064104604307784025684135089533389)*x + (17967327744507822422002132865894582144497436254326860521684651947881018675701946248008301989937447010278769148176675207080354584101*i+11993677872713593663230486380419398373615456346560587737783803548415900194415153676689038845988594221572348761407766221315060748918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17859365368782651035389038558448564950658329095003953719676902475675737724362895281604489243172502897077169812952247199248410927127*i+23864212002676693891546027440815018888419484711625792434169907166636511526465098018458304467316943064104604307784025684135089533389)*x + (17967327744507822422002132865894582144497436254326860521684651947881018675701946248008301989937447010278769148176675207080354584101*i+11993677872713593663230486380419398373615456346560587737783803548415900194415153676689038845988594221572348761407766221315060748918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4573017900082577169496203011632826318775925764694707789004158622405064632667014348518939534155836080212532836561688003208677297426*i+7813440941547658446831392738299069465381463713969030365902220687372970752010268964498197163750312954677544103395568449105426007402)*x + (8701731086354865515301870125324807373634973421997060381079499405508114684214011192465733804446486687612313234013383045544304751980*i+11829506470472867757903204904544318424308038009181890389038785173755929612046256924516358867762346431560555238196922276879185486639) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4573017900082577169496203011632826318775925764694707789004158622405064632667014348518939534155836080212532836561688003208677297426*i+7813440941547658446831392738299069465381463713969030365902220687372970752010268964498197163750312954677544103395568449105426007402)*x + (8701731086354865515301870125324807373634973421997060381079499405508114684214011192465733804446486687612313234013383045544304751980*i+11829506470472867757903204904544318424308038009181890389038785173755929612046256924516358867762346431560555238196922276879185486639) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12305332993630289615215585142880087515720944822422319806090664231484514310127178464596823141501244369969656659274771203629270081268*i+22444125889593486525501978819958750401926168021584716135110003592021961573324100931350442446272868809503137914429700641228442748115)*x + (13688970582051249040243487781426395478709265664570015142600423746989289045150851142739880617269448442486106648571302547551514704780*i+16773957477896014316832703410696531194183372024673890433955226082888149171086661118128267797773622645455074613124776489084845077830) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12305332993630289615215585142880087515720944822422319806090664231484514310127178464596823141501244369969656659274771203629270081268*i+22444125889593486525501978819958750401926168021584716135110003592021961573324100931350442446272868809503137914429700641228442748115)*x + (13688970582051249040243487781426395478709265664570015142600423746989289045150851142739880617269448442486106648571302547551514704780*i+16773957477896014316832703410696531194183372024673890433955226082888149171086661118128267797773622645455074613124776489084845077830) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1473811047345515176205461952314663294862590364437088319349181619346074731840311793479138138663955150759781992796028018869106126366*i+7477498941483845748865096114180533851153928339975397415186110235978993556382573138641439605049928770164773868051802047661331191623)*x + (18068209047176826980679613814888765044599348346190886160856283950228589246270328718431850526715936063348587915884404791108549620685*i+7264703854020130592869173293446142938390409659283316479301837792506610955054941652614693226386517431152311840121955902112106982596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1473811047345515176205461952314663294862590364437088319349181619346074731840311793479138138663955150759781992796028018869106126366*i+7477498941483845748865096114180533851153928339975397415186110235978993556382573138641439605049928770164773868051802047661331191623)*x + (18068209047176826980679613814888765044599348346190886160856283950228589246270328718431850526715936063348587915884404791108549620685*i+7264703854020130592869173293446142938390409659283316479301837792506610955054941652614693226386517431152311840121955902112106982596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4703318490091769999245497724097146093406476392989790132235745656560935997266925080431517712856889044932246550863820250418107949943*i+11539419909218651600979474261164853675389867175140588180744822243595756091078790205610638325442071627983548627046419445830436084312)*x + (5622785630788006829550141418121760712533287506150175620185697362029218796983573426227113200910497669692342478317634369279134001137*i+152782924534842150657017077591322629813864701456037499089039528986337204441221500113890417601041210376796032438814721406910420507) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4703318490091769999245497724097146093406476392989790132235745656560935997266925080431517712856889044932246550863820250418107949943*i+11539419909218651600979474261164853675389867175140588180744822243595756091078790205610638325442071627983548627046419445830436084312)*x + (5622785630788006829550141418121760712533287506150175620185697362029218796983573426227113200910497669692342478317634369279134001137*i+152782924534842150657017077591322629813864701456037499089039528986337204441221500113890417601041210376796032438814721406910420507) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2717333777984559152055727039323583101161195784573880072695897112680149518882040499781661888404001640029910960001891283733150803484*i+19989804320090912518495871935952634699312099053305713797574747909970161513358792847487641991940726674061700551460127120267007599188)*x + (8131189952213862452227379468669030621496690594317097063244741266135766350605162102673963261160355417756235825026374266339458399457*i+21696090961816438279998060349143209814528131238712532372503050566321403575714336091332581444743323467113285018237196243757547390758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2717333777984559152055727039323583101161195784573880072695897112680149518882040499781661888404001640029910960001891283733150803484*i+19989804320090912518495871935952634699312099053305713797574747909970161513358792847487641991940726674061700551460127120267007599188)*x + (8131189952213862452227379468669030621496690594317097063244741266135766350605162102673963261160355417756235825026374266339458399457*i+21696090961816438279998060349143209814528131238712532372503050566321403575714336091332581444743323467113285018237196243757547390758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2225945014844199952332836185587811107376724921225095273787881661247126819908947824631412199291876148978087665749648311018221109023*i+12652426498784791901027220637089144609806911506749795305982832608396112478288659794064786955576043009567870587629971436957659247500)*x + (5704879867873783654526632647294028155633996490477385113158993998591626069835825195048225374951269783512161225263153018678664131651*i+23171818788597946801337969595752983672326983678239129285855393441878588227723980254368262349325245476604728038845845967420587686208) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2225945014844199952332836185587811107376724921225095273787881661247126819908947824631412199291876148978087665749648311018221109023*i+12652426498784791901027220637089144609806911506749795305982832608396112478288659794064786955576043009567870587629971436957659247500)*x + (5704879867873783654526632647294028155633996490477385113158993998591626069835825195048225374951269783512161225263153018678664131651*i+23171818788597946801337969595752983672326983678239129285855393441878588227723980254368262349325245476604728038845845967420587686208) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10268849557644684742938517577737857572987368592349514358498051925857869674198768086630640305256212720642890915288816713383063519985*i+16669397554386748515480383641735788840464951320765942246858215224174789506164386207686329217777907880812017237287497732808379068875)*x + (11760720781234668116716585519632442554394836337981204613211311973489854820801300981210344530089765052571705803753041544515786803750*i+5142496103773655985456201923900306069673367496425952224960977544727775020856878275208124219413347480500585777474656323463345986177) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10268849557644684742938517577737857572987368592349514358498051925857869674198768086630640305256212720642890915288816713383063519985*i+16669397554386748515480383641735788840464951320765942246858215224174789506164386207686329217777907880812017237287497732808379068875)*x + (11760720781234668116716585519632442554394836337981204613211311973489854820801300981210344530089765052571705803753041544515786803750*i+5142496103773655985456201923900306069673367496425952224960977544727775020856878275208124219413347480500585777474656323463345986177) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16320734771604604212984681312007589998289914249461668212489736593725711322898595002933982298130667593993470302107895683926345463711*i+17578199186317130674146191850134358394221770104687932437159863966995046807918285810731306464471520845906021952105781096032600134716)*x + (13863238547466102050840661022988029505656236203034468872604478887477629957056499093390354265161658622749027522513086254909033150859*i+8770186455399927968469384742442820792138198823838445803304939268530211794967939214879674001343425410030574480153656642125712598500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16320734771604604212984681312007589998289914249461668212489736593725711322898595002933982298130667593993470302107895683926345463711*i+17578199186317130674146191850134358394221770104687932437159863966995046807918285810731306464471520845906021952105781096032600134716)*x + (13863238547466102050840661022988029505656236203034468872604478887477629957056499093390354265161658622749027522513086254909033150859*i+8770186455399927968469384742442820792138198823838445803304939268530211794967939214879674001343425410030574480153656642125712598500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16967091089179480136201270583789958574577327121491819001449474629827917448472752793091517119965436903840200715458742692337335198236*i+8148786178219316939233567419749119746410492990264809222865611858925377832849587650168682493910059796826756129730523404887378113449)*x + (4570613971911229580934075885251069977060210715469541823560877015325907151339774158491892692313172390349131085863848822694285430225*i+23744991486912425934941519168087271065072918773130251806857860969019758230595797313788003707784263031834457590511815771810494971500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16967091089179480136201270583789958574577327121491819001449474629827917448472752793091517119965436903840200715458742692337335198236*i+8148786178219316939233567419749119746410492990264809222865611858925377832849587650168682493910059796826756129730523404887378113449)*x + (4570613971911229580934075885251069977060210715469541823560877015325907151339774158491892692313172390349131085863848822694285430225*i+23744991486912425934941519168087271065072918773130251806857860969019758230595797313788003707784263031834457590511815771810494971500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12082669773383692971622080498656082163480713030648040477681945725470273839606638362613954144499021082686874810254113940381150439250*i+3219133192458962933868640057438543628797750773282502389934508825467276145384005573287275011340245107052277615160259574164518720777)*x + (10593640352893291474992272162684019572131147130598004077145469142060288256601003072526302559601628874100841662214445684088645982765*i+15086915470016698062629392336754577885240265568723823599614352713880480576689064063129694728306501247386808218875972381300666891251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12082669773383692971622080498656082163480713030648040477681945725470273839606638362613954144499021082686874810254113940381150439250*i+3219133192458962933868640057438543628797750773282502389934508825467276145384005573287275011340245107052277615160259574164518720777)*x + (10593640352893291474992272162684019572131147130598004077145469142060288256601003072526302559601628874100841662214445684088645982765*i+15086915470016698062629392336754577885240265568723823599614352713880480576689064063129694728306501247386808218875972381300666891251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17120399906710350059628308626946479514576543267286695026454042752434193000101405482323330297071574124117294303743635388270837095410*i+7471924705524124473699994570581659704576869376773034666650402017411698950781907775154523487912170894230112984715525209001997641097)*x + (15373296473801908760547565641936797401075544925606738291219636532392633663127411788944582968178360137210375722149280193938254370658*i+23244081583978083412718477790736647971786947103542275493541393444488479222955892939996202652171654706076774743324256657852084062846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17120399906710350059628308626946479514576543267286695026454042752434193000101405482323330297071574124117294303743635388270837095410*i+7471924705524124473699994570581659704576869376773034666650402017411698950781907775154523487912170894230112984715525209001997641097)*x + (15373296473801908760547565641936797401075544925606738291219636532392633663127411788944582968178360137210375722149280193938254370658*i+23244081583978083412718477790736647971786947103542275493541393444488479222955892939996202652171654706076774743324256657852084062846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21732759582104737799683471935146988609478901503669168018927079612196508457352749570879188750918327020646012474975130497787240235636*i+15121984081920304446858883101167060205172698606256062873785335397760912696959350352147383792033862429863671256553569600188919818577)*x + (16467224206710312872145609063513510202475392919356455768990095536054799371865334188406555870732425511869528228210590191942580255551*i+6815384331716722797964995024129502669736973775250628782444498026058749323891945111026036671053060657713776582641283636416053286467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21732759582104737799683471935146988609478901503669168018927079612196508457352749570879188750918327020646012474975130497787240235636*i+15121984081920304446858883101167060205172698606256062873785335397760912696959350352147383792033862429863671256553569600188919818577)*x + (16467224206710312872145609063513510202475392919356455768990095536054799371865334188406555870732425511869528228210590191942580255551*i+6815384331716722797964995024129502669736973775250628782444498026058749323891945111026036671053060657713776582641283636416053286467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2410648079424967024657536040432522513007895294962742541027214512530857448689401965150246086055328590789308002862886950682530605621*i+10806600986924023904760913006390505391910929282675763276221863958180108254711988264381365339146877552744429140241432103986911982823)*x + (24241909663977297204175250520707613605805413539836247915225252806037612789325960008785339347505748092694208125774708872364549860168*i+23919139791662804483277341042092678282692856095754485776156985855285997929321700874303205235843314595603028248648919120841500742078) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2410648079424967024657536040432522513007895294962742541027214512530857448689401965150246086055328590789308002862886950682530605621*i+10806600986924023904760913006390505391910929282675763276221863958180108254711988264381365339146877552744429140241432103986911982823)*x + (24241909663977297204175250520707613605805413539836247915225252806037612789325960008785339347505748092694208125774708872364549860168*i+23919139791662804483277341042092678282692856095754485776156985855285997929321700874303205235843314595603028248648919120841500742078) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9928417186445446502285100515286528808726567300124723686110007272673743851227672822676540136541285600934802043789153489285197851720*i+16210850678488587950754743849572446287151333782167094991954715392466461065991915531709493296872784852930139922290800933358446640401)*x + (16090365418698381263911885609037296661417150872015560160132492987984708189837376925886685584572286352173298793389612497181326814124*i+5587241719795539823901256570053392593280425711510034405380152811976907342463297529929376238426164352868455504922729988220854518807) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9928417186445446502285100515286528808726567300124723686110007272673743851227672822676540136541285600934802043789153489285197851720*i+16210850678488587950754743849572446287151333782167094991954715392466461065991915531709493296872784852930139922290800933358446640401)*x + (16090365418698381263911885609037296661417150872015560160132492987984708189837376925886685584572286352173298793389612497181326814124*i+5587241719795539823901256570053392593280425711510034405380152811976907342463297529929376238426164352868455504922729988220854518807) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22283221817998199657032672912928096028864829986444215435070293844426003502660168021384071313744090424491095497374641164282791306357*i+11613300496313313653267536985585689608485945790887523102610787423993780200864859188776510974768335581814281308657973103896544691891)*x + (3004104461333106914507953043017620385576063819665931983918422100792774027636717882605043394117249009868085737293717041417808679827*i+23349190930440160667028571618852915271033736264847424375512874555746347894619214347772103309262713460771964779317962637055536200069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22283221817998199657032672912928096028864829986444215435070293844426003502660168021384071313744090424491095497374641164282791306357*i+11613300496313313653267536985585689608485945790887523102610787423993780200864859188776510974768335581814281308657973103896544691891)*x + (3004104461333106914507953043017620385576063819665931983918422100792774027636717882605043394117249009868085737293717041417808679827*i+23349190930440160667028571618852915271033736264847424375512874555746347894619214347772103309262713460771964779317962637055536200069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15280315517280102945934892501624807219843335362199714507071359002961947796673704071150535520285262579193223814505266232884611173760*i+24136184247393757023635594166462360920655930089333154625330362716736389846279890422401582180269399578508168848211686639640774150250)*x + (23315707242664201586719763316272109892092787458719859520862220422242487189319808304589031697198383812512804326422859632690988004412*i+5479116946933839442446360312246794341397632546734671698986917043914743935336483658060921194802615762942083786762645616398467378936) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15280315517280102945934892501624807219843335362199714507071359002961947796673704071150535520285262579193223814505266232884611173760*i+24136184247393757023635594166462360920655930089333154625330362716736389846279890422401582180269399578508168848211686639640774150250)*x + (23315707242664201586719763316272109892092787458719859520862220422242487189319808304589031697198383812512804326422859632690988004412*i+5479116946933839442446360312246794341397632546734671698986917043914743935336483658060921194802615762942083786762645616398467378936) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17502184996254242983420817415847344445479795225126310247444127445201467545730112316990911053939609262397576518313218666396197710254*i+8165059538574975173301936779792471618673974986885620191634154632713131723562363249373186809844913915091643141828453976615580581385)*x + (17798312603054795748578026310748716365622214889587079785807259403415176327614081817633758935671654183812688930955157043369330235415*i+17384120276889765537485128032357107247388500566362708978593454653515691865346338768473310945490185960156600085651924714334045885557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17502184996254242983420817415847344445479795225126310247444127445201467545730112316990911053939609262397576518313218666396197710254*i+8165059538574975173301936779792471618673974986885620191634154632713131723562363249373186809844913915091643141828453976615580581385)*x + (17798312603054795748578026310748716365622214889587079785807259403415176327614081817633758935671654183812688930955157043369330235415*i+17384120276889765537485128032357107247388500566362708978593454653515691865346338768473310945490185960156600085651924714334045885557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23769707198589506343641791577330892400514194934704242026905789882532693190262439061064834679078141608530092925444179139856547567058*i+23735054326325495321751014614060940420832727087105653050024967007514401570016804564022329788566768598693784268170421530417640593260)*x + (7201027200810857080190334373499909288099682504098791244658481018062654119603987387962960303866172908297339681022362376997404322511*i+22726361910945662355002613464375990591154442161563081207818914910838514275747604224010845897719086546729686719592232134586206054717) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23769707198589506343641791577330892400514194934704242026905789882532693190262439061064834679078141608530092925444179139856547567058*i+23735054326325495321751014614060940420832727087105653050024967007514401570016804564022329788566768598693784268170421530417640593260)*x + (7201027200810857080190334373499909288099682504098791244658481018062654119603987387962960303866172908297339681022362376997404322511*i+22726361910945662355002613464375990591154442161563081207818914910838514275747604224010845897719086546729686719592232134586206054717) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21301954146121717096062316893076502067325123389745382757143585973466147821544848682325331986824289403885946946640501510822374173044*i+1856211071499148555873351735000205746177043121521016197709309880817773262571239571801196009559840854982645759539956893249210420543)*x + (17396850336239051368501017659380756168989997531740168445565121505995558678390028660871563292204902699812631953286093308677221627579*i+15156863332910908226404122648812978511391761532405941287922753152537857676999154246176569082588170483870941852429218315934850054536) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21301954146121717096062316893076502067325123389745382757143585973466147821544848682325331986824289403885946946640501510822374173044*i+1856211071499148555873351735000205746177043121521016197709309880817773262571239571801196009559840854982645759539956893249210420543)*x + (17396850336239051368501017659380756168989997531740168445565121505995558678390028660871563292204902699812631953286093308677221627579*i+15156863332910908226404122648812978511391761532405941287922753152537857676999154246176569082588170483870941852429218315934850054536) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11137897866784853067197419048175707468122242140440123843011865054553701473118964020801329090710804042223705146634676539482551236868*i+12884560995749034049701211368639706136113753930437967867113002594742587353747904222250041371868377950588090378352007609167966165938)*x + (6674703623298140808634221525540920646512298172938763670117861402156576578544093464149491965681095521408629299519021443066170325223*i+22280894708517361724929763471999403200565622731336251421066143053057074238792727294035928857350949206013149005624333053286705270109) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11137897866784853067197419048175707468122242140440123843011865054553701473118964020801329090710804042223705146634676539482551236868*i+12884560995749034049701211368639706136113753930437967867113002594742587353747904222250041371868377950588090378352007609167966165938)*x + (6674703623298140808634221525540920646512298172938763670117861402156576578544093464149491965681095521408629299519021443066170325223*i+22280894708517361724929763471999403200565622731336251421066143053057074238792727294035928857350949206013149005624333053286705270109) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5126173808839994057121653821171147838072467624773880677031970263943203066899013991698077134719094559003788101015369331736420803675*i+824082189234048696931428265687872091255921412004546255656943389861521359110310087022309179162672084022031319529382347956118337471)*x + (1323629792126404112087858894217563889748277146499585275808551433288814458648984941448794115347205585984948048767555269558063729294*i+11407831447045399152028163279205981012190613101924140712077062875295809300455685175252875279680487265235808672076749647043954445861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5126173808839994057121653821171147838072467624773880677031970263943203066899013991698077134719094559003788101015369331736420803675*i+824082189234048696931428265687872091255921412004546255656943389861521359110310087022309179162672084022031319529382347956118337471)*x + (1323629792126404112087858894217563889748277146499585275808551433288814458648984941448794115347205585984948048767555269558063729294*i+11407831447045399152028163279205981012190613101924140712077062875295809300455685175252875279680487265235808672076749647043954445861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1645740185349463273767758547568726764594818653075095331995701064267385382771688185318026929990669401259524391295481627309151783098*i+16906130102409094410301209076437398449276310237328977819727287059145709694791695531294072112157084168315229719634262643788488918566)*x + (582241634681838531722594586654348449007277931057984948108132890614446075282828538460914233046423671542878039657052943375800025113*i+12178800839285413761959306985174069027781489362765228278294397470367112938934156077882496025364881040826321313925573911730532820841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1645740185349463273767758547568726764594818653075095331995701064267385382771688185318026929990669401259524391295481627309151783098*i+16906130102409094410301209076437398449276310237328977819727287059145709694791695531294072112157084168315229719634262643788488918566)*x + (582241634681838531722594586654348449007277931057984948108132890614446075282828538460914233046423671542878039657052943375800025113*i+12178800839285413761959306985174069027781489362765228278294397470367112938934156077882496025364881040826321313925573911730532820841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4653700281711797024355702562301497538698352997220385005844096796381596064026126996979951526380208076998010404238055311014577259155*i+3957274107745781257833305109246458770803517506409141904929545653525827263488272450840083001325251379717688232256730595366179300627)*x + (14711482547792697000581177234325556960279611130326537338574735755898154196157126844385648563405183185308011213018828372271738515175*i+9077901476274401922595628236271717944538560073837435390703549188822329899578262236268097287538531686615867297414134636059655484245) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4653700281711797024355702562301497538698352997220385005844096796381596064026126996979951526380208076998010404238055311014577259155*i+3957274107745781257833305109246458770803517506409141904929545653525827263488272450840083001325251379717688232256730595366179300627)*x + (14711482547792697000581177234325556960279611130326537338574735755898154196157126844385648563405183185308011213018828372271738515175*i+9077901476274401922595628236271717944538560073837435390703549188822329899578262236268097287538531686615867297414134636059655484245) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9493408896021007357136072100738060202017160155932135384757115214466125119696598369087764625028217616507110005624853116090400296758*i+558767000175282092619443306789384862650052973625255748508580021140656051193822110654955088197286717865757960656500437940648907365)*x + (21243648390179803667118495494912238454271422645402216668005820180256031605374038008033999538447326970405268831671766732355685623824*i+19938768702336031979607130739564629299052749418804265095703316238653577023191403331106357853409637614657424644411467703977559875472) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9493408896021007357136072100738060202017160155932135384757115214466125119696598369087764625028217616507110005624853116090400296758*i+558767000175282092619443306789384862650052973625255748508580021140656051193822110654955088197286717865757960656500437940648907365)*x + (21243648390179803667118495494912238454271422645402216668005820180256031605374038008033999538447326970405268831671766732355685623824*i+19938768702336031979607130739564629299052749418804265095703316238653577023191403331106357853409637614657424644411467703977559875472) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22304295781310517746328472434303009640546904810872697374282885649955113537519337863436007100116712072848564362806142177885705576845*i+8192475357144454081231084190424639846485505674435499952972878366005963592734989042180804820278876325769021163643776433129504587316)*x + (2755592814685378640997196599191058885370652385133850644166490684330548805925092379342825094686438342835174445510558872655655688544*i+1772246691237608559332956698134735085273117840337080524725701468896163593656017201575379693230543824648549639691439945518819791807) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22304295781310517746328472434303009640546904810872697374282885649955113537519337863436007100116712072848564362806142177885705576845*i+8192475357144454081231084190424639846485505674435499952972878366005963592734989042180804820278876325769021163643776433129504587316)*x + (2755592814685378640997196599191058885370652385133850644166490684330548805925092379342825094686438342835174445510558872655655688544*i+1772246691237608559332956698134735085273117840337080524725701468896163593656017201575379693230543824648549639691439945518819791807) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5580944150389251378353776801317473038424694592288612078126016093803648647219603473534672670822773523576005163630812681736842302228*i+5191495246983482789127182284041039017499143418668765421562273849265802301384864975528716637895295349103902609416799960479030269881)*x + (16128007394367892791429394357780714497788826462468701682475604884185720542793097495750952724164044902686399432862970613478001040808*i+9345422772665793053272061902719537098169727207349727631052975097407500780319715537110200695383914813949629034702589978104495950379) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5580944150389251378353776801317473038424694592288612078126016093803648647219603473534672670822773523576005163630812681736842302228*i+5191495246983482789127182284041039017499143418668765421562273849265802301384864975528716637895295349103902609416799960479030269881)*x + (16128007394367892791429394357780714497788826462468701682475604884185720542793097495750952724164044902686399432862970613478001040808*i+9345422772665793053272061902719537098169727207349727631052975097407500780319715537110200695383914813949629034702589978104495950379) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8325723776517981863023749875067682238342017493646660585846449248865057136791475615684876414882453052532296928987869110245641099825*i+13911495973814486030930873111474403679975322994185436218998523292461833977834652962092823845637664783367483356458701713164213293722)*x + (23900618417440416035646050802946795778133292719404694296486984410022595871892179493527098932116809594119455915759017752731651264722*i+258881869534396686985285614408483907943166340977034068303701358567553993501648058331426239492936214150401711231783968036474151414) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8325723776517981863023749875067682238342017493646660585846449248865057136791475615684876414882453052532296928987869110245641099825*i+13911495973814486030930873111474403679975322994185436218998523292461833977834652962092823845637664783367483356458701713164213293722)*x + (23900618417440416035646050802946795778133292719404694296486984410022595871892179493527098932116809594119455915759017752731651264722*i+258881869534396686985285614408483907943166340977034068303701358567553993501648058331426239492936214150401711231783968036474151414) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5115722015071417125570937284408677378176124672684500570243199368411703579180914488300702082083622500644150543876099454714364978176*i+16578246379027878740971757333520890022285461562019962778847689920573235875247565393420620991551265254373662818274921746412961106414)*x + (6343054564548340551548901038589243465260329394599753600431733494857219492391162104508355373620722133271766766961706918597827355315*i+13149791556734995127227186458267582123926612622404967351726019400006446195363879921127880973095265885991161490757743765407541492280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5115722015071417125570937284408677378176124672684500570243199368411703579180914488300702082083622500644150543876099454714364978176*i+16578246379027878740971757333520890022285461562019962778847689920573235875247565393420620991551265254373662818274921746412961106414)*x + (6343054564548340551548901038589243465260329394599753600431733494857219492391162104508355373620722133271766766961706918597827355315*i+13149791556734995127227186458267582123926612622404967351726019400006446195363879921127880973095265885991161490757743765407541492280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17868967411180101587947506223459651095158707042396568029216983572326676317880994655624991143074077532051838122448775204416211206676*i+11709452317048349777517167085751800098479805042037771738794945219111141799154985315634447118332075078737647023802217177323342182418)*x + (1412684502259654231415389279837515729159079285747338598975261416973276133957496537158825038880310001734289888960638845834286067668*i+2608712701337718437776342203059410845491070399259555719014065173825122541566503410344304506828997436461768940464332861370036896899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17868967411180101587947506223459651095158707042396568029216983572326676317880994655624991143074077532051838122448775204416211206676*i+11709452317048349777517167085751800098479805042037771738794945219111141799154985315634447118332075078737647023802217177323342182418)*x + (1412684502259654231415389279837515729159079285747338598975261416973276133957496537158825038880310001734289888960638845834286067668*i+2608712701337718437776342203059410845491070399259555719014065173825122541566503410344304506828997436461768940464332861370036896899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19001392434187725678121717244976213727625766799493914163874693653150331644909616276513673539780769674041873500296737877575268778491*i+5537219197694146542537239030302800662552561880808940401616351110761539000252832062119343787443349018397108933789663940733843155594)*x + (1501933326729069710068914152653680970422322838190858951993340957941200617131245957022151756757346256296823716167361348332782276295*i+7401467939480978264901252980339599301372929169609403740866948294922493719471014493293960641838782395749777976249585533650807208522) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19001392434187725678121717244976213727625766799493914163874693653150331644909616276513673539780769674041873500296737877575268778491*i+5537219197694146542537239030302800662552561880808940401616351110761539000252832062119343787443349018397108933789663940733843155594)*x + (1501933326729069710068914152653680970422322838190858951993340957941200617131245957022151756757346256296823716167361348332782276295*i+7401467939480978264901252980339599301372929169609403740866948294922493719471014493293960641838782395749777976249585533650807208522) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2229737242338281784510197849062286607334538602536636212431541859496243325279335705476239396134834361332584267033076502485900987861*i+15061293680283833903058698915050867357933099952936716150765335430761458787830212414410283516239901681652766537609367934769885672963)*x + (16135094124239821318581555991932442734719381434200212402249282056086373972562872764641134408466886254678547947247808160499079775239*i+18178998950570017842083976110416524967581641542301535197244196209281676421030999146961633816980626877369052939980353469137390577096) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2229737242338281784510197849062286607334538602536636212431541859496243325279335705476239396134834361332584267033076502485900987861*i+15061293680283833903058698915050867357933099952936716150765335430761458787830212414410283516239901681652766537609367934769885672963)*x + (16135094124239821318581555991932442734719381434200212402249282056086373972562872764641134408466886254678547947247808160499079775239*i+18178998950570017842083976110416524967581641542301535197244196209281676421030999146961633816980626877369052939980353469137390577096) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21408516936612230412168587122313570464741072572034206594025683057102654921496139789388598097180660173200009477638816743773446112196*i+9298743294060714438636471020977193148426472204871190417332571699644528772875622381815406074447113282853496379377789573316049349048)*x + (21503869103854351683868632526966423172789466035326705949139230023857098256395347291417773037293109138070061707983952124042661535289*i+12779370181785730122022896979293720627233414681667006291373614788606368569806834864178368707380861707814022827592298140098318484016) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21408516936612230412168587122313570464741072572034206594025683057102654921496139789388598097180660173200009477638816743773446112196*i+9298743294060714438636471020977193148426472204871190417332571699644528772875622381815406074447113282853496379377789573316049349048)*x + (21503869103854351683868632526966423172789466035326705949139230023857098256395347291417773037293109138070061707983952124042661535289*i+12779370181785730122022896979293720627233414681667006291373614788606368569806834864178368707380861707814022827592298140098318484016) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12398402241150400094714744366084361488822704648921814910694904916930765930674083445120888935714756360500493990743685683076377384564*i+11418780311360383874607079813929151395802106248121492318584984762531921058044240205003127386438811893859795568251783016805762439520)*x + (16784704024650470216861905123966708588676725174014214808202735385106595769771600746028726577356587310344332652022374280961948847311*i+9025764312586223189260014369131972839553171587222020258080925854534525921359327854798905400754454992791068159756902435970669398656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12398402241150400094714744366084361488822704648921814910694904916930765930674083445120888935714756360500493990743685683076377384564*i+11418780311360383874607079813929151395802106248121492318584984762531921058044240205003127386438811893859795568251783016805762439520)*x + (16784704024650470216861905123966708588676725174014214808202735385106595769771600746028726577356587310344332652022374280961948847311*i+9025764312586223189260014369131972839553171587222020258080925854534525921359327854798905400754454992791068159756902435970669398656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23648805374126455623500934364724504022476653215739747665039191383048052032196445006539982052058290784371263142683890852104068174999*i+3116166063946745181622097412090894862679778616886328934926976709035555074599290200382541626349630174691286266431356485558176750085)*x + (23810868235764838751934861304501421051401255465181090297390251918879851982007031166545828681974501057972938773592462964793306409906*i+8565829973567604696751565966880570049951325565196856820391836224023821558875625661555338245373439893806214728515337331186793364238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23648805374126455623500934364724504022476653215739747665039191383048052032196445006539982052058290784371263142683890852104068174999*i+3116166063946745181622097412090894862679778616886328934926976709035555074599290200382541626349630174691286266431356485558176750085)*x + (23810868235764838751934861304501421051401255465181090297390251918879851982007031166545828681974501057972938773592462964793306409906*i+8565829973567604696751565966880570049951325565196856820391836224023821558875625661555338245373439893806214728515337331186793364238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6367859666809536273982879502321386460167126215461747500245259171860726941599244553924898467274576882554607120820565964320841560458*i+10763171617976692550504147435814998891720506504132489321795057946323080450109446468119859177694924035044863691510048044814076879648)*x + (12829102672241686989876330950906653097234841834235670213872991589567187188466566259285989568630489063422970220910283064152883678634*i+3366218086156018613682697644163228579425870183118428378167082073348427305400238511413441785034293796401526360716310271710489855282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6367859666809536273982879502321386460167126215461747500245259171860726941599244553924898467274576882554607120820565964320841560458*i+10763171617976692550504147435814998891720506504132489321795057946323080450109446468119859177694924035044863691510048044814076879648)*x + (12829102672241686989876330950906653097234841834235670213872991589567187188466566259285989568630489063422970220910283064152883678634*i+3366218086156018613682697644163228579425870183118428378167082073348427305400238511413441785034293796401526360716310271710489855282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2928760864069071801003329292676286385442260164871812025911138718297571437332950807446265725993664586773854707047744762775376025991*i+18640428847623328145603263435088743791018468994921479380352732344497472612229105079868970425936482559949039299249008529728530392487)*x + (12956351563155389847033173002429199847255339351975023353669888637320231158166749808612723059662985250715195296765745741487769325994*i+4199050056413688809593126509929883262062602022973979150439138700588236435664951515828010369053630331451305989656848998189660744518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2928760864069071801003329292676286385442260164871812025911138718297571437332950807446265725993664586773854707047744762775376025991*i+18640428847623328145603263435088743791018468994921479380352732344497472612229105079868970425936482559949039299249008529728530392487)*x + (12956351563155389847033173002429199847255339351975023353669888637320231158166749808612723059662985250715195296765745741487769325994*i+4199050056413688809593126509929883262062602022973979150439138700588236435664951515828010369053630331451305989656848998189660744518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8452122015388159969000296799294809057986810006575563856424327196429174973025839174802258026841265260873138361098871050103007375001*i+12114880452724674547332699543239656238475348929202369107936450450899852451849188532714006091632407444356102793435250378370537977508)*x + (22409375496185483141090507386950862645038594043475325893324829862106728461347940816164190390542424311487157132735217050585003339689*i+3353473797569400264198037947062879625065004643309631918673974851469033341011878971575504157673321992390310840468301379985261269818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8452122015388159969000296799294809057986810006575563856424327196429174973025839174802258026841265260873138361098871050103007375001*i+12114880452724674547332699543239656238475348929202369107936450450899852451849188532714006091632407444356102793435250378370537977508)*x + (22409375496185483141090507386950862645038594043475325893324829862106728461347940816164190390542424311487157132735217050585003339689*i+3353473797569400264198037947062879625065004643309631918673974851469033341011878971575504157673321992390310840468301379985261269818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11428890272632692072555816094721911812955500954494033638397218312660860296968266063224860115296043758595328953417866810249300428690*i+3189654693871923297404350967588179203411259513898759059041907772671966615920433986346704200178269994129639008042551034633166046370)*x + (22368645458309989262182576228620875518640330773252127925046006690894878738109456351590019756887424696699623898902561852497409730215*i+10073239190984653756730266128342234897151767130615175922728937758582038783574900493433101387009842063652953276415871006222473075735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11428890272632692072555816094721911812955500954494033638397218312660860296968266063224860115296043758595328953417866810249300428690*i+3189654693871923297404350967588179203411259513898759059041907772671966615920433986346704200178269994129639008042551034633166046370)*x + (22368645458309989262182576228620875518640330773252127925046006690894878738109456351590019756887424696699623898902561852497409730215*i+10073239190984653756730266128342234897151767130615175922728937758582038783574900493433101387009842063652953276415871006222473075735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [89]:
E3 = Phi3.codomain()
E4 = Phi4.codomain()
E5 = Phi5.codomain()
E6 = Phi6.codomain()
E3, E4, E5, E6
Out[89]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2)
In [90]:
Phi3_P0, Phi3_Q0  = Phi3(P0), Phi3(Q0)
Phi3_P0, Phi3_Q0
Out[90]:
((620110989477632698149086551365509318772499449815474861300673881886645159995599162788499222447426039069990761021963820338636405174*i + 7958916574761822981224513106650972801869667008780249547945549458992812267517342366947295481905043061107578152994313595484968085240 : 16075674654215872419264593589621599781407261474095797845142354101748511521909770570685357898289072332690839482438445190178164850092*i + 9105649627681014629679234774399289287412373719461146238956249573902773705737702908776432891576399879293299800223567692213782855156 : 1),
 (19442053620356349775945172299399661683056851552894815071511311327549530026607425900904689677580016333485050745089781961126947046835*i + 10150963145522824151347282523910911644374813561554843544824099860072262023636580023143967572394603443025222194075166680521088325419 : 4761215268224416011513806874339819933728352123124771348867123445506806177971633731457687443471372073613494316436627482740781527262*i + 8937843444652305291681861949314612606027440886703791550545791518712255816657669456378988137271675560053996624539056325834617582577 : 1))
In [91]:
Phi5_P0, Phi5_Q0  = Phi5(P0), Phi5(Q0)
Phi5_P0, Phi5_Q0
Out[91]:
((524521438263981319820869637815931883967855364552756689811468711093532370893276191214973085520221964157511109486133475877326256113*i + 21243423768332297386665726824923263539218848040960237984828973029094466883283062953558860352976683858571051258547758368266554870851 : 13305707239266042128010351506657782353099085077169724583086920756935974368148071394111549969581752716841722379850900879772218950566*i + 10544122266970437839911266349081624896768673667275943547518417828379008420139707930697071816251469264566951405309107471757088979516 : 1),
 (9078445689459114781065153840755566294570955844076416541547308051585669382537500633133433609645099252181822659375659090176630903722*i + 18634849517750452009404086177035842521165830316558756089746141405967823456605347432364061157594803744445768416048041697823711520089 : 8428759209582981466720144698035864302654813101340090431153584689000580834122716052881878682156711216600203541484069980981280515575*i + 19414466098590898518371153725476146129298638737030606374140587097057806781775955174745971226858876701966457930726947223456802568587 : 1))
In [92]:
Phi4_P1, Phi4_Q1  = Phi4(P1), Phi4(Q1)
Phi4_P1, Phi4_Q1
Out[92]:
((8886113700240824095811666271356594579432953779979891750841844207512918060951574485230757589923141063556037186499499591019202026471*i + 6012103220225371105263996906729328493208958526007978847561186540199003994019820433396318091771858365138188127928899281333844836654 : 18052909339692716496336322345733408008489758855815272238020053236107569609510824052664081361387004717292278606802030793312596772643*i + 11624721148210074090237847169526348698262838268581757002419461641091985024251499941869946238426324186440423118844525392424404784496 : 1),
 (18555009307337032725979052853916534192976290578014095779839945003379742786527689551841673238323465278294751517001490448313648676698*i + 23918088037899239632045311222185848798286362277139004754208330024335460482054095493995050131998260991822932172912983111726397621894 : 7778026121095960974453464413775063335341483240399491480124753660093460725585135651630485404103378106605960591487813393236095854084*i + 4292621943243382878933764834293859081813896908725187933402936634752498336785160509143610831180576663131833341182860273742983601253 : 1))
In [93]:
Phi6_P1, Phi6_Q1  = Phi6(P1), Phi6(Q1)
Phi6_P1, Phi6_Q1
Out[93]:
((10754611924182762156358635731037009500639444503391871194233877914455163590158882808864151370874233014345599930958885684261103518158*i + 20290668300686727451298117433691865168809845378041368635075285138534515194355523720147259866552490471452182855392467844286309368155 : 2419972351155026309017470395477629994817553669790801668132576911755203197725123435108675131981811903366533730227055950997273569076*i + 2785646768575119842011708620586644122828739783370823009971713648196316066762066760491298786941225495139617810043848043433564282675 : 1),
 (15826989951146681400706669082300807125524347993068189670216458538032867939591129059601685030059955912513697609604846615802539395753*i + 20192924849019260902217777195880611865593821928631288723680464899810034822872480700003340110656925814827860735212761928891909752348 : 22183091281561241743231991641855941348692940692723292012123728836311978615774338969901875150657561972748572136751324942722319506546*i + 1641022645612247295306902536103816839722233398484867589653060399430377150791549633907470653744277921395300385920564710817855487428 : 1))
In [94]:
Phi34 = isogeny_walk(E4, Phi4_P1 + S3 * Phi4_Q1, l_B,n_B)
Phi34
Out[94]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (421568841144947676704474839624850633321526277793632525744325486966297163791202021773109165045380512883865760646591463969986833988*i+2387068719522337232911665550885749399852557229740346209100957464784775757183191085575286899983849512971472832409066928264784016762)*x + (4891592667352320710162666254889275597465972510446133167281332998545215326978273147757939667739848765002878972829006219309746558946*i+20525413864471968537664378684690316190367856961493960637852690169001342834947620616487167608301346557504359226244103439597003662902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6937326041299035157611221581669465975413580877506009068890761844362962066988882405666223739294522002689922358174348858138669552151*i+12044598459795816631075568718118568975073227445057304849117959339436911761681860695461849320141622921992913615390131282906300106507)*x + (11365408250647532595996671091425325817246792718601347841386156551234979083156116476914500077822132560392143068228202670698625476414*i+10698024642756799528569887904863661606104156208715509403012920730206192696349115424825021206337168000462340173000894429231992394847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8580663809843316360140809312137591362534256184156242589778699825657001643090449649073021812673244089460104264760200845055992849794*i+21143157157001135140854199936631625166286207330522122935474846243509533417876155306780204330622253275682537645678031193248611308749)*x + (23389197551610454509768648158134747054240477091016529209715934015161332914636580500843175875587654173694118685955380478825473301650*i+3666849677641064033843986596249229721130166768687085533217970026830889520767614465803278020335631814468910867656317349210889362987) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8580663809843316360140809312137591362534256184156242589778699825657001643090449649073021812673244089460104264760200845055992849794*i+21143157157001135140854199936631625166286207330522122935474846243509533417876155306780204330622253275682537645678031193248611308749)*x + (23389197551610454509768648158134747054240477091016529209715934015161332914636580500843175875587654173694118685955380478825473301650*i+3666849677641064033843986596249229721130166768687085533217970026830889520767614465803278020335631814468910867656317349210889362987) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12562421357197503686519565851914358471730809812113367506239826899644133833989259103948277556365464463358009162577660638361618934149*i+17367350098943963391210843190953085594105684223085344271093377525790194434734810418158124017553045909395469319711297101300836011218)*x + (2305065202649626010873868108365299658830801053177518372038668546359914604148194735979471641304468666731720222545636440596726658768*i+2175768714541807378642641744760743483543734537372915425894402087506732105268628454313143819796067954402980290233641006051372210099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12562421357197503686519565851914358471730809812113367506239826899644133833989259103948277556365464463358009162577660638361618934149*i+17367350098943963391210843190953085594105684223085344271093377525790194434734810418158124017553045909395469319711297101300836011218)*x + (2305065202649626010873868108365299658830801053177518372038668546359914604148194735979471641304468666731720222545636440596726658768*i+2175768714541807378642641744760743483543734537372915425894402087506732105268628454313143819796067954402980290233641006051372210099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2864944125537244226885087690461015224451078016934381878769145360899334752112912503781167089215175673296644665707927441255391193782*i+15312252289955992209216904329037290320188558448772133624477881594480217171497114361417422698673615297982572196199130673556046902257)*x + (11787701298501131134108687124630253967226977188130821567982543981048153730751085528623865691612697418806901970904526102537751928027*i+10563554975133781011968834496345449558019127022115481165679877228001034011502236139117339082700981299658401214588530509860908963420) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2864944125537244226885087690461015224451078016934381878769145360899334752112912503781167089215175673296644665707927441255391193782*i+15312252289955992209216904329037290320188558448772133624477881594480217171497114361417422698673615297982572196199130673556046902257)*x + (11787701298501131134108687124630253967226977188130821567982543981048153730751085528623865691612697418806901970904526102537751928027*i+10563554975133781011968834496345449558019127022115481165679877228001034011502236139117339082700981299658401214588530509860908963420) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22606468601384483234527016292599623356482388265072404796792653079609956515058028730604924884836277352560708409331888751844005684823*i+16240608949001769509074750591873468227576334562054565627670256160175791546516577395124405821557007717930052460634462380227121937670)*x + (16828679913367295987975963101447040785634190091171956847526189253780317503170632081494494810549018242227385160337353609052419471562*i+23791534531528384253654925794890110869038325181924068299451887308002660212692126359113441520982383099625578478365630485987218184655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22606468601384483234527016292599623356482388265072404796792653079609956515058028730604924884836277352560708409331888751844005684823*i+16240608949001769509074750591873468227576334562054565627670256160175791546516577395124405821557007717930052460634462380227121937670)*x + (16828679913367295987975963101447040785634190091171956847526189253780317503170632081494494810549018242227385160337353609052419471562*i+23791534531528384253654925794890110869038325181924068299451887308002660212692126359113441520982383099625578478365630485987218184655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19335891486493821155662145395592307709846200162058027353255018870179567563705409480226921130384949770464681621468280397586794675232*i+22040913361086705364572942075588832653723568096220410373876707996469290848926745561869002116142155749222576820766864031255668051709)*x + (21939926957913432219085452111098040952301342162504377325069563320583635642367728686163696795830100220852233842159117004854116747402*i+17382926299089751210509803667373301422832095276087600552722885515798420766660687045001038878415797386300074978633201294403582507657) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19335891486493821155662145395592307709846200162058027353255018870179567563705409480226921130384949770464681621468280397586794675232*i+22040913361086705364572942075588832653723568096220410373876707996469290848926745561869002116142155749222576820766864031255668051709)*x + (21939926957913432219085452111098040952301342162504377325069563320583635642367728686163696795830100220852233842159117004854116747402*i+17382926299089751210509803667373301422832095276087600552722885515798420766660687045001038878415797386300074978633201294403582507657) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19169817686964377034084744538764647375004439021118930725183887423876743723419043617295096738933931117335594515661804152025474808414*i+12668954776737349536145761071764944307997637969773278903289058787014225250750356666529274208155314802691622716099045587494816369392)*x + (12834947244272285847856236620502304117757418771392597180729014507907803921366235846755225340969416918738454043205516389890703378813*i+18731120553343828986184686728881676592710176473672938037319152562769263692984437828600396133338131739493797955489211592708248698071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19169817686964377034084744538764647375004439021118930725183887423876743723419043617295096738933931117335594515661804152025474808414*i+12668954776737349536145761071764944307997637969773278903289058787014225250750356666529274208155314802691622716099045587494816369392)*x + (12834947244272285847856236620502304117757418771392597180729014507907803921366235846755225340969416918738454043205516389890703378813*i+18731120553343828986184686728881676592710176473672938037319152562769263692984437828600396133338131739493797955489211592708248698071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21012134325660736286534973815766127710352877748065129815741209078593466272346636291753808475514263191419027599928205304929365380954*i+23562897723977178235683745777563006473941207645241652156838183266904552026669600749328220809036177488212146178361759303439244407755)*x + (11589881781612922504064295290404780252804982618010610766335721990543519203178698813895473760942985719439777691818503037443022060357*i+7160392302988487447482095624633070291878624767166531179636410449171166861950961006112374750735271639652392638068005477565647001965) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21012134325660736286534973815766127710352877748065129815741209078593466272346636291753808475514263191419027599928205304929365380954*i+23562897723977178235683745777563006473941207645241652156838183266904552026669600749328220809036177488212146178361759303439244407755)*x + (11589881781612922504064295290404780252804982618010610766335721990543519203178698813895473760942985719439777691818503037443022060357*i+7160392302988487447482095624633070291878624767166531179636410449171166861950961006112374750735271639652392638068005477565647001965) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18671772581886834941954807902371312952780720154961366797776841651271731321800202209131453970817216491659053894153122409714167631153*i+19526788534938300033003034554522800755515154751460613079039466939660636877503587901848659549050286732655406262370673946661006334824)*x + (12095445797216896154866342122961180579999251051532433057487781559449658961977618067615975864601695086224441940283202470633196034916*i+2930517863845069962434997765740259997402323734597785707666326817780833077886667366297439056428066687669704669608857985660146737304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18671772581886834941954807902371312952780720154961366797776841651271731321800202209131453970817216491659053894153122409714167631153*i+19526788534938300033003034554522800755515154751460613079039466939660636877503587901848659549050286732655406262370673946661006334824)*x + (12095445797216896154866342122961180579999251051532433057487781559449658961977618067615975864601695086224441940283202470633196034916*i+2930517863845069962434997765740259997402323734597785707666326817780833077886667366297439056428066687669704669608857985660146737304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10213770223553645507240665083309978850960821980906024108137303815461921120084916608342496319604669781281425811117454847418632012014*i+7168082903359705608701991500767081930861746352040459307829729233858659705891659514017707356600395786258580601055572753406289811206)*x + (7035693378415464416481688876502981523217637721628352234617722349937506622626828860424276326953131965817370427205053905991082736903*i+4654495880550288396684858015705913350364848772261986890560951462396450286715161195156663921599419140050481359227818631656547046372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10213770223553645507240665083309978850960821980906024108137303815461921120084916608342496319604669781281425811117454847418632012014*i+7168082903359705608701991500767081930861746352040459307829729233858659705891659514017707356600395786258580601055572753406289811206)*x + (7035693378415464416481688876502981523217637721628352234617722349937506622626828860424276326953131965817370427205053905991082736903*i+4654495880550288396684858015705913350364848772261986890560951462396450286715161195156663921599419140050481359227818631656547046372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (344136334837434951838447761612091610422480067267401968466994644590338595723357535331203418239249553760833801382372136337218431791*i+18121901385066533670626977784282051423933959404635620734364105148919771234107119093255262814799793959625579928538478594163237157666)*x + (22991223963409643243607080608423652357784143521141466399061116648412459504275451346590750142002086871667466659462516337266782828588*i+20031826351329661292409039037024354644803628793136769891201436987410279511263608987251679011009450937824854445353554823687103438502) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (344136334837434951838447761612091610422480067267401968466994644590338595723357535331203418239249553760833801382372136337218431791*i+18121901385066533670626977784282051423933959404635620734364105148919771234107119093255262814799793959625579928538478594163237157666)*x + (22991223963409643243607080608423652357784143521141466399061116648412459504275451346590750142002086871667466659462516337266782828588*i+20031826351329661292409039037024354644803628793136769891201436987410279511263608987251679011009450937824854445353554823687103438502) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21333553028759324910345549802426139719360144637400103445420392396099523444399556102985164790225163544423506279319928140647271359129*i+2735518101506866953088475079134414272445616186158251871286142782291402781677285065702346343756439889742528732104281315705548207351)*x + (5791354964612603822205775162553024096275160638285169525998691788617222242287625584787016535030450379421816266252741592621699910376*i+12869634910375122351122654491245893041180706267439157559710248309450543359002929798943431770610005583271132316575406892813133917687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21333553028759324910345549802426139719360144637400103445420392396099523444399556102985164790225163544423506279319928140647271359129*i+2735518101506866953088475079134414272445616186158251871286142782291402781677285065702346343756439889742528732104281315705548207351)*x + (5791354964612603822205775162553024096275160638285169525998691788617222242287625584787016535030450379421816266252741592621699910376*i+12869634910375122351122654491245893041180706267439157559710248309450543359002929798943431770610005583271132316575406892813133917687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22485736781612941539797767874894090381018577372565267279787817067602468943416836617393863786486807697417094422843167272360256444646*i+23176511022355162399629037680487644516195963454888034479517025529379090740859146588048224440581945179633828397573395980298659464455)*x + (12619377353191097096790579016903722529132630806746802716760128385483549706075954098157115887468889703455762405666753114020985024598*i+22945078483687465718500455989652518135150506908235963427833756969615544046388726491485501055513372034071870833561313725709746362665) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22485736781612941539797767874894090381018577372565267279787817067602468943416836617393863786486807697417094422843167272360256444646*i+23176511022355162399629037680487644516195963454888034479517025529379090740859146588048224440581945179633828397573395980298659464455)*x + (12619377353191097096790579016903722529132630806746802716760128385483549706075954098157115887468889703455762405666753114020985024598*i+22945078483687465718500455989652518135150506908235963427833756969615544046388726491485501055513372034071870833561313725709746362665) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7486434574257505775760351015130496012510374331084477223462099823326393480087416289069937107765080685741902509673770517437040346453*i+17463909085162854618043928314810234537123130168097067250824751508581798751162046446499391355776773180523460903154117838870958640982)*x + (19825510745590972541005263880194950545998229022303296709077269821971742887802315098330754508840229739898538025476136415182585004417*i+21909311582828949679452318554514072546501027456183194172200860313785522533366224639059322404270331587892003667344584832948771791930) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7486434574257505775760351015130496012510374331084477223462099823326393480087416289069937107765080685741902509673770517437040346453*i+17463909085162854618043928314810234537123130168097067250824751508581798751162046446499391355776773180523460903154117838870958640982)*x + (19825510745590972541005263880194950545998229022303296709077269821971742887802315098330754508840229739898538025476136415182585004417*i+21909311582828949679452318554514072546501027456183194172200860313785522533366224639059322404270331587892003667344584832948771791930) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15358477265553916462275675101593225431113307497702029908267854306119358123054696757321384017118680944691485221201278095483402029020*i+19378758331065683855145241587969465361227841939514429375935887126360465044003380444396389580302031546074239153500472619768379372459)*x + (4001835238845867163384292996871537653456907220079327393872012794885289142521534575352541813777554248752778401298850890887376850144*i+21475552847380346273126425190682339439623594919911220878018477757927556647668951578733512163576402877801338630649034364425451241730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15358477265553916462275675101593225431113307497702029908267854306119358123054696757321384017118680944691485221201278095483402029020*i+19378758331065683855145241587969465361227841939514429375935887126360465044003380444396389580302031546074239153500472619768379372459)*x + (4001835238845867163384292996871537653456907220079327393872012794885289142521534575352541813777554248752778401298850890887376850144*i+21475552847380346273126425190682339439623594919911220878018477757927556647668951578733512163576402877801338630649034364425451241730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14956758908409228290372790071822528673805341712842288448772201900420667991581313592666297653605175862802909617178291809608191315903*i+15861014737054245930970316519152034331852402633092313470736123365044497505693837824414107909480594267261416440922240719136276229390)*x + (14935695678115145454902852494854727864565714957588151482410062449419885303030596118395154912466539247312188696433301009965734860003*i+4240329453403630459260781866920258214181696683736353109730381800047408102616331696491556387423508971155592669528010107989013714779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14956758908409228290372790071822528673805341712842288448772201900420667991581313592666297653605175862802909617178291809608191315903*i+15861014737054245930970316519152034331852402633092313470736123365044497505693837824414107909480594267261416440922240719136276229390)*x + (14935695678115145454902852494854727864565714957588151482410062449419885303030596118395154912466539247312188696433301009965734860003*i+4240329453403630459260781866920258214181696683736353109730381800047408102616331696491556387423508971155592669528010107989013714779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4384009891678468132124210063312927826435654662216038077673410048824938304255944836563473456906645913992106128105204999421227041404*i+15510350455423763173115515167953203656495842273888176450109192876623192500488848260423732843353152360620368388056596911147645813522)*x + (21357227692745280886493020030063881025256753723519165984230037804121731642753774471780449085597557914571241495375908759950919479620*i+2680804067801613553521233395175661166203336763346132174302979115330701068307367012522070982782207045731701083874994354728145143917) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4384009891678468132124210063312927826435654662216038077673410048824938304255944836563473456906645913992106128105204999421227041404*i+15510350455423763173115515167953203656495842273888176450109192876623192500488848260423732843353152360620368388056596911147645813522)*x + (21357227692745280886493020030063881025256753723519165984230037804121731642753774471780449085597557914571241495375908759950919479620*i+2680804067801613553521233395175661166203336763346132174302979115330701068307367012522070982782207045731701083874994354728145143917) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16676152968368855270106863412455067922815746092853247926225538148054552977058633670359781165958174962545838450877838001425311905124*i+22109464542034508061464541002688178303013958530627279634701241697492167625657241198758527005113635166591560123535234022379539038112)*x + (8568073092524565841629502609643825383309093902092227414547058225155201318781376026312994234970558650837199899078956515269164533423*i+15866000818415739649745111268985410963152190907841594215844252095223336241600779402227123851069410140441133569168097492620750757422) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16676152968368855270106863412455067922815746092853247926225538148054552977058633670359781165958174962545838450877838001425311905124*i+22109464542034508061464541002688178303013958530627279634701241697492167625657241198758527005113635166591560123535234022379539038112)*x + (8568073092524565841629502609643825383309093902092227414547058225155201318781376026312994234970558650837199899078956515269164533423*i+15866000818415739649745111268985410963152190907841594215844252095223336241600779402227123851069410140441133569168097492620750757422) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6204920971147177695932998589799699978509637835697820037676823958014358771239826663755102597537573450512904060112935028884898785725*i+2436016436594498680076348298267435692172602226375241392570730540909039084774471438615960628887354569964333846182222017108538370324)*x + (9997933371992020685125915719088495351139857381483881503261092282542953159320035573634495854316611044618231082029744362282505317845*i+20946134133785982912323570493061593999630847424627432000973683023325048614876649299459013608937881672708166772835382518553317063581) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6204920971147177695932998589799699978509637835697820037676823958014358771239826663755102597537573450512904060112935028884898785725*i+2436016436594498680076348298267435692172602226375241392570730540909039084774471438615960628887354569964333846182222017108538370324)*x + (9997933371992020685125915719088495351139857381483881503261092282542953159320035573634495854316611044618231082029744362282505317845*i+20946134133785982912323570493061593999630847424627432000973683023325048614876649299459013608937881672708166772835382518553317063581) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7332135451610200927937137053618589979421768229665242211165742509179596564271694372928422911732988848166302282921014062466652847197*i+24169772273472195349596427849970210347446792275411901305411620636604207316816911815921479935932906342801004353659061062172195201591)*x + (8718436810669579656831555779632811258721760656239947751415324130358898821872133157464614377894050674378430952081208296634882735936*i+295688204526724929176080967854304744367542658289232102804927247538618827217495547705763808494658881799878391284552367796603074045) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7332135451610200927937137053618589979421768229665242211165742509179596564271694372928422911732988848166302282921014062466652847197*i+24169772273472195349596427849970210347446792275411901305411620636604207316816911815921479935932906342801004353659061062172195201591)*x + (8718436810669579656831555779632811258721760656239947751415324130358898821872133157464614377894050674378430952081208296634882735936*i+295688204526724929176080967854304744367542658289232102804927247538618827217495547705763808494658881799878391284552367796603074045) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18360336871166834272408954002540613278958279474999589367504499789961772123776444721590281944641989147861108055539977286062710000889*i+14893514594065926588804807599073329277917782652383442062851440509208824686190693316717092169233503534196594950873768870489932141897)*x + (18928300749520346882550264074911721137242986661030224459918749368395993522869960954198467667485290166045448309652066805199653069197*i+19497778050605494889257163257609572321944779212763431136757426829650358491111880760448718204603881747489134845841691250079288273324) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18360336871166834272408954002540613278958279474999589367504499789961772123776444721590281944641989147861108055539977286062710000889*i+14893514594065926588804807599073329277917782652383442062851440509208824686190693316717092169233503534196594950873768870489932141897)*x + (18928300749520346882550264074911721137242986661030224459918749368395993522869960954198467667485290166045448309652066805199653069197*i+19497778050605494889257163257609572321944779212763431136757426829650358491111880760448718204603881747489134845841691250079288273324) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4034815350541555104095261658848226857907673731024281394437789150611843729952349685738707611074455086931303390598763793135415009190*i+248345042201646586355087153913086884553151830399613786303374297040822059439240779178469569783542737577447092724442718826554592313)*x + (7806867256418280439758713570018231901882909004741246156503799770944053312302484043271304600889852184466313893954237191356513061750*i+8150131483859415653694808218222443525891171961458959352190484686042164615163794418073846827893233909312590178877544290960592472086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4034815350541555104095261658848226857907673731024281394437789150611843729952349685738707611074455086931303390598763793135415009190*i+248345042201646586355087153913086884553151830399613786303374297040822059439240779178469569783542737577447092724442718826554592313)*x + (7806867256418280439758713570018231901882909004741246156503799770944053312302484043271304600889852184466313893954237191356513061750*i+8150131483859415653694808218222443525891171961458959352190484686042164615163794418073846827893233909312590178877544290960592472086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13864163410753439999175311333183509690534956853514535677084612820626588684512720948360741242672228860831493229148297607335759158065*i+8041937023417100934726236969232585284866220253567855742484062564715223632772428226790880886947096397664491061176661677514182700027)*x + (11366481245276877805986348675855615739101832358396095346152189883154952890898038607063295321035701560504915554799417613744974586837*i+22759246787496601858971066080762766322565326894588385134591007478893538434657754038025205742590785043097153254899573491644689888197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13864163410753439999175311333183509690534956853514535677084612820626588684512720948360741242672228860831493229148297607335759158065*i+8041937023417100934726236969232585284866220253567855742484062564715223632772428226790880886947096397664491061176661677514182700027)*x + (11366481245276877805986348675855615739101832358396095346152189883154952890898038607063295321035701560504915554799417613744974586837*i+22759246787496601858971066080762766322565326894588385134591007478893538434657754038025205742590785043097153254899573491644689888197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1256310620687560582706653478940098468153426436611434840005420125263685829582182495717086302775665466339001287684030833856747167850*i+4897132664437396361002861879160688858181487964923519277043858388413466343786703323961319597141796289538724817296813953506924564253)*x + (5840212790399867793483487462690739843832199563037924371647553244058745943603929905588641664861553855100685465738925626048561123773*i+11279756264315255778303868207306410893198903300728469812469122152929373918037045389811360684793861308707062000831193717180488480689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1256310620687560582706653478940098468153426436611434840005420125263685829582182495717086302775665466339001287684030833856747167850*i+4897132664437396361002861879160688858181487964923519277043858388413466343786703323961319597141796289538724817296813953506924564253)*x + (5840212790399867793483487462690739843832199563037924371647553244058745943603929905588641664861553855100685465738925626048561123773*i+11279756264315255778303868207306410893198903300728469812469122152929373918037045389811360684793861308707062000831193717180488480689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23755430852833494102199287882401702601562415940939117133177313718717004099959554419474286833597682693610544121545588410204229520079*i+12822284275322548493625047102480306710242700320935637809686272150320187459093218737776446225305667719953590601967300749194945693641)*x + (2692446323811690104498674180990881699286956582530997173307811039200311111833744318589440475567722144673255242217370856768331269567*i+1583348947588570949289670493785476198732208675835230391039487495673532336788531114519756754127838188055635933907744660566954275594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23755430852833494102199287882401702601562415940939117133177313718717004099959554419474286833597682693610544121545588410204229520079*i+12822284275322548493625047102480306710242700320935637809686272150320187459093218737776446225305667719953590601967300749194945693641)*x + (2692446323811690104498674180990881699286956582530997173307811039200311111833744318589440475567722144673255242217370856768331269567*i+1583348947588570949289670493785476198732208675835230391039487495673532336788531114519756754127838188055635933907744660566954275594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3645930011097046048087782970892120144225237009226681127979951388461886616693731362842502237548889592527997559524286809193346229456*i+1872662005278374101608135073685562769861472198731276762964052303853711680807518594636566847984876111655223652645928473180934023330)*x + (13103734130211776408766604070189326367010914753276636053534758205271313560815835801839718234215598926619707781746832132844447278986*i+4785173930787493098667544525784096164556066865297891241279297640242637485877738801889778211183243116743744468000921164405363249423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3645930011097046048087782970892120144225237009226681127979951388461886616693731362842502237548889592527997559524286809193346229456*i+1872662005278374101608135073685562769861472198731276762964052303853711680807518594636566847984876111655223652645928473180934023330)*x + (13103734130211776408766604070189326367010914753276636053534758205271313560815835801839718234215598926619707781746832132844447278986*i+4785173930787493098667544525784096164556066865297891241279297640242637485877738801889778211183243116743744468000921164405363249423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19188941075463427485655549817842851503053728937618018091631036466078252276370118482662816862349035859925323136408433087719814487830*i+7117280022995320079664899380349905194496041503019985453952689989582065737909689872965398393952429741746555186037595023020091819412)*x + (16049228425399098435867554056394911353317931042773159442216356381911411384767780304842299818859268563062895346984436178755892319710*i+19404585650698892528310389937364769544792845759265341321498619139740532821829591987850821237515855725719845278099395091868209273892) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19188941075463427485655549817842851503053728937618018091631036466078252276370118482662816862349035859925323136408433087719814487830*i+7117280022995320079664899380349905194496041503019985453952689989582065737909689872965398393952429741746555186037595023020091819412)*x + (16049228425399098435867554056394911353317931042773159442216356381911411384767780304842299818859268563062895346984436178755892319710*i+19404585650698892528310389937364769544792845759265341321498619139740532821829591987850821237515855725719845278099395091868209273892) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21150347160177510750231696410035721116490397100155536870201742025207855228505922165534127222449547359129639502304224043902084296371*i+5364619929072846961196361250617945649454054408234172726749616318684311751958812495764616451891126374814532701996713095159731596772)*x + (17303005840660815486913712547313831514940372143418122575121253636665721063316747048438628257554189226893083023868574655209525810114*i+1001055107982460154524780159622477817926257346109324797364831664365006688456320118098276324581139338457361306767441633899064936992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21150347160177510750231696410035721116490397100155536870201742025207855228505922165534127222449547359129639502304224043902084296371*i+5364619929072846961196361250617945649454054408234172726749616318684311751958812495764616451891126374814532701996713095159731596772)*x + (17303005840660815486913712547313831514940372143418122575121253636665721063316747048438628257554189226893083023868574655209525810114*i+1001055107982460154524780159622477817926257346109324797364831664365006688456320118098276324581139338457361306767441633899064936992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3392488693635753823113221043856070404256055738885948552072361636972570160053115069555221925180170460085874657317222567163128797536*i+3827099238702791513220748619203983024571185828224816425068115823155719569158871959827621638914905801888017513604691765275476371162)*x + (21697405697301701445024500845513834831775484378771247373412141257385576831628768857020642812041807068062921501855252945207599063106*i+20613338470513763427449903403126610418176639452451083602549096573269091883895567965277383706047665350932060365212061605654657897721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3392488693635753823113221043856070404256055738885948552072361636972570160053115069555221925180170460085874657317222567163128797536*i+3827099238702791513220748619203983024571185828224816425068115823155719569158871959827621638914905801888017513604691765275476371162)*x + (21697405697301701445024500845513834831775484378771247373412141257385576831628768857020642812041807068062921501855252945207599063106*i+20613338470513763427449903403126610418176639452451083602549096573269091883895567965277383706047665350932060365212061605654657897721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8389729585336318976512994677370519437805381588818909992883110147570350985314267067559909272885042867928981880726597208575546215615*i+19109197433836910072016572464602725668671251030496175023752552709441374775224017109231114241037961563337284185552674940247601369150)*x + (18782477462375847997101326807966579930314737128225067124495715256743292300836070190992256635922444430054612264106970500330364742861*i+6043194883341848805915079502649185995709180772623413019748667004271182059990351661134796351225418043536377703904681962587629902140) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8389729585336318976512994677370519437805381588818909992883110147570350985314267067559909272885042867928981880726597208575546215615*i+19109197433836910072016572464602725668671251030496175023752552709441374775224017109231114241037961563337284185552674940247601369150)*x + (18782477462375847997101326807966579930314737128225067124495715256743292300836070190992256635922444430054612264106970500330364742861*i+6043194883341848805915079502649185995709180772623413019748667004271182059990351661134796351225418043536377703904681962587629902140) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11227774640114908705760250150858991747624603446775709677470848563711600948730507223251043130451285778236616849192447845000487389825*i+17435160165649536535980741663288544320337646771416140126590333739828769311042200815636088879072469613259556004797514804407994709446)*x + (3879924669275456634072882690213790697954569701901193300732044957751617818046721220743193754724159018488028631557161592997009767373*i+16550886964564796574009559008183072048043799256547182005716589731047055910777080001866839365096983925696129133439027040030677466014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11227774640114908705760250150858991747624603446775709677470848563711600948730507223251043130451285778236616849192447845000487389825*i+17435160165649536535980741663288544320337646771416140126590333739828769311042200815636088879072469613259556004797514804407994709446)*x + (3879924669275456634072882690213790697954569701901193300732044957751617818046721220743193754724159018488028631557161592997009767373*i+16550886964564796574009559008183072048043799256547182005716589731047055910777080001866839365096983925696129133439027040030677466014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9424960056355878170457589935792237368372050062198064481408060309819589195847339556378403207630267581741736756835823307973256116035*i+2180436331266123239261899568362353581095671072221674037080716953524179224996232131100503365432347149563854634557284470684276307417)*x + (18971526522821514338488350490880226661177854863264990939864222632849301167939987076424004412166529085775323375083160276946761679154*i+12288703519364574586772607337573218684737234151251851076669280280855090194047462811276120498581801744432998722837614021392162461777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9424960056355878170457589935792237368372050062198064481408060309819589195847339556378403207630267581741736756835823307973256116035*i+2180436331266123239261899568362353581095671072221674037080716953524179224996232131100503365432347149563854634557284470684276307417)*x + (18971526522821514338488350490880226661177854863264990939864222632849301167939987076424004412166529085775323375083160276946761679154*i+12288703519364574586772607337573218684737234151251851076669280280855090194047462811276120498581801744432998722837614021392162461777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23513848145711590372947605114032529492499358163961328868167590126511059188420145133629768062869833919078310228995319244512934819076*i+7873886983825054331979037238776420140706176810069100121736934151064624263670820819612805209387408709242646105915725088532208758969)*x + (6893246417570066752298652701739316381349226251228563543173552403445145991919794360056037696450920984607537585826284405814224807574*i+16030047379408914199247329014438361762010903706420793533914147693442677036865515346467022677022429216228028320570122311870986254343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23513848145711590372947605114032529492499358163961328868167590126511059188420145133629768062869833919078310228995319244512934819076*i+7873886983825054331979037238776420140706176810069100121736934151064624263670820819612805209387408709242646105915725088532208758969)*x + (6893246417570066752298652701739316381349226251228563543173552403445145991919794360056037696450920984607537585826284405814224807574*i+16030047379408914199247329014438361762010903706420793533914147693442677036865515346467022677022429216228028320570122311870986254343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1628448695161910746854373290857925736318157352383418431908679564614976709781261964814900051620376312488506358920388173784801780924*i+17686096949961382689410769758036490955118512021584045966193895098300841753439076798827587540832013650873144054385549028246900863101)*x + (17373724574314693196057614181683934824883143369194323529127105898362063573017925695172968745233289127873235408033341410302819349124*i+21526233558327498933223720953294703257150944760161790372122165308350031910611135358461466020070476863327001251620216224113389833722) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1628448695161910746854373290857925736318157352383418431908679564614976709781261964814900051620376312488506358920388173784801780924*i+17686096949961382689410769758036490955118512021584045966193895098300841753439076798827587540832013650873144054385549028246900863101)*x + (17373724574314693196057614181683934824883143369194323529127105898362063573017925695172968745233289127873235408033341410302819349124*i+21526233558327498933223720953294703257150944760161790372122165308350031910611135358461466020070476863327001251620216224113389833722) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9311901903480815673200992378182428857753438118471786079010519974567828557584456444511572045760985471362519226642175907682581235679*i+2189000411197388298194462651325193928615104331805769102983634631177812300061680227927029935616493649699819259722997011654830548936)*x + (11347631923162611702562700528145046116667063709778372933381292033339165406825372863934590215808386325387228144067838012363315583039*i+544750731598831404197729349300207631274286804423563184302739587869640627268817660322941969853980304715244264485820847870666578788) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9311901903480815673200992378182428857753438118471786079010519974567828557584456444511572045760985471362519226642175907682581235679*i+2189000411197388298194462651325193928615104331805769102983634631177812300061680227927029935616493649699819259722997011654830548936)*x + (11347631923162611702562700528145046116667063709778372933381292033339165406825372863934590215808386325387228144067838012363315583039*i+544750731598831404197729349300207631274286804423563184302739587869640627268817660322941969853980304715244264485820847870666578788) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17566621023340651208671035780585772922926570855604586545818705934851296238339636752552429057028094734097847593013650576573563684591*i+4747584114525186526838955501453863786294418496831703981677514566471062582191849938790868422327724428463348296266489691228068549259)*x + (14236205146687581388083458720429343777934660824098284159553213164981679260517350576611766834927438568324957527993590390515485175188*i+2126422756097925524453397267793878743775795686317810992044848175902316859377220548047036688250934575900891633584498735719106050325) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17566621023340651208671035780585772922926570855604586545818705934851296238339636752552429057028094734097847593013650576573563684591*i+4747584114525186526838955501453863786294418496831703981677514566471062582191849938790868422327724428463348296266489691228068549259)*x + (14236205146687581388083458720429343777934660824098284159553213164981679260517350576611766834927438568324957527993590390515485175188*i+2126422756097925524453397267793878743775795686317810992044848175902316859377220548047036688250934575900891633584498735719106050325) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9823207374620878689916152987550467156708566762807287404773567499952231449079423249661378378806841249805957411534929223280698587026*i+12855420481306602304072991729712648879702707021478470153982098764594307724507408504175806120887634600631094169584139460032181430561)*x + (15813657117334019505573977281735298687200341313974061434423912986892245498975136738824644866270621106019467004351186187281041959364*i+7659983563272563808625423172214496933353321962410579174720853543455545840447133747932471644234094752252286298117564843635862236894) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9823207374620878689916152987550467156708566762807287404773567499952231449079423249661378378806841249805957411534929223280698587026*i+12855420481306602304072991729712648879702707021478470153982098764594307724507408504175806120887634600631094169584139460032181430561)*x + (15813657117334019505573977281735298687200341313974061434423912986892245498975136738824644866270621106019467004351186187281041959364*i+7659983563272563808625423172214496933353321962410579174720853543455545840447133747932471644234094752252286298117564843635862236894) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2213362414060758206457247274631733154884236421059499746452895553211912427397430503438558307997376072436600688730543414966453123005*i+2019319867372388693716301006111079171519621629063748340233993161985204433211778441315799184621295933983026339566315873380128142097)*x + (296358547983613199957256625586750937743607787721795633869070633836547954546765656128453944243147293424970701774050388069041068492*i+7186774106934051015543959189095645723540321866675834920638968878055579833850233123002912094037529084110651569970645080758224498501) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2213362414060758206457247274631733154884236421059499746452895553211912427397430503438558307997376072436600688730543414966453123005*i+2019319867372388693716301006111079171519621629063748340233993161985204433211778441315799184621295933983026339566315873380128142097)*x + (296358547983613199957256625586750937743607787721795633869070633836547954546765656128453944243147293424970701774050388069041068492*i+7186774106934051015543959189095645723540321866675834920638968878055579833850233123002912094037529084110651569970645080758224498501) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18400390754196406636600685171035220453655291300341041731288292304198123327244826068479444511064061582376831575538624211310364136138*i+9625841966673314847763810250116460674544958517702201094714794799821126493392065148471037252098138809646273009081730584229780260719)*x + (10593670837102982694008015183582123510890408837636963102567403333998447169347680406403661570871674464454199730974423568556003423069*i+21322777375192972031370889549319085268784685094437920547891812267078876228067894433524381377819845765318103675829994794545267981782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18400390754196406636600685171035220453655291300341041731288292304198123327244826068479444511064061582376831575538624211310364136138*i+9625841966673314847763810250116460674544958517702201094714794799821126493392065148471037252098138809646273009081730584229780260719)*x + (10593670837102982694008015183582123510890408837636963102567403333998447169347680406403661570871674464454199730974423568556003423069*i+21322777375192972031370889549319085268784685094437920547891812267078876228067894433524381377819845765318103675829994794545267981782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22327274992514273751104520172129494830445365424691381871325393112458487209704396058630291234792728767009168812430416736594093261917*i+21847394495062584001234165238708850355262011354094310446037797249419577787384871016306655708791649409601095744404016004745548558013)*x + (19442105788849741882282036634456891547222175786618239266639691949812611224011703136169853636439016074136081084615941819328433583191*i+14323386393835201987586291905376359037929271749059142276945186185834084927058615232018842082055169002960095278581874044939698265146) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22327274992514273751104520172129494830445365424691381871325393112458487209704396058630291234792728767009168812430416736594093261917*i+21847394495062584001234165238708850355262011354094310446037797249419577787384871016306655708791649409601095744404016004745548558013)*x + (19442105788849741882282036634456891547222175786618239266639691949812611224011703136169853636439016074136081084615941819328433583191*i+14323386393835201987586291905376359037929271749059142276945186185834084927058615232018842082055169002960095278581874044939698265146) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2400451431801418467079323926547572535809232163630910366750586540734099140130457126092626626083081201737856158616399072725194345334*i+6708494226376026617099781120971483829747123053631309471201285645732064472373933663219467651858251185703256413250024978299729099006)*x + (383359872992152818352404065683601201960428546367828759858018675341627962859077860338413815613473359848285808986234440038717564925*i+2933393150215065583605483087853662210364792723334739030530674924005146954722953563282327802707645423191679651023879004011018169601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2400451431801418467079323926547572535809232163630910366750586540734099140130457126092626626083081201737856158616399072725194345334*i+6708494226376026617099781120971483829747123053631309471201285645732064472373933663219467651858251185703256413250024978299729099006)*x + (383359872992152818352404065683601201960428546367828759858018675341627962859077860338413815613473359848285808986234440038717564925*i+2933393150215065583605483087853662210364792723334739030530674924005146954722953563282327802707645423191679651023879004011018169601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20803650047514579215478045074702196793016023164538406815606589767835674823157294007278823666793646056936029665781450466328627161802*i+8486811835070407313147799482896300832556808626828029730441778554902442471493224317247013484889327095012091058955510413287913001727)*x + (5462273559380411169279293755743200943985409699402557826219406535816487129851814099238023877241510682497001250401208301663141022476*i+9302949126760718408356283366220958043614296338867232948523066127949728736563497031164776981952933938751836459624580514019877124711) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20803650047514579215478045074702196793016023164538406815606589767835674823157294007278823666793646056936029665781450466328627161802*i+8486811835070407313147799482896300832556808626828029730441778554902442471493224317247013484889327095012091058955510413287913001727)*x + (5462273559380411169279293755743200943985409699402557826219406535816487129851814099238023877241510682497001250401208301663141022476*i+9302949126760718408356283366220958043614296338867232948523066127949728736563497031164776981952933938751836459624580514019877124711) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17562405075652170297505023535771198534334020872628261135859746180956226102300651930542695768666155383050954919765007030628095468016*i+23835207564603515508283046161185931254785432455264736747260007105353200306279474045128426179294141689052218790161757417280986596719)*x + (17139538831731372840360779649624206091992431736929529689474387346198415020177861635254385272498581974213390105080478890688817852263*i+19060078781402603313868652501393533942620512223843046348164565246735657090610478484568144116466122238559117747546538148166074235223) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17562405075652170297505023535771198534334020872628261135859746180956226102300651930542695768666155383050954919765007030628095468016*i+23835207564603515508283046161185931254785432455264736747260007105353200306279474045128426179294141689052218790161757417280986596719)*x + (17139538831731372840360779649624206091992431736929529689474387346198415020177861635254385272498581974213390105080478890688817852263*i+19060078781402603313868652501393533942620512223843046348164565246735657090610478484568144116466122238559117747546538148166074235223) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18076066401122734392983495640979486289388333593183967229175729323049848199209942519687249676587112755637385560691185498447423153357*i+21181797782273860698296729127096172945099208757589921307790443083427501298224769652335100302422277479142238522448692446802713515812)*x + (15369998791336626745686155637338347079401501462589241815689807203734447640904453302588257365655994389452214505020043323062559295659*i+5594577604572082157884885403693371517751577267489571816960472626586155894819050621029333868040069754249946577910325707731209156707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18076066401122734392983495640979486289388333593183967229175729323049848199209942519687249676587112755637385560691185498447423153357*i+21181797782273860698296729127096172945099208757589921307790443083427501298224769652335100302422277479142238522448692446802713515812)*x + (15369998791336626745686155637338347079401501462589241815689807203734447640904453302588257365655994389452214505020043323062559295659*i+5594577604572082157884885403693371517751577267489571816960472626586155894819050621029333868040069754249946577910325707731209156707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10586278317673668991274879590794960549682854868450918657916596126560535940749638414267742323293434725368531335012269105653641831615*i+19469053174896340098078677150011771441042463336392185159973431744798582991685185113637264191492890550435655616989858628633825384000)*x + (17396010447391330995007494701641753195921849891231298271997970448545076003981092355958089294423962247116525450617330116353594791286*i+2768509836399430324753230422379305214794372686186272698480428803782587619466963568919642624592910736439805976764427026337912547606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10586278317673668991274879590794960549682854868450918657916596126560535940749638414267742323293434725368531335012269105653641831615*i+19469053174896340098078677150011771441042463336392185159973431744798582991685185113637264191492890550435655616989858628633825384000)*x + (17396010447391330995007494701641753195921849891231298271997970448545076003981092355958089294423962247116525450617330116353594791286*i+2768509836399430324753230422379305214794372686186272698480428803782587619466963568919642624592910736439805976764427026337912547606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6453145170888439497035671670046551660152522776121349533167846867683293982020015617198671245449042633186356403840185341000156299676*i+13206425843155607152848120689999109195186810200997021061475599286266584180123717292786018457463189551961529854371059207372759119581)*x + (7277162657820920710916022239729947521204161337227603823123457814149810966731113808800387372179633133388742986398815069243688267179*i+15484533964885597146578983996318843109195997104677045939617595698701447098661268177596485870714752405301274450797339763542456207200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6453145170888439497035671670046551660152522776121349533167846867683293982020015617198671245449042633186356403840185341000156299676*i+13206425843155607152848120689999109195186810200997021061475599286266584180123717292786018457463189551961529854371059207372759119581)*x + (7277162657820920710916022239729947521204161337227603823123457814149810966731113808800387372179633133388742986398815069243688267179*i+15484533964885597146578983996318843109195997104677045939617595698701447098661268177596485870714752405301274450797339763542456207200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15410548837772551991624075995576355028289039103616177981523747940674580188688025480145088880360171601284697689849097183386006644909*i+5748528035198860014091287596217063698551169790625540538923919877614494078481192304679874615825702522095413372462655031587317446049)*x + (18163027070677437439542194635717430904895819293442835523040072897169736157058194668371040479460027395207861484767648731035745958859*i+22636075900717472605357717215766391224766657017809879306156400224386724208745582003640911377470770651302686535947641233556344293144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15410548837772551991624075995576355028289039103616177981523747940674580188688025480145088880360171601284697689849097183386006644909*i+5748528035198860014091287596217063698551169790625540538923919877614494078481192304679874615825702522095413372462655031587317446049)*x + (18163027070677437439542194635717430904895819293442835523040072897169736157058194668371040479460027395207861484767648731035745958859*i+22636075900717472605357717215766391224766657017809879306156400224386724208745582003640911377470770651302686535947641233556344293144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (563252170280337254183427872844358803188547620523893786464541714163226293721402818541771305745131883388891390249847298919654360165*i+6626904767421585692946116342588207993318969352731042610336390424732162744640508870353593844471458544657489119542844232690924970279)*x + (12967568506138495924137892703667842265448391210468888285957062546598862543487706710389801632093586662901873775878963157911001059546*i+14331615488255247037181907181680369542205160544552467367715384113322623272002943293774007908632147744946814735610194897560807283967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (563252170280337254183427872844358803188547620523893786464541714163226293721402818541771305745131883388891390249847298919654360165*i+6626904767421585692946116342588207993318969352731042610336390424732162744640508870353593844471458544657489119542844232690924970279)*x + (12967568506138495924137892703667842265448391210468888285957062546598862543487706710389801632093586662901873775878963157911001059546*i+14331615488255247037181907181680369542205160544552467367715384113322623272002943293774007908632147744946814735610194897560807283967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23994638503190216205060964868515236250489743289818756496270648695969284368680904080549469124579791802101046063037937298683793951366*i+21464140465408012260493963811876221153036414725445228297323747308793851148114189010265638834627084649871592917828459701350949201492)*x + (11134902242168101091293960214852408953652565542278972789397234472709874815701716856390512866319370921621822337679098469156391421128*i+13612759649643810322202195256327720858797400632165438139262174571576832208057427689248092675866281539955655589258462530597565362282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23994638503190216205060964868515236250489743289818756496270648695969284368680904080549469124579791802101046063037937298683793951366*i+21464140465408012260493963811876221153036414725445228297323747308793851148114189010265638834627084649871592917828459701350949201492)*x + (11134902242168101091293960214852408953652565542278972789397234472709874815701716856390512866319370921621822337679098469156391421128*i+13612759649643810322202195256327720858797400632165438139262174571576832208057427689248092675866281539955655589258462530597565362282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4364573917351152631913981770232400033864763267838783396353013940415328429945946828750365386565131400827183332875237912136254966450*i+15604550948197468937369040671584090963896181173528540103513684632185422971607711504863548192437224594556159725903164581411720368466)*x + (16269174675190089407093372201949097363029058266079468323346610155087436226453487831404086804682579681011856064070843846753030355520*i+11607147354456018129949243262564941719552311297462450996161040885063221412651059140408477897308896770111916388590644629596324214071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4364573917351152631913981770232400033864763267838783396353013940415328429945946828750365386565131400827183332875237912136254966450*i+15604550948197468937369040671584090963896181173528540103513684632185422971607711504863548192437224594556159725903164581411720368466)*x + (16269174675190089407093372201949097363029058266079468323346610155087436226453487831404086804682579681011856064070843846753030355520*i+11607147354456018129949243262564941719552311297462450996161040885063221412651059140408477897308896770111916388590644629596324214071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10344279745021862326419748673097303638899059214003011421409761869146128790387379266331954942336851197438189971202789089225540239841*i+20522594975688718011985905600026618087140566082366828004100229191542358264924695971281033911502944165264756153715024216584508190077)*x + (1763499250723846851134506172825871931575774689326117259853702469008531684127406866514809891410454181897329581951633784577526932846*i+20540415028743513365532715170737302568310168994427263966542491569408396254509536049345155146095538008289318103951206280783492968431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10344279745021862326419748673097303638899059214003011421409761869146128790387379266331954942336851197438189971202789089225540239841*i+20522594975688718011985905600026618087140566082366828004100229191542358264924695971281033911502944165264756153715024216584508190077)*x + (1763499250723846851134506172825871931575774689326117259853702469008531684127406866514809891410454181897329581951633784577526932846*i+20540415028743513365532715170737302568310168994427263966542491569408396254509536049345155146095538008289318103951206280783492968431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21183387159572143970433864532870945004997568766344144876580572030896166421059526933215928333076444788359552988773111845168307444702*i+2592954219635019790303310668038137695438316034489834710424386069312316113903280504317718839719000876789487674809529611070045760778)*x + (11088324606377209579004726123712988788358549097795574390911145000294987278313996224406720418351184208559691961307235179315920125437*i+10520013345228535645901404919404091212170863622689192316827049536973046649553987627426952208313448145475055031601146696678039704279) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21183387159572143970433864532870945004997568766344144876580572030896166421059526933215928333076444788359552988773111845168307444702*i+2592954219635019790303310668038137695438316034489834710424386069312316113903280504317718839719000876789487674809529611070045760778)*x + (11088324606377209579004726123712988788358549097795574390911145000294987278313996224406720418351184208559691961307235179315920125437*i+10520013345228535645901404919404091212170863622689192316827049536973046649553987627426952208313448145475055031601146696678039704279) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14369849572741839919216046660027824399918790858077488230872925809549080555297287662671781333317695286831608552547627726115520513102*i+5131287199057974009505129390485442205955696876161462941275515008710961836828582335227668689726101643687086171280370303592293831261)*x + (12488178028611373395607323271925358392492685370750259148506409713273139474773935965197011665556297226905353435644689208898659690604*i+7240516174918991106689094123494756382069451942323971270931649594562392089044129404584874813783557868747962895994591962292004022332) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14369849572741839919216046660027824399918790858077488230872925809549080555297287662671781333317695286831608552547627726115520513102*i+5131287199057974009505129390485442205955696876161462941275515008710961836828582335227668689726101643687086171280370303592293831261)*x + (12488178028611373395607323271925358392492685370750259148506409713273139474773935965197011665556297226905353435644689208898659690604*i+7240516174918991106689094123494756382069451942323971270931649594562392089044129404584874813783557868747962895994591962292004022332) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14102934791456742854495296642146678283965553927098123698818411297833674933083789617077951138721993265509164451293004235832838895591*i+19177277466635584099477236873836396064465987997265528564389287760910339521576418661654643359908395819271249815853795131605077707631)*x + (3731571306308672556924528433565797305853085797271831509186267958904440901838954969481040366619998410720854801819772599519260965455*i+20901430490998314646960222142929728508350822100408449804991175971370502177893642919107909312823994282157902246431567429867368498706) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14102934791456742854495296642146678283965553927098123698818411297833674933083789617077951138721993265509164451293004235832838895591*i+19177277466635584099477236873836396064465987997265528564389287760910339521576418661654643359908395819271249815853795131605077707631)*x + (3731571306308672556924528433565797305853085797271831509186267958904440901838954969481040366619998410720854801819772599519260965455*i+20901430490998314646960222142929728508350822100408449804991175971370502177893642919107909312823994282157902246431567429867368498706) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23134208726933202589873223386367925059371783804242868832996260792620217520673736972586821343764928437039933019730525793067442030092*i+15508719424075898211296363189438487750208866394495130916775178019040659200204081806556032388685506295220008567876706503076539748223)*x + (5213799773972419365230888640498610617696704663643467624986653568857495565158107708975365952323044521828146594030104080303783039204*i+19172318091409126672903381507964324098994822523474608969025341445424792470103279996446070458488512205140311583330455560950203746982) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23134208726933202589873223386367925059371783804242868832996260792620217520673736972586821343764928437039933019730525793067442030092*i+15508719424075898211296363189438487750208866394495130916775178019040659200204081806556032388685506295220008567876706503076539748223)*x + (5213799773972419365230888640498610617696704663643467624986653568857495565158107708975365952323044521828146594030104080303783039204*i+19172318091409126672903381507964324098994822523474608969025341445424792470103279996446070458488512205140311583330455560950203746982) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15300635374369436219519046985873015454836514968640309556383486806673068903560359493124233427497369247825767090158278982461810674645*i+16966139427525867012804969006110095179348590689536699295456020903241698407737325518043557192019431944277152714442235969261192267854)*x + (14730742298404442183536162967887087646973113434879911486307544816817883646412186617998201509666474417904610950731598135936961417164*i+6252634843150626966927269555619684997842639934705879363633074871518791403235634401877018577977463472325057158000713221323160868835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15300635374369436219519046985873015454836514968640309556383486806673068903560359493124233427497369247825767090158278982461810674645*i+16966139427525867012804969006110095179348590689536699295456020903241698407737325518043557192019431944277152714442235969261192267854)*x + (14730742298404442183536162967887087646973113434879911486307544816817883646412186617998201509666474417904610950731598135936961417164*i+6252634843150626966927269555619684997842639934705879363633074871518791403235634401877018577977463472325057158000713221323160868835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24407455260949233718208948746389213397171512996646079451859908296342357868971168986073862670802000379362876539430467645623833938779*i+2825929638703416180278757703855547678491731568025687540664595502342543987321155622341635159762699864545027746269091561155486728405)*x + (11940323194677459664310173432755664301210557813066376535607059693425925827776338277752896092855965687037866563888576637624553160418*i+483079936309125656612523742535186401980205967597118225519943567378627896362294421187278657773659160624879360162189687099167036895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24407455260949233718208948746389213397171512996646079451859908296342357868971168986073862670802000379362876539430467645623833938779*i+2825929638703416180278757703855547678491731568025687540664595502342543987321155622341635159762699864545027746269091561155486728405)*x + (11940323194677459664310173432755664301210557813066376535607059693425925827776338277752896092855965687037866563888576637624553160418*i+483079936309125656612523742535186401980205967597118225519943567378627896362294421187278657773659160624879360162189687099167036895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16535496294333013993251437575884506345822320160714754740763164668763359943733124783369353795040198595746066899481792709026466815277*i+19822358132529621435828887531916453478827844384928655284963042437767772205762448978715948978871037671864968669981162486084349068593)*x + (2175603327963829738994363217477686248637635624602923982783696338799552541029874943068069007764378557279495973316666908152837535033*i+15682352315476439573704722113425611164139984317034885844195213858098284570845080431844087186628693858626550390798834879816125933525) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16535496294333013993251437575884506345822320160714754740763164668763359943733124783369353795040198595746066899481792709026466815277*i+19822358132529621435828887531916453478827844384928655284963042437767772205762448978715948978871037671864968669981162486084349068593)*x + (2175603327963829738994363217477686248637635624602923982783696338799552541029874943068069007764378557279495973316666908152837535033*i+15682352315476439573704722113425611164139984317034885844195213858098284570845080431844087186628693858626550390798834879816125933525) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8843271848726638168004811258555119936922514140615706621053933956713026926441219284464877802330415285494189849401877891001894518942*i+5607136450327785172032097605636391941654206439314747909765188034904400617160723117897475632938248037169423155307118915525657913333)*x + (9041014280988574943068753011242308240382622080345986212463090331506064292229309543544272327909072804447834825326538977499907923013*i+15685732867813884869646523402292298447930079110820483282528421170749892056849593820069645420210518620860305670975671146803029452510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8843271848726638168004811258555119936922514140615706621053933956713026926441219284464877802330415285494189849401877891001894518942*i+5607136450327785172032097605636391941654206439314747909765188034904400617160723117897475632938248037169423155307118915525657913333)*x + (9041014280988574943068753011242308240382622080345986212463090331506064292229309543544272327909072804447834825326538977499907923013*i+15685732867813884869646523402292298447930079110820483282528421170749892056849593820069645420210518620860305670975671146803029452510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2180212162100001352538568302411643978362035932094859242449785422174085046428204615607949396156705110733857847910845037884012664240*i+19940220938716183633444259175287706162214380778566524043033931875828398269690492488136932962971899499102838517903153977245381116387)*x + (10827160678287615556404901995881745693491100652924039096825390891619090442367347292056776728303092566329326965842945526957022427762*i+9953274385110328017669475021255759624066074993588996345455849484671845665327188988614073383065047522867448456027585440944915188308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2180212162100001352538568302411643978362035932094859242449785422174085046428204615607949396156705110733857847910845037884012664240*i+19940220938716183633444259175287706162214380778566524043033931875828398269690492488136932962971899499102838517903153977245381116387)*x + (10827160678287615556404901995881745693491100652924039096825390891619090442367347292056776728303092566329326965842945526957022427762*i+9953274385110328017669475021255759624066074993588996345455849484671845665327188988614073383065047522867448456027585440944915188308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1182481816247796638678047841586683634359277408244055080917308959472544170125939105200191541473929263469391348015526782034599041875*i+13825519091378292601701742529842958945968269213816139809039651204095854050102575145823327790881016423258988216516519357228241874441)*x + (22577482054214137732944465223184684455692348902963986334340988785866216383548022068336044538074262957033407023452617612109018579856*i+9775756498441245564630235581507119920532395452983719072470213047155853395383770451170861489391945196527315397600129653058705970271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1182481816247796638678047841586683634359277408244055080917308959472544170125939105200191541473929263469391348015526782034599041875*i+13825519091378292601701742529842958945968269213816139809039651204095854050102575145823327790881016423258988216516519357228241874441)*x + (22577482054214137732944465223184684455692348902963986334340988785866216383548022068336044538074262957033407023452617612109018579856*i+9775756498441245564630235581507119920532395452983719072470213047155853395383770451170861489391945196527315397600129653058705970271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19442004856575654083902730920217518832843825115571542638039838181571104753652504738496137048488811203522064017815111774152101274781*i+16388863740579486267585986431687021149072483433783005547642819826470522718263486869447046376905745562257419152312488386894324500763)*x + (17037433633967533443081754052827801018547198022492847060419093613050305908111399454010568437946225839588852427304802561727453067187*i+16039870614688139446598163212915831260142798081855622164766051927111517107270777835854482632903623090168665889013319794995150489570) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19442004856575654083902730920217518832843825115571542638039838181571104753652504738496137048488811203522064017815111774152101274781*i+16388863740579486267585986431687021149072483433783005547642819826470522718263486869447046376905745562257419152312488386894324500763)*x + (17037433633967533443081754052827801018547198022492847060419093613050305908111399454010568437946225839588852427304802561727453067187*i+16039870614688139446598163212915831260142798081855622164766051927111517107270777835854482632903623090168665889013319794995150489570) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15370216940684334096981536922290362283850515386951608103615848433785406073991324779869115245343671008041052867998842494408219667088*i+3917888592393299866760987142913114003797523235155554689806643759265901234904601184923477265504791649156648298147541669496461014492)*x + (10687030873116119489116868801618553872281004818225920621995277826604865539917148605601382222055899687474743744891573307643515576687*i+19799145616243934825703622670186251737199925878419249950789788259150257998103309954759123848211641623177252350824527931572228614847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15370216940684334096981536922290362283850515386951608103615848433785406073991324779869115245343671008041052867998842494408219667088*i+3917888592393299866760987142913114003797523235155554689806643759265901234904601184923477265504791649156648298147541669496461014492)*x + (10687030873116119489116868801618553872281004818225920621995277826604865539917148605601382222055899687474743744891573307643515576687*i+19799145616243934825703622670186251737199925878419249950789788259150257998103309954759123848211641623177252350824527931572228614847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4856086799732405062564340825122801919727334292212479627888689533456249258605540964724912904256045055945355397100944123770761973412*i+10810840685897915331374336786032150853206262083557319135463366355359279739206387458549942611298786088637116727751973050820940042142)*x + (1190591527251809381825862579795409732065178880693033594773331402155493368525168581156311022995557161301816374579478470587641542458*i+23819220046217155925523713049435481858884440069125680405457384109461654874037560656626799058957562123308834296801172800924784991197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4856086799732405062564340825122801919727334292212479627888689533456249258605540964724912904256045055945355397100944123770761973412*i+10810840685897915331374336786032150853206262083557319135463366355359279739206387458549942611298786088637116727751973050820940042142)*x + (1190591527251809381825862579795409732065178880693033594773331402155493368525168581156311022995557161301816374579478470587641542458*i+23819220046217155925523713049435481858884440069125680405457384109461654874037560656626799058957562123308834296801172800924784991197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22279313369500208167070308067101106327154229934012047256700809974757534701591407142782976162524603552407720654617979559641912109626*i+23008651027681695397287156256935953262135804398421024832792349089812345544335974139161333958283325671131559938384044577659455336120)*x + (6670270317620350422607539697797205526214367021897685520566909873626666951942552367793032912997982122809573008293808097370722804298*i+6551557175583576526130076576592643438106513892342932088062012397512321936031976260499042113833145427565660906287181487390412045169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22279313369500208167070308067101106327154229934012047256700809974757534701591407142782976162524603552407720654617979559641912109626*i+23008651027681695397287156256935953262135804398421024832792349089812345544335974139161333958283325671131559938384044577659455336120)*x + (6670270317620350422607539697797205526214367021897685520566909873626666951942552367793032912997982122809573008293808097370722804298*i+6551557175583576526130076576592643438106513892342932088062012397512321936031976260499042113833145427565660906287181487390412045169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22811060661093997113023898116179583128539694310788814218445540755810691858806703388473869490368206861782219468504469369974564637022*i+17885373528044485824839775659182184091877113328743049912810647095434312395138678800276065472658359235689948461414932618187951891926)*x + (11300872804325675376012111299362465000801485060931838476781449723736403255397889067080927753297328379986903928100798433067664423920*i+11994839740073438350421767034107820052366210733521710847765401561919444302307101133061707265557127224919137094190791037851261483867) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22811060661093997113023898116179583128539694310788814218445540755810691858806703388473869490368206861782219468504469369974564637022*i+17885373528044485824839775659182184091877113328743049912810647095434312395138678800276065472658359235689948461414932618187951891926)*x + (11300872804325675376012111299362465000801485060931838476781449723736403255397889067080927753297328379986903928100798433067664423920*i+11994839740073438350421767034107820052366210733521710847765401561919444302307101133061707265557127224919137094190791037851261483867) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20015494869743722396996187546298040599161617100037945562525779809829041777892354719988404412581404090283639717230339903432559747594*i+19554302076425354154492067328663688923530553170689161450026759640797979849539915565175430801789960499014861200564089268692094473820)*x + (14208243474855941290169625832649527139608096351586664036663759179149510914138414543768117822347186815686309948223708409188840394785*i+18650319167304832166265744359427821973154714213699084313202562362581487434641782229412969018679074430022295696609093563652157850930) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20015494869743722396996187546298040599161617100037945562525779809829041777892354719988404412581404090283639717230339903432559747594*i+19554302076425354154492067328663688923530553170689161450026759640797979849539915565175430801789960499014861200564089268692094473820)*x + (14208243474855941290169625832649527139608096351586664036663759179149510914138414543768117822347186815686309948223708409188840394785*i+18650319167304832166265744359427821973154714213699084313202562362581487434641782229412969018679074430022295696609093563652157850930) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8776881198145868295625365757718911313903764601047573990830882899054514200645323908008257254147083453850928622242844918646980993905*i+21132587057678760026424678348134064279409621395092593607023325183638451481575113610020289465088920914798364722441937570898933673102)*x + (3001388074023168347922253373222162271551692589162920780282140040698713056898702597508362572223482235144410791124411023175149905921*i+10554167664329635654894154385270454712289975830789329843882517464165811156859986997694581004545133203716136048935650237165884458287) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8776881198145868295625365757718911313903764601047573990830882899054514200645323908008257254147083453850928622242844918646980993905*i+21132587057678760026424678348134064279409621395092593607023325183638451481575113610020289465088920914798364722441937570898933673102)*x + (3001388074023168347922253373222162271551692589162920780282140040698713056898702597508362572223482235144410791124411023175149905921*i+10554167664329635654894154385270454712289975830789329843882517464165811156859986997694581004545133203716136048935650237165884458287) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13750774117681687661294572536587723634737766863350130278540516518882009246499861487048754970330151451663193328939672529115187534971*i+15748599432237621989437595377421574567959239209913636807119877316800457893004433365769650621230990441866957435580022106274216092841)*x + (11211464767941324970700375926516796755368866821595632829977593020924188382826614825391132519050284318489721970619092987390476796232*i+699363623962399875592796272889161761525505775037610001967925654013919113668310894583587262537048019295023432206171778462383552846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13750774117681687661294572536587723634737766863350130278540516518882009246499861487048754970330151451663193328939672529115187534971*i+15748599432237621989437595377421574567959239209913636807119877316800457893004433365769650621230990441866957435580022106274216092841)*x + (11211464767941324970700375926516796755368866821595632829977593020924188382826614825391132519050284318489721970619092987390476796232*i+699363623962399875592796272889161761525505775037610001967925654013919113668310894583587262537048019295023432206171778462383552846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1027642094380035463836960916820981734064733960251062974975920486640901813213773012352071678624633567901020423368518411435960600182*i+9948783317942665000628698104740009827317980139825011461017638650558450219280052038406369417290146041207222642422342460841357087860)*x + (24110154101092017858459290129258957040830499273869852696958539490934119890751751511315732744974320399918308714649071498379400419133*i+12159801362595634200814646097682956814987424146639125187623267098779168193204039557620871832916863002657237547103461363841259673126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1027642094380035463836960916820981734064733960251062974975920486640901813213773012352071678624633567901020423368518411435960600182*i+9948783317942665000628698104740009827317980139825011461017638650558450219280052038406369417290146041207222642422342460841357087860)*x + (24110154101092017858459290129258957040830499273869852696958539490934119890751751511315732744974320399918308714649071498379400419133*i+12159801362595634200814646097682956814987424146639125187623267098779168193204039557620871832916863002657237547103461363841259673126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12584433134497371885316147951036705135760323889577485701034031356173332663221242430067788382013210018748787451453218011603452857098*i+24129666211799710898267944373531076969577983293709441421995829131746528202548074505072077650389960596154545595391211026034665252855)*x + (4063317325621305339601614818039369004171296870915267386824415783844186750705085320289823985330879123712869582933732314846454690249*i+24102669043649804515391905033234974152307275622057651763448673983665233351353799699113612486435040036808882888770442925586626106272) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12584433134497371885316147951036705135760323889577485701034031356173332663221242430067788382013210018748787451453218011603452857098*i+24129666211799710898267944373531076969577983293709441421995829131746528202548074505072077650389960596154545595391211026034665252855)*x + (4063317325621305339601614818039369004171296870915267386824415783844186750705085320289823985330879123712869582933732314846454690249*i+24102669043649804515391905033234974152307275622057651763448673983665233351353799699113612486435040036808882888770442925586626106272) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15115009726323727173742526541647877910097518901552544511698436595822917622425043801829666016652482954127384315317986141082164539316*i+9673807836235242818025674460055862130692093061775421172252824955486203688676511659448895897258108935078060456294330057130202035577)*x + (5569636155173478054506682476440733606382247436127793299833060447429018115532408018399608404240063859027619823519913264179613533894*i+4677473511050196258235968316032714180724432927728188642895956689883493247295609626310500205289103598921071575927922636411677222610) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15115009726323727173742526541647877910097518901552544511698436595822917622425043801829666016652482954127384315317986141082164539316*i+9673807836235242818025674460055862130692093061775421172252824955486203688676511659448895897258108935078060456294330057130202035577)*x + (5569636155173478054506682476440733606382247436127793299833060447429018115532408018399608404240063859027619823519913264179613533894*i+4677473511050196258235968316032714180724432927728188642895956689883493247295609626310500205289103598921071575927922636411677222610) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5569680353504984704373970973082813281992129876856735056630086344435668551832677707205234686290576531665231277977690071977149580856*i+23274938732286713595747177466757006561378809161575762450446114114959725418203782212103189564089443385932757735105372689854066190713)*x + (17678553847675529065745195544891946319733907867409466126911022826747432598642028681885997628370296548460554229032354531371205589561*i+20059073948120036326556375205774203131502693165596911666509142274237696368972414604753229357920864915398609411157695913211965201050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5569680353504984704373970973082813281992129876856735056630086344435668551832677707205234686290576531665231277977690071977149580856*i+23274938732286713595747177466757006561378809161575762450446114114959725418203782212103189564089443385932757735105372689854066190713)*x + (17678553847675529065745195544891946319733907867409466126911022826747432598642028681885997628370296548460554229032354531371205589561*i+20059073948120036326556375205774203131502693165596911666509142274237696368972414604753229357920864915398609411157695913211965201050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15441315912588660190397059465589427813628483806328778420593365266509283708968212820487914522467883987298644958860418968795041159512*i+17277893980857275435820937693404983409761278160794439818792249648836505741967849405637154529333400454807393118807805951553796052593)*x + (7828954981545738522708563868808335980756542907333282402930482751660685484264385406577691030991203073576078568946500161531296916568*i+1988376802850686600119737098665096248036599003068720231816457571246610339021164139613720019509115241265988912064039291938564310421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15441315912588660190397059465589427813628483806328778420593365266509283708968212820487914522467883987298644958860418968795041159512*i+17277893980857275435820937693404983409761278160794439818792249648836505741967849405637154529333400454807393118807805951553796052593)*x + (7828954981545738522708563868808335980756542907333282402930482751660685484264385406577691030991203073576078568946500161531296916568*i+1988376802850686600119737098665096248036599003068720231816457571246610339021164139613720019509115241265988912064039291938564310421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4615341708802330752803966525017148485694913499658907217131801961408422155054326428450036004483433186313450353371969618652336342910*i+12153154293818584805026292624876167287419451254696907683416178390537328589219400790296962265237366182967779151469296085630427099388)*x + (15601642755923563902103133367946052802567530871403213367812811385631689081805952248374639120775547050788175252016858583275489823731*i+20100248902525240099800142614548091643611223587290330252039715760731859456208523417465711791410480517652924543283637570622307880767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4615341708802330752803966525017148485694913499658907217131801961408422155054326428450036004483433186313450353371969618652336342910*i+12153154293818584805026292624876167287419451254696907683416178390537328589219400790296962265237366182967779151469296085630427099388)*x + (15601642755923563902103133367946052802567530871403213367812811385631689081805952248374639120775547050788175252016858583275489823731*i+20100248902525240099800142614548091643611223587290330252039715760731859456208523417465711791410480517652924543283637570622307880767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17141348393123137303555840347448961740172233243851299552415066072694750402609683776710655630099161524436251959511045352310024847244*i+13876553701421124014125494011488133752903169355895087051353045085050512247172083631500840220230071021862397417368708217977622345747)*x + (770869437392249425622713792440817318757658504599142476992012371927217233512330684228342332050279386436281187284422014268482944230*i+15683386657800097171025929506261399848673968005350035846226775654927477133522105912931062579215861507027823534163378929064825385194) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17141348393123137303555840347448961740172233243851299552415066072694750402609683776710655630099161524436251959511045352310024847244*i+13876553701421124014125494011488133752903169355895087051353045085050512247172083631500840220230071021862397417368708217977622345747)*x + (770869437392249425622713792440817318757658504599142476992012371927217233512330684228342332050279386436281187284422014268482944230*i+15683386657800097171025929506261399848673968005350035846226775654927477133522105912931062579215861507027823534163378929064825385194) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21329737337722013629337587184734345204495664529144797581814664124231214157802549594635150097677841455776426318778747317865574507085*i+1018595761581994398876870056280178912889102347276283065455695534792446444601424181776336582451085624613797382947734865712165545813)*x + (10915434845327823256992988367156328614769915099267171672723064343701232883249656067390383518252906010507094378924816477768964423244*i+21666314814304534977840495609899348266604059049533890124056687963646080121662612929730015326783672859771365369755369983653304707456) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21329737337722013629337587184734345204495664529144797581814664124231214157802549594635150097677841455776426318778747317865574507085*i+1018595761581994398876870056280178912889102347276283065455695534792446444601424181776336582451085624613797382947734865712165545813)*x + (10915434845327823256992988367156328614769915099267171672723064343701232883249656067390383518252906010507094378924816477768964423244*i+21666314814304534977840495609899348266604059049533890124056687963646080121662612929730015326783672859771365369755369983653304707456) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15345559291802770894419756991421254406184031683927787515477498459767016691162357001264446774749956813987630825966221046913171515401*i+22073973491217425844544923822683667061552964892894435458923968817384445529845126026226228954372663286591956481475491772331172997528)*x + (5554070391460359600003754180926224234507202900462899084924544177357552206419507118943370997979653661140569676283249825427150203047*i+2599727294918765308126340026832852597675554654286047339183070579915756202413738845502133948639886804701756630232904192336552545633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15345559291802770894419756991421254406184031683927787515477498459767016691162357001264446774749956813987630825966221046913171515401*i+22073973491217425844544923822683667061552964892894435458923968817384445529845126026226228954372663286591956481475491772331172997528)*x + (5554070391460359600003754180926224234507202900462899084924544177357552206419507118943370997979653661140569676283249825427150203047*i+2599727294918765308126340026832852597675554654286047339183070579915756202413738845502133948639886804701756630232904192336552545633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21738984626766482845696234396914506675282180247153818473715876413330974594473980155316355159976041402867937380220119686345069154255*i+10584471674919252078614531089637763702914804044392824833080950047415937309924307561048108077774273706131524225633045950385818285893)*x + (6281555718420218165788743849852612607260641378720186757895174306455712351080822295796930087396710721178228853117626947835543544450*i+18491594642339917297148004620061196754595238755057822763440425995901893434354744126009337176983977879476738184891185357736367397442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21738984626766482845696234396914506675282180247153818473715876413330974594473980155316355159976041402867937380220119686345069154255*i+10584471674919252078614531089637763702914804044392824833080950047415937309924307561048108077774273706131524225633045950385818285893)*x + (6281555718420218165788743849852612607260641378720186757895174306455712351080822295796930087396710721178228853117626947835543544450*i+18491594642339917297148004620061196754595238755057822763440425995901893434354744126009337176983977879476738184891185357736367397442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13255723650635964511346882212724572290895845536211248752960245495555035493773334775822940676177696936939692551070699263924669549858*i+23305014830633024643394663069797007772385349138961135318788905720455959411349461329915140856664732560864974178669584593867051971298)*x + (18884272848013470496985704662333013046328248555280344314021892687662888669970381129369310449483969657082839364423297415844971167809*i+7650796912366634920609120890076716131866610491287990431409215950838681338638384448377768197521776364480130845285813265748015113464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13255723650635964511346882212724572290895845536211248752960245495555035493773334775822940676177696936939692551070699263924669549858*i+23305014830633024643394663069797007772385349138961135318788905720455959411349461329915140856664732560864974178669584593867051971298)*x + (18884272848013470496985704662333013046328248555280344314021892687662888669970381129369310449483969657082839364423297415844971167809*i+7650796912366634920609120890076716131866610491287990431409215950838681338638384448377768197521776364480130845285813265748015113464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22408430213954217545481647260292516223651335963564903032045356217760470424183304821394979862292399219305317521169241852812357230517*i+21700611922722229335194114545228993012229200460291853334398627026895619895914051204396175764299873545652670419237821456927184389738)*x + (2227100883333091064138813120137972735239999832887371045368403770849787516867369089177238899692536076248117225957977072229417785387*i+8549575012653534200129557620745206842937528878551027590843535310630294957041163276991725585694042481290020311036359982515133168797) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22408430213954217545481647260292516223651335963564903032045356217760470424183304821394979862292399219305317521169241852812357230517*i+21700611922722229335194114545228993012229200460291853334398627026895619895914051204396175764299873545652670419237821456927184389738)*x + (2227100883333091064138813120137972735239999832887371045368403770849787516867369089177238899692536076248117225957977072229417785387*i+8549575012653534200129557620745206842937528878551027590843535310630294957041163276991725585694042481290020311036359982515133168797) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13493381609993443482611751526510538762207964403945377375616658871623576515741920456245729217039378436421187578027052478036257470560*i+19098213162914713425050871802177106390721466118275615040599182971920557025334407539360151159287507655638135891930800531590364792097)*x + (2951030019887421804377453970176335917446436744432987943828773740619508959738594311117336931333307230505243519021053832947167677921*i+17609701228629155812136061176808024812070151420384094240745868280768546406287555459443715812727957143880068838496382091282282556510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13493381609993443482611751526510538762207964403945377375616658871623576515741920456245729217039378436421187578027052478036257470560*i+19098213162914713425050871802177106390721466118275615040599182971920557025334407539360151159287507655638135891930800531590364792097)*x + (2951030019887421804377453970176335917446436744432987943828773740619508959738594311117336931333307230505243519021053832947167677921*i+17609701228629155812136061176808024812070151420384094240745868280768546406287555459443715812727957143880068838496382091282282556510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3048995253336400652012941469642067860928832242411541203936981408621218264166728996981781801393847806110166323657227608459633821616*i+14503258714644572508822470052960279112267178039427414443566033141893504634001890977064673162152969042869979386881931553401785491091)*x + (6561069812978003282696611974471767436907147430892623000137728797758209638660526541354011934160718032772284297784450962805024381241*i+21061468029765343293413610659406851807997816250232032511486538363688815380120693468745063546147045661724388991209471231059942866423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3048995253336400652012941469642067860928832242411541203936981408621218264166728996981781801393847806110166323657227608459633821616*i+14503258714644572508822470052960279112267178039427414443566033141893504634001890977064673162152969042869979386881931553401785491091)*x + (6561069812978003282696611974471767436907147430892623000137728797758209638660526541354011934160718032772284297784450962805024381241*i+21061468029765343293413610659406851807997816250232032511486538363688815380120693468745063546147045661724388991209471231059942866423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19059611624534711542364486981971744229452822104289409746445554815627441550181789958196565306211185299900125356368384599012214367002*i+469237523759165879903712816053856043133006118743814166954145560117207634070994642424593078873695747640867208502996325181079274878)*x + (326494305304559178643690607627009386011634357310462769536807446250986851185547016441977885876356822786467184985754370368565999147*i+14437880511629960099379765544250114623113254468646867661138204354919178518079156432051180736471873663102304833343902088915971412660) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19059611624534711542364486981971744229452822104289409746445554815627441550181789958196565306211185299900125356368384599012214367002*i+469237523759165879903712816053856043133006118743814166954145560117207634070994642424593078873695747640867208502996325181079274878)*x + (326494305304559178643690607627009386011634357310462769536807446250986851185547016441977885876356822786467184985754370368565999147*i+14437880511629960099379765544250114623113254468646867661138204354919178518079156432051180736471873663102304833343902088915971412660) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18714590382155692477294371436512967168102825753179704326425030519032620790127929326712818998473273643356001281326459497937462171194*i+14469531773949595958038407492849680457893429850615443659561049183503622659236854731460158328453004772868923346601700288327026450312)*x + (17645833595677302739915523788759402202638644437884095620309866818743938781832469688772483615021880483771953961349042864347061793590*i+5830475047875576920280911327987733948111319684007087689194222259353944031209153500806686814058470798572923975496052528232330271286) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18714590382155692477294371436512967168102825753179704326425030519032620790127929326712818998473273643356001281326459497937462171194*i+14469531773949595958038407492849680457893429850615443659561049183503622659236854731460158328453004772868923346601700288327026450312)*x + (17645833595677302739915523788759402202638644437884095620309866818743938781832469688772483615021880483771953961349042864347061793590*i+5830475047875576920280911327987733948111319684007087689194222259353944031209153500806686814058470798572923975496052528232330271286) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5553056093177769663058729679105684073153268732963225364368976733091233047334259141514842381441354848282939312318627142573232700532*i+18066971940132529498993178414472613280146423690999173340537043205167017723064122331330865660783010234307352812573797503428020444649)*x + (15771105982324527045980363144525917568132367481992793787119672305660329330015369257034027345534913843934315742782500223736400480242*i+23899922490907182722531305798558096239603372237337021868290062150420312203391300476568924098166572142597462959087596559331187839113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5553056093177769663058729679105684073153268732963225364368976733091233047334259141514842381441354848282939312318627142573232700532*i+18066971940132529498993178414472613280146423690999173340537043205167017723064122331330865660783010234307352812573797503428020444649)*x + (15771105982324527045980363144525917568132367481992793787119672305660329330015369257034027345534913843934315742782500223736400480242*i+23899922490907182722531305798558096239603372237337021868290062150420312203391300476568924098166572142597462959087596559331187839113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13213532119258763537099984697158510802700645222283203117468534397952659563755498145748090137594805271405261846496832319011124366004*i+11563653533764679693597522502945677747634712456165275836225239632370369553279885007846958226129609998211024060280079316531982006058)*x + (21442184462472489408379334610027444416509940131601818744484443950183530395424657273161322678343663761776622437037554427145677961838*i+6551213675913104862607452004511102549391121344087062538105516705811073865578788068630048902475165209770964804050964645522628709902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13213532119258763537099984697158510802700645222283203117468534397952659563755498145748090137594805271405261846496832319011124366004*i+11563653533764679693597522502945677747634712456165275836225239632370369553279885007846958226129609998211024060280079316531982006058)*x + (21442184462472489408379334610027444416509940131601818744484443950183530395424657273161322678343663761776622437037554427145677961838*i+6551213675913104862607452004511102549391121344087062538105516705811073865578788068630048902475165209770964804050964645522628709902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10792925890832247163643119271514578124770624697870579476793134427101501353700438525661019765518964040408728294812831668670978889433*i+7025797637653429133645760450010118065192847639116859458784967100129295903542864967910789422146842628549713329443384651213286658054)*x + (2455474353344790321203350952056051860346817535776822165369383815022556054625607376911804095138777617921356449428340253911853916728*i+8602373129796659587428955642580801073455093307828822202536189914392050087340034848551108735068686810392657203607000422984082877037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10792925890832247163643119271514578124770624697870579476793134427101501353700438525661019765518964040408728294812831668670978889433*i+7025797637653429133645760450010118065192847639116859458784967100129295903542864967910789422146842628549713329443384651213286658054)*x + (2455474353344790321203350952056051860346817535776822165369383815022556054625607376911804095138777617921356449428340253911853916728*i+8602373129796659587428955642580801073455093307828822202536189914392050087340034848551108735068686810392657203607000422984082877037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (313454169975979602461512819057316619895775154168400837128624415160273961813624400773830712085962846112777966172167903788969785041*i+15936522592644676083861984487406393479468022763088452389078386161704344432596039996893930847712922937727617386822713080133865764655)*x + (7304689243683881958031860499540004711551463964815061868613179496680096180664421674024648016867390132383570015576365462254330765323*i+8763886537716608100330165690454991949420604380185295204305944928359701146625773451092276517332113954441391995587443207044603407292) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (313454169975979602461512819057316619895775154168400837128624415160273961813624400773830712085962846112777966172167903788969785041*i+15936522592644676083861984487406393479468022763088452389078386161704344432596039996893930847712922937727617386822713080133865764655)*x + (7304689243683881958031860499540004711551463964815061868613179496680096180664421674024648016867390132383570015576365462254330765323*i+8763886537716608100330165690454991949420604380185295204305944928359701146625773451092276517332113954441391995587443207044603407292) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18779930962536715072953684182433230463742420095438686647461896683894624681043405989955121793340118347263368712199400541517755348841*i+23696900028102483025169623693882425005672627759711556700991922899842754632191452309797199511500188794701024809667960399055916295445)*x + (3333954154977122356415158386768745644955656215976824809476106789871640742854714345330233882882539781791458277285514803940788096287*i+9092115628668842108871060181133983239869129194544922815454514566112480490504862369888625731601996706450882295757867883811475720281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18779930962536715072953684182433230463742420095438686647461896683894624681043405989955121793340118347263368712199400541517755348841*i+23696900028102483025169623693882425005672627759711556700991922899842754632191452309797199511500188794701024809667960399055916295445)*x + (3333954154977122356415158386768745644955656215976824809476106789871640742854714345330233882882539781791458277285514803940788096287*i+9092115628668842108871060181133983239869129194544922815454514566112480490504862369888625731601996706450882295757867883811475720281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1076815728808419280794494277028954192363685651564246367850837491808624001108707270764664271845717256517474921896757078981393155386*i+3009455730830372103982097215053116703600293231071345538189806856657287944387339640472951517416850184907590062307818007586292453585)*x + (2091353650430689320331682881140700063778429058916196714112984768505731085719243100161108468561171369747460680322556209566232232693*i+8840952789486082551171763935266640205030427077942382799019879273244780829880418041221786142769642250265807903254739817979647417186) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1076815728808419280794494277028954192363685651564246367850837491808624001108707270764664271845717256517474921896757078981393155386*i+3009455730830372103982097215053116703600293231071345538189806856657287944387339640472951517416850184907590062307818007586292453585)*x + (2091353650430689320331682881140700063778429058916196714112984768505731085719243100161108468561171369747460680322556209566232232693*i+8840952789486082551171763935266640205030427077942382799019879273244780829880418041221786142769642250265807903254739817979647417186) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2217031149988622848593092022117213642462851020681918780056163639318872499258889901499879453542087958543013971878669259332653360755*i+6675076112367154059912024456168740716642125251209440021256014878530800880680545946411121556775631058857034573612514047707871282306)*x + (21597382574289906485712240508784579050061322324151519564731559751819134318116731490759351519100069101104242456898703038082381168709*i+8868620026796258491177737509767620896436045421427867654587195247250819704487426464498995784659633554553535532885672939597169312634) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2217031149988622848593092022117213642462851020681918780056163639318872499258889901499879453542087958543013971878669259332653360755*i+6675076112367154059912024456168740716642125251209440021256014878530800880680545946411121556775631058857034573612514047707871282306)*x + (21597382574289906485712240508784579050061322324151519564731559751819134318116731490759351519100069101104242456898703038082381168709*i+8868620026796258491177737509767620896436045421427867654587195247250819704487426464498995784659633554553535532885672939597169312634) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12621301378328150352217041884070888519750144968739244089245754577333807568829321809841404321266842122829965543697032340349659998692*i+8640019694649335598262423357497939502380233606709034878399459393747533580430155899445651967340458482130301525736286992361073580738)*x + (17645454831713837788731959925079169171569712397562976702507759195298363043478846624931699058139044680091383090074752130014565536595*i+19274930052573648027133734783060447705372848204239537720213099591996931419952702090485896037691070751403696743697863700107655587067) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12621301378328150352217041884070888519750144968739244089245754577333807568829321809841404321266842122829965543697032340349659998692*i+8640019694649335598262423357497939502380233606709034878399459393747533580430155899445651967340458482130301525736286992361073580738)*x + (17645454831713837788731959925079169171569712397562976702507759195298363043478846624931699058139044680091383090074752130014565536595*i+19274930052573648027133734783060447705372848204239537720213099591996931419952702090485896037691070751403696743697863700107655587067) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6808465609955587333756372155663664683740666125048414676908465717137138869307873217602646772378908134174836619817206848044746510412*i+6378415411635552611963134978895430994263061333770326894850226327357186287901285841511580472642883942255160506049976127018743915017)*x + (8281036099616307960509575224726361890388956325376945781746548490495969957045488296223343000247942000600228130287111223957873014985*i+16895757310802206111847910619912162572881174642034594762542595667693012029740013229205352182265193848055967305611777007828131813559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6808465609955587333756372155663664683740666125048414676908465717137138869307873217602646772378908134174836619817206848044746510412*i+6378415411635552611963134978895430994263061333770326894850226327357186287901285841511580472642883942255160506049976127018743915017)*x + (8281036099616307960509575224726361890388956325376945781746548490495969957045488296223343000247942000600228130287111223957873014985*i+16895757310802206111847910619912162572881174642034594762542595667693012029740013229205352182265193848055967305611777007828131813559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16442370779706128512038049466708681344006419779060768728975446043641187769421072391214946758282616871767163056354879641387980741240*i+7495273183078487698301021885406470114284570863847619378234758421168593993223783922936807696521985508449739858227468499213092805712)*x + (14966056040984164143308153949626492062847067602745332366312563566931351261550645411302216593879586479274793618381033604372483500378*i+15407941726709774314557759037731257170853281125424806359877066985200095979887925832719527534017581468958651727175943466139116383494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16442370779706128512038049466708681344006419779060768728975446043641187769421072391214946758282616871767163056354879641387980741240*i+7495273183078487698301021885406470114284570863847619378234758421168593993223783922936807696521985508449739858227468499213092805712)*x + (14966056040984164143308153949626492062847067602745332366312563566931351261550645411302216593879586479274793618381033604372483500378*i+15407941726709774314557759037731257170853281125424806359877066985200095979887925832719527534017581468958651727175943466139116383494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15821553099088655604958320883586167041969621134106978110655348615947780424032675297009408120132489885872318817326798769304092040348*i+5103229382173611072572343038819130665877806442144504204090369655941902643267951511094829089698328984095377481579106175180066080825)*x + (12607617311675269641342348950578374264863427796268845610344751091896481882504532745523250375101547485194410692376450987705632373926*i+18003226191890747434181298315431846931463579252407032123464643208172127875869363257977502767290738326899172262619702072264261502396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15821553099088655604958320883586167041969621134106978110655348615947780424032675297009408120132489885872318817326798769304092040348*i+5103229382173611072572343038819130665877806442144504204090369655941902643267951511094829089698328984095377481579106175180066080825)*x + (12607617311675269641342348950578374264863427796268845610344751091896481882504532745523250375101547485194410692376450987705632373926*i+18003226191890747434181298315431846931463579252407032123464643208172127875869363257977502767290738326899172262619702072264261502396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2603702885443709177041515368949300037333164227872454795719325734794154988399591973753442478431145731515483202232149356251627998982*i+12820014057238183862999770707340810259290462683842909729818756703331573999600536794076771374791958958413788400246061306295362641909)*x + (5009502846495216000812721605841271682418281844206965703668268112228639034961789756240968926877486177515565670219346203830151514168*i+7034203392382395889184157713419390760150620126238087675127871474213997984783274121307100911790136977906037388594126314273264206704) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2603702885443709177041515368949300037333164227872454795719325734794154988399591973753442478431145731515483202232149356251627998982*i+12820014057238183862999770707340810259290462683842909729818756703331573999600536794076771374791958958413788400246061306295362641909)*x + (5009502846495216000812721605841271682418281844206965703668268112228639034961789756240968926877486177515565670219346203830151514168*i+7034203392382395889184157713419390760150620126238087675127871474213997984783274121307100911790136977906037388594126314273264206704) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21266253700747980816382010045842853627062562431624970726603806048245813192939157729078718619284013265547427355053601575837899726412*i+8528781850774315308792456206573904228552281645056683570271826762446016264516310674315726872118305896619225197568793936376215760518)*x + (23948912854997886939849019542900389815860712693617617639573286049233183596260396039687188624723789114113992740181781248526389880904*i+19137779643372210716250476027207395631877709557884595611075194621363451367276191399954478254388399007009751134381857722350532615818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21266253700747980816382010045842853627062562431624970726603806048245813192939157729078718619284013265547427355053601575837899726412*i+8528781850774315308792456206573904228552281645056683570271826762446016264516310674315726872118305896619225197568793936376215760518)*x + (23948912854997886939849019542900389815860712693617617639573286049233183596260396039687188624723789114113992740181781248526389880904*i+19137779643372210716250476027207395631877709557884595611075194621363451367276191399954478254388399007009751134381857722350532615818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22007516872219123609551121269655487360692362583772334821052791003745868180801621799854558628508568962272354023772977723372279802627*i+15001317254901596164544238168993941462123323402899016825851221384433220834873449063357068718387950403013078238002223729082909010507)*x + (19230674699140216957693052909123985539919076019659221530177661415715291357733638043613617722944570462826511046743872236979112952334*i+22362871887610769791974981497802690987664361509392967259134473959193014201926417524356732135631892819057823045954457543227479329937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22007516872219123609551121269655487360692362583772334821052791003745868180801621799854558628508568962272354023772977723372279802627*i+15001317254901596164544238168993941462123323402899016825851221384433220834873449063357068718387950403013078238002223729082909010507)*x + (19230674699140216957693052909123985539919076019659221530177661415715291357733638043613617722944570462826511046743872236979112952334*i+22362871887610769791974981497802690987664361509392967259134473959193014201926417524356732135631892819057823045954457543227479329937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13711602685010847437135337269121950608869208568636821000264285883689037686424837899220898674332853808277858598775326196086297491741*i+7238356581511207439597419598031214576960407621559718133906104530428159266615036832571969498642814357268949488940395409843914485838)*x + (19136232956980418765829933590866016281152530622264306810450497790976608331559161607921991079774955513847280895587231923645548225388*i+16341395565627778404723277290135680467302834838184872692241756708724797386165420751981053235786973638947955979816249429158321854944) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13711602685010847437135337269121950608869208568636821000264285883689037686424837899220898674332853808277858598775326196086297491741*i+7238356581511207439597419598031214576960407621559718133906104530428159266615036832571969498642814357268949488940395409843914485838)*x + (19136232956980418765829933590866016281152530622264306810450497790976608331559161607921991079774955513847280895587231923645548225388*i+16341395565627778404723277290135680467302834838184872692241756708724797386165420751981053235786973638947955979816249429158321854944) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (516700618522515816845243249080535978119377288183925715920914533405275321676227676579717462550423963607685851721809537141174083834*i+15575906787907317597302987728341336169904322738230553394801988270838818177105869251534720902031992482934201303575646146283990485726)*x + (17493527615080905783020480885233653024677305170561388024783542384952321709723515147769900191940129670285479897403296319557935442175*i+17457966584195803343373609309322258520751389700700155765875278585446216985610608108303889647032814968308859185133526191081225473296) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (516700618522515816845243249080535978119377288183925715920914533405275321676227676579717462550423963607685851721809537141174083834*i+15575906787907317597302987728341336169904322738230553394801988270838818177105869251534720902031992482934201303575646146283990485726)*x + (17493527615080905783020480885233653024677305170561388024783542384952321709723515147769900191940129670285479897403296319557935442175*i+17457966584195803343373609309322258520751389700700155765875278585446216985610608108303889647032814968308859185133526191081225473296) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12216083513262239534664067998694919990602350637372091869012978280689143547240631258004027092192735699243871099074721627952938745396*i+7777409253908558485098341347875519880536706161613148493307614743663967808292633941335127854936698176863405333601827571098967130622)*x + (20185208914576738265750846401624126813880141910026859282502333475909308187209774030448102489882876082102837372012527033968474362121*i+15775468903175173103918228234493332612536320643966692163966818220871883357906449204572492826688780887225066335254472763819575635579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12216083513262239534664067998694919990602350637372091869012978280689143547240631258004027092192735699243871099074721627952938745396*i+7777409253908558485098341347875519880536706161613148493307614743663967808292633941335127854936698176863405333601827571098967130622)*x + (20185208914576738265750846401624126813880141910026859282502333475909308187209774030448102489882876082102837372012527033968474362121*i+15775468903175173103918228234493332612536320643966692163966818220871883357906449204572492826688780887225066335254472763819575635579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21890991249065528878278151409914618876999571641998793033106868644721721236884617582454620996203345500990712596192242759716227878120*i+15739664381898912211060532579531281350947297907256885694138412215715013332457405160591315884270981845838757899999258454758639402682)*x + (13455055859314918797294870435139924956308861974398317792342959248113395502042976991707900533899332121805912577062514678095524187462*i+23507000905957491831898966950399537176388462370623824371871983427148632642333630097301777003552734992748038992758781698579969535350) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21890991249065528878278151409914618876999571641998793033106868644721721236884617582454620996203345500990712596192242759716227878120*i+15739664381898912211060532579531281350947297907256885694138412215715013332457405160591315884270981845838757899999258454758639402682)*x + (13455055859314918797294870435139924956308861974398317792342959248113395502042976991707900533899332121805912577062514678095524187462*i+23507000905957491831898966950399537176388462370623824371871983427148632642333630097301777003552734992748038992758781698579969535350) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1930569554258324106783941332088685974253785745550988311753242735077558104103882009392644592107678862575103270797026117540900057160*i+19962219751387308714740813712350260780139174570672766599027629822405385453257009263977585289382605007047746332272750529558079403823)*x + (333683103906928796943997569530647542707541448166015307233478141136600765992908690767411336015307287506627576563866436396954265476*i+9719656415918601124991243649579102926386765739785550572760877080206977214654377299767591991253244497948751523880162362598417030829) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1930569554258324106783941332088685974253785745550988311753242735077558104103882009392644592107678862575103270797026117540900057160*i+19962219751387308714740813712350260780139174570672766599027629822405385453257009263977585289382605007047746332272750529558079403823)*x + (333683103906928796943997569530647542707541448166015307233478141136600765992908690767411336015307287506627576563866436396954265476*i+9719656415918601124991243649579102926386765739785550572760877080206977214654377299767591991253244497948751523880162362598417030829) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20012270380536603484682593848370439092695078435163210499389695016706005039283545613896541653327032977892558667207187273549963165225*i+17327571344934768065230035580922865973114571125502698772196045546234538370235389327884704886741578053856158060071782665943505351680)*x + (18138333911440112275417416651154839487013883918830208469908722976981575231513517199637864541007098710432203522967547257099912732444*i+6307329750225307980361560782080722888545034443224243588050324610355189294254421074377328814776820310002387130945385527869887619905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20012270380536603484682593848370439092695078435163210499389695016706005039283545613896541653327032977892558667207187273549963165225*i+17327571344934768065230035580922865973114571125502698772196045546234538370235389327884704886741578053856158060071782665943505351680)*x + (18138333911440112275417416651154839487013883918830208469908722976981575231513517199637864541007098710432203522967547257099912732444*i+6307329750225307980361560782080722888545034443224243588050324610355189294254421074377328814776820310002387130945385527869887619905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8768822152323237337993594219448870348185523886893887552086550834377644417763433023509718823531745566809494791313621260132085783720*i+20289276737128469574278776589948736314644509904846680739485919678258636502093798162485571526290367527808273492769895302692160744349)*x + (240718462555169677597513351938362831004564050267332010737307986885606094780528046206969534849628364750672636609584891343779222339*i+5953421389418068067568824347323840966333209242907114269524353788408925140195993359334771611570749701200110379736599599230412266455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8768822152323237337993594219448870348185523886893887552086550834377644417763433023509718823531745566809494791313621260132085783720*i+20289276737128469574278776589948736314644509904846680739485919678258636502093798162485571526290367527808273492769895302692160744349)*x + (240718462555169677597513351938362831004564050267332010737307986885606094780528046206969534849628364750672636609584891343779222339*i+5953421389418068067568824347323840966333209242907114269524353788408925140195993359334771611570749701200110379736599599230412266455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8531717110851675760516374174237413113586311396251905161596523626739292169968109706635660879264459419018518928731022867924980819874*i+11091934201656526205026300207961019863349044372639934048135964417720021202850597172485724493841605000099027233285237031166498901622)*x + (18668990264772300958923372839609797794458364310169147898172244735326497872935566855338183806076247313524872561186915678731458807136*i+13657159617701770185874281046788006453098442938445276980357239707699332093469375899382350296294153403326518993940223140996768193800) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8531717110851675760516374174237413113586311396251905161596523626739292169968109706635660879264459419018518928731022867924980819874*i+11091934201656526205026300207961019863349044372639934048135964417720021202850597172485724493841605000099027233285237031166498901622)*x + (18668990264772300958923372839609797794458364310169147898172244735326497872935566855338183806076247313524872561186915678731458807136*i+13657159617701770185874281046788006453098442938445276980357239707699332093469375899382350296294153403326518993940223140996768193800) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16258274847184728565860138294246699889946875727148780014508056944267984968238496517868863220407562937800774582350768171040891292114*i+12022393458898742443473860501595155015115918556078642264809182908711727433516198109420632633610944206942174523996191929116724473260)*x + (810378540006373736818637669982489316371224542190278133269312271203201828179230213392245498096931977082432125576981567266161973759*i+19778017700412705190441108708327642685826509650699872390492460848532030799502238040722487523445242203437457293807818690596600732643) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16258274847184728565860138294246699889946875727148780014508056944267984968238496517868863220407562937800774582350768171040891292114*i+12022393458898742443473860501595155015115918556078642264809182908711727433516198109420632633610944206942174523996191929116724473260)*x + (810378540006373736818637669982489316371224542190278133269312271203201828179230213392245498096931977082432125576981567266161973759*i+19778017700412705190441108708327642685826509650699872390492460848532030799502238040722487523445242203437457293807818690596600732643) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6215344336929124702645675321892628259669180240866841312509442716661227965224797430003887066572326187254977898137231126839974383167*i+628757755713100894585972463887863902697236418075023907355574813979849849628408053952131328858872590042251166610624399238429433656)*x + (1204345685139467220639595797445921668327132291689229485876512186919938167662153732239121104023906026039288259418549664069570683419*i+5640998511857047861135763568835457286350062809060642565260048373852362389122824618943198106021373967003637715957506978186288673877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6215344336929124702645675321892628259669180240866841312509442716661227965224797430003887066572326187254977898137231126839974383167*i+628757755713100894585972463887863902697236418075023907355574813979849849628408053952131328858872590042251166610624399238429433656)*x + (1204345685139467220639595797445921668327132291689229485876512186919938167662153732239121104023906026039288259418549664069570683419*i+5640998511857047861135763568835457286350062809060642565260048373852362389122824618943198106021373967003637715957506978186288673877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4796613426773526509495624404383174256097312162264498642092792393098664914234926967205223132098799709617911457117179143945891053448*i+3688571955217820622174371037797313895281563564624748637951958323068237626493961050529895529124387857136929789066920795745404505409)*x + (13057458757113884581504252094697287022808037657741535045341028951814144211703940155009296213029967350900796678959762141056023454275*i+15509986315994479992155077741063970954721228223398214869625011076760972844541552288039669399950834039703701775497186137011205617152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4796613426773526509495624404383174256097312162264498642092792393098664914234926967205223132098799709617911457117179143945891053448*i+3688571955217820622174371037797313895281563564624748637951958323068237626493961050529895529124387857136929789066920795745404505409)*x + (13057458757113884581504252094697287022808037657741535045341028951814144211703940155009296213029967350900796678959762141056023454275*i+15509986315994479992155077741063970954721228223398214869625011076760972844541552288039669399950834039703701775497186137011205617152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22416424996999742449649182479299188342061447523724853691982545229245437537580083101542645020639395294787170451075763863845194048764*i+9721103023422574898926454392110279658945494518637638269890484443672176541850371357005747397526719013440814641761019389453960802802)*x + (7443198252472518738288733366591011901594690110262513995557601830103895090236512335967446361613256290791571984772950362796283142201*i+20056704484763540802357975276322442886066449192918265895277656734711026996242790383277470531629647511141467749105619573700982381941) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22416424996999742449649182479299188342061447523724853691982545229245437537580083101542645020639395294787170451075763863845194048764*i+9721103023422574898926454392110279658945494518637638269890484443672176541850371357005747397526719013440814641761019389453960802802)*x + (7443198252472518738288733366591011901594690110262513995557601830103895090236512335967446361613256290791571984772950362796283142201*i+20056704484763540802357975276322442886066449192918265895277656734711026996242790383277470531629647511141467749105619573700982381941) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21555296215740694294796572514661258610168012085833365142451080823685149909577155816286136331071547765610480818394717830234590826589*i+12909817644368230479325268282532558187104228410915434748075849152453703235428681221521032502637280523671937006558242815335974753691)*x + (9716080724124329209409086499913849339412123567645809948110928225525988434687099244419592657958024278429247802908501007071639667916*i+14614739090919693997073726641980033346774241899617757884063404348561719362656829558243279254431279687848019546135811908441150344066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21555296215740694294796572514661258610168012085833365142451080823685149909577155816286136331071547765610480818394717830234590826589*i+12909817644368230479325268282532558187104228410915434748075849152453703235428681221521032502637280523671937006558242815335974753691)*x + (9716080724124329209409086499913849339412123567645809948110928225525988434687099244419592657958024278429247802908501007071639667916*i+14614739090919693997073726641980033346774241899617757884063404348561719362656829558243279254431279687848019546135811908441150344066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19988132659547013080808930016810861851291214799779121285425253020213510093690996971883074668217730828991852897863055573955575153147*i+1214660844338986496164995416862297253601483778525826339526668418221156126351550320731027211812697682835758208670528071690661390551)*x + (21316977752282293873636008677254717076377895559051208852116549338024172767156882728903888961174755607940024249090002946169167032007*i+11765966454274741506736372239275284888754204675618376935280765088173461560756419404954183165951146814863892315944702811998829932925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19988132659547013080808930016810861851291214799779121285425253020213510093690996971883074668217730828991852897863055573955575153147*i+1214660844338986496164995416862297253601483778525826339526668418221156126351550320731027211812697682835758208670528071690661390551)*x + (21316977752282293873636008677254717076377895559051208852116549338024172767156882728903888961174755607940024249090002946169167032007*i+11765966454274741506736372239275284888754204675618376935280765088173461560756419404954183165951146814863892315944702811998829932925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13860732975170406808291628171715159180514419951438811623312647146760183643093671406341230814034908283486654818638050702793623304186*i+5288003245560970105952991423578157345656411872827702167358098329937931472467425242389436540396710169802331319797377391804734948263)*x + (9841350099627177057320120209834328206202008543032780102666341945933838315763864562332777499633805447058108387765694677436597712057*i+14381202570318081162482895015589570928429602568268254685565228285798996013843047619468552791307955818585931068512285529848718168067) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13860732975170406808291628171715159180514419951438811623312647146760183643093671406341230814034908283486654818638050702793623304186*i+5288003245560970105952991423578157345656411872827702167358098329937931472467425242389436540396710169802331319797377391804734948263)*x + (9841350099627177057320120209834328206202008543032780102666341945933838315763864562332777499633805447058108387765694677436597712057*i+14381202570318081162482895015589570928429602568268254685565228285798996013843047619468552791307955818585931068512285529848718168067) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3783511757456769719091030247872700655291685499762305475931778989408422063118588237809800243730505639840176503125837597362981281741*i+3077065971171589776714405762357272723911648716463638698903207526834072789881495706136930638585364863571039095236214893339570836583)*x + (13136235805678473643580956475311786178835617419519735045654593091714623720093850136232695473245942524977441231550570941627537300260*i+10795469255882191014718114859630774762159624781211856134001479448341351770217975471894580792082393407927490951053330210713002938994) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3783511757456769719091030247872700655291685499762305475931778989408422063118588237809800243730505639840176503125837597362981281741*i+3077065971171589776714405762357272723911648716463638698903207526834072789881495706136930638585364863571039095236214893339570836583)*x + (13136235805678473643580956475311786178835617419519735045654593091714623720093850136232695473245942524977441231550570941627537300260*i+10795469255882191014718114859630774762159624781211856134001479448341351770217975471894580792082393407927490951053330210713002938994) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10257926765982098460024615384895925210031927819361856013568499732197176208073009320662914761334044131592155884680597826278572669557*i+18394393604001181643402467318306278843706262014822364496965124687499557753520681064623637739798391326771065497181223857814399489354)*x + (9126533585005136377641488968946406280186473237409841864132235556676454866059077383032079634870844062495766585659820877225352042807*i+9131015821020915099928927190149337588029740780291432271060640679652690485942731454206039169299209507582411652553627840808825644640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10257926765982098460024615384895925210031927819361856013568499732197176208073009320662914761334044131592155884680597826278572669557*i+18394393604001181643402467318306278843706262014822364496965124687499557753520681064623637739798391326771065497181223857814399489354)*x + (9126533585005136377641488968946406280186473237409841864132235556676454866059077383032079634870844062495766585659820877225352042807*i+9131015821020915099928927190149337588029740780291432271060640679652690485942731454206039169299209507582411652553627840808825644640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21104145160346342285936858950209329164913156901896521514669064410308960956093332297935405514377738680779242318588084630849509050570*i+4005493663176152234607736642369029784300105258357131177901230533634708543088968306141087995524581252574886574308022860893580873660)*x + (1900624879422031570907177051702069922202249002707838448852868915190905639407324169282093845816545559728677700506272783831377855205*i+12745970325004597052295264894744558970350932227119981953769490368873463241244801446240883057922966319424885925214367169278293882938) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21104145160346342285936858950209329164913156901896521514669064410308960956093332297935405514377738680779242318588084630849509050570*i+4005493663176152234607736642369029784300105258357131177901230533634708543088968306141087995524581252574886574308022860893580873660)*x + (1900624879422031570907177051702069922202249002707838448852868915190905639407324169282093845816545559728677700506272783831377855205*i+12745970325004597052295264894744558970350932227119981953769490368873463241244801446240883057922966319424885925214367169278293882938) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5008866156725565454585308371907795872082454041795469911014566485838174001594901883645991105313259117693132792889753718735730377402*i+14894750087782099366270025439385112992431743406480804375828068052970427230309700543160010011944678132480193115666752991631867240088)*x + (14950372058732497945793657387446046843963997456137443393750280494693704352539776580212666049127969500162614116498501444248548338372*i+15442278462046640265886402788812121823322964373211719621302897477127381171247346748875645266622088380288584042314041253623011223068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5008866156725565454585308371907795872082454041795469911014566485838174001594901883645991105313259117693132792889753718735730377402*i+14894750087782099366270025439385112992431743406480804375828068052970427230309700543160010011944678132480193115666752991631867240088)*x + (14950372058732497945793657387446046843963997456137443393750280494693704352539776580212666049127969500162614116498501444248548338372*i+15442278462046640265886402788812121823322964373211719621302897477127381171247346748875645266622088380288584042314041253623011223068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23998210014430383577867334141360179888239715899378234413673624361681725784672327720508943012323172273127688337969186642829113754226*i+21170413652117178487127745469971999079950658554727662148000394598618738598004206013531049011821298271335464113878261550751240323757)*x + (19223111776025543165646659269253006221580631490914331796221767143085456181058246060987170329717012463010008399290673995324793758876*i+2179247112643087694962038713033254568390823396724050152127658068521376920650557423182821646528023011444931340457058663017022162481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23998210014430383577867334141360179888239715899378234413673624361681725784672327720508943012323172273127688337969186642829113754226*i+21170413652117178487127745469971999079950658554727662148000394598618738598004206013531049011821298271335464113878261550751240323757)*x + (19223111776025543165646659269253006221580631490914331796221767143085456181058246060987170329717012463010008399290673995324793758876*i+2179247112643087694962038713033254568390823396724050152127658068521376920650557423182821646528023011444931340457058663017022162481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8261090188130969805597514082264725312752946044682659416857496922328213660033137980036164185904479146542106085594288371772376072495*i+18512838169904236106767172714301996652264936162258785257067288287996829208061660366554987980863270338247836487654118207875230634195)*x + (21842503401360384213968758731682090575950849859876300639929479541204402865944228775732174291447162381123940723294278210551212645917*i+13249398801229402121299695572428600329609070211758590220248997430606400192913988534697559492446724859928552104266778028772407992120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8261090188130969805597514082264725312752946044682659416857496922328213660033137980036164185904479146542106085594288371772376072495*i+18512838169904236106767172714301996652264936162258785257067288287996829208061660366554987980863270338247836487654118207875230634195)*x + (21842503401360384213968758731682090575950849859876300639929479541204402865944228775732174291447162381123940723294278210551212645917*i+13249398801229402121299695572428600329609070211758590220248997430606400192913988534697559492446724859928552104266778028772407992120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10619686623540179482452219703691853865083169350097169588557387602354561074515816109425831156290927241891695008047249742548841987475*i+4398119529558410301421935075343161436835982631438206971295528389176455953200634947169594444964336934310276657530241634944128265662)*x + (150928342912220723386812719961657068124032124483309205332933648306816021302231975457368291303396958600457239572737995151424302300*i+5561959672914647902523398399397625377992638364142408372733131672298185038399415609998011351021315207427549736363450628559487475812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10619686623540179482452219703691853865083169350097169588557387602354561074515816109425831156290927241891695008047249742548841987475*i+4398119529558410301421935075343161436835982631438206971295528389176455953200634947169594444964336934310276657530241634944128265662)*x + (150928342912220723386812719961657068124032124483309205332933648306816021302231975457368291303396958600457239572737995151424302300*i+5561959672914647902523398399397625377992638364142408372733131672298185038399415609998011351021315207427549736363450628559487475812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5834859777086958111656378957728024604552688313222470667269609412794845522340635573486289804778025219710112395873032459218872573306*i+81596504214550043483736676337994245216444886756953889314594033503211388594201283488297578034944175672410806626729978479091043107)*x + (24434121728304238587589554633615369618939838416270155358576427770958807639873505271327623674030507163995513974686694244847320172919*i+14147263751619619929880340544605226536517831067469510375713766312905168928512066537970953522621691751286677329238889873857355549778) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5834859777086958111656378957728024604552688313222470667269609412794845522340635573486289804778025219710112395873032459218872573306*i+81596504214550043483736676337994245216444886756953889314594033503211388594201283488297578034944175672410806626729978479091043107)*x + (24434121728304238587589554633615369618939838416270155358576427770958807639873505271327623674030507163995513974686694244847320172919*i+14147263751619619929880340544605226536517831067469510375713766312905168928512066537970953522621691751286677329238889873857355549778) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15118942594276436223997336057103936005866510587898982256864866243058580443250916840540559652747113892756203094399513131370098944209*i+13829379668326088766578357217650113415388387219836262795694774218999153059763423925734333534087410257066699240323581427202770298089)*x + (17453341760460710617029549870656316794688275094064225108227344666455591740113143780163311440263494731147804738136286816526891886289*i+10594423329612007469176952851689769327649247276936034321214930533005385104471235840615240782123919073676103441672706021927768467594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15118942594276436223997336057103936005866510587898982256864866243058580443250916840540559652747113892756203094399513131370098944209*i+13829379668326088766578357217650113415388387219836262795694774218999153059763423925734333534087410257066699240323581427202770298089)*x + (17453341760460710617029549870656316794688275094064225108227344666455591740113143780163311440263494731147804738136286816526891886289*i+10594423329612007469176952851689769327649247276936034321214930533005385104471235840615240782123919073676103441672706021927768467594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21837234960143663256062219564436729385856458049025613834104124937118941724040139749983697776820201687460550239423247612712546505199*i+425674119462395174185631080236572256669377547438599416323383484362869904196685776794941918180591248540010037786428789437612040514)*x + (17651486009308359668641338592365130787884168546187704579949306863503367128979042421146582571660870882510032979635480656042156315269*i+12071708798493418250341604727170911336206700030094375769936127966494972204844942236726600746825034238115811238006862020426150169887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21837234960143663256062219564436729385856458049025613834104124937118941724040139749983697776820201687460550239423247612712546505199*i+425674119462395174185631080236572256669377547438599416323383484362869904196685776794941918180591248540010037786428789437612040514)*x + (17651486009308359668641338592365130787884168546187704579949306863503367128979042421146582571660870882510032979635480656042156315269*i+12071708798493418250341604727170911336206700030094375769936127966494972204844942236726600746825034238115811238006862020426150169887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21017443072864224700042889561660129679260315289507907144516353284645548589620099477655806893622759596939258174251636798283600257281*i+13108692905177634407509951318305326683313059531598988239454945705817369631398800657259936927904841679385970870321486667182817998197)*x + (9530602557564417158694277652207938617291805808432323847973575637697271341414001315452077374463048197257776456720968245506979130078*i+15058940191033803840536055760176847336504963589023566160831080965237161450875200640601325490128676184452628418722644270374651040213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21017443072864224700042889561660129679260315289507907144516353284645548589620099477655806893622759596939258174251636798283600257281*i+13108692905177634407509951318305326683313059531598988239454945705817369631398800657259936927904841679385970870321486667182817998197)*x + (9530602557564417158694277652207938617291805808432323847973575637697271341414001315452077374463048197257776456720968245506979130078*i+15058940191033803840536055760176847336504963589023566160831080965237161450875200640601325490128676184452628418722644270374651040213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20573167462350999474052364930269944747957209127744622324066064991083714461077366401806970931553067247369381816531087684855137839502*i+9952492688009734930195256940697144296612006472152107312256013674178851975457796684360489732799528635304557608293505177115558731027)*x + (1293086666042497050040277176539396338955093906406403215735376733147600624701926963645382619332805743689677153414073660351341143884*i+19937297671190575448692415444764229947826807960325407129491901071828708981192139096038374181310614338685105731778958735243454509956) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20573167462350999474052364930269944747957209127744622324066064991083714461077366401806970931553067247369381816531087684855137839502*i+9952492688009734930195256940697144296612006472152107312256013674178851975457796684360489732799528635304557608293505177115558731027)*x + (1293086666042497050040277176539396338955093906406403215735376733147600624701926963645382619332805743689677153414073660351341143884*i+19937297671190575448692415444764229947826807960325407129491901071828708981192139096038374181310614338685105731778958735243454509956) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22152752498370587141365352340780760105495856411717111414758716091177517504680853710762254924752000794982996027689858655851076483512*i+21898650016181731939512346420808414987152983337840156083464492231488548542544375114454625429732871543185194648008541870113815700600)*x + (18693087522146626053514513322241047601348298495736465788732200117440742729199115082831293251129531680742097594983388404015813965437*i+15980399555800011100874647350228068889730300575435082567024591264168406260103460626033825731760254653402441790774855754145396418939) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22152752498370587141365352340780760105495856411717111414758716091177517504680853710762254924752000794982996027689858655851076483512*i+21898650016181731939512346420808414987152983337840156083464492231488548542544375114454625429732871543185194648008541870113815700600)*x + (18693087522146626053514513322241047601348298495736465788732200117440742729199115082831293251129531680742097594983388404015813965437*i+15980399555800011100874647350228068889730300575435082567024591264168406260103460626033825731760254653402441790774855754145396418939) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7304606026351515447359762127456774615499277396680803731419836623495068728807538842338538632108700393645463348951098769175047984062*i+21517739048375546727840724029006968554286034418227593667909156929817645546081987698292956837992164749068186025226056708254978205861)*x + (18620180153863331187010418283343536895647989815049869712651419853689495184982190199637934316235415524565333306495936554712367145949*i+4589355823832518291735550746822564511105179115581466482996286818506511877044510992213807697847794987644821350033580737504064184246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7304606026351515447359762127456774615499277396680803731419836623495068728807538842338538632108700393645463348951098769175047984062*i+21517739048375546727840724029006968554286034418227593667909156929817645546081987698292956837992164749068186025226056708254978205861)*x + (18620180153863331187010418283343536895647989815049869712651419853689495184982190199637934316235415524565333306495936554712367145949*i+4589355823832518291735550746822564511105179115581466482996286818506511877044510992213807697847794987644821350033580737504064184246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17805071921859898448142318238471591724693891788431800135713356283883807608042190083564474815630299320668334844833107403283433739788*i+21543776414185439580624772552705145280126497861659402767304228187413050976344525237294737740771266158213297230109515496217689662959)*x + (5458771443463986395414003454414405638252944431674418606513198634291402784878625677259780862570101966504504465578031933160294316724*i+19904857547077070022892066866469625122399823619403073660785741609778076719232078893989938203816013291780771589457588799157577138804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17805071921859898448142318238471591724693891788431800135713356283883807608042190083564474815630299320668334844833107403283433739788*i+21543776414185439580624772552705145280126497861659402767304228187413050976344525237294737740771266158213297230109515496217689662959)*x + (5458771443463986395414003454414405638252944431674418606513198634291402784878625677259780862570101966504504465578031933160294316724*i+19904857547077070022892066866469625122399823619403073660785741609778076719232078893989938203816013291780771589457588799157577138804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21376072711645670903545117381164257126811594602939191165297001275961419538815845605220286215912184543732944441284789383870337116479*i+6725018869276149631709332623645734229141922083845765946364847308888705170274327025754897548692174929780738743465544131759034667868)*x + (4829513794756203066990412491110732686392825644872016610595698234422127706581375483961416025228674881290977796599034707351009949374*i+68176964878352589032709047100107472387384701780070151533781408578321477546760855314285684560821217814631149212086042854936212923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21376072711645670903545117381164257126811594602939191165297001275961419538815845605220286215912184543732944441284789383870337116479*i+6725018869276149631709332623645734229141922083845765946364847308888705170274327025754897548692174929780738743465544131759034667868)*x + (4829513794756203066990412491110732686392825644872016610595698234422127706581375483961416025228674881290977796599034707351009949374*i+68176964878352589032709047100107472387384701780070151533781408578321477546760855314285684560821217814631149212086042854936212923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7991443891221802030418179608638417303406460035900535096539554552568952654358337357572206194476402551717710769113975963169599750619*i+13829474501971985468240066488796885060017458275656649595699658469337833989544811368793818629347978313700661017646391875995368268496)*x + (24309619347654101668975366497112495925980598638475009931421296224547111861136907747162918216473797773945925317609297648005911875060*i+20325692747505721464266593302077587021358904283820593950576767841064506305828545308401139843663546979822352035369167913528495373232) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7991443891221802030418179608638417303406460035900535096539554552568952654358337357572206194476402551717710769113975963169599750619*i+13829474501971985468240066488796885060017458275656649595699658469337833989544811368793818629347978313700661017646391875995368268496)*x + (24309619347654101668975366497112495925980598638475009931421296224547111861136907747162918216473797773945925317609297648005911875060*i+20325692747505721464266593302077587021358904283820593950576767841064506305828545308401139843663546979822352035369167913528495373232) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1120115465470898116790299016027624041451373792696803130594216441190127267474473669492532108754929697894789825310603001833604906210*i+21589492481485658410266768097219160999136213622413032586250396970454691900832954126613871521923626297812249195105322553115171235297)*x + (21969417969644918270016984514118627559266449105839838313983405336287306047808785913374575305969246399487179437451330342601200736922*i+11243425289600898724043161055408018411759688527457120672959307404169817152660301266021435216573767817136721770550210865117139391658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1120115465470898116790299016027624041451373792696803130594216441190127267474473669492532108754929697894789825310603001833604906210*i+21589492481485658410266768097219160999136213622413032586250396970454691900832954126613871521923626297812249195105322553115171235297)*x + (21969417969644918270016984514118627559266449105839838313983405336287306047808785913374575305969246399487179437451330342601200736922*i+11243425289600898724043161055408018411759688527457120672959307404169817152660301266021435216573767817136721770550210865117139391658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19717798508516066929009904649095970944835390191804857858203136677214728394239755374257376940165142219078407853039067275655275490690*i+9843145021280887770361477102953103706893289054080694345077938748785488922324918129370264673204445174520173602235330515618068484302)*x + (14107458738842634125433406617476946457978734799441235228670298198799652123343002253264176977456962407233347433202881615011409101291*i+19482793138464224999606867322870828855265702763505972554411772776222769438663552616727171242992546522357455911139531767714636165227) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19717798508516066929009904649095970944835390191804857858203136677214728394239755374257376940165142219078407853039067275655275490690*i+9843145021280887770361477102953103706893289054080694345077938748785488922324918129370264673204445174520173602235330515618068484302)*x + (14107458738842634125433406617476946457978734799441235228670298198799652123343002253264176977456962407233347433202881615011409101291*i+19482793138464224999606867322870828855265702763505972554411772776222769438663552616727171242992546522357455911139531767714636165227) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6656538337818899600773481605044239797303827255052195138281155017557366035733929779563394253062509512679468105354294797206277589017*i+351828402300488563111327520896632513093329086559429499191890917593025225567837684983423784711623046099086867144408037005413514185)*x + (22307899170223201498044779093639377216401723060080533141992361417165348792178535294951212073200029502877312290404044502695054806617*i+1826642301800093026154882243935526105315995381225940479288929825425680262306014494679697011118678222108692954922740878436532832111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6656538337818899600773481605044239797303827255052195138281155017557366035733929779563394253062509512679468105354294797206277589017*i+351828402300488563111327520896632513093329086559429499191890917593025225567837684983423784711623046099086867144408037005413514185)*x + (22307899170223201498044779093639377216401723060080533141992361417165348792178535294951212073200029502877312290404044502695054806617*i+1826642301800093026154882243935526105315995381225940479288929825425680262306014494679697011118678222108692954922740878436532832111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (26557336971833077473327335474584271212767813541502682042599474332015380251862323380723667930334036638897196100174369851619762178*i+11048925836398217146515870129933234698429898944361487599921583791811877434384821253771876790803021549882953225098793602494850930544)*x + (8061798366171041685050380109606654563972356742407022367526760448737922807948034632242368856004056809570050153811097399548189531907*i+11032330064490398794985093129775375930688618266725364344700321118385005091185749414638776071040573839059990969480127761900553466012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (26557336971833077473327335474584271212767813541502682042599474332015380251862323380723667930334036638897196100174369851619762178*i+11048925836398217146515870129933234698429898944361487599921583791811877434384821253771876790803021549882953225098793602494850930544)*x + (8061798366171041685050380109606654563972356742407022367526760448737922807948034632242368856004056809570050153811097399548189531907*i+11032330064490398794985093129775375930688618266725364344700321118385005091185749414638776071040573839059990969480127761900553466012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19239380469740868453592094670302878619969197726508253800803816396664405884119636102925697018613063966244422407077630926629973250286*i+15431899007943840701021928213071475443830078767841095198382301076763560745106365253979793335937629129445730306132345038470682464748)*x + (15068837575813219913634944082403463048144849650240258842990285169732033181146107473780118632097919355548548211892950029108281199721*i+5143543626743662861528417554515306481240838635876288711408106115000421537041642669296781435733723975028498952340429563574609336229) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19239380469740868453592094670302878619969197726508253800803816396664405884119636102925697018613063966244422407077630926629973250286*i+15431899007943840701021928213071475443830078767841095198382301076763560745106365253979793335937629129445730306132345038470682464748)*x + (15068837575813219913634944082403463048144849650240258842990285169732033181146107473780118632097919355548548211892950029108281199721*i+5143543626743662861528417554515306481240838635876288711408106115000421537041642669296781435733723975028498952340429563574609336229) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23223957253476192800726093587383824785595396647318054735071024796629242204636243304409999936403502117335974726383618847529417751324*i+4550702048467921269867217299622445406848985415265450690676481819067315275534313983345212762841820990042082428200327950470808982865)*x + (2318063400737104760450906055914083384299341057761823515946867836435278054999325501129339707534383244167634927278393314292071284470*i+14186883503471106941124883518613359565941925516027440687823363598373090918333301047119564012233652920738601586081357669432773560794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23223957253476192800726093587383824785595396647318054735071024796629242204636243304409999936403502117335974726383618847529417751324*i+4550702048467921269867217299622445406848985415265450690676481819067315275534313983345212762841820990042082428200327950470808982865)*x + (2318063400737104760450906055914083384299341057761823515946867836435278054999325501129339707534383244167634927278393314292071284470*i+14186883503471106941124883518613359565941925516027440687823363598373090918333301047119564012233652920738601586081357669432773560794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (421568841144947676704474839624850633321526277793632525744325486966297163791202021773109165045380512883865760646591463969986833988*i+2387068719522337232911665550885749399852557229740346209100957464784775757183191085575286899983849512971472832409066928264784016762)*x + (4891592667352320710162666254889275597465972510446133167281332998545215326978273147757939667739848765002878972829006219309746558946*i+20525413864471968537664378684690316190367856961493960637852690169001342834947620616487167608301346557504359226244103439597003662902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [95]:
Phi43 = isogeny_walk(E3, Phi3_P0 + S4 * Phi3_Q0, l_A,n_A)
Phi43
Out[95]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (421568841144947676704474839624850633321526277793632525744325486966297163791202021773109165045380512883865760646591463969986833988*i+2387068719522337232911665550885749399852557229740346209100957464784775757183191085575286899983849512971472832409066928264784016762)*x + (4891592667352320710162666254889275597465972510446133167281332998545215326978273147757939667739848765002878972829006219309746558946*i+20525413864471968537664378684690316190367856961493960637852690169001342834947620616487167608301346557504359226244103439597003662902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1360659084845319451343165275317004874489636995059800406345234544510358648540917456279423222319034979589566130452097599913393544520*i+13704645698928373922836831186951613913798777501329880078926665874016851606978201950041071719018771019047100280404842365193155306033)*x + (13370696346281463390413960305017410683424470202671387921698189407410087146441465847385007356366920220256240332832920537391702150851*i+10274056404583416805153915175687003579066711996342541642123105240690379409615644934798713339377346876991074229295851541207109964716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4531387751096058071580791454062885228125499112044961564839469339224548690664046998162524815198793466246809561162165114364832035956*i+290852120694461944509093618797073517788897034664246453793577648967302374886390992113858742087572191283820548341826734188078442124)*x + (1312972773612419328716256955433763072495175284125159945524451778620284686722408566074830194378655155922676182831183965000469360018*i+2599752049569134414025062572680437668550859227995896407092295510676883502581900992362772572369239586547662361116358794775147879337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4531387751096058071580791454062885228125499112044961564839469339224548690664046998162524815198793466246809561162165114364832035956*i+290852120694461944509093618797073517788897034664246453793577648967302374886390992113858742087572191283820548341826734188078442124)*x + (1312972773612419328716256955433763072495175284125159945524451778620284686722408566074830194378655155922676182831183965000469360018*i+2599752049569134414025062572680437668550859227995896407092295510676883502581900992362772572369239586547662361116358794775147879337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20268568731844507739019642270700337679910257986173242418528308493916886095727856975668221460141291562987466274788037085873152637654*i+9899940762592783455543172440426760818301990638468687818409866161758113848796606944160275563761629702287103760559258380080556585408)*x + (23007322141505434162172567362098381822893227493384652590016203784819639787603109100898743940547304422364213433031829475561519773709*i+12659993222065099623906361808809292643428506355739707884306410664767722250584630836154938313124572774207747102529290788185840469984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20268568731844507739019642270700337679910257986173242418528308493916886095727856975668221460141291562987466274788037085873152637654*i+9899940762592783455543172440426760818301990638468687818409866161758113848796606944160275563761629702287103760559258380080556585408)*x + (23007322141505434162172567362098381822893227493384652590016203784819639787603109100898743940547304422364213433031829475561519773709*i+12659993222065099623906361808809292643428506355739707884306410664767722250584630836154938313124572774207747102529290788185840469984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14706822897531366234785562480861647379729747944988301887089768092182218827109803013557645923934653614251182644889912334329401758000*i+13339524449757327073091917869198820173759565893988709288702019719686463014699712889184304433530781273421239600499796503328474976059)*x + (2355902835069277695464753700189969994024991671587073729291326591346748130588472482247893560907697056332239930454424974510422984346*i+8813768192113245418221919218958399514468656329077463738688680600114388520973168053485593476346940290340036937920655615927438725240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14706822897531366234785562480861647379729747944988301887089768092182218827109803013557645923934653614251182644889912334329401758000*i+13339524449757327073091917869198820173759565893988709288702019719686463014699712889184304433530781273421239600499796503328474976059)*x + (2355902835069277695464753700189969994024991671587073729291326591346748130588472482247893560907697056332239930454424974510422984346*i+8813768192113245418221919218958399514468656329077463738688680600114388520973168053485593476346940290340036937920655615927438725240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24136631760744050760191262639506223781296834559197201048461063224545150636319413538472585547540346312612089806669008346725205813294*i+13156212347365457192681913883466651866779620092714159046870589853257574997195367716943472620673121957107364844043736290491399950990)*x + (23696800674356595406750122053353560373016864107346815430477715306368766553664263350590701836335262578211535371634010802793488492547*i+966333017729321480316037768562576195901209560608000297692508036896322196172483442806100688204519438426329221429261091845689717602) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24136631760744050760191262639506223781296834559197201048461063224545150636319413538472585547540346312612089806669008346725205813294*i+13156212347365457192681913883466651866779620092714159046870589853257574997195367716943472620673121957107364844043736290491399950990)*x + (23696800674356595406750122053353560373016864107346815430477715306368766553664263350590701836335262578211535371634010802793488492547*i+966333017729321480316037768562576195901209560608000297692508036896322196172483442806100688204519438426329221429261091845689717602) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20707603451305112722273769101279927721857182971596654287410343917382464766378330341215197874775318907111360052118314970136345280871*i+6610144022912279543240420523845633068219671732022597447327639646070933797633013432358399440673887520307015537602431602783471590775)*x + (17311338891813389568300470009905302648878478638847053068353035151480757128671614836304752421356831578984764803423441005706837272988*i+13996709179681001030352259884359812819500960628518065985458915598605186974174670124092559016342634378974199316182069660666082782159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20707603451305112722273769101279927721857182971596654287410343917382464766378330341215197874775318907111360052118314970136345280871*i+6610144022912279543240420523845633068219671732022597447327639646070933797633013432358399440673887520307015537602431602783471590775)*x + (17311338891813389568300470009905302648878478638847053068353035151480757128671614836304752421356831578984764803423441005706837272988*i+13996709179681001030352259884359812819500960628518065985458915598605186974174670124092559016342634378974199316182069660666082782159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12054353395766235515121685230861979817382234574863808330700574614739884957411551625635786029809193967951997841585526178050198292473*i+10108281725860215232639446254282966572101521076264086488369748376700079349091475949110269669084234433204726681653158469679209755520)*x + (1361240349880674929221668716215115277432180648076005794885534675110498172838941344530207941973050637153920084585517413980321034657*i+23566748286403326759455837673526092898737079435169515114530716032047425686682668393295480998216127224956981208448811514102850651068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12054353395766235515121685230861979817382234574863808330700574614739884957411551625635786029809193967951997841585526178050198292473*i+10108281725860215232639446254282966572101521076264086488369748376700079349091475949110269669084234433204726681653158469679209755520)*x + (1361240349880674929221668716215115277432180648076005794885534675110498172838941344530207941973050637153920084585517413980321034657*i+23566748286403326759455837673526092898737079435169515114530716032047425686682668393295480998216127224956981208448811514102850651068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20144154813113608945967561762159663570314802781367869502859774755926959180642033253505059663873159358106976146582400039555173650751*i+19002310150023443353163165982693635812133322889387833746870536979298108105995530901546250643044331335267010610918635111668188799745)*x + (6110988809056602021349529184059162429338355594298964496674564291949592349557341078969452474033049046840157076022650797088592291984*i+15656705618063358889151273358910605420737277942022574336529063658363590213379222459418127264675020322008560111363722644686822671688) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20144154813113608945967561762159663570314802781367869502859774755926959180642033253505059663873159358106976146582400039555173650751*i+19002310150023443353163165982693635812133322889387833746870536979298108105995530901546250643044331335267010610918635111668188799745)*x + (6110988809056602021349529184059162429338355594298964496674564291949592349557341078969452474033049046840157076022650797088592291984*i+15656705618063358889151273358910605420737277942022574336529063658363590213379222459418127264675020322008560111363722644686822671688) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5175086182219319406016257707951342261676247773147749037674458627542571777507780561376387893297124763004231534192560394301164943216*i+17503925882138444739749802138464490887574902478959500197345732043158166195549868806074243097635948271945481633989822894575758537554)*x + (12164105584302203562819364969396351129562782249121302437733770312162717753550202373262329131973254439257737463436557514846228562427*i+15450888307778216367763564216336970367658255107616543959307587257771776580835164334361482446989857108046433786212735796139447427720) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5175086182219319406016257707951342261676247773147749037674458627542571777507780561376387893297124763004231534192560394301164943216*i+17503925882138444739749802138464490887574902478959500197345732043158166195549868806074243097635948271945481633989822894575758537554)*x + (12164105584302203562819364969396351129562782249121302437733770312162717753550202373262329131973254439257737463436557514846228562427*i+15450888307778216367763564216336970367658255107616543959307587257771776580835164334361482446989857108046433786212735796139447427720) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9172271320871929419918021183992718394547109752233611937112181902001403834676934313552379630683164416882271890047023396792624972754*i+8231963973650123086398315295371830155654509152075771789836363311804902253399302726878847819156734564745772951825392024678088612068)*x + (14016347664116063621738443447320421941933892370468815425077441448391165899438422986302084562300655334421842509060312492519742588609*i+13767195252345701038431935693949938891796302200629881869549793128601750876440760786440867922338510338252402749052815547817168768590) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9172271320871929419918021183992718394547109752233611937112181902001403834676934313552379630683164416882271890047023396792624972754*i+8231963973650123086398315295371830155654509152075771789836363311804902253399302726878847819156734564745772951825392024678088612068)*x + (14016347664116063621738443447320421941933892370468815425077441448391165899438422986302084562300655334421842509060312492519742588609*i+13767195252345701038431935693949938891796302200629881869549793128601750876440760786440867922338510338252402749052815547817168768590) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23133468993363341131470571356456193138121138534111409467865044969726649657812297460004224262291295004240179692839436679615143731864*i+9813819856668814926595249833163286630142067514408641643229921630597881815479789086712888380261147412258157287727347373287945264586)*x + (10677761708424465821671269763665835890817822495870884627304519350413294433879998597797954134750762811020769119347481933983312761235*i+13690604065924277599995171495318527001869926704832251728086038224454800764804795241059708868526463059492170359895555445528822674440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23133468993363341131470571356456193138121138534111409467865044969726649657812297460004224262291295004240179692839436679615143731864*i+9813819856668814926595249833163286630142067514408641643229921630597881815479789086712888380261147412258157287727347373287945264586)*x + (10677761708424465821671269763665835890817822495870884627304519350413294433879998597797954134750762811020769119347481933983312761235*i+13690604065924277599995171495318527001869926704832251728086038224454800764804795241059708868526463059492170359895555445528822674440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10991503253859471420570731362824001053852238699870634708077892574806527500121141943453225051352698908677634490752206681818927987607*i+10654398243379600731974655839596482204778405003957478037956945480172373662059262496815390104256429277618710382896691596010455593830)*x + (8235083026311499734886277623356258960565635154260890859484760177112832664774900474033688791388995534978049452163280739548291376165*i+15664680436506422435573951937361160771145080053617183935687780882215738868465555889823325108372088224409437601100365662037166183411) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10991503253859471420570731362824001053852238699870634708077892574806527500121141943453225051352698908677634490752206681818927987607*i+10654398243379600731974655839596482204778405003957478037956945480172373662059262496815390104256429277618710382896691596010455593830)*x + (8235083026311499734886277623356258960565635154260890859484760177112832664774900474033688791388995534978049452163280739548291376165*i+15664680436506422435573951937361160771145080053617183935687780882215738868465555889823325108372088224409437601100365662037166183411) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7765631156722621429531975894036696243873937083117859865104870350218310393475774522885764241509942934498947271302725768132282599480*i+23280959219612162853317167243172338917997775056944297123623952558027662461123972131270189676182259857810336867149289273339009181992)*x + (12655944247161590072595304376994080088295092280857822000130808019020539850065955505288983794710111015998204054030414182575016590774*i+10593692168822542821060674407278523011762157443413843697643814897641853344226371939884711772069292599430578759032744272750857050235) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7765631156722621429531975894036696243873937083117859865104870350218310393475774522885764241509942934498947271302725768132282599480*i+23280959219612162853317167243172338917997775056944297123623952558027662461123972131270189676182259857810336867149289273339009181992)*x + (12655944247161590072595304376994080088295092280857822000130808019020539850065955505288983794710111015998204054030414182575016590774*i+10593692168822542821060674407278523011762157443413843697643814897641853344226371939884711772069292599430578759032744272750857050235) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7224247280106991957677192198501097823385692505509897466291495790906841631360099368515454988635357783588957049016898750015166028286*i+21415570245492339469265350345209356987378613961779968519683910952405643107514881497702708602314843341009138529966396302082638998202)*x + (11547348401017029227859151780452649452036200766046649993199640968590048822476714764744759731845652268961124987317967493823808649133*i+8979630658103326702821993968845081767238667199355549817378761451204758268584192895221033895682390338962660696052968544950295325953) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7224247280106991957677192198501097823385692505509897466291495790906841631360099368515454988635357783588957049016898750015166028286*i+21415570245492339469265350345209356987378613961779968519683910952405643107514881497702708602314843341009138529966396302082638998202)*x + (11547348401017029227859151780452649452036200766046649993199640968590048822476714764744759731845652268961124987317967493823808649133*i+8979630658103326702821993968845081767238667199355549817378761451204758268584192895221033895682390338962660696052968544950295325953) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22815330403793255319739859555829399779896160067730658687198725428833337417875183515196860865980877688732456702402776301389082617571*i+18294804243316282551902810694516482380481075648478745454586527405617709908208686869346624029715517334578210813873679574318270601309)*x + (18738656988632722562660773528733053153143698098334318391301000093881296653909506161670254367840337914838548788542112926499001743299*i+4162185282263953160393139584587869520323894157663095665887467323275434052471651344511446645579109150526561109003439393106835806822) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22815330403793255319739859555829399779896160067730658687198725428833337417875183515196860865980877688732456702402776301389082617571*i+18294804243316282551902810694516482380481075648478745454586527405617709908208686869346624029715517334578210813873679574318270601309)*x + (18738656988632722562660773528733053153143698098334318391301000093881296653909506161670254367840337914838548788542112926499001743299*i+4162185282263953160393139584587869520323894157663095665887467323275434052471651344511446645579109150526561109003439393106835806822) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6993769673360694688379436962057823522798840926486643468121627192224568423847401139494436509963298608693926784462310093144390516339*i+5228140382639592749583230629871804472816674569652839377710205838743168842358162902823026900897382063420130791122172324188677579804)*x + (21832292993656693937792846366013451607900094058101854499952628252554969997159459047884511290987904360459064965627258613576991272995*i+14918306615222100663136700395166380618257540832542267032364346198482012180427236467208340186583413980363275220477939654372455294392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6993769673360694688379436962057823522798840926486643468121627192224568423847401139494436509963298608693926784462310093144390516339*i+5228140382639592749583230629871804472816674569652839377710205838743168842358162902823026900897382063420130791122172324188677579804)*x + (21832292993656693937792846366013451607900094058101854499952628252554969997159459047884511290987904360459064965627258613576991272995*i+14918306615222100663136700395166380618257540832542267032364346198482012180427236467208340186583413980363275220477939654372455294392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7922840942806139930862135768863653507080234080995938985477472069616613715548618319921190934328617112347179016238413001120799470649*i+4034549179626199599466465788683716802395656677959553184070540052354364317688566193158887354370028743942010123846837913762421562342)*x + (16249363026679945528424518774212534707872124243444533310988228901755951809867805270878804425613431070252192483567823932716006402476*i+23735767381738385088314425384330568949686040074515026995213807735121306782593765186724534347284515526260226930569863733533534315125) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7922840942806139930862135768863653507080234080995938985477472069616613715548618319921190934328617112347179016238413001120799470649*i+4034549179626199599466465788683716802395656677959553184070540052354364317688566193158887354370028743942010123846837913762421562342)*x + (16249363026679945528424518774212534707872124243444533310988228901755951809867805270878804425613431070252192483567823932716006402476*i+23735767381738385088314425384330568949686040074515026995213807735121306782593765186724534347284515526260226930569863733533534315125) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4504119488986513742144432139338131186682889251426977144361335332700986765874741710358015057064362804242768731308274929349040128080*i+1036756246582183504516479391605623687513717699809517615110883379706447287989062840180312148368863563094736554073027937606950183732)*x + (22071724283905430930826179682286658455252819004871947641358641516688938203007132812260405982732709146950071593404482282562441207376*i+12946441098050995871935297005071406009346549463676030081030042483218244201893390805655464195139769676059859441068446834957628119791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4504119488986513742144432139338131186682889251426977144361335332700986765874741710358015057064362804242768731308274929349040128080*i+1036756246582183504516479391605623687513717699809517615110883379706447287989062840180312148368863563094736554073027937606950183732)*x + (22071724283905430930826179682286658455252819004871947641358641516688938203007132812260405982732709146950071593404482282562441207376*i+12946441098050995871935297005071406009346549463676030081030042483218244201893390805655464195139769676059859441068446834957628119791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21836838112526094753469348734895804506438425969866524156789474118442442315861366069592603520559565087891356202291832497109221720298*i+10312473189944067526293253873789274961293337656933216059250018937720894295365623068026361950137814068311670636789093245284642475684)*x + (8851914725371534539823988820425901360852203586040552140033712513755952474723018351900619434719328376166813022385670104831023277606*i+20041408680973008213498814277712382254664073381228271960709278392936942111958867076010357884492269082405792414300209689444029058616) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21836838112526094753469348734895804506438425969866524156789474118442442315861366069592603520559565087891356202291832497109221720298*i+10312473189944067526293253873789274961293337656933216059250018937720894295365623068026361950137814068311670636789093245284642475684)*x + (8851914725371534539823988820425901360852203586040552140033712513755952474723018351900619434719328376166813022385670104831023277606*i+20041408680973008213498814277712382254664073381228271960709278392936942111958867076010357884492269082405792414300209689444029058616) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10231784053950115307067079617360687983339797295433896161788305618348559646947775291912785747997186064490990963268444067644944017119*i+21933809152139485455682378321481306151194109098221997109473172801330623985786623726366976563611188231114965260443541395514171814289)*x + (3314941885577268230195113606331082035206854247432350166387744667040143927287980388983047497392711960835504877496364836212176634684*i+15888143130583284615687215656929378212815161975080140941369695513032970866388243458172774834602240242485566967326076320765655340606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10231784053950115307067079617360687983339797295433896161788305618348559646947775291912785747997186064490990963268444067644944017119*i+21933809152139485455682378321481306151194109098221997109473172801330623985786623726366976563611188231114965260443541395514171814289)*x + (3314941885577268230195113606331082035206854247432350166387744667040143927287980388983047497392711960835504877496364836212176634684*i+15888143130583284615687215656929378212815161975080140941369695513032970866388243458172774834602240242485566967326076320765655340606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11019225053288937747241914923107756783678872062604538305175095599446513385127638365515684533014868257873907862983313901544060854308*i+21607478674303341892165060098634399464513859451954987081243670007164431441453946456406868107372490722846934210467348249829501257774)*x + (1154216474377441520960344672058829981229856279676906397610468196450793787301261177520216059302102358723690322915861686732443343697*i+606519146080964380335582726207969199350570247336373506675417815057748769524654144243582715231341957202071664974275957204418375108) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11019225053288937747241914923107756783678872062604538305175095599446513385127638365515684533014868257873907862983313901544060854308*i+21607478674303341892165060098634399464513859451954987081243670007164431441453946456406868107372490722846934210467348249829501257774)*x + (1154216474377441520960344672058829981229856279676906397610468196450793787301261177520216059302102358723690322915861686732443343697*i+606519146080964380335582726207969199350570247336373506675417815057748769524654144243582715231341957202071664974275957204418375108) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11611476963431405029573870928126390570930407374142231295410286566288522599822127033679380938566327487056025585405684291742388776956*i+805265030931673112977636341455733678841486658975699496743729697422405178060369566875565142481905190220984435431827939316175905131)*x + (22808941079214228371147386047503496229507900825459643563811678411720378172238656251457887757755236678980607854426763718657285311579*i+17551323385788790240295930286977310141048056503120996048101790602541488996734114462078311953604026885250387384333048223099340575478) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11611476963431405029573870928126390570930407374142231295410286566288522599822127033679380938566327487056025585405684291742388776956*i+805265030931673112977636341455733678841486658975699496743729697422405178060369566875565142481905190220984435431827939316175905131)*x + (22808941079214228371147386047503496229507900825459643563811678411720378172238656251457887757755236678980607854426763718657285311579*i+17551323385788790240295930286977310141048056503120996048101790602541488996734114462078311953604026885250387384333048223099340575478) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3099407231890812766094298013181388086631658481820431583344805444332966300834386838735836281500046754757437014862006734370531732578*i+9409748541906037959263764763461969380786173151154993557611544756867689684452451979297063731285036063568912972228645694397551284622)*x + (20706463941478992826841612120251394516483448012387985474983845258463398572387418298686691914046006490537231919802793031354453949606*i+21055660923511613484161940353715821857141454615199650274328694224478713505980536234014561387137059836957015206888753209959903350309) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3099407231890812766094298013181388086631658481820431583344805444332966300834386838735836281500046754757437014862006734370531732578*i+9409748541906037959263764763461969380786173151154993557611544756867689684452451979297063731285036063568912972228645694397551284622)*x + (20706463941478992826841612120251394516483448012387985474983845258463398572387418298686691914046006490537231919802793031354453949606*i+21055660923511613484161940353715821857141454615199650274328694224478713505980536234014561387137059836957015206888753209959903350309) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15859585436015419708592687800679781443836341247607401926729146326089723335368211077004424153693886496682289477653155172787462762028*i+7327660453925619785621182856004959713053600595807889800520242713522879748394245147535611744098398366301999001838985705473132426454)*x + (21447863214518422507191047238795973626183679221584918773123487960681169138724980575510516996141773027486049331648196627784347516418*i+15980231032627027018392195481654885303334964512583353855350566787696691110286964930057355042979481328511015515153669416760674549893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15859585436015419708592687800679781443836341247607401926729146326089723335368211077004424153693886496682289477653155172787462762028*i+7327660453925619785621182856004959713053600595807889800520242713522879748394245147535611744098398366301999001838985705473132426454)*x + (21447863214518422507191047238795973626183679221584918773123487960681169138724980575510516996141773027486049331648196627784347516418*i+15980231032627027018392195481654885303334964512583353855350566787696691110286964930057355042979481328511015515153669416760674549893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20725629239582380282362166074314322071211127403699277902261375777231937235404515702431915209435674375688280201255804928782576175563*i+15853280510600217703454451865459869606122306520454783686846867494367004379060512208499004153742904989686597603641768537090025311603)*x + (4248721939619274237188321118788448870468065659156538564820079825373847798726030211293700241896644397325384725752071596398387344669*i+11584733659363005767883982378952296712730623920721517686199932201604209264954988073030489989286564254638493929136974879785459298414) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20725629239582380282362166074314322071211127403699277902261375777231937235404515702431915209435674375688280201255804928782576175563*i+15853280510600217703454451865459869606122306520454783686846867494367004379060512208499004153742904989686597603641768537090025311603)*x + (4248721939619274237188321118788448870468065659156538564820079825373847798726030211293700241896644397325384725752071596398387344669*i+11584733659363005767883982378952296712730623920721517686199932201604209264954988073030489989286564254638493929136974879785459298414) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10937689810505044228940986787090185322253845505712631427749228098765946589897556377212951707432707206535565393758174779593562583970*i+3999107372998782018941408389957342518592891503301524198637392979171633263821785938881373362485164789513520221967197213885384451005)*x + (21615107149872538570379040655034076063771506707656862950270415006399962708337926603458537876924234691537162621150429368339142013109*i+5921501108927873375379807539554765900615652175652112603951836283378032995582973484200916485779649366763574821861520061910167014526) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10937689810505044228940986787090185322253845505712631427749228098765946589897556377212951707432707206535565393758174779593562583970*i+3999107372998782018941408389957342518592891503301524198637392979171633263821785938881373362485164789513520221967197213885384451005)*x + (21615107149872538570379040655034076063771506707656862950270415006399962708337926603458537876924234691537162621150429368339142013109*i+5921501108927873375379807539554765900615652175652112603951836283378032995582973484200916485779649366763574821861520061910167014526) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2434874460378618805405507344523785092305552386373888543750779762697349596893162815263681593119832472675808458774625594171109510921*i+22771438376749573287860824055841738481490212146562860718178982965555152881498435081403370995356189784377695879518718878918508761821)*x + (6658484690882643554301001604626855440323879669129169918932955576072677113640973208572637415061519422486561609922661979730243409291*i+19970610844001249790967577998238025536169769069080718721398086614654626547129515344582471962584450593074909487838870755841198631044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2434874460378618805405507344523785092305552386373888543750779762697349596893162815263681593119832472675808458774625594171109510921*i+22771438376749573287860824055841738481490212146562860718178982965555152881498435081403370995356189784377695879518718878918508761821)*x + (6658484690882643554301001604626855440323879669129169918932955576072677113640973208572637415061519422486561609922661979730243409291*i+19970610844001249790967577998238025536169769069080718721398086614654626547129515344582471962584450593074909487838870755841198631044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12864299052580860499323192598123419507655688034961038746876583342874996808805992228782890029217790614012902023755032570805593600228*i+1301582418368263704345560649703015657166978813415893839693009755642409018495322028010951215252951535382919255341396098330446788205)*x + (18238099067844739964238620985080822952505523921637166892608519355677821912586532902418551992884272808410599490876764382560570238590*i+2225649310201022502155403450211006247965413359083990948983564948732812570339916501810145698975800333258329241392609577290521468238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12864299052580860499323192598123419507655688034961038746876583342874996808805992228782890029217790614012902023755032570805593600228*i+1301582418368263704345560649703015657166978813415893839693009755642409018495322028010951215252951535382919255341396098330446788205)*x + (18238099067844739964238620985080822952505523921637166892608519355677821912586532902418551992884272808410599490876764382560570238590*i+2225649310201022502155403450211006247965413359083990948983564948732812570339916501810145698975800333258329241392609577290521468238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6384652238592726674963183037449807833658668933996974741001022490387701876696887982322581013525790469341903174701275806887010510866*i+22919231014363090113167815955452306487458343527301949835192265744993355811308803470769854187276824933342557174913465037603373777500)*x + (20517155115642658223356522343878284249586640774424067409759961658731961160908933524873619829847086345418295820497112525882433812346*i+2704382211566947263959771475037919818460231007653585670118805237237666415852968090921887637415542589204929746173388583579073153813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6384652238592726674963183037449807833658668933996974741001022490387701876696887982322581013525790469341903174701275806887010510866*i+22919231014363090113167815955452306487458343527301949835192265744993355811308803470769854187276824933342557174913465037603373777500)*x + (20517155115642658223356522343878284249586640774424067409759961658731961160908933524873619829847086345418295820497112525882433812346*i+2704382211566947263959771475037919818460231007653585670118805237237666415852968090921887637415542589204929746173388583579073153813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5957746693453075048180263692048635117866316315021335618996544294067354637199732889267028306809824351603587584045730244754170672329*i+3802441350721461886181962821065891827628517708876803631996494610917112735120930676191491116238813197903937384326382040223220799399)*x + (1990858923427275346846484515597835947173945176367975787417788365771557340084165393735186692218120023404617714624997114854052950020*i+903922478314396167365122098602890525839335966374823255535075702476892854608931524413794688244688417511835472564013938699643303112) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5957746693453075048180263692048635117866316315021335618996544294067354637199732889267028306809824351603587584045730244754170672329*i+3802441350721461886181962821065891827628517708876803631996494610917112735120930676191491116238813197903937384326382040223220799399)*x + (1990858923427275346846484515597835947173945176367975787417788365771557340084165393735186692218120023404617714624997114854052950020*i+903922478314396167365122098602890525839335966374823255535075702476892854608931524413794688244688417511835472564013938699643303112) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7385702666951258746552462567041523204509127501020466926732308964056622315967020372885449808448758120975548102873948995500550777344*i+17295129434892295313050387536073268619214239539315123578635390251769716736365501379009133213979894444241521136523148981272391726401)*x + (14234611678696678033098749614094692081187399298801320402709665585538974499764583741542390694569442631298943269814836768263619981229*i+7820027223899987858973667544421951980027992481712951824799053850800858262057145120859643524408441277283713323580881679263383873030) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7385702666951258746552462567041523204509127501020466926732308964056622315967020372885449808448758120975548102873948995500550777344*i+17295129434892295313050387536073268619214239539315123578635390251769716736365501379009133213979894444241521136523148981272391726401)*x + (14234611678696678033098749614094692081187399298801320402709665585538974499764583741542390694569442631298943269814836768263619981229*i+7820027223899987858973667544421951980027992481712951824799053850800858262057145120859643524408441277283713323580881679263383873030) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16568591513614852320262508159774905303109648598284825993563717565326785166214200972257646808247179776213452445927860623738499030739*i+4344131431534146991062140873088434684501478978041515763883319657121364670416006030498157070492713271667625448791514608935150320972)*x + (5889555736095123396059673817542603795808114660414486849507775605182073525602038830037862867526881948814057501143611056775739428951*i+20406769478919729573506807357164307680925313219444903936048154102597061235533476879392369484864742226825815939002883322190600309274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16568591513614852320262508159774905303109648598284825993563717565326785166214200972257646808247179776213452445927860623738499030739*i+4344131431534146991062140873088434684501478978041515763883319657121364670416006030498157070492713271667625448791514608935150320972)*x + (5889555736095123396059673817542603795808114660414486849507775605182073525602038830037862867526881948814057501143611056775739428951*i+20406769478919729573506807357164307680925313219444903936048154102597061235533476879392369484864742226825815939002883322190600309274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4206732178810421964293788567964216468894672499211756972968343350986025685794613825045190316413535770731158272446928036800860216625*i+4973071571231157312970489276311407863524567292415689407515441724652099475655163934866298247602026578010717027465819661970921856718)*x + (19304761667949006896613142959439390132920689615399158905967584669548705877120730067709032059912161444137627986963660933706893190182*i+6630639667700379726518230586190588696877927466571241006519764657432693973380233448470549390619306404899824545794047822919218633757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4206732178810421964293788567964216468894672499211756972968343350986025685794613825045190316413535770731158272446928036800860216625*i+4973071571231157312970489276311407863524567292415689407515441724652099475655163934866298247602026578010717027465819661970921856718)*x + (19304761667949006896613142959439390132920689615399158905967584669548705877120730067709032059912161444137627986963660933706893190182*i+6630639667700379726518230586190588696877927466571241006519764657432693973380233448470549390619306404899824545794047822919218633757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9174817123495288886593904363686503580845393155781823435091370522476619268985837861937054508299568135141786309556029713205109999266*i+4587798689425377281044720359379417569411919910706568705919762758552506118961068635312140086463247842054759270952888890200952604136)*x + (18885088514110726927946251721629700157341231201305855666593961937462152440169850142926285784195886565300028834310082739521340348041*i+5056459700497481038734592992281600300752307198732014048138252992166635509959951061090466566165875770600405099906016055987884888832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9174817123495288886593904363686503580845393155781823435091370522476619268985837861937054508299568135141786309556029713205109999266*i+4587798689425377281044720359379417569411919910706568705919762758552506118961068635312140086463247842054759270952888890200952604136)*x + (18885088514110726927946251721629700157341231201305855666593961937462152440169850142926285784195886565300028834310082739521340348041*i+5056459700497481038734592992281600300752307198732014048138252992166635509959951061090466566165875770600405099906016055987884888832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16599109003796094144813113622470908717362744734361960777605728836533620263740190460287488778939150785022830645008376049233388910034*i+22626000177059685892235650034993092732884185291052237688165345455945602268911760886671520179081544765012985325346461392206223394183)*x + (23478284206501251542416071375274578411255585906783998250278341010286889352150446790787619214482210790378669048254550425760822995136*i+19869697277160313570663205276997163039755160543392805572740835973431697576587873994899723387776727761961186879177055398596271760477) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16599109003796094144813113622470908717362744734361960777605728836533620263740190460287488778939150785022830645008376049233388910034*i+22626000177059685892235650034993092732884185291052237688165345455945602268911760886671520179081544765012985325346461392206223394183)*x + (23478284206501251542416071375274578411255585906783998250278341010286889352150446790787619214482210790378669048254550425760822995136*i+19869697277160313570663205276997163039755160543392805572740835973431697576587873994899723387776727761961186879177055398596271760477) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6566011689353579482647114380215879295942619912734445008097967782827247398314991494945915910955845483480615929223355164873606274839*i+2245515663206739842418383831771622652271864154292129269715122887351514922782528158015078189264346454720891487992282710898653227276)*x + (14497321990933837981356286032176542878759541689801646711054601214330222106764941645386349551632107998349429688541932236190146733230*i+21426782209681356433904114150518863271970121367379458631015828693011989245087788729972983557630277243058853595872542474260709637318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6566011689353579482647114380215879295942619912734445008097967782827247398314991494945915910955845483480615929223355164873606274839*i+2245515663206739842418383831771622652271864154292129269715122887351514922782528158015078189264346454720891487992282710898653227276)*x + (14497321990933837981356286032176542878759541689801646711054601214330222106764941645386349551632107998349429688541932236190146733230*i+21426782209681356433904114150518863271970121367379458631015828693011989245087788729972983557630277243058853595872542474260709637318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20374190690604187908549071373986526556776311010366557110080058952378354136526134375184410228899450895907592912820993199909761342389*i+20070840599217235524420174791363129692950453378524740013106500524083224069143642700016636905162907170451317414644598718038416003420)*x + (21282822655974542084283435256812574334348061505574509140075845082232421067141715401572014606991973334328851911511046733391268319964*i+24028381178102120856859578804617784913441221736963388553029338058612154606029935133735492002194850787613749594275782730937522897600) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20374190690604187908549071373986526556776311010366557110080058952378354136526134375184410228899450895907592912820993199909761342389*i+20070840599217235524420174791363129692950453378524740013106500524083224069143642700016636905162907170451317414644598718038416003420)*x + (21282822655974542084283435256812574334348061505574509140075845082232421067141715401572014606991973334328851911511046733391268319964*i+24028381178102120856859578804617784913441221736963388553029338058612154606029935133735492002194850787613749594275782730937522897600) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5785785473938444181804168113210667977576583216947956660936291341588039778094994973130580331056387973602599879013160068881442182636*i+3926628681148364038185021309632704307893520281535420755466017032914228125863491086041050072963355217519913718846698080151156326882)*x + (8858379429494833394780233484991493589364493322193824417233469080997653120860935120714329144660068495637576988026742952522906300960*i+24005668528831482532576618987179372617019060071909649025898394689443022386237442023916054810248980433723945911329604090185460232854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5785785473938444181804168113210667977576583216947956660936291341588039778094994973130580331056387973602599879013160068881442182636*i+3926628681148364038185021309632704307893520281535420755466017032914228125863491086041050072963355217519913718846698080151156326882)*x + (8858379429494833394780233484991493589364493322193824417233469080997653120860935120714329144660068495637576988026742952522906300960*i+24005668528831482532576618987179372617019060071909649025898394689443022386237442023916054810248980433723945911329604090185460232854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8446434038193454062183589030836828043596115018547568397764274546467471122195815836106150942631006391094373970861919794070133654789*i+24079323192040778202094569964789117442235681323369527874439801950826019691268743481010598607443457172914056690388200201094157998048)*x + (2930517653932399073104374174734704033377954995534827124418529437352682122486984312592496773517044024747445872092125712215455638931*i+5766661423914476684667156023399462082745999301730171916993786671410432299507254541671363128758905930716526674437536127633022021396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8446434038193454062183589030836828043596115018547568397764274546467471122195815836106150942631006391094373970861919794070133654789*i+24079323192040778202094569964789117442235681323369527874439801950826019691268743481010598607443457172914056690388200201094157998048)*x + (2930517653932399073104374174734704033377954995534827124418529437352682122486984312592496773517044024747445872092125712215455638931*i+5766661423914476684667156023399462082745999301730171916993786671410432299507254541671363128758905930716526674437536127633022021396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11488808997435921660328204044350542792610519885128150801423211138930801654716834167098016398344901012017784642309805034515474583994*i+6008157715790964310427829189055819784636394059808745551689934636080843680688803895813480817665976936909553780269903619805157253341)*x + (17346554905981647893230134681506787891679034198585659347507113631354540527953586951425027928352088106734150979983542400620460588534*i+24118756755562259566880311582047959245520030372749980253402998791769733294645220780575276377188155714186024593650585807402765356316) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11488808997435921660328204044350542792610519885128150801423211138930801654716834167098016398344901012017784642309805034515474583994*i+6008157715790964310427829189055819784636394059808745551689934636080843680688803895813480817665976936909553780269903619805157253341)*x + (17346554905981647893230134681506787891679034198585659347507113631354540527953586951425027928352088106734150979983542400620460588534*i+24118756755562259566880311582047959245520030372749980253402998791769733294645220780575276377188155714186024593650585807402765356316) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3724268623222479151170989436358348567012500856316627839039466367221428488067506513485520801217631418674653291122435901410667005440*i+8608057607500771195381886864215754061734696541084580088634017162699560323374493604628184042765983685715502568144685452808736712954)*x + (20296901698413776310439235095628711790762042000229829493862678068945448925901264786659721871197718223205826823880373547380996847536*i+16815774626854318744147421591996651795759144713888405544708683746654604375724740728996681363939137318419125627766980976875392756030) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3724268623222479151170989436358348567012500856316627839039466367221428488067506513485520801217631418674653291122435901410667005440*i+8608057607500771195381886864215754061734696541084580088634017162699560323374493604628184042765983685715502568144685452808736712954)*x + (20296901698413776310439235095628711790762042000229829493862678068945448925901264786659721871197718223205826823880373547380996847536*i+16815774626854318744147421591996651795759144713888405544708683746654604375724740728996681363939137318419125627766980976875392756030) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7476784092212489502280776300618996043623187960071120202287398138636895802484489357634906335511549892314497105270038320510312079296*i+14361201021778776282963496357236006176171209721328220011790529501536064822553384531593889029644270238427700678442158445808500513967)*x + (10269783094390326001832164848915852605080999095123425159760243600278231511664669396530057175798408305358437488024594375513922247352*i+18878307942395922694080509022633393944303581077105852731816250847021994610801911495526494387519633786385219217589802018502630154112) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7476784092212489502280776300618996043623187960071120202287398138636895802484489357634906335511549892314497105270038320510312079296*i+14361201021778776282963496357236006176171209721328220011790529501536064822553384531593889029644270238427700678442158445808500513967)*x + (10269783094390326001832164848915852605080999095123425159760243600278231511664669396530057175798408305358437488024594375513922247352*i+18878307942395922694080509022633393944303581077105852731816250847021994610801911495526494387519633786385219217589802018502630154112) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5194320570788613472843465579713007909259188167847960718819447600141653451320390329073553519854029559967711811577083374386252813755*i+3455928378708769243819945806877245472361180560952548319808780256084189223014349161415128308053832485305558678481418694879620981)*x + (16509907681304147316876035098421021347219009189714289274135629396266667058687641506655652805033570916538588607026673444033266740269*i+450983188254142675692678134929909543854681749426646089018262914174696471133372778140737554099494006275844897236273532407236645281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5194320570788613472843465579713007909259188167847960718819447600141653451320390329073553519854029559967711811577083374386252813755*i+3455928378708769243819945806877245472361180560952548319808780256084189223014349161415128308053832485305558678481418694879620981)*x + (16509907681304147316876035098421021347219009189714289274135629396266667058687641506655652805033570916538588607026673444033266740269*i+450983188254142675692678134929909543854681749426646089018262914174696471133372778140737554099494006275844897236273532407236645281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20119799584131180001969765478915975767623697356811306064860091117749145475904218495373290716623651294599920920968159876528596472578*i+8688680590882950453594087984563712332211605603554182502903797221061184568433485480549108461153359061921934558916276629818126505971)*x + (12488774486482967443143006663398366437152800081366718666032506626446743607903609380429836913961229352869498004615818814400703478187*i+5320922980430311844118885363378164592908940277007331554735288057644741233047536984946413685578836631291212566862142570860030004491) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20119799584131180001969765478915975767623697356811306064860091117749145475904218495373290716623651294599920920968159876528596472578*i+8688680590882950453594087984563712332211605603554182502903797221061184568433485480549108461153359061921934558916276629818126505971)*x + (12488774486482967443143006663398366437152800081366718666032506626446743607903609380429836913961229352869498004615818814400703478187*i+5320922980430311844118885363378164592908940277007331554735288057644741233047536984946413685578836631291212566862142570860030004491) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23635030636174621293516703492357782125748649859567783170395778478505891163477290548487432902166796948324949551515130689619621111052*i+12201823124914937792691601478965037050855324106028929929864090984846302846932370528402942774476548438652932270833994607739856437380)*x + (767463627854522810844021875747039337456200693288493262740660715562599716388654255791173779986957489824092513580316809776628583089*i+23687506151100870535117227647521422576430809574158370411862951187687698235319078093632024720680441732198045743078843629426442487699) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23635030636174621293516703492357782125748649859567783170395778478505891163477290548487432902166796948324949551515130689619621111052*i+12201823124914937792691601478965037050855324106028929929864090984846302846932370528402942774476548438652932270833994607739856437380)*x + (767463627854522810844021875747039337456200693288493262740660715562599716388654255791173779986957489824092513580316809776628583089*i+23687506151100870535117227647521422576430809574158370411862951187687698235319078093632024720680441732198045743078843629426442487699) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16554086217597052948472663766134366834943048946254169677024382442798657060199854993718962973568934143390489992809566562217029877933*i+10342671710431924425234748092199611046659126318601127791977910074538510951566906555472355084369483629729476072261495830459012646853)*x + (19940391885534525127561397241915886417641258129944721219415014697427910242062220774605211211656790284014269729521500072027918255571*i+18363818604023217565980562130776043967109444964174617915702151628869453934122996985124361078104504299116102245545014017463598706752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16554086217597052948472663766134366834943048946254169677024382442798657060199854993718962973568934143390489992809566562217029877933*i+10342671710431924425234748092199611046659126318601127791977910074538510951566906555472355084369483629729476072261495830459012646853)*x + (19940391885534525127561397241915886417641258129944721219415014697427910242062220774605211211656790284014269729521500072027918255571*i+18363818604023217565980562130776043967109444964174617915702151628869453934122996985124361078104504299116102245545014017463598706752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6254073910643481345175435895833462442480172233304518704707988423965892151788170980993284757907094386606751359890707662206476117165*i+16907410796289265032210447771533010940490038915080908319990488813466009054678517426305321171600203734216377955896688111709313979742)*x + (6122531791010752306225098388164051753999274218599563621924418445390573421213340400686094598095054591131074610717301857205215786891*i+15316840932555994461062466336857799275495214027898726836369876160988621489368224742360631167021076929862078405489684931559885692575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6254073910643481345175435895833462442480172233304518704707988423965892151788170980993284757907094386606751359890707662206476117165*i+16907410796289265032210447771533010940490038915080908319990488813466009054678517426305321171600203734216377955896688111709313979742)*x + (6122531791010752306225098388164051753999274218599563621924418445390573421213340400686094598095054591131074610717301857205215786891*i+15316840932555994461062466336857799275495214027898726836369876160988621489368224742360631167021076929862078405489684931559885692575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21257062984695027879559213677415604442628919031738681224593800261186836498999394986639194131657507048900107362581858213093096405188*i+22330662321879584165399851994536842251601378566294598686495173055407716129573173944213896660824258219898653051828605798066273822216)*x + (19576588677905090450505563114955702775306684154197867202595076871159850888868437974529629818010749165821773987194673930220672146694*i+24433589826526695525323498087892222760430315218782328425627407974434395549093144895029790942878118918413328394684049314239309283074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21257062984695027879559213677415604442628919031738681224593800261186836498999394986639194131657507048900107362581858213093096405188*i+22330662321879584165399851994536842251601378566294598686495173055407716129573173944213896660824258219898653051828605798066273822216)*x + (19576588677905090450505563114955702775306684154197867202595076871159850888868437974529629818010749165821773987194673930220672146694*i+24433589826526695525323498087892222760430315218782328425627407974434395549093144895029790942878118918413328394684049314239309283074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5148611599503710870518422697032642308736187045384968236555380492571136391837415491142418890224393772597456852744926690122398215186*i+4615678297040439352561890609851536473412501933567158684778140310569121618337963879077014114445313999234010438457639302466029683416)*x + (18594369558448132598423166357563150042504314576860786042609368478323567395056464129183711853234298274207222882511369441548203027202*i+15391313579939966680561707366972449418612732711852018777478472300111999297634129245230109129951012607031095435283319133104820783110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5148611599503710870518422697032642308736187045384968236555380492571136391837415491142418890224393772597456852744926690122398215186*i+4615678297040439352561890609851536473412501933567158684778140310569121618337963879077014114445313999234010438457639302466029683416)*x + (18594369558448132598423166357563150042504314576860786042609368478323567395056464129183711853234298274207222882511369441548203027202*i+15391313579939966680561707366972449418612732711852018777478472300111999297634129245230109129951012607031095435283319133104820783110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18258401923976049737867592440903859063167610589673324773097428101287530697504365566360869713033330806827275240559696209239710819656*i+14034311911728821373235080547474697307844884048988097201983086606629119053368547057137388570665220442011736966861334431602166217186)*x + (8166251488204566281045778673982871424092763815186627663947512747400228921775549172906175149686502637621994909770612890523711428398*i+4774817250093675239271750763711236293758800036975596837319440652413770538867836122429206326206591109085891290545083063081953918587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18258401923976049737867592440903859063167610589673324773097428101287530697504365566360869713033330806827275240559696209239710819656*i+14034311911728821373235080547474697307844884048988097201983086606629119053368547057137388570665220442011736966861334431602166217186)*x + (8166251488204566281045778673982871424092763815186627663947512747400228921775549172906175149686502637621994909770612890523711428398*i+4774817250093675239271750763711236293758800036975596837319440652413770538867836122429206326206591109085891290545083063081953918587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4924543408504454599333391570061418213492513524620679162852944318484490961555349024926906598618775228822468179090973169123207390734*i+21597519581240806059768104227638712764651541225089694509924678354589413138655206236675785885463282997265816280195896328244461329544)*x + (8233389139212276962034292421592186442960847012596939628938891448629305296577462486413684209731921320887562772502926508375502870442*i+20431344218532627483722116317183364692931706483979202287023046073799399824177184098149605912136736713761942046635292931308382122679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4924543408504454599333391570061418213492513524620679162852944318484490961555349024926906598618775228822468179090973169123207390734*i+21597519581240806059768104227638712764651541225089694509924678354589413138655206236675785885463282997265816280195896328244461329544)*x + (8233389139212276962034292421592186442960847012596939628938891448629305296577462486413684209731921320887562772502926508375502870442*i+20431344218532627483722116317183364692931706483979202287023046073799399824177184098149605912136736713761942046635292931308382122679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24389233943932388386187910267775187128810115953705179373364353638039179002355499340478706725539910238472887448624985827367758812749*i+2743627520507187979704842752251282505635081783596113641031476987620055040644257605705575333752141243669466689861559156633879942679)*x + (17152381508947415990730777939789461080011293315277370005746993154817639766297315315700415854911681226258716668839932495754634464444*i+22697388382809233790552646278978441391850266742011724874545305680351041291370940140357407555000806426979735711636104632014371174902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24389233943932388386187910267775187128810115953705179373364353638039179002355499340478706725539910238472887448624985827367758812749*i+2743627520507187979704842752251282505635081783596113641031476987620055040644257605705575333752141243669466689861559156633879942679)*x + (17152381508947415990730777939789461080011293315277370005746993154817639766297315315700415854911681226258716668839932495754634464444*i+22697388382809233790552646278978441391850266742011724874545305680351041291370940140357407555000806426979735711636104632014371174902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17017402491287006392545460356030013093195430573266220886219213067052620161006886698513774705459756181829516573431429731761654471036*i+1177779072062234950342916185275545511204113172810896385065962291269305556168829271551773102474157537616584553984819450255093397747)*x + (9883594859620836230997785328668428956244644046474202878506180881288071965094679233608250830271527741332927589528551299449674430977*i+10234248350827089372885232566344870640093313824410334559317837039552530643305792178791319637096830273909706158777010455107929514996) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17017402491287006392545460356030013093195430573266220886219213067052620161006886698513774705459756181829516573431429731761654471036*i+1177779072062234950342916185275545511204113172810896385065962291269305556168829271551773102474157537616584553984819450255093397747)*x + (9883594859620836230997785328668428956244644046474202878506180881288071965094679233608250830271527741332927589528551299449674430977*i+10234248350827089372885232566344870640093313824410334559317837039552530643305792178791319637096830273909706158777010455107929514996) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1950974615733510083227473073702387721490471163202061573616548691947973316933021283211832929264551447017322223112858849874666323541*i+15286605042366059003459700591713597502114521502233582102612978926401569561259613562134340429803313565571609881012208127529712943997)*x + (21393707658547889417769945602632841615071022875115914080111482730749983504529260601210623519351373588792636377540221403342377239164*i+14294517809085782840854401318770642017723353706461771223811180854497054259996542419072359348215261102164221792102212924807223853699) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1950974615733510083227473073702387721490471163202061573616548691947973316933021283211832929264551447017322223112858849874666323541*i+15286605042366059003459700591713597502114521502233582102612978926401569561259613562134340429803313565571609881012208127529712943997)*x + (21393707658547889417769945602632841615071022875115914080111482730749983504529260601210623519351373588792636377540221403342377239164*i+14294517809085782840854401318770642017723353706461771223811180854497054259996542419072359348215261102164221792102212924807223853699) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8843404959308112075578962431423341455237369144674560211550694867805152316791744610050555748406704514968536595328181451456390676594*i+17316204279520828915183913979260342833013812110434068686776756819510901794773307256500735085832622888825063528274119396649463597399)*x + (21340905438198608062490499968342917939078640793873317099489007082234847164931737825871088331987525567637758602601560385911086273017*i+7120668910685290380622118027924536117369389469809533382618902170122873098439140630917197936521496875747753997090986513945466769295) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8843404959308112075578962431423341455237369144674560211550694867805152316791744610050555748406704514968536595328181451456390676594*i+17316204279520828915183913979260342833013812110434068686776756819510901794773307256500735085832622888825063528274119396649463597399)*x + (21340905438198608062490499968342917939078640793873317099489007082234847164931737825871088331987525567637758602601560385911086273017*i+7120668910685290380622118027924536117369389469809533382618902170122873098439140630917197936521496875747753997090986513945466769295) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11194526941127110748816240773281919675991204711128055779068419840004087900920077131815941899151519661130317243761341525366801475999*i+11603290263063354134085623708628441321624921436079870005803434065152716375486846763328639126959608591848478757071316086815941923558)*x + (8675346789857395671438926829967390568683570317140165563772488166409940069807449446659718019991176139123038453715744854166479481648*i+24283952300724640686269572112121033144831448239382127608275348630740307921839243907548795195414110745926907795910556691846523290764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11194526941127110748816240773281919675991204711128055779068419840004087900920077131815941899151519661130317243761341525366801475999*i+11603290263063354134085623708628441321624921436079870005803434065152716375486846763328639126959608591848478757071316086815941923558)*x + (8675346789857395671438926829967390568683570317140165563772488166409940069807449446659718019991176139123038453715744854166479481648*i+24283952300724640686269572112121033144831448239382127608275348630740307921839243907548795195414110745926907795910556691846523290764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12963280734999429468491232820019467585004176371556217569252812874241079538971509060868302925262126487389913262626621775355207648476*i+14115386108366081667463018979246117007150142246377879663137155135050020207763174696440197585194802317291346094953250471833791329304)*x + (16193076220398873009284145667832695114720669028684440090188155138579773244628094504798405352718469698611790670012669253669780400859*i+13372289283784515023200727727436726734139608454871029009295129997095329116673332009765874362559685122024238536992448873277541610236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12963280734999429468491232820019467585004176371556217569252812874241079538971509060868302925262126487389913262626621775355207648476*i+14115386108366081667463018979246117007150142246377879663137155135050020207763174696440197585194802317291346094953250471833791329304)*x + (16193076220398873009284145667832695114720669028684440090188155138579773244628094504798405352718469698611790670012669253669780400859*i+13372289283784515023200727727436726734139608454871029009295129997095329116673332009765874362559685122024238536992448873277541610236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (558100522677444286635684604251216915371616738002825073569940281732397981879910117451026255774602057984036769735705866334474325002*i+596587111169742428480316915662824471012605766511672723652896667005669013067891797156963592558701872147972167173879046763481440607)*x + (4621972156991443319128248397410876476445848536381819990351359708395256618791947890403942528916354764441537197355305965664224880944*i+10324801385168998088885111924458946262485856971277994992991426517765511585126787257824635462312762811095645367328871690683154574676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (558100522677444286635684604251216915371616738002825073569940281732397981879910117451026255774602057984036769735705866334474325002*i+596587111169742428480316915662824471012605766511672723652896667005669013067891797156963592558701872147972167173879046763481440607)*x + (4621972156991443319128248397410876476445848536381819990351359708395256618791947890403942528916354764441537197355305965664224880944*i+10324801385168998088885111924458946262485856971277994992991426517765511585126787257824635462312762811095645367328871690683154574676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23239890223260995355869892897526422843608723587125508611966504774274673269071538482615525272295309593024986030935450097436942041576*i+23217572072208337456857482836447776495864755399461421995249200247637497521694695241419115698950636530498412342323478602497790613071)*x + (23093964816545499671890023102536996013910716755995099751434398549757419584488908277852254669590646917398418071503217603921425037738*i+16377397178575872709910043024506237235329418577627866109711079579587096545920120860747347171446674801827594417109346360222149134094) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23239890223260995355869892897526422843608723587125508611966504774274673269071538482615525272295309593024986030935450097436942041576*i+23217572072208337456857482836447776495864755399461421995249200247637497521694695241419115698950636530498412342323478602497790613071)*x + (23093964816545499671890023102536996013910716755995099751434398549757419584488908277852254669590646917398418071503217603921425037738*i+16377397178575872709910043024506237235329418577627866109711079579587096545920120860747347171446674801827594417109346360222149134094) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12970763824471459187711558262319354668218316310933025943256004812995080622681053187821248521641680082822928397616959072033814542945*i+8267176615852795011933393382263579824403674439292444711332659264012458287104325919646212859208170435710285976535919749355277860398)*x + (23334350375926227377233930455746065529265018114886281834981294570308919087971872964709480773589349398261449687949496843798408296966*i+13487987911196718682645003042408702904379263240805230784378964247691416657605465611124296753294594072701668356223506834985399860015) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12970763824471459187711558262319354668218316310933025943256004812995080622681053187821248521641680082822928397616959072033814542945*i+8267176615852795011933393382263579824403674439292444711332659264012458287104325919646212859208170435710285976535919749355277860398)*x + (23334350375926227377233930455746065529265018114886281834981294570308919087971872964709480773589349398261449687949496843798408296966*i+13487987911196718682645003042408702904379263240805230784378964247691416657605465611124296753294594072701668356223506834985399860015) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18053811419140581886533018096238767958583979091230658805050408209742765318112415262775224011128501814105091499935588703284162854908*i+10898971564124949196979142022028938682272844965247914627559355233452657665217649259430407569606843062786109003912670911307891930676)*x + (2891491526051699020582321465700162070982994148191304211325584039610192296881966616832710555286205389876442217174730077010338622549*i+13595176443057888950014016308609761871065124971167888308574995041999201554736789244686010196811044290174446413939969279754307686570) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18053811419140581886533018096238767958583979091230658805050408209742765318112415262775224011128501814105091499935588703284162854908*i+10898971564124949196979142022028938682272844965247914627559355233452657665217649259430407569606843062786109003912670911307891930676)*x + (2891491526051699020582321465700162070982994148191304211325584039610192296881966616832710555286205389876442217174730077010338622549*i+13595176443057888950014016308609761871065124971167888308574995041999201554736789244686010196811044290174446413939969279754307686570) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19749475540298651920998236195329514585909896857186765104632130863902296318526213995675906948101351976767781912056103536202876662376*i+20954431439987379053698341343048917233946132552644781447696475391147596828890491337059785184876345826431197047728290134318986012923)*x + (11112578642185215834268096234948598016109758825750057633008082248278919584864180770434259972890499683667095156006641285292925116707*i+19842502465025430179923979149391346847851192868663007441162343720010215086278100759383852219689499120723176134074731224424567548564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19749475540298651920998236195329514585909896857186765104632130863902296318526213995675906948101351976767781912056103536202876662376*i+20954431439987379053698341343048917233946132552644781447696475391147596828890491337059785184876345826431197047728290134318986012923)*x + (11112578642185215834268096234948598016109758825750057633008082248278919584864180770434259972890499683667095156006641285292925116707*i+19842502465025430179923979149391346847851192868663007441162343720010215086278100759383852219689499120723176134074731224424567548564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3077674143718502076668141893561651587217925903466880454854744244248714041523609328688619895762332804581368698817069994705005112103*i+7488322945704510811684966541913358472908132715313043224475404105557062006209241090581142190913017215265407057687181757708478136317)*x + (11579382259677119660223020245551298904194126876825200362641198558627682951559939624592468644288147935138986818268744597853414890125*i+3531518934814177726695206965086721275982028898409687558388145598815461498215600630419137474303875539691704759988307848787099560203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3077674143718502076668141893561651587217925903466880454854744244248714041523609328688619895762332804581368698817069994705005112103*i+7488322945704510811684966541913358472908132715313043224475404105557062006209241090581142190913017215265407057687181757708478136317)*x + (11579382259677119660223020245551298904194126876825200362641198558627682951559939624592468644288147935138986818268744597853414890125*i+3531518934814177726695206965086721275982028898409687558388145598815461498215600630419137474303875539691704759988307848787099560203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7735125845912039735117464512152528050606615531300207027325119768160878540759997943185463172684765104006487021802141719970355696964*i+23635648555421600881538819027834952731140129709602339583343372868399709543469707619278696494133325658512780133252077086297191627142)*x + (4499132788738609741909436130479885728465217431408695101163816094437712602409380275114133094915362134581800015185365150475796592453*i+6488154796745652136848921552548796498813135834255259881812364536176186589311733586483135548182499135124775831104999343283852504275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7735125845912039735117464512152528050606615531300207027325119768160878540759997943185463172684765104006487021802141719970355696964*i+23635648555421600881538819027834952731140129709602339583343372868399709543469707619278696494133325658512780133252077086297191627142)*x + (4499132788738609741909436130479885728465217431408695101163816094437712602409380275114133094915362134581800015185365150475796592453*i+6488154796745652136848921552548796498813135834255259881812364536176186589311733586483135548182499135124775831104999343283852504275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12917102374942517537692975899983974542695114631201688123305691287616442837201475721618314514796675270853782024214770981769854335108*i+8040167829137706498478851920728818284280166962148401964434139151600670865809097141564514364566429119931485829973542397560942780117)*x + (19702114502083592461230760685094584590863897644994809638767790229702025726335509306232806193382642921021337494725685146004198297709*i+10662879907891529328043856008116540928274086477810380217153584602375646677533401388117526934076574958081771012643841004508170479904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12917102374942517537692975899983974542695114631201688123305691287616442837201475721618314514796675270853782024214770981769854335108*i+8040167829137706498478851920728818284280166962148401964434139151600670865809097141564514364566429119931485829973542397560942780117)*x + (19702114502083592461230760685094584590863897644994809638767790229702025726335509306232806193382642921021337494725685146004198297709*i+10662879907891529328043856008116540928274086477810380217153584602375646677533401388117526934076574958081771012643841004508170479904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11415481945089302537462095374580257770068209305282394034363928739369059515464695070644684534631092805540082554342896273624728609507*i+15100420297218332897499467018632510765628611488853669129775516674083466995817538546658843841484946225895087311385811852453105077736)*x + (15362232483780430270616432789827478799199470001772456836833351046746917541560391162555495384379416171927127799650948396524646732355*i+12561529897052990688459355457389389051810385227505573757190502815984799052461833181675562534692481492982549290427187387224724843561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11415481945089302537462095374580257770068209305282394034363928739369059515464695070644684534631092805540082554342896273624728609507*i+15100420297218332897499467018632510765628611488853669129775516674083466995817538546658843841484946225895087311385811852453105077736)*x + (15362232483780430270616432789827478799199470001772456836833351046746917541560391162555495384379416171927127799650948396524646732355*i+12561529897052990688459355457389389051810385227505573757190502815984799052461833181675562534692481492982549290427187387224724843561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2541830877609578274058883815711548278148822776824482099454093975420699377529021226895397048523751447469784061037254097870837653658*i+9834329350785974637247597902231240618596696940740207199082092256762205309760371102188752954001797730505258110574805503050067910256)*x + (12078952111387415687165702322415013302620886774893100270880315530099599271463894400595447916070957125379699701464105661848248871227*i+9274762601128777444023035687840256109813919311639733356543918766936268028529865791920826043799063996749778383193486827098424686529) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2541830877609578274058883815711548278148822776824482099454093975420699377529021226895397048523751447469784061037254097870837653658*i+9834329350785974637247597902231240618596696940740207199082092256762205309760371102188752954001797730505258110574805503050067910256)*x + (12078952111387415687165702322415013302620886774893100270880315530099599271463894400595447916070957125379699701464105661848248871227*i+9274762601128777444023035687840256109813919311639733356543918766936268028529865791920826043799063996749778383193486827098424686529) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12532687001324500441041256890453367108005429194811509459427442451044565084639887205991548559171501495462231721077312706102920578273*i+10601275760041599590205153150103616523254784571443983968138687238390387877772578855231887794203895065705564142302481090536705382389)*x + (22808896872947892968272674769816943135146483164705475271257722329833442991884644576332003231135030365113079942715433079500143165734*i+17315798716675116893336988157476498706463999771289005760218470254836546587035987876019906067065386605391213106229675719749518093818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12532687001324500441041256890453367108005429194811509459427442451044565084639887205991548559171501495462231721077312706102920578273*i+10601275760041599590205153150103616523254784571443983968138687238390387877772578855231887794203895065705564142302481090536705382389)*x + (22808896872947892968272674769816943135146483164705475271257722329833442991884644576332003231135030365113079942715433079500143165734*i+17315798716675116893336988157476498706463999771289005760218470254836546587035987876019906067065386605391213106229675719749518093818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5474378081693275851789300508019038032318154943300291253811192936847200599789841231531748514121455281029519395626485034010157074246*i+19569581111904122523183088746106855872971726347339043952269555080718185596081903971090902815302161394906560561183884539650384061754)*x + (1103675952671182286790730505685948722406463874703677469531464267662765782131846315933452488338477444268377625783971689215162143870*i+9523620957874185748162387571828992312386243575950040675743227563440431508795202582176099166418984135270462467059459203183120135373) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5474378081693275851789300508019038032318154943300291253811192936847200599789841231531748514121455281029519395626485034010157074246*i+19569581111904122523183088746106855872971726347339043952269555080718185596081903971090902815302161394906560561183884539650384061754)*x + (1103675952671182286790730505685948722406463874703677469531464267662765782131846315933452488338477444268377625783971689215162143870*i+9523620957874185748162387571828992312386243575950040675743227563440431508795202582176099166418984135270462467059459203183120135373) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4579844838342823403735544170303964314747363286286430869637843384298787390351326894986480357310103421181583110029227558808429925226*i+708159286751997273209080882195898916329467031268106779024641792305014150276955064134621946301779933918572533727855310707480638381)*x + (16405697688371612550245660144700949458779718865629024481828018195373190613971305463987429628120734573624700693527576850285577532104*i+15443484631821006369844861981570731021516076351888474307578530394376451783132252277113472544132522116833787590500381078886852681348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4579844838342823403735544170303964314747363286286430869637843384298787390351326894986480357310103421181583110029227558808429925226*i+708159286751997273209080882195898916329467031268106779024641792305014150276955064134621946301779933918572533727855310707480638381)*x + (16405697688371612550245660144700949458779718865629024481828018195373190613971305463987429628120734573624700693527576850285577532104*i+15443484631821006369844861981570731021516076351888474307578530394376451783132252277113472544132522116833787590500381078886852681348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2552048257395085651006564830401218032253631778089613607890488100195555750182157118646557253990260776653195475923317203407445424716*i+14940806323591031582708531941574715846210243122584234316320436925906256876881496934233468452053130856368402268180393803270948761710)*x + (23577104000365549434694447793656779381187789313257233411100878195345935544997176352451388147035203437425235704906766127740231920552*i+5352831586788896409045792031441748463665312230841269047328261731515110398627183106284217350300069057168084785460971677494544948073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2552048257395085651006564830401218032253631778089613607890488100195555750182157118646557253990260776653195475923317203407445424716*i+14940806323591031582708531941574715846210243122584234316320436925906256876881496934233468452053130856368402268180393803270948761710)*x + (23577104000365549434694447793656779381187789313257233411100878195345935544997176352451388147035203437425235704906766127740231920552*i+5352831586788896409045792031441748463665312230841269047328261731515110398627183106284217350300069057168084785460971677494544948073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14091669919687214845501665536114008748080784596762403491656729731333131538119648753881217869515618747878006562381682587425289159803*i+21612587361904201119973248877577637599826743103921329229065064243211673172891789023682804750508864665148825765674051014189461716418)*x + (16213838635045755947239882985531532934627702556786702900306067705460317995114533537899435172269287416965317200223810090514853864843*i+23498957338077935319012874370839771700913547099621089367737575796585904510216839284235541756504358847873314810217254358831123845452) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14091669919687214845501665536114008748080784596762403491656729731333131538119648753881217869515618747878006562381682587425289159803*i+21612587361904201119973248877577637599826743103921329229065064243211673172891789023682804750508864665148825765674051014189461716418)*x + (16213838635045755947239882985531532934627702556786702900306067705460317995114533537899435172269287416965317200223810090514853864843*i+23498957338077935319012874370839771700913547099621089367737575796585904510216839284235541756504358847873314810217254358831123845452) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15604626135788475856401496525470131192573372142421542202447155921489620708195486296787855405212043959892919842485668257583621082823*i+6403097148213901351019147902057588063441258871105639398764011363867831211631804590336841218216403612534286749034637209770509299071)*x + (16927443796065056509295085137552281083377996892293018064891588452354884826832199764395872874373827385704713550300337903906466308662*i+23230592512763748941532042926831534567647790729289008938884745366392528003537129142435620666774108049853449326674644691617405376138) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15604626135788475856401496525470131192573372142421542202447155921489620708195486296787855405212043959892919842485668257583621082823*i+6403097148213901351019147902057588063441258871105639398764011363867831211631804590336841218216403612534286749034637209770509299071)*x + (16927443796065056509295085137552281083377996892293018064891588452354884826832199764395872874373827385704713550300337903906466308662*i+23230592512763748941532042926831534567647790729289008938884745366392528003537129142435620666774108049853449326674644691617405376138) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17169905425545232362531205175321961673801692331579013759828420015760175173974413049671202073062849074799974167051981336320822122403*i+9471903521139816923528442636000739605373120950511949457850462370253383708017990353128484053792075683627949583993088156524961225570)*x + (5592073853916474080797015435062263212433046749994008792002141245675585967619934983054789998048479965322073876454482786987120568425*i+4590389117584811428654184235685443531884575088209955112020180813412163043797309559558740630190776732686979325441045017988106929691) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17169905425545232362531205175321961673801692331579013759828420015760175173974413049671202073062849074799974167051981336320822122403*i+9471903521139816923528442636000739605373120950511949457850462370253383708017990353128484053792075683627949583993088156524961225570)*x + (5592073853916474080797015435062263212433046749994008792002141245675585967619934983054789998048479965322073876454482786987120568425*i+4590389117584811428654184235685443531884575088209955112020180813412163043797309559558740630190776732686979325441045017988106929691) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16940945561568368762959884133519103747339214656908294449624325224858694753896988332472148170938100195738221524425677666435623312083*i+19832568733483072703434849507314522931565035607217569192070830315140786070917355942779782617412210530681985300693530709560238892292)*x + (52352689173710772952977389377574014734670843016647785898330973651955293300873671801280472444265801299625847840584496883932011519*i+7455680150318730852872934017117394287975850186226666792738647531523432194643933795345952278328248699072486828329617584171862242948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16940945561568368762959884133519103747339214656908294449624325224858694753896988332472148170938100195738221524425677666435623312083*i+19832568733483072703434849507314522931565035607217569192070830315140786070917355942779782617412210530681985300693530709560238892292)*x + (52352689173710772952977389377574014734670843016647785898330973651955293300873671801280472444265801299625847840584496883932011519*i+7455680150318730852872934017117394287975850186226666792738647531523432194643933795345952278328248699072486828329617584171862242948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16124796353446681864570103024631624280415334727774385988405588401042510363410535924402228693201934452485064596956956309517676102834*i+13573619654717964065269065696367862942446675969436414285893588181596686054507518470154577452219143256640830250545282241578502605729)*x + (7686032311617272290712741962438492417709709368557329331093584060657285388965412865018994476363274562748409008805506616425972514955*i+141174141322720246438440018056396388971575266009327727835024168362613037400805065190030887203257685655606752775484270718350488159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16124796353446681864570103024631624280415334727774385988405588401042510363410535924402228693201934452485064596956956309517676102834*i+13573619654717964065269065696367862942446675969436414285893588181596686054507518470154577452219143256640830250545282241578502605729)*x + (7686032311617272290712741962438492417709709368557329331093584060657285388965412865018994476363274562748409008805506616425972514955*i+141174141322720246438440018056396388971575266009327727835024168362613037400805065190030887203257685655606752775484270718350488159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3665444641892852493486426231665357459850702750778494032946005434403708695889537700692062593867540066081078967472102107883451974324*i+1590019420856188617687680447236896146335442731661118326323128985576996112893927234311822500221523393441265700455068743121999490725)*x + (9431096229890448848725492242613815998277573344113829339917667222780685144563723012212531738203107576145998015936677971305194581482*i+4637714182314126007941178732479822046704905258247313444826938099362670434571516073668618583819294588798950321600855486771039389535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3665444641892852493486426231665357459850702750778494032946005434403708695889537700692062593867540066081078967472102107883451974324*i+1590019420856188617687680447236896146335442731661118326323128985576996112893927234311822500221523393441265700455068743121999490725)*x + (9431096229890448848725492242613815998277573344113829339917667222780685144563723012212531738203107576145998015936677971305194581482*i+4637714182314126007941178732479822046704905258247313444826938099362670434571516073668618583819294588798950321600855486771039389535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23789244641096217117302659825208375246862750118712658410837703157251228042789167501708084939774690977780061341904885434945641079471*i+20372698747161155953123196765523129211839713204871615206200995867316619858926432726623227101645252798371062157541699193658451794316)*x + (19183699397804798424273809812155288201122057874324457002139847981316175837323904994686579088242750272247053072698774521719179292873*i+8487289159342587038411720746201278225593079884219740578618569224797281695214440478259978689807165906928512205025813867177805147205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23789244641096217117302659825208375246862750118712658410837703157251228042789167501708084939774690977780061341904885434945641079471*i+20372698747161155953123196765523129211839713204871615206200995867316619858926432726623227101645252798371062157541699193658451794316)*x + (19183699397804798424273809812155288201122057874324457002139847981316175837323904994686579088242750272247053072698774521719179292873*i+8487289159342587038411720746201278225593079884219740578618569224797281695214440478259978689807165906928512205025813867177805147205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22958691035936908820029292415966138728487020385314371230879057562226348338054530341009726507498318764430079250489594785940479570600*i+14196470422496122889956510022024932842724073720193830834206411858120025861173679080051385455724024523538710047080558835163520048479)*x + (12684446277917204589660673520192709847462961181087798601248197467170532651937514207591419321930920022958093321152296648988008656313*i+20290759691186897972840778264291335114826369839865343987136105935224250366408791789410576512734101569913073883664539422933595580456) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22958691035936908820029292415966138728487020385314371230879057562226348338054530341009726507498318764430079250489594785940479570600*i+14196470422496122889956510022024932842724073720193830834206411858120025861173679080051385455724024523538710047080558835163520048479)*x + (12684446277917204589660673520192709847462961181087798601248197467170532651937514207591419321930920022958093321152296648988008656313*i+20290759691186897972840778264291335114826369839865343987136105935224250366408791789410576512734101569913073883664539422933595580456) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10679281614715413789845682495987284218157562427639548851196979258135749201811895187587919081394217842184872646413778225141601311998*i+8758241081142602348131086644961163978026496199135051541013070419800810164509490615992294195242009448016752164624682334447196766731)*x + (14219169872237809475675653916327993493827716413273328026911434411917215095650453639681976725190596335653493067881593855338300471856*i+15031389408067639280981239054915291309565537314543111899652538734448245777545275802805836340493663700862760357559714124542309359560) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10679281614715413789845682495987284218157562427639548851196979258135749201811895187587919081394217842184872646413778225141601311998*i+8758241081142602348131086644961163978026496199135051541013070419800810164509490615992294195242009448016752164624682334447196766731)*x + (14219169872237809475675653916327993493827716413273328026911434411917215095650453639681976725190596335653493067881593855338300471856*i+15031389408067639280981239054915291309565537314543111899652538734448245777545275802805836340493663700862760357559714124542309359560) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14241567575228802963194449767767184607013309425185252335124885359196052042006806071265496644153391749574366984552804472715856571987*i+16208477564505442014461291204596056452847940386684644826662217922528779755386224400057247673049553522279236099432662576524944882550)*x + (22199086037035037081690123863253758228988429320020089804312277072763472109866022797323190516499309947454158607965121102646985921940*i+21946390905938905350311647508674102653394647741047030477602038963928411357772870090775949745816504634267816212221907788983019609982) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14241567575228802963194449767767184607013309425185252335124885359196052042006806071265496644153391749574366984552804472715856571987*i+16208477564505442014461291204596056452847940386684644826662217922528779755386224400057247673049553522279236099432662576524944882550)*x + (22199086037035037081690123863253758228988429320020089804312277072763472109866022797323190516499309947454158607965121102646985921940*i+21946390905938905350311647508674102653394647741047030477602038963928411357772870090775949745816504634267816212221907788983019609982) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19772702971528508114641176731686357525690376710237855544286679957057945892775226208269960795054940024466731993064218475039356408823*i+1572023916028062357298783333586025885456681922371842760471380051233900128485247962411477280172830532217731489336004266637324201907)*x + (4107055352533123961339729489335414396398843562526617659820079534378792197812247218044241346242353369091581454870540018878594999236*i+15318712737543364611766835759651636576983672341241544377229111733323785310745390410959401323999933279316216617141546931830287249683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19772702971528508114641176731686357525690376710237855544286679957057945892775226208269960795054940024466731993064218475039356408823*i+1572023916028062357298783333586025885456681922371842760471380051233900128485247962411477280172830532217731489336004266637324201907)*x + (4107055352533123961339729489335414396398843562526617659820079534378792197812247218044241346242353369091581454870540018878594999236*i+15318712737543364611766835759651636576983672341241544377229111733323785310745390410959401323999933279316216617141546931830287249683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3649566967950610638626932938262255903553122982105249112802166874437565079051937155955080068531388468202356806466881107025882736033*i+7760971598474802592752420123237379301717596938125955510656954225329891486199467420069262683684776721577336973784983256470317864924)*x + (1809405392285539150645457094452472061953148068698087041221442316348208253666895652750286136806277662743738312995711832571721339771*i+903991244724311913823216443294294202677748349900832429288550813206636244761938319364283182079402939119677107639882066172839816386) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3649566967950610638626932938262255903553122982105249112802166874437565079051937155955080068531388468202356806466881107025882736033*i+7760971598474802592752420123237379301717596938125955510656954225329891486199467420069262683684776721577336973784983256470317864924)*x + (1809405392285539150645457094452472061953148068698087041221442316348208253666895652750286136806277662743738312995711832571721339771*i+903991244724311913823216443294294202677748349900832429288550813206636244761938319364283182079402939119677107639882066172839816386) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3165401970596827355891548244814721026702598915449494153982581847342658632104773621251103016702211342182109777460228225669330712162*i+8201126136701602618221042265907591307453206746659715674992619412663853148297319654591501141728896101320129458959074179169476770858)*x + (20972833186241503122984916615597820061922988941417418002252595385725926671941496782352109180047042575312260748066560096099851191270*i+3452601839412903073701520862500985273090587293293895206775719366738057250954595414199179594757607249049338047864889557784823241672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3165401970596827355891548244814721026702598915449494153982581847342658632104773621251103016702211342182109777460228225669330712162*i+8201126136701602618221042265907591307453206746659715674992619412663853148297319654591501141728896101320129458959074179169476770858)*x + (20972833186241503122984916615597820061922988941417418002252595385725926671941496782352109180047042575312260748066560096099851191270*i+3452601839412903073701520862500985273090587293293895206775719366738057250954595414199179594757607249049338047864889557784823241672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (553457636634261361227711435066462615357782014092351315969962576236624700772890413240298172673543946466911990259067474603178592573*i+10669160579453993254995150696459772689926187202751847137041255798377594679767337557682883179777539703334350248425970263770054320738)*x + (14231923846825740599207966682582141387543091413973514457251567822143303855364240153552680487823326841747746504492893915578094141387*i+1872936551259599237925183044854006701558225866987561940185149745592355814966577885272822472257901276911107430994555146474858804872) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (553457636634261361227711435066462615357782014092351315969962576236624700772890413240298172673543946466911990259067474603178592573*i+10669160579453993254995150696459772689926187202751847137041255798377594679767337557682883179777539703334350248425970263770054320738)*x + (14231923846825740599207966682582141387543091413973514457251567822143303855364240153552680487823326841747746504492893915578094141387*i+1872936551259599237925183044854006701558225866987561940185149745592355814966577885272822472257901276911107430994555146474858804872) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23776947959235641246192793354944785388764525396656872822161136479677157224215793533418469559049341232160573850453792323950017051872*i+12928455878645073899440923893928397983255235383045484151822871026862592154437390289247715946507505440522488589596102931055267343997)*x + (14123774189022731999052496936150375500715155511390355398253492061333672792902839292930772234300868295737362843189554789196914598126*i+12245159909954659310602006360385853087207400188337955543272101111158533711215010437892134247375548643789931287106854308245512443565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23776947959235641246192793354944785388764525396656872822161136479677157224215793533418469559049341232160573850453792323950017051872*i+12928455878645073899440923893928397983255235383045484151822871026862592154437390289247715946507505440522488589596102931055267343997)*x + (14123774189022731999052496936150375500715155511390355398253492061333672792902839292930772234300868295737362843189554789196914598126*i+12245159909954659310602006360385853087207400188337955543272101111158533711215010437892134247375548643789931287106854308245512443565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23001567036297308785097536242347401073469696536940176691532387265049914713806840111014485536129416314559413021786698085413781525334*i+23939851781318351249024713197513075461228452262153169026849186822301268582304401557812659303957206849597076092655263656349347733993)*x + (18390618240873710487583766458511258085338014048027991166584357491749228133881665863090830708400074458885298385675068648377989041326*i+1822636851944354456436453728346681863148310578190797296390088391741360084742686954755437296877349130696758354570673967147363810779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23001567036297308785097536242347401073469696536940176691532387265049914713806840111014485536129416314559413021786698085413781525334*i+23939851781318351249024713197513075461228452262153169026849186822301268582304401557812659303957206849597076092655263656349347733993)*x + (18390618240873710487583766458511258085338014048027991166584357491749228133881665863090830708400074458885298385675068648377989041326*i+1822636851944354456436453728346681863148310578190797296390088391741360084742686954755437296877349130696758354570673967147363810779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11743011870588045234434672241443214839468819202386041646168395861986842927603854628960361956888052350886686971089328621560247072169*i+13762580287613267773438924654985567680703881925259651678796978911254935380107551151415068081760549574429936018877320793087661358249)*x + (13722889900737131267560569559800886326214272482486282443056537099876083367842749977267689796862876015898211108608517695892509306553*i+7902377449193834136861913533833528542918844430978309019548930755893695670808135424507228868974324060003471085434910179089951934571) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11743011870588045234434672241443214839468819202386041646168395861986842927603854628960361956888052350886686971089328621560247072169*i+13762580287613267773438924654985567680703881925259651678796978911254935380107551151415068081760549574429936018877320793087661358249)*x + (13722889900737131267560569559800886326214272482486282443056537099876083367842749977267689796862876015898211108608517695892509306553*i+7902377449193834136861913533833528542918844430978309019548930755893695670808135424507228868974324060003471085434910179089951934571) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11070461147193107881467898867859672128627125240184188051518663477223145984761543054025907111269508329475655130881201867630716475158*i+5247642066098726561131554119580332645680584101473638600078237421046662841145415044884608284885439731970191354323418125261957061356)*x + (23309496099482363030093933853663907187762634897207461018832240627865968872333982248833711715842665938515568636708785486752889914054*i+4077752849483012080212659578572297698169517590538485478435905410975507942089130695720806332698392822001085317983989513843932147051) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11070461147193107881467898867859672128627125240184188051518663477223145984761543054025907111269508329475655130881201867630716475158*i+5247642066098726561131554119580332645680584101473638600078237421046662841145415044884608284885439731970191354323418125261957061356)*x + (23309496099482363030093933853663907187762634897207461018832240627865968872333982248833711715842665938515568636708785486752889914054*i+4077752849483012080212659578572297698169517590538485478435905410975507942089130695720806332698392822001085317983989513843932147051) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23592087698176844918676216219715741330829654235294386132721758756257018224813909242262400632529133206709307728409126126914144631149*i+20084684851023762236968040314620415626683324660089877607658784176172339212624330541636634591792799688917911371626178913840524142597)*x + (12577238120482138039295840571340446665122614936386591452845765504064138613108935622091152870170483731041871425294846701404719250120*i+132365541576241518707275054109653055356202128652840406084414115309493332531202052125234926919136731561486357044466838767497161037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23592087698176844918676216219715741330829654235294386132721758756257018224813909242262400632529133206709307728409126126914144631149*i+20084684851023762236968040314620415626683324660089877607658784176172339212624330541636634591792799688917911371626178913840524142597)*x + (12577238120482138039295840571340446665122614936386591452845765504064138613108935622091152870170483731041871425294846701404719250120*i+132365541576241518707275054109653055356202128652840406084414115309493332531202052125234926919136731561486357044466838767497161037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18466901024969027881432934392131943039622173850340391870723383301949686640631934013505085066483575386794256781718997099968113948443*i+2474649988575632331255698850759691265128821475492750996282158696897780101199421059368378023890092388938237123304277693012148563032)*x + (6194162358174257307408756446501087304766344100577929441189030905141426270720912514549046319931503758568458322360253699694037974554*i+10868209418804868229516197831048691949043999605963445990918067212295831665068352845650868881000261949067425491735125173857370963079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18466901024969027881432934392131943039622173850340391870723383301949686640631934013505085066483575386794256781718997099968113948443*i+2474649988575632331255698850759691265128821475492750996282158696897780101199421059368378023890092388938237123304277693012148563032)*x + (6194162358174257307408756446501087304766344100577929441189030905141426270720912514549046319931503758568458322360253699694037974554*i+10868209418804868229516197831048691949043999605963445990918067212295831665068352845650868881000261949067425491735125173857370963079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14203955181117558557752456655262221529319980215180123760988094015969267436455224752457020319500938509325880082078467248635807956071*i+1225538842431416120105900969443769457406873957921057749234520135660182053320753365384536092319217835576913715037688965154349780012)*x + (16299327327400293508986721125026387719449096307100002211365564726087856493172376362464335396636775060144128552400954623122031629904*i+14939016776868455980520165842858546841382787988998645572877429611479529137971037965358372926237552843481168228609384011782718543591) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14203955181117558557752456655262221529319980215180123760988094015969267436455224752457020319500938509325880082078467248635807956071*i+1225538842431416120105900969443769457406873957921057749234520135660182053320753365384536092319217835576913715037688965154349780012)*x + (16299327327400293508986721125026387719449096307100002211365564726087856493172376362464335396636775060144128552400954623122031629904*i+14939016776868455980520165842858546841382787988998645572877429611479529137971037965358372926237552843481168228609384011782718543591) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18078627683760530464108682578769217158290291495655023297047963369404708187646435308105125259469208839423547657704167875822983387800*i+21019455887521992030694680157311321781912032875035638105480919961015080613725484671448315301462088358848429695839932031674079986499)*x + (7900885984771475514746361628867143829378021486039581011536660011562800852075227171184266792961780671643155204895140577044823763190*i+11219845150834222030548684781045414022094860352594544286188201976367186152625719818695496533727373526180117252857723394193526302122) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18078627683760530464108682578769217158290291495655023297047963369404708187646435308105125259469208839423547657704167875822983387800*i+21019455887521992030694680157311321781912032875035638105480919961015080613725484671448315301462088358848429695839932031674079986499)*x + (7900885984771475514746361628867143829378021486039581011536660011562800852075227171184266792961780671643155204895140577044823763190*i+11219845150834222030548684781045414022094860352594544286188201976367186152625719818695496533727373526180117252857723394193526302122) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18061426887554354707609755673266588726924916442337600234855744562004289486969454456554802150089902247088078170910854932318570847298*i+2736926588572911363086932868396106431504659824655852593356565616994242022029139787402481195691437784899375176891403581179978427870)*x + (14023343944964636103247539086985934839002759603392000256492318222080900656012629827760365947317431510885040874900505064950395568065*i+6773296242412589505623063729134497032961666111364057398163514651843200921116273357862287270331429986213916090600659520248971116267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18061426887554354707609755673266588726924916442337600234855744562004289486969454456554802150089902247088078170910854932318570847298*i+2736926588572911363086932868396106431504659824655852593356565616994242022029139787402481195691437784899375176891403581179978427870)*x + (14023343944964636103247539086985934839002759603392000256492318222080900656012629827760365947317431510885040874900505064950395568065*i+6773296242412589505623063729134497032961666111364057398163514651843200921116273357862287270331429986213916090600659520248971116267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12771845751164632242682190265385258764639948133500888775541410642390163346600913297436797037710442933584783009950279959893730758641*i+16476468729383949107177888504180921531331739585680556440987424329928699487877065556505901456172159008214751145383837631668377194930)*x + (1699035916323178334321142651902427931780708786643294492584643670703776064427978027731538922473059190054202450551739118317518336717*i+447026842297456495515254172550915688193578432138974839268954093432367489868167315667579753884614820042296311163661815235188308733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12771845751164632242682190265385258764639948133500888775541410642390163346600913297436797037710442933584783009950279959893730758641*i+16476468729383949107177888504180921531331739585680556440987424329928699487877065556505901456172159008214751145383837631668377194930)*x + (1699035916323178334321142651902427931780708786643294492584643670703776064427978027731538922473059190054202450551739118317518336717*i+447026842297456495515254172550915688193578432138974839268954093432367489868167315667579753884614820042296311163661815235188308733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8042939314189516797461996051903190239832552856296695055688822994426103884122798879043786690444718768286736321911119602977381216348*i+24117915371102446337713539935502981916727664941763566407743703128525759762516834716101377265382377195007858373906427226565322451580)*x + (4764480507671171341839240347424813972892941373371146108256099389591089068884066607923118534533844640390204633767748068491932921582*i+8381725243965537211213819260866455146672507398765229983081246744086178252059243106880161797586438487430709148044129666180260498693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8042939314189516797461996051903190239832552856296695055688822994426103884122798879043786690444718768286736321911119602977381216348*i+24117915371102446337713539935502981916727664941763566407743703128525759762516834716101377265382377195007858373906427226565322451580)*x + (4764480507671171341839240347424813972892941373371146108256099389591089068884066607923118534533844640390204633767748068491932921582*i+8381725243965537211213819260866455146672507398765229983081246744086178252059243106880161797586438487430709148044129666180260498693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1743469040845859761974961117145013698019113085994558449095971562515851567779014976344061015279880339623501278064102746336205802920*i+20165904725503634013817387732752321616482822229556017160470637839173649345605845198378680145822491729674904829786748410379988260069)*x + (19241575860049813001331627076969160404173004270701206254981907833313311858816128005924107641998234589434885758053456614517032606506*i+3784912890764563252805725197518380485073026451340114908911324768374738837601553798406659123027811488774860905137532071473549912499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1743469040845859761974961117145013698019113085994558449095971562515851567779014976344061015279880339623501278064102746336205802920*i+20165904725503634013817387732752321616482822229556017160470637839173649345605845198378680145822491729674904829786748410379988260069)*x + (19241575860049813001331627076969160404173004270701206254981907833313311858816128005924107641998234589434885758053456614517032606506*i+3784912890764563252805725197518380485073026451340114908911324768374738837601553798406659123027811488774860905137532071473549912499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22866176642013633064428911669768393641135279977548741371006441128299902932460100456826155953229555110282121064961767352365275884418*i+22594716244368290086762127526348981648930522546665535332528651993532075512565838405975443157272570600546480983732785437448982381476)*x + (17647046866545650346924076167095788524352130305364021310667966050063509858323639835981829333450783587353257234546338819366471054291*i+17875992730236970811838628016899756543331565808297016025300284660733905859108309079132139299998128985807624972859978147153649524460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22866176642013633064428911669768393641135279977548741371006441128299902932460100456826155953229555110282121064961767352365275884418*i+22594716244368290086762127526348981648930522546665535332528651993532075512565838405975443157272570600546480983732785437448982381476)*x + (17647046866545650346924076167095788524352130305364021310667966050063509858323639835981829333450783587353257234546338819366471054291*i+17875992730236970811838628016899756543331565808297016025300284660733905859108309079132139299998128985807624972859978147153649524460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12897537010126120611547781671357490575827982158375517616676970721572702942965484547200811465109493236694353105897937696826196441908*i+431172165959786158991996774992114622883529089291602319574889246174273405509896798357254803273946683955321447714348053301066710810)*x + (1107705172488305866878453525989046670708469796844548179071918273165980136451596444866320258041488228782627737326166817393858234934*i+18425381099888994088773391526044974595296669380768397213545968829716470352204454309571020841474041657205034060512449166488579601759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12897537010126120611547781671357490575827982158375517616676970721572702942965484547200811465109493236694353105897937696826196441908*i+431172165959786158991996774992114622883529089291602319574889246174273405509896798357254803273946683955321447714348053301066710810)*x + (1107705172488305866878453525989046670708469796844548179071918273165980136451596444866320258041488228782627737326166817393858234934*i+18425381099888994088773391526044974595296669380768397213545968829716470352204454309571020841474041657205034060512449166488579601759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3352319675130819098966948150707272484558310515184840494562195620498819217160853340177821533328607716797347761693008425520359351543*i+8271746343159217104992139177763006588220166697626572714590863863309706905050089100571488284117687012597990115362669745777694259782)*x + (11739925155359576225238068623121780357882705948236059718421768219570704936244143813201518744782576087913348662498977733157159588925*i+6468121213270195374041458482784980565693497013331910218400180643112231198036855281131695495165645415035078849695291164999076852773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3352319675130819098966948150707272484558310515184840494562195620498819217160853340177821533328607716797347761693008425520359351543*i+8271746343159217104992139177763006588220166697626572714590863863309706905050089100571488284117687012597990115362669745777694259782)*x + (11739925155359576225238068623121780357882705948236059718421768219570704936244143813201518744782576087913348662498977733157159588925*i+6468121213270195374041458482784980565693497013331910218400180643112231198036855281131695495165645415035078849695291164999076852773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9510251411559806367883287254726743189074688907459498070791581726529937600043370306110215069684738090121516388804656278435213112205*i+17716649525458121041333320901485541490655851626136375191902068831997162634136922848979845503990546002199471974267891946694409877784)*x + (2562738134861734172120054908934019050408275841288703544769444719129264613378393177524089581076709969094336403969356196128778885088*i+8297142612775355939821822728668608402407858510430977607501087734434579574190062394643357535312283253495010294848692837687423912108) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9510251411559806367883287254726743189074688907459498070791581726529937600043370306110215069684738090121516388804656278435213112205*i+17716649525458121041333320901485541490655851626136375191902068831997162634136922848979845503990546002199471974267891946694409877784)*x + (2562738134861734172120054908934019050408275841288703544769444719129264613378393177524089581076709969094336403969356196128778885088*i+8297142612775355939821822728668608402407858510430977607501087734434579574190062394643357535312283253495010294848692837687423912108) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11974271325837641315797630282199862214796827756263795133659052448429707137930009123285491112028231033852618027682824961255004425316*i+11139667715336316829160724422572548755538954900601406788370991669479310139623085799125383858082421227607745079824271474765504223083)*x + (4686475038024119091543808695166163264463050639413410966400430404534975563920860021390348467950936527185708675059970510974274987931*i+6823641392724615247974822474864198121377244582276327836698382529737126877898202937609735556363295980054245759333508695880252539237) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11974271325837641315797630282199862214796827756263795133659052448429707137930009123285491112028231033852618027682824961255004425316*i+11139667715336316829160724422572548755538954900601406788370991669479310139623085799125383858082421227607745079824271474765504223083)*x + (4686475038024119091543808695166163264463050639413410966400430404534975563920860021390348467950936527185708675059970510974274987931*i+6823641392724615247974822474864198121377244582276327836698382529737126877898202937609735556363295980054245759333508695880252539237) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14062681982062537323076194328426932732417664904140098169494244516900094606842479004678616377171907720088579025823221785730758258734*i+23977331180982594508032989157472701023423503247007300462217499170895029680466903109625737276675958592216328134231005349541212368925)*x + (20660774902893981331806233805317100791397633495152105294865757715599440457137183499366371565685637380934978333180189787086069313598*i+11669051310994255365070891928695362855882219378499101625122112868911372417395581755496273207506918218108094938306220621712010629218) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14062681982062537323076194328426932732417664904140098169494244516900094606842479004678616377171907720088579025823221785730758258734*i+23977331180982594508032989157472701023423503247007300462217499170895029680466903109625737276675958592216328134231005349541212368925)*x + (20660774902893981331806233805317100791397633495152105294865757715599440457137183499366371565685637380934978333180189787086069313598*i+11669051310994255365070891928695362855882219378499101625122112868911372417395581755496273207506918218108094938306220621712010629218) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4584410447827090984908430692308834254540372396099101398328628803454733145549846158781508828407133154007826184344551337480763428690*i+1122037045047516616521901234042388441377345989354206320661237588812429429499333184507071883408991906069938328736779937620278319428)*x + (7057094061910383146878635682546567027017532548534538662836724226095493354109234782486910664834916629182599988239806895370707862891*i+15654898935038695284878684114982440284225460622770418993758162728579745459310760989080146103738898087114102273581346566666115627356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4584410447827090984908430692308834254540372396099101398328628803454733145549846158781508828407133154007826184344551337480763428690*i+1122037045047516616521901234042388441377345989354206320661237588812429429499333184507071883408991906069938328736779937620278319428)*x + (7057094061910383146878635682546567027017532548534538662836724226095493354109234782486910664834916629182599988239806895370707862891*i+15654898935038695284878684114982440284225460622770418993758162728579745459310760989080146103738898087114102273581346566666115627356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16949208459788877841101346774065074642242211298883367263758041036099872961651963609314638137199435984898973333251801104415896296427*i+23586130494435825846299044725629957798164145282984055253669267898648496644025332535685135700622796587073023307690739390451915940362)*x + (23598107320946728260329933687462306254155543823084423114368498755057955039039421662829281276338018928642267147701085954193762960997*i+10784735267121862374669090373129636048119975640839761881365288910366108556034040617680020798743380813821302823554880253362759278290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16949208459788877841101346774065074642242211298883367263758041036099872961651963609314638137199435984898973333251801104415896296427*i+23586130494435825846299044725629957798164145282984055253669267898648496644025332535685135700622796587073023307690739390451915940362)*x + (23598107320946728260329933687462306254155543823084423114368498755057955039039421662829281276338018928642267147701085954193762960997*i+10784735267121862374669090373129636048119975640839761881365288910366108556034040617680020798743380813821302823554880253362759278290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2035193882741230418883796447380340715803167487641917856722435331675510178281915222457492858565224528101932718187647344763073639247*i+12917540134992196437183131645910730821645170944848354275614946662475552699872640528218366951483712905866307163187801698502752758694)*x + (21076504082184330361326548484257814572368745418499990256783437596239604838913836315612901340663169104697119339704559713210518513542*i+7862288731807151538982199585915145652779404391958483916219581988625896672336468305473803367091000161444157605437057696523574423243) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2035193882741230418883796447380340715803167487641917856722435331675510178281915222457492858565224528101932718187647344763073639247*i+12917540134992196437183131645910730821645170944848354275614946662475552699872640528218366951483712905866307163187801698502752758694)*x + (21076504082184330361326548484257814572368745418499990256783437596239604838913836315612901340663169104697119339704559713210518513542*i+7862288731807151538982199585915145652779404391958483916219581988625896672336468305473803367091000161444157605437057696523574423243) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6803787836307450204922868859483616401378841217721527808273665840038136881856639118621489938582862740997718517125646221473879384178*i+21480587894984006708507696813560031880418422203120731680444081197738193376551133489257354218650351292068887361682465186212171302098)*x + (21190211808514661490995889636809958421613022599059700224882302507046708356111594650436783590567652508521866730233532203222979932608*i+1495865987192807140570432983701851227678206214324414714879677936176654447516458315086841391484592286010144081251893883842772679598) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6803787836307450204922868859483616401378841217721527808273665840038136881856639118621489938582862740997718517125646221473879384178*i+21480587894984006708507696813560031880418422203120731680444081197738193376551133489257354218650351292068887361682465186212171302098)*x + (21190211808514661490995889636809958421613022599059700224882302507046708356111594650436783590567652508521866730233532203222979932608*i+1495865987192807140570432983701851227678206214324414714879677936176654447516458315086841391484592286010144081251893883842772679598) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3673078132866733359179325281197222322204027176482767477524518348347881221255704603446584760496638408731030416265883352294172983688*i+3915561970457257575339859854601141465987156093969195208895985911959001852896230224013327017251144397844913178756503390504754460254)*x + (17259043530546749313952370973701907690534887378758746621852941305972456393695056564724119186239779642726261263538101937696240215545*i+10415485558831896884430229546396490169269933084662324528167448070999211370602908833289957155968856701407983781836024396424467419912) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3673078132866733359179325281197222322204027176482767477524518348347881221255704603446584760496638408731030416265883352294172983688*i+3915561970457257575339859854601141465987156093969195208895985911959001852896230224013327017251144397844913178756503390504754460254)*x + (17259043530546749313952370973701907690534887378758746621852941305972456393695056564724119186239779642726261263538101937696240215545*i+10415485558831896884430229546396490169269933084662324528167448070999211370602908833289957155968856701407983781836024396424467419912) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11228074556178137526639314730899129872799801548596324544596506836764013152051734102220243304720014893400477031738604441052946498744*i+5217845652079176915429331874720335664343698535966788107231855735534609821431306855797537419721034453788583613743826832229829471675)*x + (13968433805682295659586442772819706078294223299446513770227422710625979482372009085985553706919224340621695549022340880645642723198*i+21171713726028780466531127539474448047756648517674771806165837846771911128411433916406215593523903607881470088744292567396702335007) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11228074556178137526639314730899129872799801548596324544596506836764013152051734102220243304720014893400477031738604441052946498744*i+5217845652079176915429331874720335664343698535966788107231855735534609821431306855797537419721034453788583613743826832229829471675)*x + (13968433805682295659586442772819706078294223299446513770227422710625979482372009085985553706919224340621695549022340880645642723198*i+21171713726028780466531127539474448047756648517674771806165837846771911128411433916406215593523903607881470088744292567396702335007) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6071250417284210550295452777215133733646445530965530924924729761353782057191384908243032669697346075929823523223641084678899879038*i+14178995814143700612552481814045471573780946426624835748201401853976972094847567190976341207037894455622041302294267914877367006675)*x + (23802563648480650812372761922485519168918571536143615446963408385315485079963000964097732180238053771753504895946885584157195710330*i+2751964503463389302174887839527611261911984723561311645144160941308456379989847470007021994367377241918871662085203395096947033263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6071250417284210550295452777215133733646445530965530924924729761353782057191384908243032669697346075929823523223641084678899879038*i+14178995814143700612552481814045471573780946426624835748201401853976972094847567190976341207037894455622041302294267914877367006675)*x + (23802563648480650812372761922485519168918571536143615446963408385315485079963000964097732180238053771753504895946885584157195710330*i+2751964503463389302174887839527611261911984723561311645144160941308456379989847470007021994367377241918871662085203395096947033263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23697775668597202812236912657330613081281669844266807166322883098871520199421700614600754565183576598485585118813550771045329136629*i+1427440777903086376067069731246601115707478231808842276501150438928983543494352740828765977337129876708015228793308825389786930587)*x + (19270911312858771159229562012141480040557822718701756836950569342549780854417593550277848123772601697510484893185724359377877414120*i+8006923519699441657744948764294900938614808784744844730271155597507937389147416200192664663619101787405125233781734701928816608478) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23697775668597202812236912657330613081281669844266807166322883098871520199421700614600754565183576598485585118813550771045329136629*i+1427440777903086376067069731246601115707478231808842276501150438928983543494352740828765977337129876708015228793308825389786930587)*x + (19270911312858771159229562012141480040557822718701756836950569342549780854417593550277848123772601697510484893185724359377877414120*i+8006923519699441657744948764294900938614808784744844730271155597507937389147416200192664663619101787405125233781734701928816608478) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3481691626621015799136171558008222456698405478449857997011183949329092511659392163024845233874845262400692328284381509412941593237*i+21717051425266383940985762765537875655196166551853318410936721670042406777216806871203952866978479995293053337165362957126657569240)*x + (2983848662489147853473551924785542942548467044157047653512220746829857781137529551278576643333334646335510027331379211669447148098*i+12669407334884263466043969909936684291570768092653241425929809664115905610641331941975841175541342823041013398642377401527129286725) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3481691626621015799136171558008222456698405478449857997011183949329092511659392163024845233874845262400692328284381509412941593237*i+21717051425266383940985762765537875655196166551853318410936721670042406777216806871203952866978479995293053337165362957126657569240)*x + (2983848662489147853473551924785542942548467044157047653512220746829857781137529551278576643333334646335510027331379211669447148098*i+12669407334884263466043969909936684291570768092653241425929809664115905610641331941975841175541342823041013398642377401527129286725) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2778825286025363152944093027485488037185077930767898940647884761815219650557966628910639015362353547151568255783035234730144491450*i+24390472387489794085645377906325961437059802160038357999119210351520713263977106910681561293668829660872602683827789760091554749858)*x + (8329018376682883921289320341700509957833784824911424424856245780676399373867467209924862605903337096369316999977264542261297947809*i+2809261888021242599407944205969563024216797544270838895818953949525664016825931117138932364240872559562661192868528988910157424492) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2778825286025363152944093027485488037185077930767898940647884761815219650557966628910639015362353547151568255783035234730144491450*i+24390472387489794085645377906325961437059802160038357999119210351520713263977106910681561293668829660872602683827789760091554749858)*x + (8329018376682883921289320341700509957833784824911424424856245780676399373867467209924862605903337096369316999977264542261297947809*i+2809261888021242599407944205969563024216797544270838895818953949525664016825931117138932364240872559562661192868528988910157424492) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8074774185358001003668496174198661904932668479636216694489032753330659083432851972067047906356363549440377639802125546658290744109*i+10521446078632457159043897323804456209429878196839307618927126702406693653079476370996376986849918109485495245607930547118235136268)*x + (22923366559089154144487444109831326439926429900275632600715460815824504173063371289654295868971866229989898944139654202562592777241*i+732340610734805494269144728353553563897055185872857853577601434038624942820153438453888628300475709754610999570062832711149150249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8074774185358001003668496174198661904932668479636216694489032753330659083432851972067047906356363549440377639802125546658290744109*i+10521446078632457159043897323804456209429878196839307618927126702406693653079476370996376986849918109485495245607930547118235136268)*x + (22923366559089154144487444109831326439926429900275632600715460815824504173063371289654295868971866229989898944139654202562592777241*i+732340610734805494269144728353553563897055185872857853577601434038624942820153438453888628300475709754610999570062832711149150249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24299252949948727705046393326712199886874692954370997550225672629185730471338508787209246073325137863531518591001466698153670481615*i+17011701915647961098347980304610394606046547697200718045189236651248965001444516106438274992691588667695505396575961290534768886863)*x + (8279431528606130566957251455222828690982876127132471898786509057776440007071617194092548583379062223200556725173792178531787180204*i+19976974892644370513061113289772379446692501332115990172844355884304991566779050030407904117665740723173044013640029736070114002476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24299252949948727705046393326712199886874692954370997550225672629185730471338508787209246073325137863531518591001466698153670481615*i+17011701915647961098347980304610394606046547697200718045189236651248965001444516106438274992691588667695505396575961290534768886863)*x + (8279431528606130566957251455222828690982876127132471898786509057776440007071617194092548583379062223200556725173792178531787180204*i+19976974892644370513061113289772379446692501332115990172844355884304991566779050030407904117665740723173044013640029736070114002476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15916736324665312965755157601229804137324667500175967304401882429069350735106075220136729684480285052123517950985939438933577086608*i+20346762350172536261119101980065719497171618382574365466689926427966970455453275337333959843987066796288888389249543046043094115180)*x + (5605444248954434696935971003996465414698847428731273474514664417971744888738801297196529687958196489982075009530937617116662117160*i+23860559320374580979970357564861113808921677205824806620360670247815247484284658260115820823388609502915469950281484765144289446063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15916736324665312965755157601229804137324667500175967304401882429069350735106075220136729684480285052123517950985939438933577086608*i+20346762350172536261119101980065719497171618382574365466689926427966970455453275337333959843987066796288888389249543046043094115180)*x + (5605444248954434696935971003996465414698847428731273474514664417971744888738801297196529687958196489982075009530937617116662117160*i+23860559320374580979970357564861113808921677205824806620360670247815247484284658260115820823388609502915469950281484765144289446063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (366922764547108602829969202312278410044653322687016146643932217159546286036168140624619364529941836585309329630358335312692072443*i+7036651848774392891319753148076606802574175566340834725391572080340024794274477602771190707301878018437348963547003985712590546222)*x + (11089980119410339897949279736203383060196272459879122827533901525146069760769453146608554260343168972010973343893776758550235118197*i+16726550714405158758533046259314862299137990834936574960597501395615541543235471047166256744304703440152138114141906096938552678267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (366922764547108602829969202312278410044653322687016146643932217159546286036168140624619364529941836585309329630358335312692072443*i+7036651848774392891319753148076606802574175566340834725391572080340024794274477602771190707301878018437348963547003985712590546222)*x + (11089980119410339897949279736203383060196272459879122827533901525146069760769453146608554260343168972010973343893776758550235118197*i+16726550714405158758533046259314862299137990834936574960597501395615541543235471047166256744304703440152138114141906096938552678267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24356800220384183242756362019561305291555069786092694208017032075255794566679055017587317361872993674101815341987456200927380370105*i+1085270554357598143690167652462925306393329370601894381867487799684358331360859157527273046670212032384453914616559429134793631602)*x + (22385298877200961189494576868466149404117851605548402336940872389566858775546400071504346456157635892278793724073360516475889947427*i+1581747950672979479160555868451246960996678176948969594574870417119784662390936769015930551102438279893567968704058891717083460603) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24356800220384183242756362019561305291555069786092694208017032075255794566679055017587317361872993674101815341987456200927380370105*i+1085270554357598143690167652462925306393329370601894381867487799684358331360859157527273046670212032384453914616559429134793631602)*x + (22385298877200961189494576868466149404117851605548402336940872389566858775546400071504346456157635892278793724073360516475889947427*i+1581747950672979479160555868451246960996678176948969594574870417119784662390936769015930551102438279893567968704058891717083460603) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14867389874943193131407566227901227245065066430465328675450503666378281289549353296485952096978378219250380071571954635590240395806*i+1946881243476827586824171140895432093119618644697889501983097718499714092941412927617197221971773771127859009594362861680617738325)*x + (10083684766200980283414855289882344095046118727884642165182327005741829229235040342434874695363850947301457578616488530382887008752*i+18467743648197843068222721974163726408955005672984140919593815216319582357819219551734527496693372291853941625553009779887615950694) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14867389874943193131407566227901227245065066430465328675450503666378281289549353296485952096978378219250380071571954635590240395806*i+1946881243476827586824171140895432093119618644697889501983097718499714092941412927617197221971773771127859009594362861680617738325)*x + (10083684766200980283414855289882344095046118727884642165182327005741829229235040342434874695363850947301457578616488530382887008752*i+18467743648197843068222721974163726408955005672984140919593815216319582357819219551734527496693372291853941625553009779887615950694) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17327209923995673584249409329523377575542280411864249531820233365711914591741093013032675267836900041614000528543419348940505926038*i+3778083865280925209362736356567438792630296306904969395393541604048645061016730392953599427707703222652673621151796819572906111209)*x + (7001462357003951972850263277796248268867319380485074797336942994128214850651207379188714334482768420461911762120439392239294786064*i+12722270918868560070741898678526153159479004146190984405043289754141212702522641368933797115536231255197377193047660489180113425022) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17327209923995673584249409329523377575542280411864249531820233365711914591741093013032675267836900041614000528543419348940505926038*i+3778083865280925209362736356567438792630296306904969395393541604048645061016730392953599427707703222652673621151796819572906111209)*x + (7001462357003951972850263277796248268867319380485074797336942994128214850651207379188714334482768420461911762120439392239294786064*i+12722270918868560070741898678526153159479004146190984405043289754141212702522641368933797115536231255197377193047660489180113425022) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9661125494736529435237978016294900407576649070469321554320529584266048055796413612648019304033121562812028387102054902741599364262*i+8021955533624794822734633082199341444510477374580817314042317873290587306836961732801972413391689020730934491055079824415123869238)*x + (5302763574349610327052498213381895973233263541617515226824379679622316617069570041570982121810212506211201757666792972070481010593*i+5877207965556356058217880361927597298918571203381536745498616557327995007381572981756545831236745955666560170312189596601233717121) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9661125494736529435237978016294900407576649070469321554320529584266048055796413612648019304033121562812028387102054902741599364262*i+8021955533624794822734633082199341444510477374580817314042317873290587306836961732801972413391689020730934491055079824415123869238)*x + (5302763574349610327052498213381895973233263541617515226824379679622316617069570041570982121810212506211201757666792972070481010593*i+5877207965556356058217880361927597298918571203381536745498616557327995007381572981756545831236745955666560170312189596601233717121) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23437176079398122680662056384675783142198073856664649194277972666533055824101763744555206734201325443591820057827798214929573018873*i+4139508575003715598517483231405076917856194813663792726998514102842830098054857946208987525632675633406274238288656732246012803334)*x + (16105499598917266740507700361717393022595038852226800475559499328846509009662796624841692780578157174340918909006738933545765665709*i+14362335266617800421824768020131855450586957547523784936592178289126570320110506087526340226019761464731331788071301249417430242104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23437176079398122680662056384675783142198073856664649194277972666533055824101763744555206734201325443591820057827798214929573018873*i+4139508575003715598517483231405076917856194813663792726998514102842830098054857946208987525632675633406274238288656732246012803334)*x + (16105499598917266740507700361717393022595038852226800475559499328846509009662796624841692780578157174340918909006738933545765665709*i+14362335266617800421824768020131855450586957547523784936592178289126570320110506087526340226019761464731331788071301249417430242104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21049061269339037040026504053907058913438066438611077769291400520433591743846863587442529400944525490379558017476418739094937886439*i+1734597967787411891182670843829722455776594224404626316036029960252039734664494306438181541790295133715962243366127452852467006665)*x + (2837119697324944510375083044865062216337701809236351993662902321430601443809353979786368990487915727580983439001981999074614501578*i+24080887866157492713227395224173756400419702729302924414914364918955600497936842462442638602313497934904889958184017457202874059758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21049061269339037040026504053907058913438066438611077769291400520433591743846863587442529400944525490379558017476418739094937886439*i+1734597967787411891182670843829722455776594224404626316036029960252039734664494306438181541790295133715962243366127452852467006665)*x + (2837119697324944510375083044865062216337701809236351993662902321430601443809353979786368990487915727580983439001981999074614501578*i+24080887866157492713227395224173756400419702729302924414914364918955600497936842462442638602313497934904889958184017457202874059758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13006576402941204584909594331599427416523045320651723908862077221763618937824420603701182515483384744982074774423420908243044004310*i+20047624977076665269496977480085047331030452670133194565612209352081902320410976518318988981033713026104696419890293211488536460473)*x + (18679958070559135268228336419313720076607916947890335104929089583725836016141130090813235239402028827067228366558705760526273906934*i+4300046903674319213301682659146863442826945921277244240136440113697469342840788415331051974815281926602584427818081483267030317674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13006576402941204584909594331599427416523045320651723908862077221763618937824420603701182515483384744982074774423420908243044004310*i+20047624977076665269496977480085047331030452670133194565612209352081902320410976518318988981033713026104696419890293211488536460473)*x + (18679958070559135268228336419313720076607916947890335104929089583725836016141130090813235239402028827067228366558705760526273906934*i+4300046903674319213301682659146863442826945921277244240136440113697469342840788415331051974815281926602584427818081483267030317674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1053096008099538091832016820725680712567583076689992928400731034040990946130094666710099865879239028010269896022995850717181861813*i+23030541433896405143969523707935786622778511175792607963192136110670621308595002349023350365911511257906769795282789981086602310566)*x + (18876809452196396219008438701635430071194311387938094973969463014392038279741120581921473788820363669321597382466315347505155514149*i+18414345119519492861107735098408169023783430097840271601210184827786189318103892940072547993889644647236147848410354564688603030130) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1053096008099538091832016820725680712567583076689992928400731034040990946130094666710099865879239028010269896022995850717181861813*i+23030541433896405143969523707935786622778511175792607963192136110670621308595002349023350365911511257906769795282789981086602310566)*x + (18876809452196396219008438701635430071194311387938094973969463014392038279741120581921473788820363669321597382466315347505155514149*i+18414345119519492861107735098408169023783430097840271601210184827786189318103892940072547993889644647236147848410354564688603030130) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3256690653466477889324312470877611591184956872865606326270368724388629543443529271483779908008172127767898410258281159947556344286*i+7368596138730479552028391685609376143157365071901588588853028180380609643306824261620984948122040887840101465960258196548573527773)*x + (16291859337622999469624458814442864939645466399328735764080076044787068987135721526136231020984698243056003631779691077100791745715*i+17899627035915795498187233368962010290667614383979368813212221494016932674895795518468276595704569684381357992899218267991808876277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3256690653466477889324312470877611591184956872865606326270368724388629543443529271483779908008172127767898410258281159947556344286*i+7368596138730479552028391685609376143157365071901588588853028180380609643306824261620984948122040887840101465960258196548573527773)*x + (16291859337622999469624458814442864939645466399328735764080076044787068987135721526136231020984698243056003631779691077100791745715*i+17899627035915795498187233368962010290667614383979368813212221494016932674895795518468276595704569684381357992899218267991808876277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2946253454272358511393560176559866386660468725666024207565286597661935284206833331232917639367603304476983459389162670556593250602*i+23902619165508902233772353819431432863054411281015840094391349700444562782986941911309843204143115570820583246891469366020326005579)*x + (12203828335709270086593142935957841637982945833284496057327425826726819206521366898335731259705905059718152414235599799236917456535*i+13032877301035659248449133856630998933377582422606304983532001857427564100121767788289703603293275743145818475300334591484653803805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2946253454272358511393560176559866386660468725666024207565286597661935284206833331232917639367603304476983459389162670556593250602*i+23902619165508902233772353819431432863054411281015840094391349700444562782986941911309843204143115570820583246891469366020326005579)*x + (12203828335709270086593142935957841637982945833284496057327425826726819206521366898335731259705905059718152414235599799236917456535*i+13032877301035659248449133856630998933377582422606304983532001857427564100121767788289703603293275743145818475300334591484653803805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23061055652209465019179044045661128792996970711723779617454272836864814345317609003167380363817052680577873718387534742704891810994*i+9471278010686517900783103239083042865370773238126987320391075206819653370624265503944555112369208483850203438916541553846797509653)*x + (11169667560591385930796442191862715976492484992226478835686566743724243702010193529705699939097373815781235892300672048668635591296*i+22482607617388180561585181103049445202714019660489710998117820824024249833832165181048777814343578151465657722188420804697511673489) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23061055652209465019179044045661128792996970711723779617454272836864814345317609003167380363817052680577873718387534742704891810994*i+9471278010686517900783103239083042865370773238126987320391075206819653370624265503944555112369208483850203438916541553846797509653)*x + (11169667560591385930796442191862715976492484992226478835686566743724243702010193529705699939097373815781235892300672048668635591296*i+22482607617388180561585181103049445202714019660489710998117820824024249833832165181048777814343578151465657722188420804697511673489) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14484166524260456060637269985026892047999227641037576340119077092403905730315853073944750383041913245364992022984061328283649311928*i+163177517299406890715687375256624084445793816632718115009092536478997380392232924466605489244978807335837412116029701188885702276)*x + (18962296940392388820990449715728889037371924345118881532965766841766736328644141857190445052635661690620966914746816120390858114356*i+19883868070600258149817616798374189038891229607214016697685331592608762133593107677773386098651359531733375826376875184901040484383) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14484166524260456060637269985026892047999227641037576340119077092403905730315853073944750383041913245364992022984061328283649311928*i+163177517299406890715687375256624084445793816632718115009092536478997380392232924466605489244978807335837412116029701188885702276)*x + (18962296940392388820990449715728889037371924345118881532965766841766736328644141857190445052635661690620966914746816120390858114356*i+19883868070600258149817616798374189038891229607214016697685331592608762133593107677773386098651359531733375826376875184901040484383) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20281258505230589745083718784732134610822868418954035225563110137427812626262525685467780548264563249159656757614124337816382450453*i+21257944158481793890399689988842134189766127884768952162864856507021331918984614483603337790582513574450360793440467205493389234745)*x + (19350487453702143633126890932488846262783797570267464030658572910662753605472501392010048205975327489257900482360039430853088362651*i+10465566088603135585691360783849955629136817588303950242421599427065200672276986351342601694222263928519606356562471198097518902381) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20281258505230589745083718784732134610822868418954035225563110137427812626262525685467780548264563249159656757614124337816382450453*i+21257944158481793890399689988842134189766127884768952162864856507021331918984614483603337790582513574450360793440467205493389234745)*x + (19350487453702143633126890932488846262783797570267464030658572910662753605472501392010048205975327489257900482360039430853088362651*i+10465566088603135585691360783849955629136817588303950242421599427065200672276986351342601694222263928519606356562471198097518902381) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15798872183055027922511790041426726960232456773726291979952082383015418419095794112891304004273282751517853609010592127663544728324*i+1656135258227259156402371663513397127198852496646088627373619921951627913679745151991777880807339221199192665623640286871553851001)*x + (17131100132670947081116933701903622086582744327557480982063411134470949432924888476733394652482732172783528787581466542573767594486*i+22689957996431563914341377738971265366571201382437773702418142732051930825498801832804332382798975743029157265013554013129644965799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15798872183055027922511790041426726960232456773726291979952082383015418419095794112891304004273282751517853609010592127663544728324*i+1656135258227259156402371663513397127198852496646088627373619921951627913679745151991777880807339221199192665623640286871553851001)*x + (17131100132670947081116933701903622086582744327557480982063411134470949432924888476733394652482732172783528787581466542573767594486*i+22689957996431563914341377738971265366571201382437773702418142732051930825498801832804332382798975743029157265013554013129644965799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5071857213917777583790066492080698843346194242186036875932301092963419817999837295386054980592841368417435360810426764546672984124*i+8432415962745548143292404006814848776161783386493480599355580201899094863473783176863977316055290613698731085770707952087008234576)*x + (13633907365570994945122619640971325273117790507654879979983993729162187864723685016173370765968037537567560722611129490634633598188*i+12139022104757357996968829223722694352314863662635446491052604810454909740789973800586174378798478081294998790706796820534692512264) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5071857213917777583790066492080698843346194242186036875932301092963419817999837295386054980592841368417435360810426764546672984124*i+8432415962745548143292404006814848776161783386493480599355580201899094863473783176863977316055290613698731085770707952087008234576)*x + (13633907365570994945122619640971325273117790507654879979983993729162187864723685016173370765968037537567560722611129490634633598188*i+12139022104757357996968829223722694352314863662635446491052604810454909740789973800586174378798478081294998790706796820534692512264) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16484857383408059859103697601935208242232266123944940036847068028876523653067258969812232597446198775259137675175007463843852243911*i+22638880720333911413251398328532031500744082990503464381292074014940612991592375853923906241884852898669661313153242900103523563070)*x + (20381437113234797404759465114219678784353037807829111066549212482793386321468871655018309035890829383907243572920498224168668467144*i+7641860221558906526419500927271507632589950206476102832872380099919272549002429292413998542689010053783754827377732520064528450311) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16484857383408059859103697601935208242232266123944940036847068028876523653067258969812232597446198775259137675175007463843852243911*i+22638880720333911413251398328532031500744082990503464381292074014940612991592375853923906241884852898669661313153242900103523563070)*x + (20381437113234797404759465114219678784353037807829111066549212482793386321468871655018309035890829383907243572920498224168668467144*i+7641860221558906526419500927271507632589950206476102832872380099919272549002429292413998542689010053783754827377732520064528450311) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23417617069394041041382775558792371166814007511761658837689977990992130002480155028175229435961850120618471786916592139591162865254*i+12632307557255338245201174612018104288791845153285324541614959708100056350119663235989892877968295066536919916711335029112833681280)*x + (18899639460043616065564069284393725030480849916333580834692813389028629659482371044964801334665068558004066829691730744883171588363*i+520053707575880754824656310249833904203598982408302073357811798043170424224495601278375819711573981311916393185068739432531351677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23417617069394041041382775558792371166814007511761658837689977990992130002480155028175229435961850120618471786916592139591162865254*i+12632307557255338245201174612018104288791845153285324541614959708100056350119663235989892877968295066536919916711335029112833681280)*x + (18899639460043616065564069284393725030480849916333580834692813389028629659482371044964801334665068558004066829691730744883171588363*i+520053707575880754824656310249833904203598982408302073357811798043170424224495601278375819711573981311916393185068739432531351677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1903622165707634465169730862996239509264978865765789593283149588061695156374567438542867958183029311314937627616458454344847160411*i+24379610356229057225439641479477103893343766779094496337447900516935626330070745496718295359006052986359374267006817652148993203416)*x + (6644954825795592664006450513392735503660406876133241532968000236813073105942724618550622458078876429885395370664005342185893402319*i+5557834025405280807532963712586533221186014538934594241901128917616283068068410192066940871630518133081103791240052905635440237096) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1903622165707634465169730862996239509264978865765789593283149588061695156374567438542867958183029311314937627616458454344847160411*i+24379610356229057225439641479477103893343766779094496337447900516935626330070745496718295359006052986359374267006817652148993203416)*x + (6644954825795592664006450513392735503660406876133241532968000236813073105942724618550622458078876429885395370664005342185893402319*i+5557834025405280807532963712586533221186014538934594241901128917616283068068410192066940871630518133081103791240052905635440237096) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1014472497312082214311470365990482780268737558158929296234631273945922140323188561381714957140145879816158905798156171189093226348*i+3350737300088350307202227904042047982113629309582291513941454263945920065063233907751790737901635519199959976207524237134810135175)*x + (82164415890008498606176539519967971150771759689648924327033269259695770003701794543811854339386305313064569857464316535017212728*i+3277634872655753848340425239686788153597222771666082713809592667376181826778696461551665568351075401920567737481453684921306005152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1014472497312082214311470365990482780268737558158929296234631273945922140323188561381714957140145879816158905798156171189093226348*i+3350737300088350307202227904042047982113629309582291513941454263945920065063233907751790737901635519199959976207524237134810135175)*x + (82164415890008498606176539519967971150771759689648924327033269259695770003701794543811854339386305313064569857464316535017212728*i+3277634872655753848340425239686788153597222771666082713809592667376181826778696461551665568351075401920567737481453684921306005152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2665748664110486130996415235893379200563994536059619682956368862202472011190270391122298602123383165608805077754008675826065529588*i+5319335206177192823283006015187534258850632095157328562818501344338637877206983852024090528252434611591155792947645550130895266175)*x + (5911963993680687457052095531171905117549831546776722418304888421228459119770527722048347891000755889932948043713787891230239641008*i+5529252317849536553258783474211817855830020051543265887274132552797845380880639809834664801830630310772711088025475278334497168781) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2665748664110486130996415235893379200563994536059619682956368862202472011190270391122298602123383165608805077754008675826065529588*i+5319335206177192823283006015187534258850632095157328562818501344338637877206983852024090528252434611591155792947645550130895266175)*x + (5911963993680687457052095531171905117549831546776722418304888421228459119770527722048347891000755889932948043713787891230239641008*i+5529252317849536553258783474211817855830020051543265887274132552797845380880639809834664801830630310772711088025475278334497168781) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23567598170556091645757676181072136471836247441697667360586374022059746002759146928411796698764491912041422863962852855621404217283*i+17464467628913834398355655600585227120288025439235468595201444698040119224341319894625511179419645944619548819970064633140468523449)*x + (5644853145308889392716835700555551263106418729342009205112913232002608818026489327277380193852707306308652538019877820846695093768*i+14529613641371356234052022055042315866672581121314389601305987030284197630528596353248206272258091599848192029520186177009112310534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23567598170556091645757676181072136471836247441697667360586374022059746002759146928411796698764491912041422863962852855621404217283*i+17464467628913834398355655600585227120288025439235468595201444698040119224341319894625511179419645944619548819970064633140468523449)*x + (5644853145308889392716835700555551263106418729342009205112913232002608818026489327277380193852707306308652538019877820846695093768*i+14529613641371356234052022055042315866672581121314389601305987030284197630528596353248206272258091599848192029520186177009112310534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15527389637327464429880912583770766694929004662890637159837186510198657217428469584471751954012529114961656439298547730601119285906*i+8728815089705935795271676291511101456691640136099503048881962022233688843203582950424433305117051163739687740959705094056433726321)*x + (5152313224439833997141820099403878373175693273279278300109679246003728583678846792967824476570613823838346959290348372464615361768*i+3783899838653559425809445670010852917885182054296501529876143474039638321266140978800573486586391125433780537705249019714805313445) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15527389637327464429880912583770766694929004662890637159837186510198657217428469584471751954012529114961656439298547730601119285906*i+8728815089705935795271676291511101456691640136099503048881962022233688843203582950424433305117051163739687740959705094056433726321)*x + (5152313224439833997141820099403878373175693273279278300109679246003728583678846792967824476570613823838346959290348372464615361768*i+3783899838653559425809445670010852917885182054296501529876143474039638321266140978800573486586391125433780537705249019714805313445) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17597664783754115398729661561928454721007801998055691509726506800876211057560159791790470351556145081027867199719456070109545955845*i+10669840000383673347369916591016064404082568428610870378317012415407737512640355911107402880532084617974764892537718066494763238776)*x + (22433213582586961804090041198284404170547972799641460010250252970320404225318035803183505226059199990275456830896587148039606450226*i+275330610516947359351262763563681579794019310854927585177192025084758828055145479235527688515700592373751352046430745832172957629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17597664783754115398729661561928454721007801998055691509726506800876211057560159791790470351556145081027867199719456070109545955845*i+10669840000383673347369916591016064404082568428610870378317012415407737512640355911107402880532084617974764892537718066494763238776)*x + (22433213582586961804090041198284404170547972799641460010250252970320404225318035803183505226059199990275456830896587148039606450226*i+275330610516947359351262763563681579794019310854927585177192025084758828055145479235527688515700592373751352046430745832172957629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9875428985221265810057021022049207359256432308436876799639172930480472017771938704276064947124063409603490007883649976679121271488*i+6371245432287153219405153307408892962231546100601296431415758735319406319871328585229630363714294282068933164104695556027058516237)*x + (17748828626428426137557754153478423394981167340787874300166277428162984207022503248014376977409883798137849153518446660207264245636*i+21641636193036000993232491791182961977824680938798642286439895862335940792978454280672380369979079676433440744043086371433853858780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9875428985221265810057021022049207359256432308436876799639172930480472017771938704276064947124063409603490007883649976679121271488*i+6371245432287153219405153307408892962231546100601296431415758735319406319871328585229630363714294282068933164104695556027058516237)*x + (17748828626428426137557754153478423394981167340787874300166277428162984207022503248014376977409883798137849153518446660207264245636*i+21641636193036000993232491791182961977824680938798642286439895862335940792978454280672380369979079676433440744043086371433853858780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17103379236805665596038122847159580727759997545164564680855740320031616487188788113776202079157443792967900232744309251188710833450*i+12374630177961859684266125738272818984182052288462144301552744216095125670960389303778463248669002350950164338122470879861976134966)*x + (19997852551943461272726741895900965642659918532136466866414224022139401371114371511615078276575974560584511181751256953429107733614*i+6074746082530200941306827811497347738852561585406601428742711485067873373113837458966667736529071983933783780847901799769474692846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17103379236805665596038122847159580727759997545164564680855740320031616487188788113776202079157443792967900232744309251188710833450*i+12374630177961859684266125738272818984182052288462144301552744216095125670960389303778463248669002350950164338122470879861976134966)*x + (19997852551943461272726741895900965642659918532136466866414224022139401371114371511615078276575974560584511181751256953429107733614*i+6074746082530200941306827811497347738852561585406601428742711485067873373113837458966667736529071983933783780847901799769474692846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14207327042248926125535680531272712595841046830329273122400071278051880966092873871130671066281626736984831744662152430907494249435*i+22351603642292994712107495915623081991574413554069918011129130505693483281787921378097377228404882070523541257056278360567679774721)*x + (4304980390835563637179420931123292703406936814436538922163380176838471707233019423647396687293570463794532956291543180248113612258*i+24148086262472317014032764606695709058845176941052780285782558318962735448297969502671976280954782127993061632852036131224444851155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14207327042248926125535680531272712595841046830329273122400071278051880966092873871130671066281626736984831744662152430907494249435*i+22351603642292994712107495915623081991574413554069918011129130505693483281787921378097377228404882070523541257056278360567679774721)*x + (4304980390835563637179420931123292703406936814436538922163380176838471707233019423647396687293570463794532956291543180248113612258*i+24148086262472317014032764606695709058845176941052780285782558318962735448297969502671976280954782127993061632852036131224444851155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7112892691153151761664652939316400224955016666697306818864443619879448136171433919594542737199304493267598118185239610683465531745*i+8190432653005219723781071030904670721329840393950094218485212535468265448811041836655276248200073894700180371416006604823794553960)*x + (15156557147695820000542964873366674210647629870515422965288455878326095757117363053387710177637681256466571543227953772137168417988*i+22338782256419661517460025790606544489811303919886968893402057242439056439957628874074323407063699934880693100917354540314888793396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7112892691153151761664652939316400224955016666697306818864443619879448136171433919594542737199304493267598118185239610683465531745*i+8190432653005219723781071030904670721329840393950094218485212535468265448811041836655276248200073894700180371416006604823794553960)*x + (15156557147695820000542964873366674210647629870515422965288455878326095757117363053387710177637681256466571543227953772137168417988*i+22338782256419661517460025790606544489811303919886968893402057242439056439957628874074323407063699934880693100917354540314888793396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19303968018681486736409282483448139961251848819077566323167141446213890922871251247820669562841945189966452877093062320974378622341*i+16186809703241289493556219612307700237541299816195486844359877485067889706706919448045076434960943589036613342585325403879816951984)*x + (10113764506562855778478577005829433407603607909766172096479632716767029351919993190036674070330200615478345468905621939026899662686*i+12024292295247717975883524624583977735521954519448169244341678068174977910051728731942971346463687822359564627762542571353129397595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19303968018681486736409282483448139961251848819077566323167141446213890922871251247820669562841945189966452877093062320974378622341*i+16186809703241289493556219612307700237541299816195486844359877485067889706706919448045076434960943589036613342585325403879816951984)*x + (10113764506562855778478577005829433407603607909766172096479632716767029351919993190036674070330200615478345468905621939026899662686*i+12024292295247717975883524624583977735521954519448169244341678068174977910051728731942971346463687822359564627762542571353129397595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11893900709841149735231404678596263305640809591576072216134388127639522700889352513239923626934592873341857776439264535982522470455*i+6956299556946680511531709970994111372877267510898566515542571337295289141693905035192982583129682739159056030336483374873718101496)*x + (9812328979604290221768584320980957106150550420720800224498442766514059528951456671097745449270036864984752656642252881136247568367*i+13147578525526153534851606485691999733121117885758548529465624813127963066044403126210983368354940232009103254567933574064398446316) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11893900709841149735231404678596263305640809591576072216134388127639522700889352513239923626934592873341857776439264535982522470455*i+6956299556946680511531709970994111372877267510898566515542571337295289141693905035192982583129682739159056030336483374873718101496)*x + (9812328979604290221768584320980957106150550420720800224498442766514059528951456671097745449270036864984752656642252881136247568367*i+13147578525526153534851606485691999733121117885758548529465624813127963066044403126210983368354940232009103254567933574064398446316) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13505095339901621766180875690046621818850100254837197290495985371063154697028240831413568590985346688884538177869728112327319645933*i+7522103392324691485256063810124403855980364573295942437869526091725950976213086754393803260231923642874072923791040058056188099217)*x + (6247562740514892061097308038787941878612437696717711291916714497350421293483221832671631144303731371904993599490974143119732098646*i+162543992731271809577957095775594997607684673352901568705856800475212120743090483820669376366481697776705688120205515055526213448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13505095339901621766180875690046621818850100254837197290495985371063154697028240831413568590985346688884538177869728112327319645933*i+7522103392324691485256063810124403855980364573295942437869526091725950976213086754393803260231923642874072923791040058056188099217)*x + (6247562740514892061097308038787941878612437696717711291916714497350421293483221832671631144303731371904993599490974143119732098646*i+162543992731271809577957095775594997607684673352901568705856800475212120743090483820669376366481697776705688120205515055526213448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5729392813478751169829889566109752874580801862472207784141258061225698972887873439227139327850837183937828156368916283263734517106*i+18042793131107394144401066527220774110371048299732959150162369025817987296681479816033081378589956075874859581786506808202707038585)*x + (2012248608063778705455107922547165414828582511143180565467393706386009134174934415334441952975128230761881070575127038986000331350*i+18962952785877587021318388574208996394502857464031611285876206590013084704811120917133843859954384509147327382369316609659041982480) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5729392813478751169829889566109752874580801862472207784141258061225698972887873439227139327850837183937828156368916283263734517106*i+18042793131107394144401066527220774110371048299732959150162369025817987296681479816033081378589956075874859581786506808202707038585)*x + (2012248608063778705455107922547165414828582511143180565467393706386009134174934415334441952975128230761881070575127038986000331350*i+18962952785877587021318388574208996394502857464031611285876206590013084704811120917133843859954384509147327382369316609659041982480) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (102066737361972227325097881830396743406305610591209747467871506111268319563864613946546496518585860321453969882706270830855613064*i+13217779622451561499829142931118838879830710431704952159295004075066509954197873884585155918175051050238386811356270500850540879050)*x + (2151437000476848212608476685862772651794591979589253390364103282058109268138648367146549927029543917100312598208340555698769227099*i+7695032041105346407230356195828769149028573689282286391634398825829168300319458482094965331853323076153665305969015826449670319073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (102066737361972227325097881830396743406305610591209747467871506111268319563864613946546496518585860321453969882706270830855613064*i+13217779622451561499829142931118838879830710431704952159295004075066509954197873884585155918175051050238386811356270500850540879050)*x + (2151437000476848212608476685862772651794591979589253390364103282058109268138648367146549927029543917100312598208340555698769227099*i+7695032041105346407230356195828769149028573689282286391634398825829168300319458482094965331853323076153665305969015826449670319073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15642296404037133508204903005112019640296951318713603067933337200294807740706031958228684226066286131217813280211789487148335766708*i+23957712217966833650410744054669682857637425487501719340983167538747810048835632449994807343521279753554232424449946202290212016437)*x + (3921390469257812739997777810169394380968808191010338293537161684401745517316580691596302921512712127647637901876138023503019658577*i+15375506611705543315010394644800484442807589874446950085028004408012529638068619226866854784487384063922259171326076452058518366737) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15642296404037133508204903005112019640296951318713603067933337200294807740706031958228684226066286131217813280211789487148335766708*i+23957712217966833650410744054669682857637425487501719340983167538747810048835632449994807343521279753554232424449946202290212016437)*x + (3921390469257812739997777810169394380968808191010338293537161684401745517316580691596302921512712127647637901876138023503019658577*i+15375506611705543315010394644800484442807589874446950085028004408012529638068619226866854784487384063922259171326076452058518366737) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23715418442734456139508971566485433573586851853699853458080170985755536054393269718711535186005703852781808228656423130584563058558*i+23680301345161550095120851915002643532213175925299378051503449778891293199754897151908224301559164120499162182876809917744085299761)*x + (4966910033171087331082898140105446159819528466387767121899242326012513008235575663243050807837804494508011351431227704848485133445*i+1770899143751513351576149552004759010740188649514879252227120807881453492035617641116449859320360881040320187275194662376259440559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23715418442734456139508971566485433573586851853699853458080170985755536054393269718711535186005703852781808228656423130584563058558*i+23680301345161550095120851915002643532213175925299378051503449778891293199754897151908224301559164120499162182876809917744085299761)*x + (4966910033171087331082898140105446159819528466387767121899242326012513008235575663243050807837804494508011351431227704848485133445*i+1770899143751513351576149552004759010740188649514879252227120807881453492035617641116449859320360881040320187275194662376259440559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21673364174775971449204056549207036350673881645307930276942417621538680974562139848887748466652549633214975552363346551922410300080*i+23800300641135540875832982358572065411825568623524290168285488054025302758952027125655222493385554103040599295621746425925435737380)*x + (12160113603726758342843316770990452657512851995633501551806652163897480623687479426088696137955510433849837012416871368472251334290*i+15786657066245798175577322498337284411919682264312270823795825171232657399368461077262254508742046988612957730777796394165007787813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21673364174775971449204056549207036350673881645307930276942417621538680974562139848887748466652549633214975552363346551922410300080*i+23800300641135540875832982358572065411825568623524290168285488054025302758952027125655222493385554103040599295621746425925435737380)*x + (12160113603726758342843316770990452657512851995633501551806652163897480623687479426088696137955510433849837012416871368472251334290*i+15786657066245798175577322498337284411919682264312270823795825171232657399368461077262254508742046988612957730777796394165007787813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2490100789754298765331866491840958294196050071830342944649988672928234965295563842395552003948396223504896103696854077145780885233*i+11248350483208576516532916527157757068314593134679195009262305178257034548456218618846066497764996900857914618428332852265471836876)*x + (9821616220438539133031155646279662902301396109262270068433976145220385906435116905734954670306988352837782817943004292090971096506*i+12480336252617905387973410889859962025749124914185863144943116999802288947275726366479751777999813726770650396704971472580399861340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2490100789754298765331866491840958294196050071830342944649988672928234965295563842395552003948396223504896103696854077145780885233*i+11248350483208576516532916527157757068314593134679195009262305178257034548456218618846066497764996900857914618428332852265471836876)*x + (9821616220438539133031155646279662902301396109262270068433976145220385906435116905734954670306988352837782817943004292090971096506*i+12480336252617905387973410889859962025749124914185863144943116999802288947275726366479751777999813726770650396704971472580399861340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22909534460165928733018832474629143319867669427308910060589121093476033954790328958593248622668474964717402046215490374402202375660*i+2894122769382154803401936974635093163451871145950310002732633218765711594118553951704698348371731519815736393259401125806933726349)*x + (21470798123808781855089640897240461251559873086152908254635754218438246558256658197482181348491580667462035279258902324734215728921*i+15434173016613506651057080585822629353369936974901863279179938260522940125339859088797483720585386896358663551960985876790614003943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22909534460165928733018832474629143319867669427308910060589121093476033954790328958593248622668474964717402046215490374402202375660*i+2894122769382154803401936974635093163451871145950310002732633218765711594118553951704698348371731519815736393259401125806933726349)*x + (21470798123808781855089640897240461251559873086152908254635754218438246558256658197482181348491580667462035279258902324734215728921*i+15434173016613506651057080585822629353369936974901863279179938260522940125339859088797483720585386896358663551960985876790614003943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12181813944258003856594414247510761846998312826368353454661527459903775609483374106907252209978012958968103386651942055108034709537*i+17714590891147301574382950265874614676985703205291831711370235535878470123318908344980086887590344534575948205160857286623002965632)*x + (1485128178513971261556126203647536062753660968990569226192500304881512231515079272048358752064685091304333078416266015687756091129*i+19614054930647656803839691067998704217452544351886855775601514954407692448114613679496759490425781175150290033632379015465141329472) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12181813944258003856594414247510761846998312826368353454661527459903775609483374106907252209978012958968103386651942055108034709537*i+17714590891147301574382950265874614676985703205291831711370235535878470123318908344980086887590344534575948205160857286623002965632)*x + (1485128178513971261556126203647536062753660968990569226192500304881512231515079272048358752064685091304333078416266015687756091129*i+19614054930647656803839691067998704217452544351886855775601514954407692448114613679496759490425781175150290033632379015465141329472) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13859963385041535804354615464822784222085832275568660576145858683207156438581049152249801604692819253599099739822446819545733839708*i+5001199857165565609876920895392698461827347768992449094081605238822920430965600275625452147358320269909964442187559388681358651757)*x + (21831436011365766000154699386794816247723816473020790274918102532429799530835878354164448013111306592481832248355822233553084342644*i+3562957681108883719328408534593420045765759209067342926292710752424991484507473368303559974357863602545207916451955383284227495569) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13859963385041535804354615464822784222085832275568660576145858683207156438581049152249801604692819253599099739822446819545733839708*i+5001199857165565609876920895392698461827347768992449094081605238822920430965600275625452147358320269909964442187559388681358651757)*x + (21831436011365766000154699386794816247723816473020790274918102532429799530835878354164448013111306592481832248355822233553084342644*i+3562957681108883719328408534593420045765759209067342926292710752424991484507473368303559974357863602545207916451955383284227495569) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7027546872641513421325455790319077636073174120763122618118405149288839499373785114105369859650515474845084839768036564234763148721*i+20204100783304156106679178249886792048526367192698140314451467566733966976457668488983125329728760492146369865719370488560114695444)*x + (2176257617147277782072110994954668973931520697955133440308200624902872770280046556219250044231669348570851399912348632026616550520*i+1497698050408529065001867739112953150018617960579102565185067261491580407509292227020652842726251061858793337851705050237696067533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7027546872641513421325455790319077636073174120763122618118405149288839499373785114105369859650515474845084839768036564234763148721*i+20204100783304156106679178249886792048526367192698140314451467566733966976457668488983125329728760492146369865719370488560114695444)*x + (2176257617147277782072110994954668973931520697955133440308200624902872770280046556219250044231669348570851399912348632026616550520*i+1497698050408529065001867739112953150018617960579102565185067261491580407509292227020652842726251061858793337851705050237696067533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9747001911497928885338445399394762441338929694500979034135101006364514825127874284289585185063196875978639483215638630379512280742*i+9483528201320807264085241561828452529045039095103902731468226893105430743509170530667920782195164428527542539739152187500140332286)*x + (24355302318455009169498726522894543606938666395996429669962373654134215472140744129632764338888282175795727277120619728033250916589*i+13896755979299644295475025748180088137638074698049777216468728027243642627458649883225499097032896288068320360073250158728886906116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9747001911497928885338445399394762441338929694500979034135101006364514825127874284289585185063196875978639483215638630379512280742*i+9483528201320807264085241561828452529045039095103902731468226893105430743509170530667920782195164428527542539739152187500140332286)*x + (24355302318455009169498726522894543606938666395996429669962373654134215472140744129632764338888282175795727277120619728033250916589*i+13896755979299644295475025748180088137638074698049777216468728027243642627458649883225499097032896288068320360073250158728886906116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12668765874195337349548978260620719332790940586714866556326994724163036905081379175751725394452930045575680164255361822369246999260*i+24062755139893635377122664766518490211809871773251060107606251628724387080671873298454664860990622461881897753895535177514249783057)*x + (4491219039629721050186547826878888812345421224646679026202607085673574957500612804106695554592435765511059395752155256395420018150*i+16785490411274432561921149278520746424504025691470842938444324240634712696690671502395726159602414240089581208270388195644029337281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12668765874195337349548978260620719332790940586714866556326994724163036905081379175751725394452930045575680164255361822369246999260*i+24062755139893635377122664766518490211809871773251060107606251628724387080671873298454664860990622461881897753895535177514249783057)*x + (4491219039629721050186547826878888812345421224646679026202607085673574957500612804106695554592435765511059395752155256395420018150*i+16785490411274432561921149278520746424504025691470842938444324240634712696690671502395726159602414240089581208270388195644029337281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4252652113584414153519094577177612466563661654041546363516116684232649353802488560275947409366782611956540455062423665746562326760*i+13740733958015378663601529453322496362264239921090159202752591735072803875991166403002034116801769279298077017177021575219333520902)*x + (24344906823191510879631668451746917965283308202602968855423213165183455608625422842233077143513254781844211418123851152828481576858*i+16624180577519965053505501178095326857432987374945447856889393257200852266331772053036098044600202327129141735171500788075147730628) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4252652113584414153519094577177612466563661654041546363516116684232649353802488560275947409366782611956540455062423665746562326760*i+13740733958015378663601529453322496362264239921090159202752591735072803875991166403002034116801769279298077017177021575219333520902)*x + (24344906823191510879631668451746917965283308202602968855423213165183455608625422842233077143513254781844211418123851152828481576858*i+16624180577519965053505501178095326857432987374945447856889393257200852266331772053036098044600202327129141735171500788075147730628) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6787058966694324663967080295447477160450877403276954605364037817144649952325865086173748410561495357057590259566504625485983443122*i+24172541250214367719949445317343046803949527589543059425219667424985148411337758996037529862532522782024864482541831783342180278215)*x + (22466290097346611591418256246277248327760751989177384907161757591773873651300093176782215232318981778258728012641146278843202200464*i+37517975663459678828978473717322225886802616167389694690736113556473486096874470699219265003979450381084928814710838216198396165) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6787058966694324663967080295447477160450877403276954605364037817144649952325865086173748410561495357057590259566504625485983443122*i+24172541250214367719949445317343046803949527589543059425219667424985148411337758996037529862532522782024864482541831783342180278215)*x + (22466290097346611591418256246277248327760751989177384907161757591773873651300093176782215232318981778258728012641146278843202200464*i+37517975663459678828978473717322225886802616167389694690736113556473486096874470699219265003979450381084928814710838216198396165) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3201264878590888016622769251222555520389688203398377818528589449241180535077018284682978355174308310011023698786029982212287971579*i+6953421904058783644929390388015381222682231855186535534339280594251466615080127559117940846284207352833482389589160068793023386314)*x + (5517296782253741841755099370166185574667637948078595399959714519958697748721523030018358123331321109583309965538857431948063938595*i+20081184991409820138815377279761340677171958876354876505263931774727531373162833197663286515149799132946488601655796234511256937386) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3201264878590888016622769251222555520389688203398377818528589449241180535077018284682978355174308310011023698786029982212287971579*i+6953421904058783644929390388015381222682231855186535534339280594251466615080127559117940846284207352833482389589160068793023386314)*x + (5517296782253741841755099370166185574667637948078595399959714519958697748721523030018358123331321109583309965538857431948063938595*i+20081184991409820138815377279761340677171958876354876505263931774727531373162833197663286515149799132946488601655796234511256937386) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (372240907770039503092931195483750227263977047772816454060889963294101870354053421282152925179884805836468916017078340467831558871*i+174471685763648230502237870317913776949630189590314594461483603463823702677376529529897535111667312230980049551228769710245743762)*x + (2767096879523366524710066654556621407778241187959824051984456899695583597478621741608553422865733482008590994078490574873590608004*i+19841526762048334205924990338837536291061218407510213493826115191082497029338753016758255379354579020072535892835090679067269236344) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (372240907770039503092931195483750227263977047772816454060889963294101870354053421282152925179884805836468916017078340467831558871*i+174471685763648230502237870317913776949630189590314594461483603463823702677376529529897535111667312230980049551228769710245743762)*x + (2767096879523366524710066654556621407778241187959824051984456899695583597478621741608553422865733482008590994078490574873590608004*i+19841526762048334205924990338837536291061218407510213493826115191082497029338753016758255379354579020072535892835090679067269236344) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15115434459587924589930818060488677396770417238207194147125275135899766281379401131140091685517218646162590378218472224929297829270*i+20035663924500482428238105618212484728881061572694516116581418992716242762407299582897884089254043847278276014386101806201432608297)*x + (2880376604815423056815052385699097406342367192455071979147698250893822529324387708878706698192051180327519924872273057517618082418*i+13765713841390611418868339961217921778670682720855386224651349657728117580103128174644839067686076385147153461808352868398669421487) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15115434459587924589930818060488677396770417238207194147125275135899766281379401131140091685517218646162590378218472224929297829270*i+20035663924500482428238105618212484728881061572694516116581418992716242762407299582897884089254043847278276014386101806201432608297)*x + (2880376604815423056815052385699097406342367192455071979147698250893822529324387708878706698192051180327519924872273057517618082418*i+13765713841390611418868339961217921778670682720855386224651349657728117580103128174644839067686076385147153461808352868398669421487) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16438114409554153528312470294101261149419122970645451733652505471696264657759043538868993575567353999364097681358249110434871370494*i+11503411245769279981284110578159280207694309015346824916095148693779483706310624566054387737211214869079806846572227721547944993593)*x + (16562624028981711436929242188126105175600705590504254026324892632067114250509690004676514079680207866301785003055641151257721008294*i+16052049131039283942554463132466160117080103739659684704328065931944138763949822300948028956392460850087045540861249647066048973791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16438114409554153528312470294101261149419122970645451733652505471696264657759043538868993575567353999364097681358249110434871370494*i+11503411245769279981284110578159280207694309015346824916095148693779483706310624566054387737211214869079806846572227721547944993593)*x + (16562624028981711436929242188126105175600705590504254026324892632067114250509690004676514079680207866301785003055641151257721008294*i+16052049131039283942554463132466160117080103739659684704328065931944138763949822300948028956392460850087045540861249647066048973791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7011036922756444688126919997037458640778398731888177524091510126479734105459608972094309654601982879262914620851144524605196478526*i+2738705348840965996678851244293659330116047322461818881975502870744375037489930921825257718216749372793702098407903982778689594888)*x + (2124293333989344081784888306377206011774423656115610201280995586637328991211998396946399202618992875622180450014998220378386881812*i+20639914521801798938504304403645904675464456101791576126840766739848937043983414861698536550528538972970116244483137038435341153580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7011036922756444688126919997037458640778398731888177524091510126479734105459608972094309654601982879262914620851144524605196478526*i+2738705348840965996678851244293659330116047322461818881975502870744375037489930921825257718216749372793702098407903982778689594888)*x + (2124293333989344081784888306377206011774423656115610201280995586637328991211998396946399202618992875622180450014998220378386881812*i+20639914521801798938504304403645904675464456101791576126840766739848937043983414861698536550528538972970116244483137038435341153580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23611270373730400086891567455306649406543196009536096731346474251140332807523515474458763119484432354480227644795345735980428986513*i+11543383181927143471799917596681926952475932617062121986935325876300349910192267084291412947910788223216510914230096705484881134972)*x + (349578874740951398054896903711317012329939743833432020719265206031458517475014476773959043935243704062241804989650793919847562312*i+1028534028554700722169809206065749299291085338555300327907636210060435551274469799326206439530198531547912054700343277512375225211) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23611270373730400086891567455306649406543196009536096731346474251140332807523515474458763119484432354480227644795345735980428986513*i+11543383181927143471799917596681926952475932617062121986935325876300349910192267084291412947910788223216510914230096705484881134972)*x + (349578874740951398054896903711317012329939743833432020719265206031458517475014476773959043935243704062241804989650793919847562312*i+1028534028554700722169809206065749299291085338555300327907636210060435551274469799326206439530198531547912054700343277512375225211) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15794493756939914604148586822586191221650459536615423759212203207412349537421639698756538838245229771294082789151875513250425675743*i+11360728667419446893349889486049594054516975207201368737954236627771357713109800317440984613815622200060477771026088617027855794047)*x + (23529266392834804010816558703077078670414937411766355711590591682168955824437424356654798285931318406790704314919677287921464705180*i+24012371013446052093872052256179822689942728333586615215289145596614970737219408839664053657072621829949575261038111191526190376645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15794493756939914604148586822586191221650459536615423759212203207412349537421639698756538838245229771294082789151875513250425675743*i+11360728667419446893349889486049594054516975207201368737954236627771357713109800317440984613815622200060477771026088617027855794047)*x + (23529266392834804010816558703077078670414937411766355711590591682168955824437424356654798285931318406790704314919677287921464705180*i+24012371013446052093872052256179822689942728333586615215289145596614970737219408839664053657072621829949575261038111191526190376645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11592144738659401343923077475206789218733500834379035924462735276161103855140127295261659509715225584036229894323698797699853136224*i+5201930633177013167857036961192546199904937075674177942966941563469856980525163585676340302243489419722803861289907937001074701571)*x + (19709051470827262201035121691086234931209690795428693887586551411856694919021917720740983560764500582666898568132846523076184931665*i+19297900082162387804170940130882627592254420664615285709436444256102884609244165420180566478419426632067775665366674752263936225398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11592144738659401343923077475206789218733500834379035924462735276161103855140127295261659509715225584036229894323698797699853136224*i+5201930633177013167857036961192546199904937075674177942966941563469856980525163585676340302243489419722803861289907937001074701571)*x + (19709051470827262201035121691086234931209690795428693887586551411856694919021917720740983560764500582666898568132846523076184931665*i+19297900082162387804170940130882627592254420664615285709436444256102884609244165420180566478419426632067775665366674752263936225398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9977602301174137798830183610019716767971944727637748194201418244751290433576227183399733697939385288624049425801789559607100045185*i+7275428149981986476817047092734318836221473747500372886197441666666154836736145344571290305810313743672032653544902138101413195632)*x + (24279954430313123620160629516796888403230918940390022819295416049890728951550153974776460943728590855987438038717657053939304204706*i+15843942937418403482347738632830435244424233449554239222185770779655374703099214609899899005061338768370604695858305490698055662048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9977602301174137798830183610019716767971944727637748194201418244751290433576227183399733697939385288624049425801789559607100045185*i+7275428149981986476817047092734318836221473747500372886197441666666154836736145344571290305810313743672032653544902138101413195632)*x + (24279954430313123620160629516796888403230918940390022819295416049890728951550153974776460943728590855987438038717657053939304204706*i+15843942937418403482347738632830435244424233449554239222185770779655374703099214609899899005061338768370604695858305490698055662048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11750919459905862632595813593984609730678539894877795705430767929570384110023210578525128826966679018334275386605041460575911477565*i+11331168633016850535598383185883504438372632566807434536962431162491690641412195241784101693302306765970579436035855309901807752054)*x + (17592069159914650551906434418408803444936949127757391641429345878706189922211145986836541577554037688898428311646877298189203098487*i+20735872084603858178482239839258946812118383740965635874500468864566561311221594519684707619140428232761041482223659676726669114815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11750919459905862632595813593984609730678539894877795705430767929570384110023210578525128826966679018334275386605041460575911477565*i+11331168633016850535598383185883504438372632566807434536962431162491690641412195241784101693302306765970579436035855309901807752054)*x + (17592069159914650551906434418408803444936949127757391641429345878706189922211145986836541577554037688898428311646877298189203098487*i+20735872084603858178482239839258946812118383740965635874500468864566561311221594519684707619140428232761041482223659676726669114815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6567421996579132531064624928973921519230584307057967461207252841377531898723048112927710995094089879447488426370619067764466429295*i+23747520320296894048215819349517025112857125686575236384038424424337325112024239507866077531312775277482234794561452228504412819621)*x + (3762319022774847835230772278875225195314714659539988225364119141617538952295520093140697318751869013991128884289587265623270531582*i+3305813115146590411518849351295810622029382446436776280516356867868132428451101721411208480258669781718571110697145564588170605974) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6567421996579132531064624928973921519230584307057967461207252841377531898723048112927710995094089879447488426370619067764466429295*i+23747520320296894048215819349517025112857125686575236384038424424337325112024239507866077531312775277482234794561452228504412819621)*x + (3762319022774847835230772278875225195314714659539988225364119141617538952295520093140697318751869013991128884289587265623270531582*i+3305813115146590411518849351295810622029382446436776280516356867868132428451101721411208480258669781718571110697145564588170605974) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (114215408670137679312517690575696384494351374782059794550411109181916713097562672581197957585238536965031197044359997859497797420*i+15331452002355381248697238996233444335886494654839598521085807595768125050563891044065668008610862087844381090043387815988794917631)*x + (2930647759817957417379386066715319105303289625036417208732861627261136193077735501445153506303792244748366652819426831133116039561*i+17288288953251791644178030671721960206674570281068951275673489324912950654112301383742969165882408110539882046527731995579086008078) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (114215408670137679312517690575696384494351374782059794550411109181916713097562672581197957585238536965031197044359997859497797420*i+15331452002355381248697238996233444335886494654839598521085807595768125050563891044065668008610862087844381090043387815988794917631)*x + (2930647759817957417379386066715319105303289625036417208732861627261136193077735501445153506303792244748366652819426831133116039561*i+17288288953251791644178030671721960206674570281068951275673489324912950654112301383742969165882408110539882046527731995579086008078) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17244035840142284989149372957960944853771893488645012452804667044628256753996521410144314351854390175267556487158038211157528661379*i+380364474150921151525767454081063286365302432976863166425047460307180366496222178072299719260309931934924258112670173081799052483)*x + (3530733968342348095215605028457043769824717194248176187398137792116055501953663886522061904322209067797776714457415470356938931835*i+5973346598662960697516042236969057516545577324513256706871583529972486042989150761038647242289945355449356998135131893241009123168) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17244035840142284989149372957960944853771893488645012452804667044628256753996521410144314351854390175267556487158038211157528661379*i+380364474150921151525767454081063286365302432976863166425047460307180366496222178072299719260309931934924258112670173081799052483)*x + (3530733968342348095215605028457043769824717194248176187398137792116055501953663886522061904322209067797776714457415470356938931835*i+5973346598662960697516042236969057516545577324513256706871583529972486042989150761038647242289945355449356998135131893241009123168) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12753125175602178651427980523684164705388496937319543267678037166404306970538588611889298369469997599025516237355121657632433518041*i+7708734332303583402031379019784526475028983144987582069719716290050530511814257178479232593178091024347286197641031469119393554614)*x + (15414072711224909498131161214558848485719425584896428911053143130700849413616827967289019283422767745836398812135275911585222819296*i+19072295129554826317761237012766797497799234677233157950692606142624537387559095134747106233289547679379049645639866146285226363637) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12753125175602178651427980523684164705388496937319543267678037166404306970538588611889298369469997599025516237355121657632433518041*i+7708734332303583402031379019784526475028983144987582069719716290050530511814257178479232593178091024347286197641031469119393554614)*x + (15414072711224909498131161214558848485719425584896428911053143130700849413616827967289019283422767745836398812135275911585222819296*i+19072295129554826317761237012766797497799234677233157950692606142624537387559095134747106233289547679379049645639866146285226363637) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18689067993152113997915750393284888500653491326775549003138222605999505925302625218083855305585661429739004045676806566725043251384*i+4931448123075815951467250922130911286585461672816968001645907356489013846007023463879682850296345410554103097929709890116896767172)*x + (15724865136833301537546186300953219193824071384900895640885399857544673793679355611838687182654140456264022807492154311792584309130*i+14832994010852861533622626787009525294391010606681875664889781610459777671674480163037660170671790698963356797310995919047805128271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18689067993152113997915750393284888500653491326775549003138222605999505925302625218083855305585661429739004045676806566725043251384*i+4931448123075815951467250922130911286585461672816968001645907356489013846007023463879682850296345410554103097929709890116896767172)*x + (15724865136833301537546186300953219193824071384900895640885399857544673793679355611838687182654140456264022807492154311792584309130*i+14832994010852861533622626787009525294391010606681875664889781610459777671674480163037660170671790698963356797310995919047805128271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17093579060977544576176314526340043256502366618016601707284373860452612769800234089494334470425184826033543102729348634727704568060*i+7630360223430739140320057482068151426618186604833662731759596777953061141009074485726563712607664662891921239010407420826413663649)*x + (7608242357962729204256630672972189817632313661232130814499049619358312518428136602912179939692235068695514049002595966486572136395*i+21899239546524633611408136303086478416282358911625534046604024701470252988699609430006809067049967347359135370148553972227447588764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17093579060977544576176314526340043256502366618016601707284373860452612769800234089494334470425184826033543102729348634727704568060*i+7630360223430739140320057482068151426618186604833662731759596777953061141009074485726563712607664662891921239010407420826413663649)*x + (7608242357962729204256630672972189817632313661232130814499049619358312518428136602912179939692235068695514049002595966486572136395*i+21899239546524633611408136303086478416282358911625534046604024701470252988699609430006809067049967347359135370148553972227447588764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17448954601617675528671152328589072078326019189340963819444075916883109383119118279759439222399729985881029117688721967999086909107*i+7643723817956874131230099023341502285856113578105526975235579685800529824515323029251147200518253257443989225864449407247343254615)*x + (2028718990319736876993678826019820317259110703043205565517124588261125431557854501691305202256310540602487435537076644427909842556*i+12970025859115912132614798073267870510895356022232593346535530468983866685429842809965764895328541772133502735133677145195710138607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17448954601617675528671152328589072078326019189340963819444075916883109383119118279759439222399729985881029117688721967999086909107*i+7643723817956874131230099023341502285856113578105526975235579685800529824515323029251147200518253257443989225864449407247343254615)*x + (2028718990319736876993678826019820317259110703043205565517124588261125431557854501691305202256310540602487435537076644427909842556*i+12970025859115912132614798073267870510895356022232593346535530468983866685429842809965764895328541772133502735133677145195710138607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18359906599731212948768056463903279897149263059682269724177897186787563456489480044350351925039460781393952156851410514719539254723*i+14522180873371349848369983147713945358396643193149490750003209745692567755650877343853251353814260674781334978313479543818035980674)*x + (2398887039955543109821288273550605050615297945298652421953431848515809714897008739366663555191435010202308264397128488178781512122*i+9219829703152517226787256222344515157388639880490308199032629387222375462641089299099646189860442536999718164416301637733446393813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18359906599731212948768056463903279897149263059682269724177897186787563456489480044350351925039460781393952156851410514719539254723*i+14522180873371349848369983147713945358396643193149490750003209745692567755650877343853251353814260674781334978313479543818035980674)*x + (2398887039955543109821288273550605050615297945298652421953431848515809714897008739366663555191435010202308264397128488178781512122*i+9219829703152517226787256222344515157388639880490308199032629387222375462641089299099646189860442536999718164416301637733446393813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17478057039347050824982593769752827163325215340690272479408686992626256014653093905627252462415751081170838300056557684683652767406*i+15536294723415236968652435218813073494274287917475240761865181886974062342912009505043451238200852312442597758816594250700512735712)*x + (20557845892030764152493433058460395089282968326082418935550667780732862800369777910925114501186071741114630357067837515363413165819*i+104389371216493910660071401559797266987320431721297769367161531427766784845255552175979852780573814360487062079086839538608258812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17478057039347050824982593769752827163325215340690272479408686992626256014653093905627252462415751081170838300056557684683652767406*i+15536294723415236968652435218813073494274287917475240761865181886974062342912009505043451238200852312442597758816594250700512735712)*x + (20557845892030764152493433058460395089282968326082418935550667780732862800369777910925114501186071741114630357067837515363413165819*i+104389371216493910660071401559797266987320431721297769367161531427766784845255552175979852780573814360487062079086839538608258812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7339008732684843605603071297748752816730042562657159064645136506532935022305388070803744305992598127942340992714871884088187306846*i+2075978221782781478892606759049057483348382924330475986434742275040020408314367670550175415257292229292839494834194223133028279008)*x + (3252217843582752183155918026002395564108623963288103352043141458616699248223606322529179270250730206760909691992997874785512938194*i+23594155841331091713155871819595277860016943869191894498598482380687594076648448282874039583565145441825553873193184254364555211116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7339008732684843605603071297748752816730042562657159064645136506532935022305388070803744305992598127942340992714871884088187306846*i+2075978221782781478892606759049057483348382924330475986434742275040020408314367670550175415257292229292839494834194223133028279008)*x + (3252217843582752183155918026002395564108623963288103352043141458616699248223606322529179270250730206760909691992997874785512938194*i+23594155841331091713155871819595277860016943869191894498598482380687594076648448282874039583565145441825553873193184254364555211116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (39142748882124668794745658504411341339424496900737856044380546674142920225196896014185017211490308834314569808087446661011551033*i+19706864489418487912723834592187433464070371010774185789326363628325511947826860891372224914875500787770179688419837612973890925515)*x + (13747510986730428665883640223742706708351734897594431973490371527265448965286220296355104644447386066035829557437779524213834486119*i+20888461348144408492548478537976789104988570292055616430674654767203557731465589804500999195442674112431521437353573046514559126251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (39142748882124668794745658504411341339424496900737856044380546674142920225196896014185017211490308834314569808087446661011551033*i+19706864489418487912723834592187433464070371010774185789326363628325511947826860891372224914875500787770179688419837612973890925515)*x + (13747510986730428665883640223742706708351734897594431973490371527265448965286220296355104644447386066035829557437779524213834486119*i+20888461348144408492548478537976789104988570292055616430674654767203557731465589804500999195442674112431521437353573046514559126251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8440555668014904298608156457771011638256178680528737793888302702181476719329340923289696387787928718936032122830849394971305289979*i+16125712722593347271183991494703068986473789677824675556934380078838457953274911532972948349394910231372487129216103480494580601554)*x + (7353119659777634623689518631052638889666333413803957956647400234992633940211295913269311306503687039491654375495204065367328757265*i+12563573436788478888666793111852872085277395307925554662162575122645840326085372969014206771966507791995642005126734507764508133391) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8440555668014904298608156457771011638256178680528737793888302702181476719329340923289696387787928718936032122830849394971305289979*i+16125712722593347271183991494703068986473789677824675556934380078838457953274911532972948349394910231372487129216103480494580601554)*x + (7353119659777634623689518631052638889666333413803957956647400234992633940211295913269311306503687039491654375495204065367328757265*i+12563573436788478888666793111852872085277395307925554662162575122645840326085372969014206771966507791995642005126734507764508133391) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19766674315929903338995355066971415016069651596154293865999140918103055557875833129865684311366722855941943787119924174775096658909*i+22205561502679546506057691339353605924115081467208284355229707336815224608463742431930272823995500849964778173263025742783041008024)*x + (3990805853511523267881309373773800599823653638184996417778085600266305271694998638663794102802383536949714867089873596292383845219*i+13793118600140855699068975788506720638293524475652359662146608437243552906006954965321346265978576577737974886842514727496656393195) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19766674315929903338995355066971415016069651596154293865999140918103055557875833129865684311366722855941943787119924174775096658909*i+22205561502679546506057691339353605924115081467208284355229707336815224608463742431930272823995500849964778173263025742783041008024)*x + (3990805853511523267881309373773800599823653638184996417778085600266305271694998638663794102802383536949714867089873596292383845219*i+13793118600140855699068975788506720638293524475652359662146608437243552906006954965321346265978576577737974886842514727496656393195) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7735986413932819141323042527203798120111038480037317039744499522284538895545484630146050874207235874125186254378284059899239212411*i+20450394340688082834150143999294646212499430232032714158414602940305174962021126244549087437192153024133382322368392521941487891728)*x + (14353148644975809657400012689977587133143000898571611802337368909280012793953418520280405691776845917094281913037782486930732133179*i+21360033562570445327700100747492124273748654478478953982206782237951728103027289985414996091086679189418848522080045504927576116923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7735986413932819141323042527203798120111038480037317039744499522284538895545484630146050874207235874125186254378284059899239212411*i+20450394340688082834150143999294646212499430232032714158414602940305174962021126244549087437192153024133382322368392521941487891728)*x + (14353148644975809657400012689977587133143000898571611802337368909280012793953418520280405691776845917094281913037782486930732133179*i+21360033562570445327700100747492124273748654478478953982206782237951728103027289985414996091086679189418848522080045504927576116923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23184678549834154358539584038736690541918464676070308623215902149149014420995988391400283333413241367817666844493755249822129859975*i+4979361584536709601352334451345561361552728447738580924193557905216443746171107547020331446537378307246379557630462065291175126733)*x + (12447909937063697815913182773603979788444680642205339351428706699891513784629559159631970134505914263663651819318403434735355596268*i+23045852443462885555603510743466515644986279014395278569424127070968721184318432667906989624462916902430692511455368282782003772504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23184678549834154358539584038736690541918464676070308623215902149149014420995988391400283333413241367817666844493755249822129859975*i+4979361584536709601352334451345561361552728447738580924193557905216443746171107547020331446537378307246379557630462065291175126733)*x + (12447909937063697815913182773603979788444680642205339351428706699891513784629559159631970134505914263663651819318403434735355596268*i+23045852443462885555603510743466515644986279014395278569424127070968721184318432667906989624462916902430692511455368282782003772504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13707317510952865053293026881035410222662324518227395570094125844503724758866001836209121095284528426125805178184562700315188732477*i+10000858672616938428111083927769030781521117456127918397908822723715495363530748126503160015055294025434382399501602198803036603672)*x + (15364888260666179267692499851607345495229354886914062799106008083943160497695558601080457699535895194503742147055449352369974154171*i+14150532609678914991168538947857962814210780732282855497955249199110482760485539663156987046980663698415227058859476402194591373005) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13707317510952865053293026881035410222662324518227395570094125844503724758866001836209121095284528426125805178184562700315188732477*i+10000858672616938428111083927769030781521117456127918397908822723715495363530748126503160015055294025434382399501602198803036603672)*x + (15364888260666179267692499851607345495229354886914062799106008083943160497695558601080457699535895194503742147055449352369974154171*i+14150532609678914991168538947857962814210780732282855497955249199110482760485539663156987046980663698415227058859476402194591373005) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23874307359427712957045590991459745335774863707822613490450398530672486706363652215327964754343282120863399550376033656672450709585*i+19396702343955983926307876547776780832742732508125902788702172899035357809410068967929312446622395613694527115558784315106891461510)*x + (5667273344217843284742761284846065025248841529955612582111881986025273392536631750701283560636043540256479782568862165355212397273*i+22021426138565416829527643973203227497219396201165320789718474939061638935640219748561361930326723483896013139282506673018233676355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23874307359427712957045590991459745335774863707822613490450398530672486706363652215327964754343282120863399550376033656672450709585*i+19396702343955983926307876547776780832742732508125902788702172899035357809410068967929312446622395613694527115558784315106891461510)*x + (5667273344217843284742761284846065025248841529955612582111881986025273392536631750701283560636043540256479782568862165355212397273*i+22021426138565416829527643973203227497219396201165320789718474939061638935640219748561361930326723483896013139282506673018233676355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5122860590447071618710940971292582120938913806413636698339394219945203495806974758273763391657976277767576862853643862198616269456*i+1504688344493354733643185533001033546273693567853669217791386982434749200257060594960639117794740071794523923132962482042355029314)*x + (17333015269746507889023913095056711281433745494281020178264251569331847955778247685457142372667682308471907922722310160771449708123*i+3626853808708456728457951003412373627593484233449835733278681262392274548350203022269730848977316633357647817017712063430870602782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5122860590447071618710940971292582120938913806413636698339394219945203495806974758273763391657976277767576862853643862198616269456*i+1504688344493354733643185533001033546273693567853669217791386982434749200257060594960639117794740071794523923132962482042355029314)*x + (17333015269746507889023913095056711281433745494281020178264251569331847955778247685457142372667682308471907922722310160771449708123*i+3626853808708456728457951003412373627593484233449835733278681262392274548350203022269730848977316633357647817017712063430870602782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15942673292853503846599328415681642381188588588968638496933477708035419964530860847142066446460227856607185285617530933787632142618*i+2221167714191488115187009259634771486378556047820559267281397406336659628906474626511797127720107013901784707167559814215515125132)*x + (4721598902544087992597247166094343046019846589192349392480199470091020566593668064142140170820829522444644414334141095641659424772*i+9767890673227267418487060668013713418782666617007634226443679655818410901503540896131100344135655393180660088109394137633357830256) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15942673292853503846599328415681642381188588588968638496933477708035419964530860847142066446460227856607185285617530933787632142618*i+2221167714191488115187009259634771486378556047820559267281397406336659628906474626511797127720107013901784707167559814215515125132)*x + (4721598902544087992597247166094343046019846589192349392480199470091020566593668064142140170820829522444644414334141095641659424772*i+9767890673227267418487060668013713418782666617007634226443679655818410901503540896131100344135655393180660088109394137633357830256) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1220977344666905193623123511214502744829557591814421142063204835741314815400395704252190335012387492773929964212511410844493522464*i+12813264607197870061709401584506604679988248270074439670377734423081858229239601070966348093486662237142067131600766190797503210576)*x + (1011199948782003269644932866602914171058440771494192506138313164202245244286450750613215670678482075892576871680952710679831856455*i+2933876950741375509636809148653574370619713465381088494720723552962209673293635961316971186826450510719223327978092808292674037454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1220977344666905193623123511214502744829557591814421142063204835741314815400395704252190335012387492773929964212511410844493522464*i+12813264607197870061709401584506604679988248270074439670377734423081858229239601070966348093486662237142067131600766190797503210576)*x + (1011199948782003269644932866602914171058440771494192506138313164202245244286450750613215670678482075892576871680952710679831856455*i+2933876950741375509636809148653574370619713465381088494720723552962209673293635961316971186826450510719223327978092808292674037454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4333865185996186573041784432089763530328266846993973260139050476905483298636609727221830119541533938577235816549919694980768866042*i+1143247320411433875724715129644507409927409563744248787444135748676698549879212363231263980669745433514203288785820301942800240248)*x + (4154168161865759378322966260722422461924594489324958760362091761953462382551436288828897030480959589720674008503814325671952626636*i+9066074730996527064425026691177523355242617508056287959714592724440626282438772585044907269746189415554506618321395747824020815693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4333865185996186573041784432089763530328266846993973260139050476905483298636609727221830119541533938577235816549919694980768866042*i+1143247320411433875724715129644507409927409563744248787444135748676698549879212363231263980669745433514203288785820301942800240248)*x + (4154168161865759378322966260722422461924594489324958760362091761953462382551436288828897030480959589720674008503814325671952626636*i+9066074730996527064425026691177523355242617508056287959714592724440626282438772585044907269746189415554506618321395747824020815693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12717688652135248230654683318096185385855969766273621717324645251643871513120984948740027487854028303524002189953746249634162784953*i+13443269433844643190844535910560711761470559653440725875694061929397676098746243155573295905469959976319049179596483751875709586860)*x + (8165748063979619675934097928630604180643855013550573904835669497826645333855247939908081274664871807134547497104501913094319393149*i+5440349668715855266786171020703489696730874434841403712622762963855838664158631742443352152603024993941526189145896628144328831313) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12717688652135248230654683318096185385855969766273621717324645251643871513120984948740027487854028303524002189953746249634162784953*i+13443269433844643190844535910560711761470559653440725875694061929397676098746243155573295905469959976319049179596483751875709586860)*x + (8165748063979619675934097928630604180643855013550573904835669497826645333855247939908081274664871807134547497104501913094319393149*i+5440349668715855266786171020703489696730874434841403712622762963855838664158631742443352152603024993941526189145896628144328831313) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12743815278573581745073350959237593639156957334409029062550148375051438759265133453616331467704177001152924087702515544929306509665*i+50271146738256973460521463451416533804258985016592903826100360030813293941301875466408736605949699687325944100603772358609882727)*x + (23283196986138399983499791132015996800779541638226879534772531812546139381537202832621393087774258043315504380051708663381319133018*i+22187743040215531066579076382684164784638802151727171738812743357996215967353345481161031459184070242650147745410914549781029080510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12743815278573581745073350959237593639156957334409029062550148375051438759265133453616331467704177001152924087702515544929306509665*i+50271146738256973460521463451416533804258985016592903826100360030813293941301875466408736605949699687325944100603772358609882727)*x + (23283196986138399983499791132015996800779541638226879534772531812546139381537202832621393087774258043315504380051708663381319133018*i+22187743040215531066579076382684164784638802151727171738812743357996215967353345481161031459184070242650147745410914549781029080510) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12426941830958543830661198018538540115590141343831679072168133888208663404439100056680620236106241668085271187296629968569586959326*i+17698442264659201837628061586507523613198248525895267916901195885414967488934859737010774989303621263484555120515604637169830600022)*x + (1698972656415269021575150131529621466575162581092641344068046703259721713612543044999259979964562518500349336432561200415312095373*i+21863222901878558926764874784832740429051137414427124067441504309219789678230259165586368169436427198145167570654433546632673596139) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12426941830958543830661198018538540115590141343831679072168133888208663404439100056680620236106241668085271187296629968569586959326*i+17698442264659201837628061586507523613198248525895267916901195885414967488934859737010774989303621263484555120515604637169830600022)*x + (1698972656415269021575150131529621466575162581092641344068046703259721713612543044999259979964562518500349336432561200415312095373*i+21863222901878558926764874784832740429051137414427124067441504309219789678230259165586368169436427198145167570654433546632673596139) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10777720797658482869062834942373350900497485906259500684026936746145690860931064486768666238341848522175861258638157273470924663733*i+11700422840283828651568329762960399332776844858115568784742614925615257391971750940551258894129318252953564381933105741310613289543)*x + (20446376968153982470106249418971429956487552408826530761261606074492585617108408788116789356986065914473863466067843378157841983823*i+16805220046305172956241032873765932810277252520925730177903477111978839348650133961832352626280347296507559563686169628378131802460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10777720797658482869062834942373350900497485906259500684026936746145690860931064486768666238341848522175861258638157273470924663733*i+11700422840283828651568329762960399332776844858115568784742614925615257391971750940551258894129318252953564381933105741310613289543)*x + (20446376968153982470106249418971429956487552408826530761261606074492585617108408788116789356986065914473863466067843378157841983823*i+16805220046305172956241032873765932810277252520925730177903477111978839348650133961832352626280347296507559563686169628378131802460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3147319805896896282984818598940870874680707593056480847059597082982031196841953459325449654744057156315998206607818643065900099931*i+6465881566427390489818103032852193182580756355530224656198343596164400004439464026778059748270380063926451581087591384037117560320)*x + (19495947747007466569355288460501751808119909411764355019008501748521503776032967244929264830132958433031584988177563486131733008137*i+5040842677361224716270834971776132623381354455373654420948569261750225676733474939632682639156148520943358341525261469051116652099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3147319805896896282984818598940870874680707593056480847059597082982031196841953459325449654744057156315998206607818643065900099931*i+6465881566427390489818103032852193182580756355530224656198343596164400004439464026778059748270380063926451581087591384037117560320)*x + (19495947747007466569355288460501751808119909411764355019008501748521503776032967244929264830132958433031584988177563486131733008137*i+5040842677361224716270834971776132623381354455373654420948569261750225676733474939632682639156148520943358341525261469051116652099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9556479273434491836661399503929993109563331644824669352427781893443048749961994380067860517502319303729156012296838094369457626885*i+13239914015931930446470169764354372641113573589590450139039896568392435537691743982514319001132888558303588671539531639404451219525)*x + (23689535853100980847253510236520254312587417571628401653985317246302854551513115306770155373234109620579416798781358888713528793385*i+458824715067370606401800564216062211790955808778675682689744676080442810675149836301942636361046903609658436067879133407576813273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9556479273434491836661399503929993109563331644824669352427781893443048749961994380067860517502319303729156012296838094369457626885*i+13239914015931930446470169764354372641113573589590450139039896568392435537691743982514319001132888558303588671539531639404451219525)*x + (23689535853100980847253510236520254312587417571628401653985317246302854551513115306770155373234109620579416798781358888713528793385*i+458824715067370606401800564216062211790955808778675682689744676080442810675149836301942636361046903609658436067879133407576813273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11657825192095433575636434046751090462743983185886049058727668965293519430365477749833378364287039031613841248553728168367275240415*i+12542430718909669521630992002457597513258786811052839013028439383686962258066596614024485660914605142429941550136513079857439613605)*x + (6644786075836923700244218220562691144258596193609981677177630766192041468057268390307935278268516846373798973401751678564801508330*i+21377660745368568105345454011940811304549094776369217235691815315694187985487113782690562902487243255085539716603404198910626349006) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11657825192095433575636434046751090462743983185886049058727668965293519430365477749833378364287039031613841248553728168367275240415*i+12542430718909669521630992002457597513258786811052839013028439383686962258066596614024485660914605142429941550136513079857439613605)*x + (6644786075836923700244218220562691144258596193609981677177630766192041468057268390307935278268516846373798973401751678564801508330*i+21377660745368568105345454011940811304549094776369217235691815315694187985487113782690562902487243255085539716603404198910626349006) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14601681181208702776312917333148390255228169355800931217960377873715959913745199479906631242914435813552905509263550545420579656981*i+14319972324452661075089362595004333813357317829802554458936940543551428735129025392500235895409449313962589149448465865930087862645)*x + (3953850729047548497570366800404077147602248646091391337543689151709014991377935378878364382699227256675270293487272174297021156645*i+17919131021754051478566350749386939905556985399672518542883697670907436998670473259510017815780058485122584166631099027217042265453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14601681181208702776312917333148390255228169355800931217960377873715959913745199479906631242914435813552905509263550545420579656981*i+14319972324452661075089362595004333813357317829802554458936940543551428735129025392500235895409449313962589149448465865930087862645)*x + (3953850729047548497570366800404077147602248646091391337543689151709014991377935378878364382699227256675270293487272174297021156645*i+17919131021754051478566350749386939905556985399672518542883697670907436998670473259510017815780058485122584166631099027217042265453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4015668531397657975453352647016498264085951030752839389543850595433764475502246091378849634896397927278938881559755008936850680148*i+4881989310804763888192324386045458312105583974347942365401897670158959268990036299410333620861490101847164862989741424938886992428)*x + (3433796683355291971161901221716514859168550715558492739580931830071369167567243786065876444509234200597527097117365549117533100174*i+1234952429253507011420685391028359228128933874714653368952266299465670404476790282435426045246102633213590637893416448887100180689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4015668531397657975453352647016498264085951030752839389543850595433764475502246091378849634896397927278938881559755008936850680148*i+4881989310804763888192324386045458312105583974347942365401897670158959268990036299410333620861490101847164862989741424938886992428)*x + (3433796683355291971161901221716514859168550715558492739580931830071369167567243786065876444509234200597527097117365549117533100174*i+1234952429253507011420685391028359228128933874714653368952266299465670404476790282435426045246102633213590637893416448887100180689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14345221288856066102796358407141322458932873625447662750277568745373744789257867630567299391322033393503230974093632002907603061948*i+19294488673713005685263566517354605498099681338169967321918212369909333584935489969490339218242944560524245541370451055143937325028)*x + (21331861376231240548144286475963994307036265826675977613531914614659177271008405325889517220644585033662158734627344843816866981910*i+12822760457363350495572985258853094498557426499655576367637607524412568987232712511896664419838939090153067926565921646677543454391) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14345221288856066102796358407141322458932873625447662750277568745373744789257867630567299391322033393503230974093632002907603061948*i+19294488673713005685263566517354605498099681338169967321918212369909333584935489969490339218242944560524245541370451055143937325028)*x + (21331861376231240548144286475963994307036265826675977613531914614659177271008405325889517220644585033662158734627344843816866981910*i+12822760457363350495572985258853094498557426499655576367637607524412568987232712511896664419838939090153067926565921646677543454391) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11798290509351531398088286001875433453425261519216462823825452726744588839729149822820966085205951510042669925929210499399352389014*i+3268248493195725350601817982630004946611421094925818069905501041065687012940170352089579021864988897767547092138478419890381521622)*x + (6865823903018545100654725290963177242426222135221249725079207778792444282067315076032518071085438927789245720974241333999090787681*i+9498076712328506211492168851574775713164670863515591725179716175198182677383984029769487790173942541628529599980954155587148497993) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11798290509351531398088286001875433453425261519216462823825452726744588839729149822820966085205951510042669925929210499399352389014*i+3268248493195725350601817982630004946611421094925818069905501041065687012940170352089579021864988897767547092138478419890381521622)*x + (6865823903018545100654725290963177242426222135221249725079207778792444282067315076032518071085438927789245720974241333999090787681*i+9498076712328506211492168851574775713164670863515591725179716175198182677383984029769487790173942541628529599980954155587148497993) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13272596434026511382002565586058347524076694403223330753860066177708547193188997508392241661350115929601347792969077891228065080560*i+13758883216329970929141194117842694274438826914104750558111334395117484279877876241077058821620496343474567508433881375579908065402)*x + (14181003174130933275349088051459665508486696941498334247163302708572859519768131557136912282640200185091196942773588586364253649252*i+3775530788372230876130781229737560219882493191340677356615048167262361420929481693195833476479785394190791419089507443241374155847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13272596434026511382002565586058347524076694403223330753860066177708547193188997508392241661350115929601347792969077891228065080560*i+13758883216329970929141194117842694274438826914104750558111334395117484279877876241077058821620496343474567508433881375579908065402)*x + (14181003174130933275349088051459665508486696941498334247163302708572859519768131557136912282640200185091196942773588586364253649252*i+3775530788372230876130781229737560219882493191340677356615048167262361420929481693195833476479785394190791419089507443241374155847) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (269575851948213305711244778766595729790516853282965543979892121273676873514090543039410493972838380471423468203959153266556765224*i+14705864261368321436395688649620593312543723152489764340872567127922958205940641552472193135621495487864433114113504208469653349327)*x + (18079244162548667194062818963617198181857942635391091850113481360067887023864680651008584263938112589968812346289656187512138192425*i+3815582447660813272749912574234542723601780949590878552161071918376413383402224677453749109123923785938853682711446666943590085493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (269575851948213305711244778766595729790516853282965543979892121273676873514090543039410493972838380471423468203959153266556765224*i+14705864261368321436395688649620593312543723152489764340872567127922958205940641552472193135621495487864433114113504208469653349327)*x + (18079244162548667194062818963617198181857942635391091850113481360067887023864680651008584263938112589968812346289656187512138192425*i+3815582447660813272749912574234542723601780949590878552161071918376413383402224677453749109123923785938853682711446666943590085493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23845134258822680514942163937333881056064342682939760101217301184954167427775890272594947146516469480680170352501734446191151846400*i+24386207667465282352064256789468560105893147996539204715329950771980016201310411492011102134928641462992768990843040859860491891662)*x + (15567263799946399640530683885270639350632130710665615223579157675660122073499062647752442214161765617528552855400002022093709639234*i+22490587161950471900080956463944384764251918985656940884232301771262660742038303070764030296273968423779413268848401624854729366782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23845134258822680514942163937333881056064342682939760101217301184954167427775890272594947146516469480680170352501734446191151846400*i+24386207667465282352064256789468560105893147996539204715329950771980016201310411492011102134928641462992768990843040859860491891662)*x + (15567263799946399640530683885270639350632130710665615223579157675660122073499062647752442214161765617528552855400002022093709639234*i+22490587161950471900080956463944384764251918985656940884232301771262660742038303070764030296273968423779413268848401624854729366782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15900361151773815587537477379602801893285502478135199879708486936160587666737810952780827061010317571097785365819246466725087930875*i+19190368873746923210935962014956415890579818932967586247486297051153415036053795968789168374609391509272644668689872572030735411324)*x + (8090519438802278995458517948453138763564550046340499091912414844307618160087713030242278819628440775955444789183152498934822068628*i+7904205781511002155250472395423170494604789016319943729264198681100566439249333502791030198497029331895553959872474985161313242962) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15900361151773815587537477379602801893285502478135199879708486936160587666737810952780827061010317571097785365819246466725087930875*i+19190368873746923210935962014956415890579818932967586247486297051153415036053795968789168374609391509272644668689872572030735411324)*x + (8090519438802278995458517948453138763564550046340499091912414844307618160087713030242278819628440775955444789183152498934822068628*i+7904205781511002155250472395423170494604789016319943729264198681100566439249333502791030198497029331895553959872474985161313242962) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11835705072069366121997793471402465132092195819253431409731349576251891035793902454566873497065803836612696790876695317918230279242*i+12574017605518525790685744587029350722241958144519901694794901730433965840046150792947938312129228483992314432898511239214916544220)*x + (647703211480475319446427295332690539105831894487511746358519818124367239056041986808624587977286918519880156546565640646719976872*i+9663629475636629957410950700185390858659785365236614666114483975938525916204187185596583612679311690533164909472343569830206861587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11835705072069366121997793471402465132092195819253431409731349576251891035793902454566873497065803836612696790876695317918230279242*i+12574017605518525790685744587029350722241958144519901694794901730433965840046150792947938312129228483992314432898511239214916544220)*x + (647703211480475319446427295332690539105831894487511746358519818124367239056041986808624587977286918519880156546565640646719976872*i+9663629475636629957410950700185390858659785365236614666114483975938525916204187185596583612679311690533164909472343569830206861587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2718005436137456114316998280360718558928972296120975833919862766115800783213050956192858390592106797117696275713650223303351367042*i+16245044156195779864916759844595086442877312569434337752304076215739095908130337167308417746937961979659928535867175386835686644321)*x + (12568257087989774327094165582690279047669477430367930662387038921021027967868102969734067800773571810387523900974527528479084441425*i+21049333997752557107028051052695484286991934669039715721004503248774507560304939727454071162034745969460999737335185125183082784559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2718005436137456114316998280360718558928972296120975833919862766115800783213050956192858390592106797117696275713650223303351367042*i+16245044156195779864916759844595086442877312569434337752304076215739095908130337167308417746937961979659928535867175386835686644321)*x + (12568257087989774327094165582690279047669477430367930662387038921021027967868102969734067800773571810387523900974527528479084441425*i+21049333997752557107028051052695484286991934669039715721004503248774507560304939727454071162034745969460999737335185125183082784559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7916698517847320989956624481611848572095717698646589051212834596867967143621842794770169988726704333090491261523464806012751119799*i+22227979177139872100515434603896729967982531376057749588658901593107394112865344705547434930370532425399519767671705883536413212111)*x + (3233746600008211890599648041840096505573314715138343030767456736581187541778208406391245266596451716871756098904375152424229261816*i+8920455890879069666341101111805042559989190773804953579495917415858470060304271395435734134933696799751588507248450676505438942717) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7916698517847320989956624481611848572095717698646589051212834596867967143621842794770169988726704333090491261523464806012751119799*i+22227979177139872100515434603896729967982531376057749588658901593107394112865344705547434930370532425399519767671705883536413212111)*x + (3233746600008211890599648041840096505573314715138343030767456736581187541778208406391245266596451716871756098904375152424229261816*i+8920455890879069666341101111805042559989190773804953579495917415858470060304271395435734134933696799751588507248450676505438942717) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4907392618344790473243329707712869726659179557254208627182117510750697553589655086808579155447057333545816511776759818098776446402*i+22124668338242510907121074671274279827870102299585184373802878296969459742739718358495928545215472227206283609134030409929154922914)*x + (4820638931088254652902148309168565491859637108033483914037433314808892442312969376591837779145919990618348786048656185662457371903*i+20483595336830630866277216069426352344032290387312603666665355771493292059826242380000733738913879833082312287716601699415774713059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4907392618344790473243329707712869726659179557254208627182117510750697553589655086808579155447057333545816511776759818098776446402*i+22124668338242510907121074671274279827870102299585184373802878296969459742739718358495928545215472227206283609134030409929154922914)*x + (4820638931088254652902148309168565491859637108033483914037433314808892442312969376591837779145919990618348786048656185662457371903*i+20483595336830630866277216069426352344032290387312603666665355771493292059826242380000733738913879833082312287716601699415774713059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8129576763852449074181296948642359137999947520031788105582832872275118007841961688213767032781970860339272100578385207257016589080*i+16253887140306065097646937300584384834074554240342784958417920677377764223271077684262222516265819882060094230372010167648517281873)*x + (2233989525939402572043896618510135578218211039839839692282323766110094792107573813530826227546280655076500055058041528799966898964*i+2131939537141838262536497683634744187850656097481326496574670565087972150873357355270651925011426589985463255316440660395885446433) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8129576763852449074181296948642359137999947520031788105582832872275118007841961688213767032781970860339272100578385207257016589080*i+16253887140306065097646937300584384834074554240342784958417920677377764223271077684262222516265819882060094230372010167648517281873)*x + (2233989525939402572043896618510135578218211039839839692282323766110094792107573813530826227546280655076500055058041528799966898964*i+2131939537141838262536497683634744187850656097481326496574670565087972150873357355270651925011426589985463255316440660395885446433) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15364984375525303048331483463469967134702225033209658275590323756042934071601658884028939962280609977999972925985654068966454192843*i+18131218705673378916847673153702701860822308039750204248853727467007655623155784180347313823899929249025921760381881324139074597735)*x + (12488995076870673928449908066962903900220355199376232217444588716580471760462560685477762042220784167606504168110732311980076175413*i+9505029544093951790531970991646036244777414378407732843574619860276809430026222527016055163069747164507598473909815908582293106666) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15364984375525303048331483463469967134702225033209658275590323756042934071601658884028939962280609977999972925985654068966454192843*i+18131218705673378916847673153702701860822308039750204248853727467007655623155784180347313823899929249025921760381881324139074597735)*x + (12488995076870673928449908066962903900220355199376232217444588716580471760462560685477762042220784167606504168110732311980076175413*i+9505029544093951790531970991646036244777414378407732843574619860276809430026222527016055163069747164507598473909815908582293106666) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6551417776861752353496989760776716606402500374106435647652323555843590225543604859027446677160512033126911227464666814791147029239*i+10313394987349138797031183024362929933048162240679842745172995595836926200520206279533022376853070658481728465003495716970565474501)*x + (17925639172277136831917850812538551949155214417765812241554218278732429888751609958711346181048669755732072355073669427315451330182*i+18066799780342183926758101676834211335751527053477816684655492642056397565955469426706464503551914220775207238976023036923857848100) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6551417776861752353496989760776716606402500374106435647652323555843590225543604859027446677160512033126911227464666814791147029239*i+10313394987349138797031183024362929933048162240679842745172995595836926200520206279533022376853070658481728465003495716970565474501)*x + (17925639172277136831917850812538551949155214417765812241554218278732429888751609958711346181048669755732072355073669427315451330182*i+18066799780342183926758101676834211335751527053477816684655492642056397565955469426706464503551914220775207238976023036923857848100) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18685422724074618117049030930353394777394476587325534211506181015756091043859651326259996878680502359186025863452312963842683528930*i+13163802870337209619056633377981458275496904969063180568753022530116284902639719259578369866853154248905170029573194510157210746780)*x + (4492693612705720109972881681083365465233264822441388500701970249981279818131762678212100412779701764946195649547260221309723181031*i+8342458831923208665476065362472297857944100187203035403846191533450186484010507869582267167082205350959320947755391013197133918357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18685422724074618117049030930353394777394476587325534211506181015756091043859651326259996878680502359186025863452312963842683528930*i+13163802870337209619056633377981458275496904969063180568753022530116284902639719259578369866853154248905170029573194510157210746780)*x + (4492693612705720109972881681083365465233264822441388500701970249981279818131762678212100412779701764946195649547260221309723181031*i+8342458831923208665476065362472297857944100187203035403846191533450186484010507869582267167082205350959320947755391013197133918357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4850536863333119043070830778946461997049659902050475714482855890374320490214385998682273631277657141481113018724876382811894144079*i+5194734463450348662813235768133798571670108193321193911806360723440501554726983413034393522988897546659600575652162643104743734985)*x + (488767806559297801239688695180935009985661315770340249546901339690344774052283925089589029258349442896429583851842485064074442144*i+7209679142322450333707973387669073593145914980798076422994483066089324092474983323866707985370407909087242435664608971711947110948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4850536863333119043070830778946461997049659902050475714482855890374320490214385998682273631277657141481113018724876382811894144079*i+5194734463450348662813235768133798571670108193321193911806360723440501554726983413034393522988897546659600575652162643104743734985)*x + (488767806559297801239688695180935009985661315770340249546901339690344774052283925089589029258349442896429583851842485064074442144*i+7209679142322450333707973387669073593145914980798076422994483066089324092474983323866707985370407909087242435664608971711947110948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (421568841144947676704474839624850633321526277793632525744325486966297163791202021773109165045380512883865760646591463969986833988*i+2387068719522337232911665550885749399852557229740346209100957464784775757183191085575286899983849512971472832409066928264784016762)*x + (4891592667352320710162666254889275597465972510446133167281332998545215326978273147757939667739848765002878972829006219309746558946*i+20525413864471968537664378684690316190367856961493960637852690169001342834947620616487167608301346557504359226244103439597003662902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [96]:
E34 = Phi34.codomain()
E34, E34.j_invariant()
Out[96]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (421568841144947676704474839624850633321526277793632525744325486966297163791202021773109165045380512883865760646591463969986833988*i+2387068719522337232911665550885749399852557229740346209100957464784775757183191085575286899983849512971472832409066928264784016762)*x + (4891592667352320710162666254889275597465972510446133167281332998545215326978273147757939667739848765002878972829006219309746558946*i+20525413864471968537664378684690316190367856961493960637852690169001342834947620616487167608301346557504359226244103439597003662902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 9600900565590155379869827767826241658875132070186773946611664078838000372866322763378943055194049171529466372183103631622310032243*i + 17719567468690129103022750276367963626502476596177307037463815164559200464033992902821020708951521632856446537380751107252016936687)
In [97]:
E43 = Phi43.codomain()
E43,  E43.j_invariant()
Out[97]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (421568841144947676704474839624850633321526277793632525744325486966297163791202021773109165045380512883865760646591463969986833988*i+2387068719522337232911665550885749399852557229740346209100957464784775757183191085575286899983849512971472832409066928264784016762)*x + (4891592667352320710162666254889275597465972510446133167281332998545215326978273147757939667739848765002878972829006219309746558946*i+20525413864471968537664378684690316190367856961493960637852690169001342834947620616487167608301346557504359226244103439597003662902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 9600900565590155379869827767826241658875132070186773946611664078838000372866322763378943055194049171529466372183103631622310032243*i + 17719567468690129103022750276367963626502476596177307037463815164559200464033992902821020708951521632856446537380751107252016936687)
In [98]:
E34.j_invariant() == E43.j_invariant()
Out[98]:
True
In [99]:
Phi56 = isogeny_walk(E6, Phi6_P1 + S5 * Phi6_Q1, l_B,n_B)
Phi56
Out[99]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7434654208963203565817315448164949194143869287650817931120880260205839493578971914803466685787991444403252009630294900275352941803*i+24293389825434213490226173930695788636814619377933638408481247852559959249983478717607932856170640792772389830786722727182753014216)*x + (3143466551631004402731595520449417592995077058126835562623362923575364916654681941329901626006994124889716123362871418313199499267*i+6473187532724367841987901374855376526284134911465853109451393413718302962356406201584901041881390564619671757514107581373240746437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14280678015063978297884565524871933723502431830380539955555808493394817967609205055122929555495508452399408578366714983911812876357*i+22903250930870045405745383790421099348416588419986072980067877089061437351391812924965594862891038256630926880582518513095630539233)*x + (18871121622583286268753655997140624942885972113382855175070533379336514219496301991311727806254794097058566526123507467806507123525*i+18197079454244544888472031236833840901199762827051383584430502298575948641582769926037971053289517098678982701590198201651873275392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2308075496656402299475039154381383663191550134057559222749999800135288962354508902815501221626643931202984888251571087003354024094*i+11588731729388232094964753624920032166154885427238908570193081781779635292005548876401976915085590272624041420357384885341160502235)*x + (13093152903362344550841241197443155452448834436145003704121265958072435447255077299480050303183561811404355455927866539043708384304*i+7047525863223609795899493578660374358999104348906554495712356885938723085592519897751753801184386334354844608811519643269729367294) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2308075496656402299475039154381383663191550134057559222749999800135288962354508902815501221626643931202984888251571087003354024094*i+11588731729388232094964753624920032166154885427238908570193081781779635292005548876401976915085590272624041420357384885341160502235)*x + (13093152903362344550841241197443155452448834436145003704121265958072435447255077299480050303183561811404355455927866539043708384304*i+7047525863223609795899493578660374358999104348906554495712356885938723085592519897751753801184386334354844608811519643269729367294) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20870683896595590261497377108166484506408961825045952753471942776196580387789657226999542978602776939051972162633278461514513461397*i+3573151953457978600332667598427152546111467284717618127014741895661653410417249368695714007157404872295872187486773071319382795640)*x + (21061683007370050121157551688877886792705188717017758103790644727226295662569830438021621956865635513395366863578644037413290033056*i+7744269784588033584114709931313003149782788376443695748789059148600471400107633171240091840334180975422206939597697686880562473667) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20870683896595590261497377108166484506408961825045952753471942776196580387789657226999542978602776939051972162633278461514513461397*i+3573151953457978600332667598427152546111467284717618127014741895661653410417249368695714007157404872295872187486773071319382795640)*x + (21061683007370050121157551688877886792705188717017758103790644727226295662569830438021621956865635513395366863578644037413290033056*i+7744269784588033584114709931313003149782788376443695748789059148600471400107633171240091840334180975422206939597697686880562473667) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23610349710393377293265242359540776402732253079193169123226609181181300306974218115510805551445737210586564649724054052487532636892*i+1545484366096453689928168820876471220701937577444546917545459481918140664054173577775119721484940010324165216681510570177134682145)*x + (15387671762683117827507449537929955423672100631933916827976588131734859794676123257748256252793109797120793566073598312753166661173*i+18840332958460600113752958369066250497776346265450231426432029840610504813776012985125480199280340101627902486651062624432401486476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23610349710393377293265242359540776402732253079193169123226609181181300306974218115510805551445737210586564649724054052487532636892*i+1545484366096453689928168820876471220701937577444546917545459481918140664054173577775119721484940010324165216681510570177134682145)*x + (15387671762683117827507449537929955423672100631933916827976588131734859794676123257748256252793109797120793566073598312753166661173*i+18840332958460600113752958369066250497776346265450231426432029840610504813776012985125480199280340101627902486651062624432401486476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4916064129603674477141975652134482658871134855756525564864818155603571098893653923772003239603198255228633213744432590865763799897*i+22549900926955658315733973055307948031794542776102889227158139146438273784522054528872101294026899988919164484862588749754471215436)*x + (20671045514450828212842218923580296755188668875286687381470727545308346735228246475668073683695084681918528250674056771164169152769*i+2344610870005027526159519256548035843736083080837977449643019307922029324671686892335161627634278689830189871025919519827061144349) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4916064129603674477141975652134482658871134855756525564864818155603571098893653923772003239603198255228633213744432590865763799897*i+22549900926955658315733973055307948031794542776102889227158139146438273784522054528872101294026899988919164484862588749754471215436)*x + (20671045514450828212842218923580296755188668875286687381470727545308346735228246475668073683695084681918528250674056771164169152769*i+2344610870005027526159519256548035843736083080837977449643019307922029324671686892335161627634278689830189871025919519827061144349) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19814641578445173209315866265746847797358197416074346768005836056235346668498721402824253541653561904048215100976456045555260016034*i+4848232595954763822293240619194927511503049952783865289868497219976315199899381706944923402454778179912215948780984259097072338164)*x + (14226351404843931735175371105091392431744278461046599733591973279521193914322427480440602126957155749483703408255165518266775455721*i+16878691934153134200446837436279301565186246703708831817734255729902356245414522578079559480625573320628884861062797395619454884353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19814641578445173209315866265746847797358197416074346768005836056235346668498721402824253541653561904048215100976456045555260016034*i+4848232595954763822293240619194927511503049952783865289868497219976315199899381706944923402454778179912215948780984259097072338164)*x + (14226351404843931735175371105091392431744278461046599733591973279521193914322427480440602126957155749483703408255165518266775455721*i+16878691934153134200446837436279301565186246703708831817734255729902356245414522578079559480625573320628884861062797395619454884353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10753358101833073947621949289950506032436073172514864501735350000950889726287681824359529544032554303830029102836735786868326990012*i+16495186034284791670541698029970841355580206420931759557136391603377546080381623099322929078146269330701989069412845272287007632693)*x + (4989284041027643812446316536415714579166348197697381611888513770561605870174797626484585909074241968306673870784022660214352470520*i+19702547946816633355917963882855448430520371986340422306127364965358939356812053513519231455929838082396713906182635888879113557357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10753358101833073947621949289950506032436073172514864501735350000950889726287681824359529544032554303830029102836735786868326990012*i+16495186034284791670541698029970841355580206420931759557136391603377546080381623099322929078146269330701989069412845272287007632693)*x + (4989284041027643812446316536415714579166348197697381611888513770561605870174797626484585909074241968306673870784022660214352470520*i+19702547946816633355917963882855448430520371986340422306127364965358939356812053513519231455929838082396713906182635888879113557357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12761997034482112432466708973636640592387225088990897195842899220529820482230456888398545266262236851162464957540085993092512526656*i+2657864453974447819421033156044885544510911156968666419050806869872553736969441038769809990654905994155937665023606696035656886715)*x + (10890648011391261536343797832516107354788024784513536587585457004090238011018119997469612885138459090037655955376168575100021861742*i+3977070685186010121533135672548235646795243834786709083892539399461333496286277421268281357315651748752112432339861243206427313560) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12761997034482112432466708973636640592387225088990897195842899220529820482230456888398545266262236851162464957540085993092512526656*i+2657864453974447819421033156044885544510911156968666419050806869872553736969441038769809990654905994155937665023606696035656886715)*x + (10890648011391261536343797832516107354788024784513536587585457004090238011018119997469612885138459090037655955376168575100021861742*i+3977070685186010121533135672548235646795243834786709083892539399461333496286277421268281357315651748752112432339861243206427313560) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21444890377873872631539814966857935974514615171536465039380164310419448506097225238879814060506086605676587909071645985446944469662*i+11306985915767442649863381729668739815816836587081720435549297500001483276516563452728602604380457164854821413132233851846512801653)*x + (13792416914734652475708739907273078725784823782972992638176967419882632797935313238364517908132488782178613050589825507468687305012*i+4667683975962004683938085265110510147347622401172034067833763469562969517836200422192572474775905238684880343089236236484999146442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21444890377873872631539814966857935974514615171536465039380164310419448506097225238879814060506086605676587909071645985446944469662*i+11306985915767442649863381729668739815816836587081720435549297500001483276516563452728602604380457164854821413132233851846512801653)*x + (13792416914734652475708739907273078725784823782972992638176967419882632797935313238364517908132488782178613050589825507468687305012*i+4667683975962004683938085265110510147347622401172034067833763469562969517836200422192572474775905238684880343089236236484999146442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12363742156067229315706691257505766777539331115232482985879303980334189254215323455826217755802439873787437168604251874052792703248*i+4254998272377885206333143837720857300096762579248749985955623651705419922059401268509053351503829523659551495766134209913502333355)*x + (6380816113502282463550080997492630281281713219773987846765757376185853428326420811097562707503665099092242332324509756867080292023*i+3989149667415676197207194455161017066493503332273138305827016577844399580004343721271385703572127451755210544373606493620120501970) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12363742156067229315706691257505766777539331115232482985879303980334189254215323455826217755802439873787437168604251874052792703248*i+4254998272377885206333143837720857300096762579248749985955623651705419922059401268509053351503829523659551495766134209913502333355)*x + (6380816113502282463550080997492630281281713219773987846765757376185853428326420811097562707503665099092242332324509756867080292023*i+3989149667415676197207194455161017066493503332273138305827016577844399580004343721271385703572127451755210544373606493620120501970) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12174722094574615330946138019825862786158271251345357732093414443175508188075506355171828640038948249575806587375375131850399138201*i+4314422274373954697489938344733730998920859386202188199715922829464169877800894830117724822610925465037964044336452089804722058675)*x + (4698377431444117180937471598827760519702998319872846767498725147370722425564841950993403824341379594578615211862521203412247031333*i+13625430285349975604487585888439010434938991406320948219271047994258751123644065889130328826103293609284532870900766230862819023488) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12174722094574615330946138019825862786158271251345357732093414443175508188075506355171828640038948249575806587375375131850399138201*i+4314422274373954697489938344733730998920859386202188199715922829464169877800894830117724822610925465037964044336452089804722058675)*x + (4698377431444117180937471598827760519702998319872846767498725147370722425564841950993403824341379594578615211862521203412247031333*i+13625430285349975604487585888439010434938991406320948219271047994258751123644065889130328826103293609284532870900766230862819023488) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5465314849741085246376907644008344125100286910425654165586365153395861048921010492010012801856903118398945291445206774040044637275*i+22612715496280162544750351017212390056454613732390087580735074983423510513207199406936161782103640646371678805549938428111042559236)*x + (5270618381191309910117648704425802675596408379345395209329662168694735014392816769248003408311802575474929350618697384712083191331*i+14243340187857580462176877976463928885728369347930553423212007379306338208432237733196139697913548241405864546343244446537345327394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5465314849741085246376907644008344125100286910425654165586365153395861048921010492010012801856903118398945291445206774040044637275*i+22612715496280162544750351017212390056454613732390087580735074983423510513207199406936161782103640646371678805549938428111042559236)*x + (5270618381191309910117648704425802675596408379345395209329662168694735014392816769248003408311802575474929350618697384712083191331*i+14243340187857580462176877976463928885728369347930553423212007379306338208432237733196139697913548241405864546343244446537345327394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5145305712288713145953051101917684181024313329774334745011794820552819996762305179350732176915224225716556072101926091095950210673*i+1311409493271402149888042294963930647069308947330761515268048083433247502330009680346897829957976907974048778039502295007080998525)*x + (84713116530554743999082240124503601457681706990261706298927922838461344766365120279474927235340599875766128718661745092140495291*i+12170321067886262310912175755986502812345461433590200219488392908022759505108146978918320260128101185356461866046053269219155181588) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5145305712288713145953051101917684181024313329774334745011794820552819996762305179350732176915224225716556072101926091095950210673*i+1311409493271402149888042294963930647069308947330761515268048083433247502330009680346897829957976907974048778039502295007080998525)*x + (84713116530554743999082240124503601457681706990261706298927922838461344766365120279474927235340599875766128718661745092140495291*i+12170321067886262310912175755986502812345461433590200219488392908022759505108146978918320260128101185356461866046053269219155181588) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12050443757929876868794344734782117677936099312014564106328475251441282786435379905546872669698320548226211850643513851362597033247*i+4317613945908864553013627424591238168731869695952359860991617843093478955492253019051831414731645893850298237689272714173563129256)*x + (4934054997072692642026630088511800882539175064093460064020182305404802500321937779623205652239718377906347741495448498225746756258*i+16928818781765459864798952665786726140539535525563969096185161427162206416123486361774099422323440327215349586261245186073651092037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12050443757929876868794344734782117677936099312014564106328475251441282786435379905546872669698320548226211850643513851362597033247*i+4317613945908864553013627424591238168731869695952359860991617843093478955492253019051831414731645893850298237689272714173563129256)*x + (4934054997072692642026630088511800882539175064093460064020182305404802500321937779623205652239718377906347741495448498225746756258*i+16928818781765459864798952665786726140539535525563969096185161427162206416123486361774099422323440327215349586261245186073651092037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7515592610335032059923323755955208867229803368826532265824813177846903048050217758716632049073090083639850729062633008934194026393*i+13119704663386745956711071621107825758731461083247722293935596125816401303491475913266940606361017764567303940956065782278849816669)*x + (3985177687028496822657958939584084070396924164832347552949449711052589028036482804401833012167844522702031213109861959434076701670*i+7544039640517253509388360303933127226569292250610849438469038929340435262302239067707749611417406678511483274749899220177430437899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7515592610335032059923323755955208867229803368826532265824813177846903048050217758716632049073090083639850729062633008934194026393*i+13119704663386745956711071621107825758731461083247722293935596125816401303491475913266940606361017764567303940956065782278849816669)*x + (3985177687028496822657958939584084070396924164832347552949449711052589028036482804401833012167844522702031213109861959434076701670*i+7544039640517253509388360303933127226569292250610849438469038929340435262302239067707749611417406678511483274749899220177430437899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3129350067589392434615545205673135241352684230845445534279125705957136235892545180277914410952850420214849621334012796333454759428*i+13439261364897448635662683112486283167648311286816188445690780256547030377687693923423677244925875726070892784767889986555046361319)*x + (9401877382670122702243565938538527263677736756086576213103738574019031648231585175198924908022093943759380410948185940039771684056*i+3721383775302226285156253705467836280443426389895414460857889176344716646130419882794070912375387620384280881264791513043192282419) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3129350067589392434615545205673135241352684230845445534279125705957136235892545180277914410952850420214849621334012796333454759428*i+13439261364897448635662683112486283167648311286816188445690780256547030377687693923423677244925875726070892784767889986555046361319)*x + (9401877382670122702243565938538527263677736756086576213103738574019031648231585175198924908022093943759380410948185940039771684056*i+3721383775302226285156253705467836280443426389895414460857889176344716646130419882794070912375387620384280881264791513043192282419) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12517999433472583356468784002346123202629252337367935053467019766117343884843845317647536514617382908171129657111367511408794624708*i+17487101386837405120342101150242765917671771535635359595128042252562137099115580940013227908787815118700743517550737464951673214943)*x + (14648502919302178027439902847558655015238758838390285093272633358591211672531027651977297974964963566106318856512387419215872365535*i+5161072197276148140526463909502847049338247146128207953155563014681704332759623372001250664919701921227970370810626358821930351363) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12517999433472583356468784002346123202629252337367935053467019766117343884843845317647536514617382908171129657111367511408794624708*i+17487101386837405120342101150242765917671771535635359595128042252562137099115580940013227908787815118700743517550737464951673214943)*x + (14648502919302178027439902847558655015238758838390285093272633358591211672531027651977297974964963566106318856512387419215872365535*i+5161072197276148140526463909502847049338247146128207953155563014681704332759623372001250664919701921227970370810626358821930351363) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11723219291182689821019400601737455020200366273104122634732406893253185102199099610703377221581865712421375607529950176173670211660*i+9193927660223697585764393182211544792801449469447145260211294900697261488998077858440792717606171621507860520135677948431022487427)*x + (15005483391014276128339039428617673103244458839864328854142423063909480508548246558710727505215488379077620904846542429052962619267*i+15472629474282587847190893902193629801741417301308540592721639052545815551969703256594121764017106830901399701779005463267667783902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11723219291182689821019400601737455020200366273104122634732406893253185102199099610703377221581865712421375607529950176173670211660*i+9193927660223697585764393182211544792801449469447145260211294900697261488998077858440792717606171621507860520135677948431022487427)*x + (15005483391014276128339039428617673103244458839864328854142423063909480508548246558710727505215488379077620904846542429052962619267*i+15472629474282587847190893902193629801741417301308540592721639052545815551969703256594121764017106830901399701779005463267667783902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22136592371067193931444635369696506027583894721725052931514003679659891037488602414684230808175959030318814330251944803873817758813*i+871998099143126921186938824800610418051705536962758786015960228088286230817929144915891565852416868717674242742533122125703243784)*x + (13651114192237125728046274660200416393085069138406544409639010502817028468346886833319429941000528717794338339672913516080562744542*i+410158923907614642858057653101492803189109078108163313288524492892125399020007326362191899086679390271678532888297218761783659969) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22136592371067193931444635369696506027583894721725052931514003679659891037488602414684230808175959030318814330251944803873817758813*i+871998099143126921186938824800610418051705536962758786015960228088286230817929144915891565852416868717674242742533122125703243784)*x + (13651114192237125728046274660200416393085069138406544409639010502817028468346886833319429941000528717794338339672913516080562744542*i+410158923907614642858057653101492803189109078108163313288524492892125399020007326362191899086679390271678532888297218761783659969) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15970610411019518623250691819638334708381255085556511988315414306272849054707168031661465902903609420415772872532154057512654347634*i+7900057857829183786190102955038022905495750153722340205081866969045192315645938058692307499890634030448556154590860413234331224806)*x + (11699426526022832805809775628933968726442273257293634031108064726765345719163260200253101191027571462369912893324917553512130913715*i+24148166015285215367526852375976232484409894044358227415639001301107404577908654735262247874507206362873928813330655540223784052105) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15970610411019518623250691819638334708381255085556511988315414306272849054707168031661465902903609420415772872532154057512654347634*i+7900057857829183786190102955038022905495750153722340205081866969045192315645938058692307499890634030448556154590860413234331224806)*x + (11699426526022832805809775628933968726442273257293634031108064726765345719163260200253101191027571462369912893324917553512130913715*i+24148166015285215367526852375976232484409894044358227415639001301107404577908654735262247874507206362873928813330655540223784052105) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2685534316001784090706545314788497831292563773417188228601369308655059297479427838552177698511032466252669583811767594001561260852*i+23042758177656332664444294176120468432825827717347311445751439785531780520215931519643042871428029601347399483394205259933951715797)*x + (12246623288219019066129241716646221693538860299964225445429686273560525151289877914993244428111709594487211570154624335019114726649*i+13628992266365149765335058996850448010310856938372537938999214106053675264552869091725090121608087055765974737747092499270781794387) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2685534316001784090706545314788497831292563773417188228601369308655059297479427838552177698511032466252669583811767594001561260852*i+23042758177656332664444294176120468432825827717347311445751439785531780520215931519643042871428029601347399483394205259933951715797)*x + (12246623288219019066129241716646221693538860299964225445429686273560525151289877914993244428111709594487211570154624335019114726649*i+13628992266365149765335058996850448010310856938372537938999214106053675264552869091725090121608087055765974737747092499270781794387) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9113897560043155225478583513451586528296006721687878913152532237880022044514101124948120147851956956408078470537802324309384973007*i+13137566869112966443236313451679878934435283208139041139455826744917306675446023139995750565931201103109242464666626307294193119060)*x + (15954290406567002338484573146754070295347747079707100831280516935930919141612803366170747489708613787337464468772121602932673344440*i+21298994365276005442623483765677810814904268684071459314435403775711643650104190909159033753261370869730225349162634146609202299654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9113897560043155225478583513451586528296006721687878913152532237880022044514101124948120147851956956408078470537802324309384973007*i+13137566869112966443236313451679878934435283208139041139455826744917306675446023139995750565931201103109242464666626307294193119060)*x + (15954290406567002338484573146754070295347747079707100831280516935930919141612803366170747489708613787337464468772121602932673344440*i+21298994365276005442623483765677810814904268684071459314435403775711643650104190909159033753261370869730225349162634146609202299654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12220195364308399957996011125184035707349249627858813809727990876593420826337529796076099327742288945437380270001913261347599359388*i+4948736198374557897821945472104020843322201151479933669982616105294177864498270216227352111147633978689926186977362452240614111804)*x + (3568032687554277761425533304914032161419039535810025208324794845516867679192434622798457878696452928836055664234596299314688646972*i+9752532535465213809236406256081470601998157878807145097600721178922483311338167219086811434176501434708579044137047529892742531613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12220195364308399957996011125184035707349249627858813809727990876593420826337529796076099327742288945437380270001913261347599359388*i+4948736198374557897821945472104020843322201151479933669982616105294177864498270216227352111147633978689926186977362452240614111804)*x + (3568032687554277761425533304914032161419039535810025208324794845516867679192434622798457878696452928836055664234596299314688646972*i+9752532535465213809236406256081470601998157878807145097600721178922483311338167219086811434176501434708579044137047529892742531613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4319541964750787696266349188112335619518026199024066513145872084129902494197543041077425383112597723388860949947428336073344713994*i+12402890206487883338280748354698203633489652693207016428092727659856516180720815997368826181989707283835982124686153372638869687989)*x + (17573570566343678015137517050424583683979705379012632482096101808216308096306089157979515200660778663847769452753530483154845411318*i+300833614726404532886426063410309945442517184493659957988548058026575957773530195337768042178237165192134254161520807640338783194) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4319541964750787696266349188112335619518026199024066513145872084129902494197543041077425383112597723388860949947428336073344713994*i+12402890206487883338280748354698203633489652693207016428092727659856516180720815997368826181989707283835982124686153372638869687989)*x + (17573570566343678015137517050424583683979705379012632482096101808216308096306089157979515200660778663847769452753530483154845411318*i+300833614726404532886426063410309945442517184493659957988548058026575957773530195337768042178237165192134254161520807640338783194) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6682171556246492049240637622375386727427885610381889487568874926502519272870633140916513307238478632238055451448966968835794595786*i+1859252990835035015823619206830132336056296900265019866921019396823317629515374479148073241866480661184504227629874981901474237032)*x + (23482872626675177302192904392421243417028732439780503735211957684682302999905891093317002493837883146759816133592064848859524670047*i+1258952237818340978418506574425243775837493165990514839622313288774065969160178707385718385085107513788559575906503316157847666506) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6682171556246492049240637622375386727427885610381889487568874926502519272870633140916513307238478632238055451448966968835794595786*i+1859252990835035015823619206830132336056296900265019866921019396823317629515374479148073241866480661184504227629874981901474237032)*x + (23482872626675177302192904392421243417028732439780503735211957684682302999905891093317002493837883146759816133592064848859524670047*i+1258952237818340978418506574425243775837493165990514839622313288774065969160178707385718385085107513788559575906503316157847666506) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8337961717194575117437833402897247200285312840067326224813170360448307879884396841777183202022994224265584931361160812559551467926*i+5096289363514818763131598809565854348407933745075792671166530843816381888226457568065323858451965563904786978901256641189523172654)*x + (10622705101509751409490576990952543791190431672230192774520510897646007723728936537085081805435896697952927633368637416926232230945*i+1110265164888325158843709773399289487520509466300858553603443326323455646177143938967335953863394682354473793650838966018832372691) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8337961717194575117437833402897247200285312840067326224813170360448307879884396841777183202022994224265584931361160812559551467926*i+5096289363514818763131598809565854348407933745075792671166530843816381888226457568065323858451965563904786978901256641189523172654)*x + (10622705101509751409490576990952543791190431672230192774520510897646007723728936537085081805435896697952927633368637416926232230945*i+1110265164888325158843709773399289487520509466300858553603443326323455646177143938967335953863394682354473793650838966018832372691) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6659203304931784840672939641424358060640339403751990391440794330774839350969840503534104136427435130262214192212097434449111644780*i+9422027874422629792351662583226145028466537506776358736128680838921612055459860121439060805807581828733536436236324552574524016433)*x + (10346369974574648722871791254615784718704648953798895665743808855770540490447476951696964003521634190458952955259412252723653155036*i+22439806835970179168332688337513813737551608904942025772136555693827923785296012561296320922721951477013348539128269777151949287637) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6659203304931784840672939641424358060640339403751990391440794330774839350969840503534104136427435130262214192212097434449111644780*i+9422027874422629792351662583226145028466537506776358736128680838921612055459860121439060805807581828733536436236324552574524016433)*x + (10346369974574648722871791254615784718704648953798895665743808855770540490447476951696964003521634190458952955259412252723653155036*i+22439806835970179168332688337513813737551608904942025772136555693827923785296012561296320922721951477013348539128269777151949287637) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16901009664056288680202224280970219225363540929857139027396573252204519214662515884229196081424529936260978388977140567463282010969*i+7261565430574331487145115075538147408181106764982487434246248637593743123444362968157690328804156064109955416414134476785700920936)*x + (5685672464957226076503810621574495141927181106126186472537156868032638717354987762241806135731347371372004696250023902239777426522*i+14323295742166780816575664259233631266376904028228190623505858219831920024086153261254130665874316927033399450423793400461390062282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16901009664056288680202224280970219225363540929857139027396573252204519214662515884229196081424529936260978388977140567463282010969*i+7261565430574331487145115075538147408181106764982487434246248637593743123444362968157690328804156064109955416414134476785700920936)*x + (5685672464957226076503810621574495141927181106126186472537156868032638717354987762241806135731347371372004696250023902239777426522*i+14323295742166780816575664259233631266376904028228190623505858219831920024086153261254130665874316927033399450423793400461390062282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17316823655127008450278134327446184800323507718174947755831458773513040494796290982254546666556192060375317723518122700112546885867*i+3252007027022038887201088048899631611756685832871160067037669865837455394318365974748928665239463816695256352502790701206768698429)*x + (9132707919254891417050461972253281290305688664492070397973605573368854024507833363459735806699873880696708678306254360282406304641*i+1505853573825289401415825481080963083517067860504609933887030523571418163430639866604464110520427163945684524798822403213483537836) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17316823655127008450278134327446184800323507718174947755831458773513040494796290982254546666556192060375317723518122700112546885867*i+3252007027022038887201088048899631611756685832871160067037669865837455394318365974748928665239463816695256352502790701206768698429)*x + (9132707919254891417050461972253281290305688664492070397973605573368854024507833363459735806699873880696708678306254360282406304641*i+1505853573825289401415825481080963083517067860504609933887030523571418163430639866604464110520427163945684524798822403213483537836) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2689693794121471500146460416522448610049997605889374920601673944644529712852227207968198700279813598901501147110154695692239786579*i+9862644908257944447364728532502836262232200406245346361245673556143414126353725428238347813192164443885479568732845757555933705567)*x + (22871344694066993960532295272814235209949114542867263025506941255941930412140451403114545795310719896767733911674697818282948359323*i+13640805226829868437997557411036539998572867840709693965386455181568883527577713469263479161012595422005265611329389189929883912071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2689693794121471500146460416522448610049997605889374920601673944644529712852227207968198700279813598901501147110154695692239786579*i+9862644908257944447364728532502836262232200406245346361245673556143414126353725428238347813192164443885479568732845757555933705567)*x + (22871344694066993960532295272814235209949114542867263025506941255941930412140451403114545795310719896767733911674697818282948359323*i+13640805226829868437997557411036539998572867840709693965386455181568883527577713469263479161012595422005265611329389189929883912071) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10332005244243129532891891081357829755258498093554396965171675570274943959902563108226152646225038340975543873373881313090115038812*i+17379059028387089153315525318071795199063595949090238487592139165308315623994091292201164603731843903745530710430259977904380027371)*x + (8806537801030058057782908078733096073946138326306877786719008173173254587652810787168147616588690491678444790374341132115381628654*i+4081541949956776579794577319593090912326221799360860693391528875668863415338068929779892101707691557960193359701768148649622576070) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10332005244243129532891891081357829755258498093554396965171675570274943959902563108226152646225038340975543873373881313090115038812*i+17379059028387089153315525318071795199063595949090238487592139165308315623994091292201164603731843903745530710430259977904380027371)*x + (8806537801030058057782908078733096073946138326306877786719008173173254587652810787168147616588690491678444790374341132115381628654*i+4081541949956776579794577319593090912326221799360860693391528875668863415338068929779892101707691557960193359701768148649622576070) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16681232204337452428426308911582411270558100118293345048139188900247669704302393141149913080160995221269688428950161945744231002586*i+2037127939331992838695915789833084798567808586571602183294726099797699880450191978686458417272429041988124835833813751447457063572)*x + (9893254616789386655032958749080164023535414320236530253867198962664417501995438476036028766713896079494881580825068857619098445424*i+11834809199577754517343697477116906097170408601729653774040333763591019245096166634235530649887727691769111568002817720382502701013) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16681232204337452428426308911582411270558100118293345048139188900247669704302393141149913080160995221269688428950161945744231002586*i+2037127939331992838695915789833084798567808586571602183294726099797699880450191978686458417272429041988124835833813751447457063572)*x + (9893254616789386655032958749080164023535414320236530253867198962664417501995438476036028766713896079494881580825068857619098445424*i+11834809199577754517343697477116906097170408601729653774040333763591019245096166634235530649887727691769111568002817720382502701013) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18669205731023043076651696328327330547304646799167381211150365054833645101922367230471986015645285170742762432829018628437969559741*i+20048946668129050553340924028606879455919490057735688049411362926308171986551839879996433954028162004328317662110247504716508705768)*x + (17554111590825285369565853696131123156561619977929115290419770613289497683536258025134450071597829873923443808777440401122095952957*i+19141286119433265378305792827590157453080897312719465001109763994609947350078059482185457984587477778951875329821393834531465067352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18669205731023043076651696328327330547304646799167381211150365054833645101922367230471986015645285170742762432829018628437969559741*i+20048946668129050553340924028606879455919490057735688049411362926308171986551839879996433954028162004328317662110247504716508705768)*x + (17554111590825285369565853696131123156561619977929115290419770613289497683536258025134450071597829873923443808777440401122095952957*i+19141286119433265378305792827590157453080897312719465001109763994609947350078059482185457984587477778951875329821393834531465067352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3275449441563702226922814990807101777408153072215332782257259730343034707561945506963999078023515509352701724682133734937971373291*i+6738029720100482984860985959717893959439910074422906324104186502055029258910930921070382322810993956760680400386261102225664109182)*x + (12510649539908062172497658202077659827111853445414830572119980390134991810828998902959619975445228004143867522960776308181671172340*i+7526586795468638799911725193657715594904424663155110474983806904836154989997779542874395001190291146312737043763470761800217856779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3275449441563702226922814990807101777408153072215332782257259730343034707561945506963999078023515509352701724682133734937971373291*i+6738029720100482984860985959717893959439910074422906324104186502055029258910930921070382322810993956760680400386261102225664109182)*x + (12510649539908062172497658202077659827111853445414830572119980390134991810828998902959619975445228004143867522960776308181671172340*i+7526586795468638799911725193657715594904424663155110474983806904836154989997779542874395001190291146312737043763470761800217856779) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8932260467062963410398672432638640866074423857182918888002342562847106264818777029001627385949492856222091588686701240675353990128*i+11442436227839390703708211326164050305137164047331858949198848976385586037908742226174126774964536412559948477648040193115113191169)*x + (18834449021742219125596904231359073971346372806082627409811597240896537187744192013159347507486304883463879997191679975341706048393*i+22451168589603062678361598782494654800357382141348713351273185606949315994886779289330366807091266990006463444446810804455546176512) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8932260467062963410398672432638640866074423857182918888002342562847106264818777029001627385949492856222091588686701240675353990128*i+11442436227839390703708211326164050305137164047331858949198848976385586037908742226174126774964536412559948477648040193115113191169)*x + (18834449021742219125596904231359073971346372806082627409811597240896537187744192013159347507486304883463879997191679975341706048393*i+22451168589603062678361598782494654800357382141348713351273185606949315994886779289330366807091266990006463444446810804455546176512) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (889310198329783834312831956085137652852318689394207118142499673669499314678801827211951670245170865012368944263761033616841525460*i+16292166372543807429999901732481362516721277292722802390189509377637449240871708349744488236617944430114641837349066213713502044165)*x + (3673365660178508431032202611018276553585006327403023344458043753933914533939315141818601354815842239763537827637923010868578442720*i+4632073001995970555223274511080000221472415303791076363526016637352045097346245349199340511589169677073788960293397380139371514728) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (889310198329783834312831956085137652852318689394207118142499673669499314678801827211951670245170865012368944263761033616841525460*i+16292166372543807429999901732481362516721277292722802390189509377637449240871708349744488236617944430114641837349066213713502044165)*x + (3673365660178508431032202611018276553585006327403023344458043753933914533939315141818601354815842239763537827637923010868578442720*i+4632073001995970555223274511080000221472415303791076363526016637352045097346245349199340511589169677073788960293397380139371514728) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1357574444394845900025305470312791492208399046111012274233617800626351815874026969192696553581385378837733881018472776511912458247*i+3874476630179451944674105927118568621992106044903769492127816686952982540742748813172787578841086732928831542677600569095811105882)*x + (10839432011278344818937143982910758577005563845772411946739092758098406657054676060033898244824583396766831444581622658543794030571*i+4365001474702502414799729132257708984877081274859816734400148968498587235959720126794992662069234752671621217170462244317029363000) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1357574444394845900025305470312791492208399046111012274233617800626351815874026969192696553581385378837733881018472776511912458247*i+3874476630179451944674105927118568621992106044903769492127816686952982540742748813172787578841086732928831542677600569095811105882)*x + (10839432011278344818937143982910758577005563845772411946739092758098406657054676060033898244824583396766831444581622658543794030571*i+4365001474702502414799729132257708984877081274859816734400148968498587235959720126794992662069234752671621217170462244317029363000) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20872015242372222971568895613619921909861868490939607471218882551168452505833232894300831280057722489516431552780853216640364928598*i+23127497704688271685470846388956447619972445888791217566422073223559080934944531284287349659821268742727072926011857943945993323437)*x + (523024021785137709855219612760469108684543027632973264135366663650447838161315832634503438834462259765222872465717899275548343498*i+15479843724112382257137855580238873006857391032625562525741958101415727226208780295169311939907822183621466838134396695192176743347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20872015242372222971568895613619921909861868490939607471218882551168452505833232894300831280057722489516431552780853216640364928598*i+23127497704688271685470846388956447619972445888791217566422073223559080934944531284287349659821268742727072926011857943945993323437)*x + (523024021785137709855219612760469108684543027632973264135366663650447838161315832634503438834462259765222872465717899275548343498*i+15479843724112382257137855580238873006857391032625562525741958101415727226208780295169311939907822183621466838134396695192176743347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10899286399548616710576572312860127600956297260521637848100882655878272920944519437191230968793959398482961326539196654409235662120*i+4803565208307665722800364715240340693027730155908526542781547566857403794951710585747013367630068575145149069702030191612216417416)*x + (10663264259003949971030923432684509260601980281487039504833378670791202131040108121423948195270796920785300325184989862881967819694*i+7743468696138243389183565775291240012633966756762255794556988290060750916991465980417512895799979941966829864228016646509460004113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10899286399548616710576572312860127600956297260521637848100882655878272920944519437191230968793959398482961326539196654409235662120*i+4803565208307665722800364715240340693027730155908526542781547566857403794951710585747013367630068575145149069702030191612216417416)*x + (10663264259003949971030923432684509260601980281487039504833378670791202131040108121423948195270796920785300325184989862881967819694*i+7743468696138243389183565775291240012633966756762255794556988290060750916991465980417512895799979941966829864228016646509460004113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13368724335353177646713357468877462955470102717954052380126430674475797304719413711807699408565099247453557772069783500828947775058*i+18853050311172234854560023886006313741590990646043183743903209526476934203910306711298791344082348868845748716162232834815167024357)*x + (5037940460728069289207083362200782544027452833921442650108385106618738521449718657815367960472462518803435110219956702384780057933*i+5552730336958468847158909107943206357496167347360270478554136375189991294801927324256297694705053496227657462545114728068031603300) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13368724335353177646713357468877462955470102717954052380126430674475797304719413711807699408565099247453557772069783500828947775058*i+18853050311172234854560023886006313741590990646043183743903209526476934203910306711298791344082348868845748716162232834815167024357)*x + (5037940460728069289207083362200782544027452833921442650108385106618738521449718657815367960472462518803435110219956702384780057933*i+5552730336958468847158909107943206357496167347360270478554136375189991294801927324256297694705053496227657462545114728068031603300) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9133314480409068425402123901955148148467512123018350544915349527959796323124414133275959353991614699115188297631593243587405685966*i+21014831159302342267699014323440412418699139093676711608932205908719569947729551173831115430584776559433582292760682797827833421984)*x + (20211316027177425807651252600094817489867333782838009879940528275312370756190134943985350436809648416775936019374000369037609089067*i+13176588209451658382568886798975380939199564277982867701165305880108565881116150434727586472088172908113465584500946126696735462243) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9133314480409068425402123901955148148467512123018350544915349527959796323124414133275959353991614699115188297631593243587405685966*i+21014831159302342267699014323440412418699139093676711608932205908719569947729551173831115430584776559433582292760682797827833421984)*x + (20211316027177425807651252600094817489867333782838009879940528275312370756190134943985350436809648416775936019374000369037609089067*i+13176588209451658382568886798975380939199564277982867701165305880108565881116150434727586472088172908113465584500946126696735462243) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10750892220962985008739505902956249325280927506987076140613026181743613284565059021327807207906804713503404706580876346967617670099*i+13416017222479028960981347870489066077338978343041739693165132207675096925699536260051375584444188390075459966312141866517415093927)*x + (16458871276791782454590382099663090660879078835509263748109031388800370941133296412674187340696631835500631298319730635155190200344*i+15070036515669637923253047526921821147807905376584586177907841280972881262144890945870261641474451649358614467928196433278856481228) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10750892220962985008739505902956249325280927506987076140613026181743613284565059021327807207906804713503404706580876346967617670099*i+13416017222479028960981347870489066077338978343041739693165132207675096925699536260051375584444188390075459966312141866517415093927)*x + (16458871276791782454590382099663090660879078835509263748109031388800370941133296412674187340696631835500631298319730635155190200344*i+15070036515669637923253047526921821147807905376584586177907841280972881262144890945870261641474451649358614467928196433278856481228) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20559781252584065205960168864827259400870326188025530475533163260018851623468751358911014220959083174080453329843962103405166751292*i+17670303049854006781326267444449856964922040832233980635632612287284081587855562827287380798857746236292156270907569111275163300634)*x + (9169834237726904185324419240491255994403884883470166324202563488677790610263188197472316579159023903527458112286787649753345495833*i+10096973374317318529958085911461994596470546191618480030020220947098561367981479040675442565836224440678065264045523251096707959640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20559781252584065205960168864827259400870326188025530475533163260018851623468751358911014220959083174080453329843962103405166751292*i+17670303049854006781326267444449856964922040832233980635632612287284081587855562827287380798857746236292156270907569111275163300634)*x + (9169834237726904185324419240491255994403884883470166324202563488677790610263188197472316579159023903527458112286787649753345495833*i+10096973374317318529958085911461994596470546191618480030020220947098561367981479040675442565836224440678065264045523251096707959640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5674646513722322136440231800003591910109910565120476815150186528145810668846672544927695658589714424127104919932546365047053127531*i+1403145146332932529570670262126763189744462173276810384352743657052071333565184647816069940673529535228851634983172517507780866295)*x + (14799303767901112750228351850944361622406395194243679076630726356983440164501041649730322188321099766374170572013553281912555558157*i+6755967466399152993657224697384215542697120826251733472026159156143054641163602305255559754132486596477685322667591169416691731443) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5674646513722322136440231800003591910109910565120476815150186528145810668846672544927695658589714424127104919932546365047053127531*i+1403145146332932529570670262126763189744462173276810384352743657052071333565184647816069940673529535228851634983172517507780866295)*x + (14799303767901112750228351850944361622406395194243679076630726356983440164501041649730322188321099766374170572013553281912555558157*i+6755967466399152993657224697384215542697120826251733472026159156143054641163602305255559754132486596477685322667591169416691731443) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22262158661428504891088392670628905047651247418470621720288381091856781392801991004728410486787145648398090583685270810671439442499*i+4840453019724062783710689832274606503247702730353291257737107302702448863072376598047316241387329871007464579614689716661979799404)*x + (4031918893385666519136577888116809305051627208258607664634508675448892552780601870371675512055820864088246631845500345935279349424*i+22567131699166636951758719218920432666381726060597747226740831494245665442678979326717979989675444016789481647299250335618090113335) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22262158661428504891088392670628905047651247418470621720288381091856781392801991004728410486787145648398090583685270810671439442499*i+4840453019724062783710689832274606503247702730353291257737107302702448863072376598047316241387329871007464579614689716661979799404)*x + (4031918893385666519136577888116809305051627208258607664634508675448892552780601870371675512055820864088246631845500345935279349424*i+22567131699166636951758719218920432666381726060597747226740831494245665442678979326717979989675444016789481647299250335618090113335) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12334319603426087836996217084659818854602772902599771056859517009959023938127044164287628522061622196707289419742490085003484633538*i+9346134015396374905556253365989167198156583066957815652136449310752750390203257103012574884278783042654688120601839331265443186683)*x + (4029214105691607289614823071067707366038666374141022905154101621555451457981896855725586356176590380660325894668060286074807352295*i+19642720108454342606900425513881822338508687726576796480969881930550198594353945282878864839620166418134934522013281415510606957154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12334319603426087836996217084659818854602772902599771056859517009959023938127044164287628522061622196707289419742490085003484633538*i+9346134015396374905556253365989167198156583066957815652136449310752750390203257103012574884278783042654688120601839331265443186683)*x + (4029214105691607289614823071067707366038666374141022905154101621555451457981896855725586356176590380660325894668060286074807352295*i+19642720108454342606900425513881822338508687726576796480969881930550198594353945282878864839620166418134934522013281415510606957154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23025489033885288399531439483418096470664201015776329114646654253853093033871027208994215623437082698124636024340025596110148194611*i+483700352153328221078832803881008779559720725689392633597771816344247319470563579480992614821174619744211385971591143677818867472)*x + (18510992494405931460282925313477304982368886052308353426190440691673416761248272465659922084451551387958358996111775206734519134239*i+10912249277642064939404144043467123508150387993717971146921011706603660375879169385779140572947322575917361704017657464087242125651) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23025489033885288399531439483418096470664201015776329114646654253853093033871027208994215623437082698124636024340025596110148194611*i+483700352153328221078832803881008779559720725689392633597771816344247319470563579480992614821174619744211385971591143677818867472)*x + (18510992494405931460282925313477304982368886052308353426190440691673416761248272465659922084451551387958358996111775206734519134239*i+10912249277642064939404144043467123508150387993717971146921011706603660375879169385779140572947322575917361704017657464087242125651) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8684823286928562194240743370748684410807752317643546681895025740954615753498388823541428802701292846202293068974806217752812921127*i+9497590344215875656383024275389491001100870542727203984323918437269701992956245672108426196849621824177584240782399829713982846954)*x + (19443099050172394321251634028586948617763536460726029042591521711194721024620476732440220007614781279928443035855513324909050680985*i+8904909106398286991097406284636960786137638990968477430588126583904417294042205414929573784832723547733651667389994364971992568158) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8684823286928562194240743370748684410807752317643546681895025740954615753498388823541428802701292846202293068974806217752812921127*i+9497590344215875656383024275389491001100870542727203984323918437269701992956245672108426196849621824177584240782399829713982846954)*x + (19443099050172394321251634028586948617763536460726029042591521711194721024620476732440220007614781279928443035855513324909050680985*i+8904909106398286991097406284636960786137638990968477430588126583904417294042205414929573784832723547733651667389994364971992568158) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18463944179439959142500038863246925671771163263167230114122884304353722680630964581961110461252458017415834473286288787025943059710*i+1739372980451735425362077262550243592935113187581582180623798022156392295727083837635140950010148305596143449425094011464706937646)*x + (325453588603177465296994321466660228897624010115489022493292325728566886968265137972600482895456258674693034464134698797230006435*i+17492396475459116131423083539574075582214968578539107668603108394523567571443213543609988710270366984837917748277572964238372865163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18463944179439959142500038863246925671771163263167230114122884304353722680630964581961110461252458017415834473286288787025943059710*i+1739372980451735425362077262550243592935113187581582180623798022156392295727083837635140950010148305596143449425094011464706937646)*x + (325453588603177465296994321466660228897624010115489022493292325728566886968265137972600482895456258674693034464134698797230006435*i+17492396475459116131423083539574075582214968578539107668603108394523567571443213543609988710270366984837917748277572964238372865163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13996943023847508624843350264880877324713513433413906546091912479381128626176284531356291934763356212041264178664514727989558742130*i+16630863110002580674866722994479513487216734288857031134714304166416787050608786471301352930202378789334881643483463344490581013037)*x + (9946479959213310725658709994604582860886636713194953353040007971927940709642698955955580950307139142197037654464550279192237239631*i+3335701444670643953981119172459602910716065611795890397008982872059564683045433991277923555361499322977897266841557594609574184895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13996943023847508624843350264880877324713513433413906546091912479381128626176284531356291934763356212041264178664514727989558742130*i+16630863110002580674866722994479513487216734288857031134714304166416787050608786471301352930202378789334881643483463344490581013037)*x + (9946479959213310725658709994604582860886636713194953353040007971927940709642698955955580950307139142197037654464550279192237239631*i+3335701444670643953981119172459602910716065611795890397008982872059564683045433991277923555361499322977897266841557594609574184895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7573632253937142196891515982442081402690019095045548422930737892592969683272565739227671751745584032511250125362414708740072155712*i+16350326135132832630239970607623384905825285488224319951068811506677568382204166269789420433804739860869032828514035992621012900978)*x + (11985589077461760695527948786522699269409695430517864077418014082969871478129715724958385003489790816475819119395745752760083736654*i+1079455701659082415123856786456041657103748484093731153154036649494631113513260723156533323678412782895918527394664523548040350604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7573632253937142196891515982442081402690019095045548422930737892592969683272565739227671751745584032511250125362414708740072155712*i+16350326135132832630239970607623384905825285488224319951068811506677568382204166269789420433804739860869032828514035992621012900978)*x + (11985589077461760695527948786522699269409695430517864077418014082969871478129715724958385003489790816475819119395745752760083736654*i+1079455701659082415123856786456041657103748484093731153154036649494631113513260723156533323678412782895918527394664523548040350604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5742786743953331263899651416496113456774762608894858008126918366129098617349984363353432241895348541125709852832713255668365407672*i+12759638895939607166870373307280717251594976770298097483229159731832270237986682204520632185564215515967481125925223321038906121493)*x + (14692060769132479711282185878394551349826698546750895287311254822897548822705990024940943925375258526957344075663694689014914558348*i+21911539432472110113018869634513851468950687085375902234981336937828647935040646426355463005564535250064530189784258236998759045599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5742786743953331263899651416496113456774762608894858008126918366129098617349984363353432241895348541125709852832713255668365407672*i+12759638895939607166870373307280717251594976770298097483229159731832270237986682204520632185564215515967481125925223321038906121493)*x + (14692060769132479711282185878394551349826698546750895287311254822897548822705990024940943925375258526957344075663694689014914558348*i+21911539432472110113018869634513851468950687085375902234981336937828647935040646426355463005564535250064530189784258236998759045599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13230157237448859410397643944942314999807263644233523127761942573896380980821419529916795212656475430972924906407081502080263825815*i+6407894288962624681235947876093200576632497889533395746874185925236512723259447355765275228811116882100609490944891273191511743973)*x + (13749520644492799030908320288488169996223550009313692322310409865536900480574047693799965857921173487978729359180581688982359620705*i+10335470347142986281117154337256594477946393535552900423540792586608384562393901479788248173286963021151741814716438095439999748116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13230157237448859410397643944942314999807263644233523127761942573896380980821419529916795212656475430972924906407081502080263825815*i+6407894288962624681235947876093200576632497889533395746874185925236512723259447355765275228811116882100609490944891273191511743973)*x + (13749520644492799030908320288488169996223550009313692322310409865536900480574047693799965857921173487978729359180581688982359620705*i+10335470347142986281117154337256594477946393535552900423540792586608384562393901479788248173286963021151741814716438095439999748116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22541156888759293545592531579706701886778437824039398743917134509998059099771676600937836571326781871460963449251061727212236330692*i+12143445673731658630089138545642845439515149615578877445660980616513935359201594472356109388081971737739930187819982320853857487462)*x + (10738084107311181109289712579369234997693591417818429792154602693148221372585043270774234192521759593732860072727215425361195673003*i+14205112389738507654118779344599335884667900514834136029997652374668840513729924118593101237990216544458705810049096752982164070063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22541156888759293545592531579706701886778437824039398743917134509998059099771676600937836571326781871460963449251061727212236330692*i+12143445673731658630089138545642845439515149615578877445660980616513935359201594472356109388081971737739930187819982320853857487462)*x + (10738084107311181109289712579369234997693591417818429792154602693148221372585043270774234192521759593732860072727215425361195673003*i+14205112389738507654118779344599335884667900514834136029997652374668840513729924118593101237990216544458705810049096752982164070063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13775771506805767278371472564647994622719126772313231299323083221793800681179907189214198825548445655179391448027038141690527243937*i+23070162155743580241495633100812588159833287509491940247791052409180827744519280529069334377108388200244152278351532361201601329681)*x + (5468071157027085233224228181845163010193682958390864070579205161813478876619567948290812785085628709945360869110254164247600747511*i+17606316301107587942413493252779864132149158061983659614958243596992956215454450537262639888562262126262767727926966160136992454590) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13775771506805767278371472564647994622719126772313231299323083221793800681179907189214198825548445655179391448027038141690527243937*i+23070162155743580241495633100812588159833287509491940247791052409180827744519280529069334377108388200244152278351532361201601329681)*x + (5468071157027085233224228181845163010193682958390864070579205161813478876619567948290812785085628709945360869110254164247600747511*i+17606316301107587942413493252779864132149158061983659614958243596992956215454450537262639888562262126262767727926966160136992454590) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3994557431531740506554511458120749764444158690971165609105377946398158727360218227296608019302247835444220189663837213771609001431*i+44864202868139034504972707583100427754321222306819413627542910808295020645249181233732488844633491490124011193664511258715382278)*x + (15483291896836402718337109592028226591219570210470896667175243255362631216794222876134381026396293588622159855082637851520425231080*i+10435081993029118313970361684890107368644650282898420592752183069795916922800727619323559453875515143869019680601709023851906037827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3994557431531740506554511458120749764444158690971165609105377946398158727360218227296608019302247835444220189663837213771609001431*i+44864202868139034504972707583100427754321222306819413627542910808295020645249181233732488844633491490124011193664511258715382278)*x + (15483291896836402718337109592028226591219570210470896667175243255362631216794222876134381026396293588622159855082637851520425231080*i+10435081993029118313970361684890107368644650282898420592752183069795916922800727619323559453875515143869019680601709023851906037827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10324566130739137775281590170367497831829929211129406289852934333514036900783620015118478716308922998350169608794336283855961842742*i+14846678141396457675499461206826551516201048360973748035967076297152678570041880040256647607347271991012034091336250230541216922730)*x + (1650810080530097666109029609812456198776206852547378630399581105301155050371304647945420370168210829907627991860352911197730489970*i+1536989184036829250120123905348105934134361821889340428020748770953284350183899911981714841608128660751646444105776286099763094548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10324566130739137775281590170367497831829929211129406289852934333514036900783620015118478716308922998350169608794336283855961842742*i+14846678141396457675499461206826551516201048360973748035967076297152678570041880040256647607347271991012034091336250230541216922730)*x + (1650810080530097666109029609812456198776206852547378630399581105301155050371304647945420370168210829907627991860352911197730489970*i+1536989184036829250120123905348105934134361821889340428020748770953284350183899911981714841608128660751646444105776286099763094548) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4014876560937634934189273914198152634496283156814245515326818310755085864458241889986146288752606827991051563668148998769175592384*i+14747485117515044580147911486580988641807786010638136991730661232797149043258749593971187981636839343386390760635330805367500796049)*x + (8201419120199433699935152689157031102274160946969904354708757969536738715123748415954073016563673541068656651698657262277736863286*i+13485412591721723713709439799509140090073256320494345053144861941719237543637511486188579481439396682198740141995830513534108379154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4014876560937634934189273914198152634496283156814245515326818310755085864458241889986146288752606827991051563668148998769175592384*i+14747485117515044580147911486580988641807786010638136991730661232797149043258749593971187981636839343386390760635330805367500796049)*x + (8201419120199433699935152689157031102274160946969904354708757969536738715123748415954073016563673541068656651698657262277736863286*i+13485412591721723713709439799509140090073256320494345053144861941719237543637511486188579481439396682198740141995830513534108379154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8958762144937530986837373351947861372781605318262579496203497286480041424902441079138966861278837105385562522939669027237250751362*i+13451688341743985753175298532747988262579587578713929328449831796238884591945904335984625661641213645179676570131858097074313910620)*x + (16362147425666543466247448143289138027080358886207822824515821415156315596852531877698758988105082202527292535176732305186782889068*i+14272850582224980047986179797392599327810663858121568897518816693802149599872553713860692876099937968796033160662047350038485560933) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8958762144937530986837373351947861372781605318262579496203497286480041424902441079138966861278837105385562522939669027237250751362*i+13451688341743985753175298532747988262579587578713929328449831796238884591945904335984625661641213645179676570131858097074313910620)*x + (16362147425666543466247448143289138027080358886207822824515821415156315596852531877698758988105082202527292535176732305186782889068*i+14272850582224980047986179797392599327810663858121568897518816693802149599872553713860692876099937968796033160662047350038485560933) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1153994524125739098175009363822214085900361959424187253120666813507481392736404180608262971387622449849130450137509932718213542986*i+10836555577996667500275306967330213627876722898985889281753376596883413979530565246709353562847377122536710191971708221929671701172)*x + (5878817293020626398392093958502803353336406475638616203401834688914414156839611330429784519627376317852542308913382393703685286041*i+19204759817884276140588300529532671996138270045933985084582743783574403901036281442632006879374308641498942060077023898719197842684) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1153994524125739098175009363822214085900361959424187253120666813507481392736404180608262971387622449849130450137509932718213542986*i+10836555577996667500275306967330213627876722898985889281753376596883413979530565246709353562847377122536710191971708221929671701172)*x + (5878817293020626398392093958502803353336406475638616203401834688914414156839611330429784519627376317852542308913382393703685286041*i+19204759817884276140588300529532671996138270045933985084582743783574403901036281442632006879374308641498942060077023898719197842684) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18351721345589979798899429601097213168363236971687947481711648579398909640661430669456755384671985773901184929365279453656242249773*i+9553366977309025177648723728530215541397305360431447241395977917887599028507562235763441030242837373180581605885618145391987067656)*x + (18709263833250864930235490441865174328689769977579229562774942298070712129199962694225984726480981496155709778332977860093881991225*i+8908781632846594575052357004998587631150002574502929833136992286613574021601505727919167297252112505125713872958187932109309960524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18351721345589979798899429601097213168363236971687947481711648579398909640661430669456755384671985773901184929365279453656242249773*i+9553366977309025177648723728530215541397305360431447241395977917887599028507562235763441030242837373180581605885618145391987067656)*x + (18709263833250864930235490441865174328689769977579229562774942298070712129199962694225984726480981496155709778332977860093881991225*i+8908781632846594575052357004998587631150002574502929833136992286613574021601505727919167297252112505125713872958187932109309960524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16895056961020431044400036571067737971789709764755876381567224327330752866993923343290159445046544032107838245061312199636387845765*i+13319239329879663363001620470146048041903310394434838442315972871787402570904843704947992239982554497195359398027985322723586224689)*x + (8601264750619044590954111202591001213510033952182202345659674898158549783427232160568026111727207079533582486220432016801125946935*i+1429936609232817458560091144136373535142558701232631308887662436884049252138794721218232782921408598644927111420910063751256199845) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16895056961020431044400036571067737971789709764755876381567224327330752866993923343290159445046544032107838245061312199636387845765*i+13319239329879663363001620470146048041903310394434838442315972871787402570904843704947992239982554497195359398027985322723586224689)*x + (8601264750619044590954111202591001213510033952182202345659674898158549783427232160568026111727207079533582486220432016801125946935*i+1429936609232817458560091144136373535142558701232631308887662436884049252138794721218232782921408598644927111420910063751256199845) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22922190354356796233428800761624565189795772984366157708070794281271198862355153330315400726815281344233419185278434569892603269694*i+9879218905261418883116374294214550811845384947199004817576611745554766273610089511901646469788361539002823565954206047401705511380)*x + (2446666621604010085463493936889577530848658346067498334479827454724515293797129480268130308328125068406007193554328518442709745878*i+7240077074965651940941958241963361843764089090350118253955176002492460030643931951886541772170549869837239025567073235586733830226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22922190354356796233428800761624565189795772984366157708070794281271198862355153330315400726815281344233419185278434569892603269694*i+9879218905261418883116374294214550811845384947199004817576611745554766273610089511901646469788361539002823565954206047401705511380)*x + (2446666621604010085463493936889577530848658346067498334479827454724515293797129480268130308328125068406007193554328518442709745878*i+7240077074965651940941958241963361843764089090350118253955176002492460030643931951886541772170549869837239025567073235586733830226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16775890744793987002651436436515656707120680806209263542333081227010717942656577509001476295870246954094748902257768822002865135885*i+17159900997858948581282063461420854851441047507857169260348125595853618654922598044663689169093248568452866996690602042041248731028)*x + (5858549664878967798763938388704337591164428876302420759811428822353287489981987697284839706808675088254601260639260046823654342343*i+6660843363306108425464078642066307227797300839750764971230973562258339551398486096374950863237413855594533312551194188120835920066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16775890744793987002651436436515656707120680806209263542333081227010717942656577509001476295870246954094748902257768822002865135885*i+17159900997858948581282063461420854851441047507857169260348125595853618654922598044663689169093248568452866996690602042041248731028)*x + (5858549664878967798763938388704337591164428876302420759811428822353287489981987697284839706808675088254601260639260046823654342343*i+6660843363306108425464078642066307227797300839750764971230973562258339551398486096374950863237413855594533312551194188120835920066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10622122840179802440326985435365376733746406011071011430444237625266440459271421758862968165766190374058150864324250717165741449979*i+24061333571325089587161349048558287678238010722446634760904748965783122091334507272330309844432526996711961731254554143330120186325)*x + (23634903814724245399987590612452745855838431557062229474959163942243051557492708945285305959806762916589893970566571571588470639974*i+248745281257820283649723094940491027054272676743705458427488949361612179933147432438803722355569348140311669518750976230928054825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10622122840179802440326985435365376733746406011071011430444237625266440459271421758862968165766190374058150864324250717165741449979*i+24061333571325089587161349048558287678238010722446634760904748965783122091334507272330309844432526996711961731254554143330120186325)*x + (23634903814724245399987590612452745855838431557062229474959163942243051557492708945285305959806762916589893970566571571588470639974*i+248745281257820283649723094940491027054272676743705458427488949361612179933147432438803722355569348140311669518750976230928054825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14734578587482450713148584461992765655515740402665373966113893392993103419340189270743554389212733121236380602818931208326868534629*i+4133154725562724082505072455656162044082582431457682961612680783396448473103930250168332653184416330158682670784193616101396529688)*x + (7291157017059078696481829426392432132919849205253173482234830647137624076542416742430492531545511940545310274355955300536581645858*i+2839851386580639262509640494519212117943798991601086079194201169254678743003404855244405961139790176734568816487217990017159858349) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14734578587482450713148584461992765655515740402665373966113893392993103419340189270743554389212733121236380602818931208326868534629*i+4133154725562724082505072455656162044082582431457682961612680783396448473103930250168332653184416330158682670784193616101396529688)*x + (7291157017059078696481829426392432132919849205253173482234830647137624076542416742430492531545511940545310274355955300536581645858*i+2839851386580639262509640494519212117943798991601086079194201169254678743003404855244405961139790176734568816487217990017159858349) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5342671094125402720095936863497442989212401964290835737159438782711545093818877813593052768711230103931852995365150653673340088085*i+17842682884019344580244500972854643756006425326372173524941223921452718148897231370583326275024048823671249346443335525714655536801)*x + (22654739879413872277504901344225867624071499699590660067711309491062522282665608463760644012920606984497671098298135134130080489353*i+21386484336734142398507385811559686911209851647705805189234696154360570989597512116531170981920843735105622440967324887525644172777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5342671094125402720095936863497442989212401964290835737159438782711545093818877813593052768711230103931852995365150653673340088085*i+17842682884019344580244500972854643756006425326372173524941223921452718148897231370583326275024048823671249346443335525714655536801)*x + (22654739879413872277504901344225867624071499699590660067711309491062522282665608463760644012920606984497671098298135134130080489353*i+21386484336734142398507385811559686911209851647705805189234696154360570989597512116531170981920843735105622440967324887525644172777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9301810074098290646313985344712252454558972455432690901478853270608971642700029771843813725898195603839172720721680603732359609191*i+8931731791956485374857875533401333833770973985576092760461571128022808425119828900238965248426968029760558553486750777261031304913)*x + (20568959661863595444123279745212890102992894928055697564568851944004111413120304160944400411607023855592439672151427679948165533397*i+19341015211829178126090094419128022006834256868598565106856098809375211269598296449788832386130408505069974290209600318904876870107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9301810074098290646313985344712252454558972455432690901478853270608971642700029771843813725898195603839172720721680603732359609191*i+8931731791956485374857875533401333833770973985576092760461571128022808425119828900238965248426968029760558553486750777261031304913)*x + (20568959661863595444123279745212890102992894928055697564568851944004111413120304160944400411607023855592439672151427679948165533397*i+19341015211829178126090094419128022006834256868598565106856098809375211269598296449788832386130408505069974290209600318904876870107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5070587782551865331050234015284960486694102273342732654842174925422937627649799215878980300394848361175733647764450758870899965940*i+2901118520592104790551981722981457222909245703735761271145249446053189930322699734968822687152183204927251838874345136893532872975)*x + (17327508296658624771578378934032119920524727903197196550965040588043147338059289184026158614679617481562831033451551742871706393285*i+8301462620954287597196185469962375777627414262299346231146431491670844326254115386442520030967739059600824585657865447369813699976) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5070587782551865331050234015284960486694102273342732654842174925422937627649799215878980300394848361175733647764450758870899965940*i+2901118520592104790551981722981457222909245703735761271145249446053189930322699734968822687152183204927251838874345136893532872975)*x + (17327508296658624771578378934032119920524727903197196550965040588043147338059289184026158614679617481562831033451551742871706393285*i+8301462620954287597196185469962375777627414262299346231146431491670844326254115386442520030967739059600824585657865447369813699976) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5330387163058391119666369946367060538467699782284933230087234996464808853576261124323730342243835890436859110107100022057497495863*i+2564167470867731340227496577587794027569812194242681841948171044589628916315972904639369677191010187412478314949735318793351194191)*x + (24000997211465030971695849645894495174193527451956900037303621249934590944530538776954122226371125214202561846757902123152801517493*i+20351757896668398228864275145084864120152599415190085590175721102409454766269130363575205657839724141059997279591736056566759057076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5330387163058391119666369946367060538467699782284933230087234996464808853576261124323730342243835890436859110107100022057497495863*i+2564167470867731340227496577587794027569812194242681841948171044589628916315972904639369677191010187412478314949735318793351194191)*x + (24000997211465030971695849645894495174193527451956900037303621249934590944530538776954122226371125214202561846757902123152801517493*i+20351757896668398228864275145084864120152599415190085590175721102409454766269130363575205657839724141059997279591736056566759057076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1811144081054488310612999204116153562655116849916391916052420601802063281121015865959574439203107977895192209633927786731352876435*i+6133727909872505391411949479345224541563592588305807529485497069101621809742679379148614679439136148003816771112889663324471743209)*x + (23428334183634076587591358535727059068707797907129839616760242383607510396124864377525096662269735333398944925780599983022836941118*i+9300118046457751192670457051116957493782037172014055304355538675352876874652297150495983430009537476391235086477265457745407967520) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1811144081054488310612999204116153562655116849916391916052420601802063281121015865959574439203107977895192209633927786731352876435*i+6133727909872505391411949479345224541563592588305807529485497069101621809742679379148614679439136148003816771112889663324471743209)*x + (23428334183634076587591358535727059068707797907129839616760242383607510396124864377525096662269735333398944925780599983022836941118*i+9300118046457751192670457051116957493782037172014055304355538675352876874652297150495983430009537476391235086477265457745407967520) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14693403526166458301864770555219001763919720092054627130091806301382919806484885105475361816050319006388052306872884953247232533684*i+13521955109368758526788546216157911436810813097496040400117814126483432852055513680639524589232832437878649019068574183981533882271)*x + (19119190120305765725645280517169476216103464036643006949310363030332469646261662787408271673019454938516484048093032068596824801246*i+19551999825293801995122996146853634370190770525552484574952704001745363666364690686761209202829331100335982323015390646857430500599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14693403526166458301864770555219001763919720092054627130091806301382919806484885105475361816050319006388052306872884953247232533684*i+13521955109368758526788546216157911436810813097496040400117814126483432852055513680639524589232832437878649019068574183981533882271)*x + (19119190120305765725645280517169476216103464036643006949310363030332469646261662787408271673019454938516484048093032068596824801246*i+19551999825293801995122996146853634370190770525552484574952704001745363666364690686761209202829331100335982323015390646857430500599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22536150607659303193213724289117923614508072329440412123137815253713554753519442421890338777535512479179030058623676340689322835358*i+4488917122100430366110214548092844346142000068923762781322996728481954653307703850181915865430232022548982312834237428812110465511)*x + (16296819327822647978441819954047272171864983971657828576664571554432876331783453121029585036687534107516349814374540076418986776868*i+23603565288298108149572188283829302900315084159735188022678105978867422636897014289614493070156016011840027427290503208622269057840) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22536150607659303193213724289117923614508072329440412123137815253713554753519442421890338777535512479179030058623676340689322835358*i+4488917122100430366110214548092844346142000068923762781322996728481954653307703850181915865430232022548982312834237428812110465511)*x + (16296819327822647978441819954047272171864983971657828576664571554432876331783453121029585036687534107516349814374540076418986776868*i+23603565288298108149572188283829302900315084159735188022678105978867422636897014289614493070156016011840027427290503208622269057840) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13578494609779543966847639313496369897159619556653860662764954528371255914963662425675175874433490580001497201538661820443794879281*i+13650072459045622867095387009427497348924959401601534725700719339555824153394143511593412268205502936704451642190036052492004723264)*x + (6504600126542790975518956109091765636209598399004887044082136928872868950495469204332469301159864262273946053943012672762255145948*i+17741462903733277444169216815568880270065437867831061949040188450089501928929670631076763419137307721331729983109172894753299936145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13578494609779543966847639313496369897159619556653860662764954528371255914963662425675175874433490580001497201538661820443794879281*i+13650072459045622867095387009427497348924959401601534725700719339555824153394143511593412268205502936704451642190036052492004723264)*x + (6504600126542790975518956109091765636209598399004887044082136928872868950495469204332469301159864262273946053943012672762255145948*i+17741462903733277444169216815568880270065437867831061949040188450089501928929670631076763419137307721331729983109172894753299936145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12161142776789691402071645921278321499623092869062342624943487779402461053791272567062711209093789145930213158622578068426160008498*i+14199463605214223400353236195207543744781020161861964898649062907234650371686372309101089588462603772687001031830418757440611423805)*x + (12602197206028675438920532583513104072893571998147082805637793227523229676453103754256974769403262377396048461907163711192427115155*i+10525079898256293419617040229022371749809752398164342616078727972386644789368868924239379740759166286441931591685207781887973858503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12161142776789691402071645921278321499623092869062342624943487779402461053791272567062711209093789145930213158622578068426160008498*i+14199463605214223400353236195207543744781020161861964898649062907234650371686372309101089588462603772687001031830418757440611423805)*x + (12602197206028675438920532583513104072893571998147082805637793227523229676453103754256974769403262377396048461907163711192427115155*i+10525079898256293419617040229022371749809752398164342616078727972386644789368868924239379740759166286441931591685207781887973858503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (265288459752501931179971851276817110472560534961594739213793594601424647831796373671645320697773765276640161089890205555336147416*i+748485671834828263558482359350095504129259814921896015396510211910669083591547189728693217784055015002910057085664176271471475163)*x + (21620421358208969556677817511905189731593835149343680915895775333830327872690263454950487517171881679017576625625773455831683417002*i+19608722138644419732781126912887784194160280405763428527621314067559403456301596800160837023263524302600144779423700670611582967148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (265288459752501931179971851276817110472560534961594739213793594601424647831796373671645320697773765276640161089890205555336147416*i+748485671834828263558482359350095504129259814921896015396510211910669083591547189728693217784055015002910057085664176271471475163)*x + (21620421358208969556677817511905189731593835149343680915895775333830327872690263454950487517171881679017576625625773455831683417002*i+19608722138644419732781126912887784194160280405763428527621314067559403456301596800160837023263524302600144779423700670611582967148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5476366855335816099453853186984485973956667741036314431189523228236076106659997225255521808037943265447232997508610667369227101363*i+14478445893770811155649346126403004663915644148280523912845391950550749000927807364016164406379421027984709457775123208012393314955)*x + (18329278389674958123149099737268469940123095969122287572882080279241097474257694272685612224161822679359011072961758045128557216738*i+5875465757832363564395107585484436915646516966220050830855913146373093268076541179349341441279713871521981623013722447412604962445) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5476366855335816099453853186984485973956667741036314431189523228236076106659997225255521808037943265447232997508610667369227101363*i+14478445893770811155649346126403004663915644148280523912845391950550749000927807364016164406379421027984709457775123208012393314955)*x + (18329278389674958123149099737268469940123095969122287572882080279241097474257694272685612224161822679359011072961758045128557216738*i+5875465757832363564395107585484436915646516966220050830855913146373093268076541179349341441279713871521981623013722447412604962445) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21393504998778633841352004117607525493791204004457822810221045551962778189056144372102324099934165548125708992036331318741351693010*i+7324481021461671489199980927995984203251967273164025482796408177098763369014880061523103461054984420780181740197378818047900284668)*x + (13807546094884737853011360784554927674598108964920643159015299771900276868852960865021383402910865759581765513638069309791748552678*i+21575528395617735145328204072366828969834735146735171259655858872942363549401795528924421917336271658765768095825580724292716794093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21393504998778633841352004117607525493791204004457822810221045551962778189056144372102324099934165548125708992036331318741351693010*i+7324481021461671489199980927995984203251967273164025482796408177098763369014880061523103461054984420780181740197378818047900284668)*x + (13807546094884737853011360784554927674598108964920643159015299771900276868852960865021383402910865759581765513638069309791748552678*i+21575528395617735145328204072366828969834735146735171259655858872942363549401795528924421917336271658765768095825580724292716794093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13384304284996281469340006267959608753820376231453767744368757611938980299185286181075316852961249456310571960903974369852750065819*i+11129920356563242129269800602988399560882174930558398979853443639322266303932310653856969421369863122668417140555670576564632493736)*x + (9672760183083771891143529863618371557648641192402585974684424050662235091521084809410149133029454713952537999132275153908997807869*i+11821314506815289031225488138377072990664961621904934911643212379406871678672437271699891372469804597027789599172489143082159860906) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13384304284996281469340006267959608753820376231453767744368757611938980299185286181075316852961249456310571960903974369852750065819*i+11129920356563242129269800602988399560882174930558398979853443639322266303932310653856969421369863122668417140555670576564632493736)*x + (9672760183083771891143529863618371557648641192402585974684424050662235091521084809410149133029454713952537999132275153908997807869*i+11821314506815289031225488138377072990664961621904934911643212379406871678672437271699891372469804597027789599172489143082159860906) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18655820527547484621718061716299738211129656843128507612432148043205455769690890057294081681316929186273533711699419280721398835548*i+7694199508513990903014338663038216767134774682196402763250003333419986442224617173756436256365378719829786465536225786355166473397)*x + (14074489992512857379911637772203667927955470144163071230549918381206248450582396132052304646835153892749638230208054880502567482780*i+425882628164875051741243068924831622585980890297009921157128064544287313144176123821813862680915205404979166639839289063832667231) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18655820527547484621718061716299738211129656843128507612432148043205455769690890057294081681316929186273533711699419280721398835548*i+7694199508513990903014338663038216767134774682196402763250003333419986442224617173756436256365378719829786465536225786355166473397)*x + (14074489992512857379911637772203667927955470144163071230549918381206248450582396132052304646835153892749638230208054880502567482780*i+425882628164875051741243068924831622585980890297009921157128064544287313144176123821813862680915205404979166639839289063832667231) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17602186608061797852740986344574363997945683598074405140159794050845113310081860915909184776896638329688090363132749099133335083322*i+18232745920013882610980120373507862036585700588110954430879076078114542741782553323932337806592447329698488740897591861189681250897)*x + (447937678464337147213036357902579881125681058785820483467135647902274654854218632797322275297835215606030549657557385145262732433*i+13771392340193312872518265700969556633421397074664958614196217336055938629342187441436331615185888532895988701994680467695498030159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17602186608061797852740986344574363997945683598074405140159794050845113310081860915909184776896638329688090363132749099133335083322*i+18232745920013882610980120373507862036585700588110954430879076078114542741782553323932337806592447329698488740897591861189681250897)*x + (447937678464337147213036357902579881125681058785820483467135647902274654854218632797322275297835215606030549657557385145262732433*i+13771392340193312872518265700969556633421397074664958614196217336055938629342187441436331615185888532895988701994680467695498030159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6810307944833352986463831458630555468647212115116806917525816382994987757437513486032515942520270267847246913082956177837854873997*i+2125383027649660665566462880255040616945756337187949739336592544498766423470308518127189236506887204102355865403910008819367134273)*x + (14666129705927256299894250041323949511855756467155110724857217913970992110933631412514880327010166309312484487858820129200933831948*i+221208974105038840686305552345043854074086662575554690061584132464834493444342411511903129786893216900283564534979513030794381433) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6810307944833352986463831458630555468647212115116806917525816382994987757437513486032515942520270267847246913082956177837854873997*i+2125383027649660665566462880255040616945756337187949739336592544498766423470308518127189236506887204102355865403910008819367134273)*x + (14666129705927256299894250041323949511855756467155110724857217913970992110933631412514880327010166309312484487858820129200933831948*i+221208974105038840686305552345043854074086662575554690061584132464834493444342411511903129786893216900283564534979513030794381433) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16187521159255523537254094981145736609876785150057215568009388166215970094752866541240751541382052942348688254986741833942049619790*i+17049329899086364542235192376957405910645670644710155042372786277351094554986762546545746757040723576890880618724537384527896131658)*x + (6769717338077188279114235305655396951324193372704303942070273950300927179533244803686470145677884418153541415383635841874588700105*i+16668855196583962939803703565908915190235851347530362223459050133322859685953168930237752542287759990447832126522046089785245561763) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16187521159255523537254094981145736609876785150057215568009388166215970094752866541240751541382052942348688254986741833942049619790*i+17049329899086364542235192376957405910645670644710155042372786277351094554986762546545746757040723576890880618724537384527896131658)*x + (6769717338077188279114235305655396951324193372704303942070273950300927179533244803686470145677884418153541415383635841874588700105*i+16668855196583962939803703565908915190235851347530362223459050133322859685953168930237752542287759990447832126522046089785245561763) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12228086040535528558281237571132577029493237578555007511120405854589203615039699138178931860238699953828705936736957166568243640538*i+9751841206050119866580337928734173929794770733496365104066569819971962687538766535906587782793767532312724116435162394644209080278)*x + (4921824808244188919108003304914814524700613211894197524497856764326394854360984230449110749979544149012678471833842200601450823940*i+2056854203015075289995404146445493731810132544119187812640329597795014062843272305591192691132073422556284992309966144574113211806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12228086040535528558281237571132577029493237578555007511120405854589203615039699138178931860238699953828705936736957166568243640538*i+9751841206050119866580337928734173929794770733496365104066569819971962687538766535906587782793767532312724116435162394644209080278)*x + (4921824808244188919108003304914814524700613211894197524497856764326394854360984230449110749979544149012678471833842200601450823940*i+2056854203015075289995404146445493731810132544119187812640329597795014062843272305591192691132073422556284992309966144574113211806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4866633620832656582931158217660236650463195482164397153524608750614989438155939361920442081483083009084961910996780091227185986739*i+1667681102984137783083214986805146934591816970226639648026335658919078996239299554818958517254639121227575774788002441772503080781)*x + (19578564194120838063210662677635831824243536531278892069689742638033922709820547706332859616322808066939795004060811322188799641672*i+17960450052306426039677546054908901331690015196742418821145473641318062933278278330061957738112076822714365947292341395283061686021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4866633620832656582931158217660236650463195482164397153524608750614989438155939361920442081483083009084961910996780091227185986739*i+1667681102984137783083214986805146934591816970226639648026335658919078996239299554818958517254639121227575774788002441772503080781)*x + (19578564194120838063210662677635831824243536531278892069689742638033922709820547706332859616322808066939795004060811322188799641672*i+17960450052306426039677546054908901331690015196742418821145473641318062933278278330061957738112076822714365947292341395283061686021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21597500330728089089961986548685238832663786638807992442202713520262704492626970725117977427699333353313623849781608413976142067757*i+14720323865756534111130904202372002335850112968677170287372388555153647162527852924812297224837661137689371351353543445411934789692)*x + (19028352352531996158526499148672119601214210078359392032652611423675830589813030659659026420084244847115222997739951861964613158317*i+7551462402535725484626801962035055913252224325398622775812050387109725663902279446189203932037070401511567644127644343017058724434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21597500330728089089961986548685238832663786638807992442202713520262704492626970725117977427699333353313623849781608413976142067757*i+14720323865756534111130904202372002335850112968677170287372388555153647162527852924812297224837661137689371351353543445411934789692)*x + (19028352352531996158526499148672119601214210078359392032652611423675830589813030659659026420084244847115222997739951861964613158317*i+7551462402535725484626801962035055913252224325398622775812050387109725663902279446189203932037070401511567644127644343017058724434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2402157740568776224315063462269111091917363162751733200831839924069894006561174802393435637674224570613223481876899374592259611516*i+9759401513650975580594491638920399207789403934086607813916832737922367778451999741801646877620846022161749133427168735812509562329)*x + (12158969630847114019100192638061654584613072676100336358052108769291609603432265204938059831328345622613489412520751033456992755596*i+17691787216248227191523886722701174220530676135400848803190729612267079671091115875232109429157561104867406818232479624653542601339) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2402157740568776224315063462269111091917363162751733200831839924069894006561174802393435637674224570613223481876899374592259611516*i+9759401513650975580594491638920399207789403934086607813916832737922367778451999741801646877620846022161749133427168735812509562329)*x + (12158969630847114019100192638061654584613072676100336358052108769291609603432265204938059831328345622613489412520751033456992755596*i+17691787216248227191523886722701174220530676135400848803190729612267079671091115875232109429157561104867406818232479624653542601339) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15365436315362995233840892172793456653497171056830181068960871751093625155273088797214297756106551991558304050600112798706644116021*i+382529904899021141816263683221198112874504968473029492344123247311699429891141950155448905013730669868735839259325109511096033322)*x + (20735746894981340546897050255870367321134459134639133515434491143895787888208165397711446986896838197552977265101374874745733292238*i+6994599768766452273720695955636781404698461357685658846362566292504253892276069268328682218692213665865861827522184966805500016121) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15365436315362995233840892172793456653497171056830181068960871751093625155273088797214297756106551991558304050600112798706644116021*i+382529904899021141816263683221198112874504968473029492344123247311699429891141950155448905013730669868735839259325109511096033322)*x + (20735746894981340546897050255870367321134459134639133515434491143895787888208165397711446986896838197552977265101374874745733292238*i+6994599768766452273720695955636781404698461357685658846362566292504253892276069268328682218692213665865861827522184966805500016121) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10819000140620306363413415645236163139827833090186631734517362169465431014451191911379609824416695162911724740919431237846992817461*i+15131539361001580771201982548787642044539880275835557653734730837488509924502491406806217170653723634850870145213806069834917867723)*x + (14368546147924454517871785583714637947624579629890258427899008875465016950299854711040885107285184044284296860070358101825319879646*i+23049364890092848100349197542025626443490239662481462038839460171227962975122600805247093638900393372618077932591477676556082030198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10819000140620306363413415645236163139827833090186631734517362169465431014451191911379609824416695162911724740919431237846992817461*i+15131539361001580771201982548787642044539880275835557653734730837488509924502491406806217170653723634850870145213806069834917867723)*x + (14368546147924454517871785583714637947624579629890258427899008875465016950299854711040885107285184044284296860070358101825319879646*i+23049364890092848100349197542025626443490239662481462038839460171227962975122600805247093638900393372618077932591477676556082030198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14507315945867040565982642062244982783409261821103744906118892476431141698797245112323218775613312258696456700325456377664726310000*i+19327621881606698504216894471603998717177998024401170008986424168791495884846153777356942118226690234785381439623847425605698002940)*x + (1094794301842828745944413142894538362986467064539904440475582229707557724177587688569853324401292796146590830690279525135399498163*i+12969588903202641898891068627211065536408002011288080217894435191196528573992829529765035377995167739770106922095077359164194894760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14507315945867040565982642062244982783409261821103744906118892476431141698797245112323218775613312258696456700325456377664726310000*i+19327621881606698504216894471603998717177998024401170008986424168791495884846153777356942118226690234785381439623847425605698002940)*x + (1094794301842828745944413142894538362986467064539904440475582229707557724177587688569853324401292796146590830690279525135399498163*i+12969588903202641898891068627211065536408002011288080217894435191196528573992829529765035377995167739770106922095077359164194894760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11168692111897680806642969031250044968802749841891386542052948738257206407455023964698886659562116396025976119338443016977292572217*i+17963152958466561659586505267550326735325724635081492816100648373160432805716432958817079429311815799654079893204149230083693464051)*x + (852217764148264976566907849283817474113054466250854326363007515753255436111468893248836370758836373591061438331983298604658043821*i+23487309847381044650366692358165302728389125022647179326958463846859396261666673090412585706020856048340953867652122468013300680190) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11168692111897680806642969031250044968802749841891386542052948738257206407455023964698886659562116396025976119338443016977292572217*i+17963152958466561659586505267550326735325724635081492816100648373160432805716432958817079429311815799654079893204149230083693464051)*x + (852217764148264976566907849283817474113054466250854326363007515753255436111468893248836370758836373591061438331983298604658043821*i+23487309847381044650366692358165302728389125022647179326958463846859396261666673090412585706020856048340953867652122468013300680190) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12941238628282720907698822927023605668445889580867363846918158320569292438552079107475391244070319446712458541790315370626814301566*i+24301809643056388496401364066843021938306428820003692551456977751248381148774032288187580546363337427363516776453201988033975014550)*x + (10422331541436754644441366194371717592267995234175580519443133199445289274982269541812926803362295450411011568804465590775327605417*i+7129594716349156132636942338716355840617550036854219028118219567321790054788334704819014595664897950885409136253272639225212592103) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12941238628282720907698822927023605668445889580867363846918158320569292438552079107475391244070319446712458541790315370626814301566*i+24301809643056388496401364066843021938306428820003692551456977751248381148774032288187580546363337427363516776453201988033975014550)*x + (10422331541436754644441366194371717592267995234175580519443133199445289274982269541812926803362295450411011568804465590775327605417*i+7129594716349156132636942338716355840617550036854219028118219567321790054788334704819014595664897950885409136253272639225212592103) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1008604158394274948589883625682542950466699542455228178044433740411408848686932536000212604717875177832398272521344447264986760628*i+7350709019970757119688227418373420208837885380109108221050462745426987737184585961960694601397749253915708945366916016645176779005)*x + (7749112519956598923287200984676227012562478961044547845323390188078252551128807093703267527922242782019921875711253160201008651251*i+3186335694791761837131744111668339438110992260803690269483949703221376242570209480074276339345724533687635068220362481831656020708) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1008604158394274948589883625682542950466699542455228178044433740411408848686932536000212604717875177832398272521344447264986760628*i+7350709019970757119688227418373420208837885380109108221050462745426987737184585961960694601397749253915708945366916016645176779005)*x + (7749112519956598923287200984676227012562478961044547845323390188078252551128807093703267527922242782019921875711253160201008651251*i+3186335694791761837131744111668339438110992260803690269483949703221376242570209480074276339345724533687635068220362481831656020708) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21619182169146782650357729827710575603680204182745801574333716966351457491679458857143359658379013879813143663489766080809682258849*i+6483244436071229325442556721271500457360616258885180634310089134902486601676967148561967827087900306098922128898857550362294149700)*x + (18891578429796897492609425882690077889283664097621118930439698847019075192274506404557729425848582919719519279362412917428129095697*i+10019090230580501540246364594025593095273109076096938605375670147546375306294030767392351046006996080260422684232235310716174068535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21619182169146782650357729827710575603680204182745801574333716966351457491679458857143359658379013879813143663489766080809682258849*i+6483244436071229325442556721271500457360616258885180634310089134902486601676967148561967827087900306098922128898857550362294149700)*x + (18891578429796897492609425882690077889283664097621118930439698847019075192274506404557729425848582919719519279362412917428129095697*i+10019090230580501540246364594025593095273109076096938605375670147546375306294030767392351046006996080260422684232235310716174068535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3100560853461336340849931443902420817149110419231951490043879971051876353662396316552710712042056431950254011951134906518920742007*i+18490806860629075656291496850129156538810734089462524895857810929347370771540559972634905063204066993894844469198080176296756079402)*x + (14549734562515555286737721983604584354056979348217340883931866012406824638812106370325788599087626759009323606749748421061768942655*i+19777299901282692687325714427145930563601961888676270661220268115594323409903659570204294812381452175436041956350880175149919974126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3100560853461336340849931443902420817149110419231951490043879971051876353662396316552710712042056431950254011951134906518920742007*i+18490806860629075656291496850129156538810734089462524895857810929347370771540559972634905063204066993894844469198080176296756079402)*x + (14549734562515555286737721983604584354056979348217340883931866012406824638812106370325788599087626759009323606749748421061768942655*i+19777299901282692687325714427145930563601961888676270661220268115594323409903659570204294812381452175436041956350880175149919974126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18751285957555734960768252502679885213903335251462445930557150760429609270596980180327003784106319477561818537410376281083542355398*i+18448623815953927622570939679062727759207585226577565439736009597737990461852335435546622778751011477138662523877965698770627703936)*x + (4029301852901531261937110824679887485061311935363136979146606303836175474390213163132628068734711164679169600233634253016539881131*i+2534356900351317505683735065891194781999808199116191243451535260748785949657231837584231324209604095450199099387513613533206895964) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18751285957555734960768252502679885213903335251462445930557150760429609270596980180327003784106319477561818537410376281083542355398*i+18448623815953927622570939679062727759207585226577565439736009597737990461852335435546622778751011477138662523877965698770627703936)*x + (4029301852901531261937110824679887485061311935363136979146606303836175474390213163132628068734711164679169600233634253016539881131*i+2534356900351317505683735065891194781999808199116191243451535260748785949657231837584231324209604095450199099387513613533206895964) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20515619469786214692410949919992079720071101060716256740317303069350791754122224707707932833717264117990043168167852708914857005027*i+5678779194647830711443944210511258573769714550202945704951232759258030252740619478511069618069789216023121623391011900380372467562)*x + (9055586298772018665229870714954714198030149510491461775984021709167934454241727265803830481367191387481184890208969581634739798987*i+5050580704688630244421496971267596662170961343820817643418250348078583687052517248980175893908289426924438427040173559979501093905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20515619469786214692410949919992079720071101060716256740317303069350791754122224707707932833717264117990043168167852708914857005027*i+5678779194647830711443944210511258573769714550202945704951232759258030252740619478511069618069789216023121623391011900380372467562)*x + (9055586298772018665229870714954714198030149510491461775984021709167934454241727265803830481367191387481184890208969581634739798987*i+5050580704688630244421496971267596662170961343820817643418250348078583687052517248980175893908289426924438427040173559979501093905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18559632023205512493053736151513996870182173966253128495437490487813100754389165079306300663777539744895263958305852011680153431465*i+15753006788621896525367715704308797033786566472766721140262865883694874065640406589815051173701030523951294646048261759815113002795)*x + (13287066112333875891394373024289699460847591320850543882155753216888787560975354124229534821485815398485549729577300131122350102126*i+14541876271633333179391259708426810901879410007192578778213203152640210433473361652495054542173384824650035892138717437152204978947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18559632023205512493053736151513996870182173966253128495437490487813100754389165079306300663777539744895263958305852011680153431465*i+15753006788621896525367715704308797033786566472766721140262865883694874065640406589815051173701030523951294646048261759815113002795)*x + (13287066112333875891394373024289699460847591320850543882155753216888787560975354124229534821485815398485549729577300131122350102126*i+14541876271633333179391259708426810901879410007192578778213203152640210433473361652495054542173384824650035892138717437152204978947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9013154575779521320427004066173706527000297797837214232853328519155883837670138736781997757122742059179722063109453717617675984771*i+21265080285386505645821242501627214253903245864494138131280410489546937904908265469068783007938221777961794926672968802675271781933)*x + (6082693069788553169725967703662790492867864410031459324097894644831598534313377354864681429923351758069446872886009267810691771076*i+12761808683438843258297815900850237537416482466062512468998302632210014804507581683953963440851778808863430693238996800015297610273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9013154575779521320427004066173706527000297797837214232853328519155883837670138736781997757122742059179722063109453717617675984771*i+21265080285386505645821242501627214253903245864494138131280410489546937904908265469068783007938221777961794926672968802675271781933)*x + (6082693069788553169725967703662790492867864410031459324097894644831598534313377354864681429923351758069446872886009267810691771076*i+12761808683438843258297815900850237537416482466062512468998302632210014804507581683953963440851778808863430693238996800015297610273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (969133035990333175461595168866317168870196254916888603922135178360653813383189967650814054957834206661367185988280732608815758254*i+15425778586632876283724437577052369021484119169557449868667211483408988223367003542851628872461028294937147936443355356714996798428)*x + (6213818931194445628881506064136532775679865190941190487422660724166842358136262034097285264537496780320164258592854608853184324500*i+15947634810090578956563883331886971431928840105545326523991026254607525759030485233775829643206637174770957632775280671987696858551) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (969133035990333175461595168866317168870196254916888603922135178360653813383189967650814054957834206661367185988280732608815758254*i+15425778586632876283724437577052369021484119169557449868667211483408988223367003542851628872461028294937147936443355356714996798428)*x + (6213818931194445628881506064136532775679865190941190487422660724166842358136262034097285264537496780320164258592854608853184324500*i+15947634810090578956563883331886971431928840105545326523991026254607525759030485233775829643206637174770957632775280671987696858551) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16961493824950746776800236224516186157407327222351683542213719832591978919534004911066775849320295778832254627766743095070452839802*i+20362206732611611555816764084642907195826543058621431078835104117797244731970040841075578098263300318922153960443729573199110269056)*x + (8897635264873338495144924105926557825122997323584573773748732760059566301470489082694468183906294462343408109168772985264579077895*i+18084097675830932107716164871171748510840844596105039705183147497594898181967940907326356972853917106671506570592579604677958884921) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16961493824950746776800236224516186157407327222351683542213719832591978919534004911066775849320295778832254627766743095070452839802*i+20362206732611611555816764084642907195826543058621431078835104117797244731970040841075578098263300318922153960443729573199110269056)*x + (8897635264873338495144924105926557825122997323584573773748732760059566301470489082694468183906294462343408109168772985264579077895*i+18084097675830932107716164871171748510840844596105039705183147497594898181967940907326356972853917106671506570592579604677958884921) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9482622933109197306069671343254608119648419902835698886754585107839240531223083706270776174161616490335462285992093151599395138205*i+12010926734345231117463871409326721121433086026557129757094958449797312390776059121005459193161022400220536488695369496649762052935)*x + (33019457444692967796521735100414176249916704245431522297426149955672145638642977051964316673058945227312976206430768885902168818*i+15466412079019687255456699023276653494555515096080430558730226811181215562324660029649192596133946738862303100632822820589868460257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9482622933109197306069671343254608119648419902835698886754585107839240531223083706270776174161616490335462285992093151599395138205*i+12010926734345231117463871409326721121433086026557129757094958449797312390776059121005459193161022400220536488695369496649762052935)*x + (33019457444692967796521735100414176249916704245431522297426149955672145638642977051964316673058945227312976206430768885902168818*i+15466412079019687255456699023276653494555515096080430558730226811181215562324660029649192596133946738862303100632822820589868460257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (802790134437030159238152214880860291707899519808704608839586142149720526134902735006386372681165025374991087206181321455662964532*i+9493063773265595057266205160123547194946666642443025939120643637972245543092095613617731112682317012006853607571960991853620659356)*x + (16224033384555930713442881576814925529732152496441237622215540068778662538372142506259887954025435655493457515481478272787997385685*i+23859398611354904160200014495571922466336593809754940934643696433518819869677003551861843644075192363911110540463955333848166993883) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (802790134437030159238152214880860291707899519808704608839586142149720526134902735006386372681165025374991087206181321455662964532*i+9493063773265595057266205160123547194946666642443025939120643637972245543092095613617731112682317012006853607571960991853620659356)*x + (16224033384555930713442881576814925529732152496441237622215540068778662538372142506259887954025435655493457515481478272787997385685*i+23859398611354904160200014495571922466336593809754940934643696433518819869677003551861843644075192363911110540463955333848166993883) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5254745274374211972158709531032831742399517257884857882263559767083799390599912194568120746746705174722080480152957207088421996113*i+11617604088858524370849006001343375500772570411844323596070672479598395858632187489148574607641319031414914466381379163256275258351)*x + (4649923681829839296229397704851823344400110288173620366848699219385702980858732111533526989103039446264968697309649356165519648382*i+23479662131863634214151109164761661219804397233837891270021909618813733264085279368416525460578609436659290121013350526498918133489) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5254745274374211972158709531032831742399517257884857882263559767083799390599912194568120746746705174722080480152957207088421996113*i+11617604088858524370849006001343375500772570411844323596070672479598395858632187489148574607641319031414914466381379163256275258351)*x + (4649923681829839296229397704851823344400110288173620366848699219385702980858732111533526989103039446264968697309649356165519648382*i+23479662131863634214151109164761661219804397233837891270021909618813733264085279368416525460578609436659290121013350526498918133489) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4291275236478880026875091594507061928403636932685796100852036582018938902650847477481932885577436731061286944036366093175327555789*i+17402881561979569777317264912248903266229744232428627447385837018978420254199924968213201419842100924544147419800251481369918762434)*x + (4903255392686645962376930640627956257990081864186236865307742023525219838217109680362350612077333314920429142583027051368883007120*i+17315606035572290022710157956552789983912930497819179905630400602494323024479141368969538342845619240134945206460217509575111850572) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4291275236478880026875091594507061928403636932685796100852036582018938902650847477481932885577436731061286944036366093175327555789*i+17402881561979569777317264912248903266229744232428627447385837018978420254199924968213201419842100924544147419800251481369918762434)*x + (4903255392686645962376930640627956257990081864186236865307742023525219838217109680362350612077333314920429142583027051368883007120*i+17315606035572290022710157956552789983912930497819179905630400602494323024479141368969538342845619240134945206460217509575111850572) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6004587622147037447220453517028826043712755252970375017125144611534157808662883364676696142126464030554502155699741154439293447464*i+16971943960857500714701129059856964887243882704945177174055618273468796079008271703233919905801108424749037707322922555538232823445)*x + (18731390328553180531468281671419545837411151874474849098541942004731696678845604195721813175676978865193260131745038546339838467667*i+7766097588194587362438740225583065896030413995485750600496287790121772765977359086359783004862795129907573854180040832643259774133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6004587622147037447220453517028826043712755252970375017125144611534157808662883364676696142126464030554502155699741154439293447464*i+16971943960857500714701129059856964887243882704945177174055618273468796079008271703233919905801108424749037707322922555538232823445)*x + (18731390328553180531468281671419545837411151874474849098541942004731696678845604195721813175676978865193260131745038546339838467667*i+7766097588194587362438740225583065896030413995485750600496287790121772765977359086359783004862795129907573854180040832643259774133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14362367579721355918244382877907304855106092489991016973642306985291183594513386635580420110919660787863872994968375056540607921773*i+9751512476808289779569811319693479390728422008931372982575438635513097345322726584769033658335229777595591343087937574466953651994)*x + (9916291894297485464096079362680715447971685855967835002780170279238971494758749904431220436771189970304342286817213433657762260912*i+8826566877226467647926207470835710666804997388325618603805527482730066346435555251626587534198041926149884812772837746413055536901) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14362367579721355918244382877907304855106092489991016973642306985291183594513386635580420110919660787863872994968375056540607921773*i+9751512476808289779569811319693479390728422008931372982575438635513097345322726584769033658335229777595591343087937574466953651994)*x + (9916291894297485464096079362680715447971685855967835002780170279238971494758749904431220436771189970304342286817213433657762260912*i+8826566877226467647926207470835710666804997388325618603805527482730066346435555251626587534198041926149884812772837746413055536901) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16811217645575281812746749656739919811312016108201907770161968480004254741513550845591584856965888300972857801610724819650394955782*i+6364637130134412686306998659572773149614711711195543260612469628238441868214130870224637484322712408410087519362303158365911113056)*x + (4241557479724242761031103456682320547680386022983573726889072137792434449209143879606711561660447105568316425829670860222971380538*i+15388267261400639398440445184275492566850850274258720726016509907793137807138700646133580435995079329608847413549482846121153477423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16811217645575281812746749656739919811312016108201907770161968480004254741513550845591584856965888300972857801610724819650394955782*i+6364637130134412686306998659572773149614711711195543260612469628238441868214130870224637484322712408410087519362303158365911113056)*x + (4241557479724242761031103456682320547680386022983573726889072137792434449209143879606711561660447105568316425829670860222971380538*i+15388267261400639398440445184275492566850850274258720726016509907793137807138700646133580435995079329608847413549482846121153477423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8301702552336644284767515843273646859804222591614896142618352891907597254181816675473724655678925676918752019944704532228907293408*i+20155591118168745642915542013376890386421829923980773677245529943213808109933641495157617082235782453588887934490143343284723261189)*x + (7958062848747190338707452038423589576083326528013621467572764197817084347275290932355646273408224307569008173854761961093707790832*i+12805713595438458298799507093515700452791372595659455399214588937140474755911726995642522056570728501610170035900589838256321959340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8301702552336644284767515843273646859804222591614896142618352891907597254181816675473724655678925676918752019944704532228907293408*i+20155591118168745642915542013376890386421829923980773677245529943213808109933641495157617082235782453588887934490143343284723261189)*x + (7958062848747190338707452038423589576083326528013621467572764197817084347275290932355646273408224307569008173854761961093707790832*i+12805713595438458298799507093515700452791372595659455399214588937140474755911726995642522056570728501610170035900589838256321959340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9066651588286240003903328914958416838146887548393187158863469178397366408785673780749273029433815297150176676590953874788840128045*i+14783643488113756363454275920528038973390467928104384464049053108633163520547461102629749945077835788794065353097737335693763174008)*x + (19708187083186877762625056821373267625246765148146060260530203507999820712753750067498346016583941937535071322880809212658711803904*i+11490136671395833911460694847212533564412222426153094570550715791492773896330506333358558781519900271447157269044046989335625625413) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9066651588286240003903328914958416838146887548393187158863469178397366408785673780749273029433815297150176676590953874788840128045*i+14783643488113756363454275920528038973390467928104384464049053108633163520547461102629749945077835788794065353097737335693763174008)*x + (19708187083186877762625056821373267625246765148146060260530203507999820712753750067498346016583941937535071322880809212658711803904*i+11490136671395833911460694847212533564412222426153094570550715791492773896330506333358558781519900271447157269044046989335625625413) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4766991464108062519340282854752161792228992876764184382115809604792070001468554433788212752467840683943470515676107631479093650910*i+20852715076237874624184922911767223007098629559623500571131525641747920116027032223286272083221104335213641402733031419248247273755)*x + (20862422551603046529508333179892849992000184746369689671788928239341633456389096538577939904171320902301678525456497252008610442161*i+18902813592566368577644548235327647145614929628802957190139560831397676820207975794337201248181465324578394054976442961256851791213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4766991464108062519340282854752161792228992876764184382115809604792070001468554433788212752467840683943470515676107631479093650910*i+20852715076237874624184922911767223007098629559623500571131525641747920116027032223286272083221104335213641402733031419248247273755)*x + (20862422551603046529508333179892849992000184746369689671788928239341633456389096538577939904171320902301678525456497252008610442161*i+18902813592566368577644548235327647145614929628802957190139560831397676820207975794337201248181465324578394054976442961256851791213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (289966064048247710300028610653217840193330224730889344610060184684728982434841362465775780520524040957866789251743688850776978896*i+16194327139803462910747109448711930396095063333226957573880176555966805163659322110183166593506885803022505005514305850128333343467)*x + (7985432096326362781885619984465574739139363757637194194579089942636720378539421154513986730425231203641807383270330717100882183571*i+14983370327514540760657638073634207108298814132570389136167681756110155410985083274664732715945221702357939357045241088223298370751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (289966064048247710300028610653217840193330224730889344610060184684728982434841362465775780520524040957866789251743688850776978896*i+16194327139803462910747109448711930396095063333226957573880176555966805163659322110183166593506885803022505005514305850128333343467)*x + (7985432096326362781885619984465574739139363757637194194579089942636720378539421154513986730425231203641807383270330717100882183571*i+14983370327514540760657638073634207108298814132570389136167681756110155410985083274664732715945221702357939357045241088223298370751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19161996279916946366364486642640256792525251516101020754014797422638570677857827367254692933788547793998013014148540107774789296330*i+7022479164676815008707369632638311753593205259992531036186541613658610607531583842175813016496948626788981454835482144348851468392)*x + (14226557252810303808912569793272529358108402007993692791688137908450374940712135229280786852341017472218126635302326377907467429903*i+4051733846231455213702675567017196976819219725741847424819191325309071639998244627366381205928343099265114126833927030639383043506) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19161996279916946366364486642640256792525251516101020754014797422638570677857827367254692933788547793998013014148540107774789296330*i+7022479164676815008707369632638311753593205259992531036186541613658610607531583842175813016496948626788981454835482144348851468392)*x + (14226557252810303808912569793272529358108402007993692791688137908450374940712135229280786852341017472218126635302326377907467429903*i+4051733846231455213702675567017196976819219725741847424819191325309071639998244627366381205928343099265114126833927030639383043506) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19971670106680440648904406544313041775345705014457489406139686842206152328826559551967760128901538189316271928666425042984491845331*i+5022895226389255061307928945967430589040334690531257595203686322425290739678461201568354192658021368683608211441158446128452532220)*x + (11692352894789132778941587514125910908509042268402006671177846268165757130743824637645306952098714642814566210368220047860739332973*i+5140593045983618774494210410057635614853819027782858944943314396109449702726558233464853687184878742295620268627531508500842775432) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19971670106680440648904406544313041775345705014457489406139686842206152328826559551967760128901538189316271928666425042984491845331*i+5022895226389255061307928945967430589040334690531257595203686322425290739678461201568354192658021368683608211441158446128452532220)*x + (11692352894789132778941587514125910908509042268402006671177846268165757130743824637645306952098714642814566210368220047860739332973*i+5140593045983618774494210410057635614853819027782858944943314396109449702726558233464853687184878742295620268627531508500842775432) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15318117158007730120811564409439364779949025836040332666769698711931473589928981976970639813333184320418764142503328968965502008328*i+18204530580781121511429417844909760838136314640416133656081223824432531857810076126188811770986943649984864189529679943982701299083)*x + (1777847143629125151376221087326212796700387518371575961558589222753451305030366533522108622015327584810190547286528202358670891753*i+10758571779639310983134346359554967258597313624961007204578344682238178324134983885590276264341343354842722474159239367999622819138) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15318117158007730120811564409439364779949025836040332666769698711931473589928981976970639813333184320418764142503328968965502008328*i+18204530580781121511429417844909760838136314640416133656081223824432531857810076126188811770986943649984864189529679943982701299083)*x + (1777847143629125151376221087326212796700387518371575961558589222753451305030366533522108622015327584810190547286528202358670891753*i+10758571779639310983134346359554967258597313624961007204578344682238178324134983885590276264341343354842722474159239367999622819138) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20237839683080718773697524064428152741222135014577801946304276268693570327109437175877823596069801669151141846011278169117130279052*i+11678614661751737020784789585605784542630196197448532874497256196300161918098637035988926398361013388218859461718782235269999795082)*x + (14332200116851239039179003595110631238894756428444965970691643003350340940047132755131928331061969460084315143475134425680749179273*i+2806514218167517888648149194197142550183116185532324940598301460406589657763380754065803909820615090375942188083164928990264422785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20237839683080718773697524064428152741222135014577801946304276268693570327109437175877823596069801669151141846011278169117130279052*i+11678614661751737020784789585605784542630196197448532874497256196300161918098637035988926398361013388218859461718782235269999795082)*x + (14332200116851239039179003595110631238894756428444965970691643003350340940047132755131928331061969460084315143475134425680749179273*i+2806514218167517888648149194197142550183116185532324940598301460406589657763380754065803909820615090375942188083164928990264422785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22664267805725317844545687751544991733847096980083760465802889342557769587184449055805000272124883022302947100178176127211396130006*i+2378381754553592149052251736590977686147526204887289489428422630667615748233317869212129567373787034927212038575849262076770137776)*x + (11326374183829362599029398981846197262427255089518160682556574698253147436772961925312397551111004112181262189077771697123129683123*i+7107774947822318226178984938573288999176137620251165367120262182791512758596016853179279491967382489901581037349044525310002544292) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22664267805725317844545687751544991733847096980083760465802889342557769587184449055805000272124883022302947100178176127211396130006*i+2378381754553592149052251736590977686147526204887289489428422630667615748233317869212129567373787034927212038575849262076770137776)*x + (11326374183829362599029398981846197262427255089518160682556574698253147436772961925312397551111004112181262189077771697123129683123*i+7107774947822318226178984938573288999176137620251165367120262182791512758596016853179279491967382489901581037349044525310002544292) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10915899926537094652036611442335537295266664480250100104303272781080573654774264982468594537103204018736499185707196461080353952446*i+1055100704153698599023536743024886365013596620016132890902483242472431519813927434263173451092002352646493936835752837075065395997)*x + (14184699578478212515509418784699277549509277719076182248870501410037156905406655787704446482056509638396964842189493280907437361490*i+20727859560458455514550450503538326152972151597308672788809421111512714135203548900008925613101942898320608100603047704915958434750) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10915899926537094652036611442335537295266664480250100104303272781080573654774264982468594537103204018736499185707196461080353952446*i+1055100704153698599023536743024886365013596620016132890902483242472431519813927434263173451092002352646493936835752837075065395997)*x + (14184699578478212515509418784699277549509277719076182248870501410037156905406655787704446482056509638396964842189493280907437361490*i+20727859560458455514550450503538326152972151597308672788809421111512714135203548900008925613101942898320608100603047704915958434750) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9086870617005100774473270424019794431053477637841010601995200257490972463506385132841715096640316159224835489744635508149304596657*i+17250215827171569054986155622633017510028951466196048114063295101274516558794950728177424845736539257624796797213120525315989517611)*x + (9002374546676773177451208109566893363794133242132416361281379624078381149969806580793070010431199607093024626527217744084021696145*i+2536799966661847920382901844127801507111905868912704958233249592838353650980901072869809736249838871843907825372115572338380860317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9086870617005100774473270424019794431053477637841010601995200257490972463506385132841715096640316159224835489744635508149304596657*i+17250215827171569054986155622633017510028951466196048114063295101274516558794950728177424845736539257624796797213120525315989517611)*x + (9002374546676773177451208109566893363794133242132416361281379624078381149969806580793070010431199607093024626527217744084021696145*i+2536799966661847920382901844127801507111905868912704958233249592838353650980901072869809736249838871843907825372115572338380860317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15693411615286845932669261135280145341086523823007792799349456095435853114465956828738281093360458548061649020160095322877822447717*i+7504523427046240072948034341287918476037854039682146434175580474820297468654127598433895293502364598115776227923787693813520588777)*x + (10974831268770404160589426281201423710411222229205830120829170568153812190357310125853250338172909444739856413088890270148718590152*i+20397416955975658547048912717751880356469145940900935417215315598687751324665139328383321058149254727731112235727017828346859474076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15693411615286845932669261135280145341086523823007792799349456095435853114465956828738281093360458548061649020160095322877822447717*i+7504523427046240072948034341287918476037854039682146434175580474820297468654127598433895293502364598115776227923787693813520588777)*x + (10974831268770404160589426281201423710411222229205830120829170568153812190357310125853250338172909444739856413088890270148718590152*i+20397416955975658547048912717751880356469145940900935417215315598687751324665139328383321058149254727731112235727017828346859474076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14839607532629277452212622035249597580728129709293966771691210854927511686244651128785692577104967662999289217982235406764046120428*i+661349288295231563164003188238127424997212570342311652041467385507374101383662775962972646481410497086587010226145926686397457212)*x + (4814715720324991489716852948863372063441938099933534001752749995420457666257305609647002690966925274441606829018521484073185552520*i+12616625786196357869192630443260609059436088873196598976418833594510870439710054451649975377845270140255723752745825248182846432281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14839607532629277452212622035249597580728129709293966771691210854927511686244651128785692577104967662999289217982235406764046120428*i+661349288295231563164003188238127424997212570342311652041467385507374101383662775962972646481410497086587010226145926686397457212)*x + (4814715720324991489716852948863372063441938099933534001752749995420457666257305609647002690966925274441606829018521484073185552520*i+12616625786196357869192630443260609059436088873196598976418833594510870439710054451649975377845270140255723752745825248182846432281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21045992421776365717118484537532721984026962167032888725907138393316987463581555173095616041683494683692214344633249823493834330898*i+5749132409853691570963407587999643207071801688611601137336391281268427550203293115838268560430652852294816221968040857092034119127)*x + (8240966249948456591838029392321884275174300376741639843622838127174378731185181069521078072243041962532169678611174949123798720772*i+6759411920284281691754847436592363501869700887031242262234666454967711469139167047556900583368022140980812906912166261584359270968) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21045992421776365717118484537532721984026962167032888725907138393316987463581555173095616041683494683692214344633249823493834330898*i+5749132409853691570963407587999643207071801688611601137336391281268427550203293115838268560430652852294816221968040857092034119127)*x + (8240966249948456591838029392321884275174300376741639843622838127174378731185181069521078072243041962532169678611174949123798720772*i+6759411920284281691754847436592363501869700887031242262234666454967711469139167047556900583368022140980812906912166261584359270968) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21281712606975001418980906188073750771991764572472486989644052601853357773459001061405087187723776488283914931948000328565054259758*i+18426031956981441060263021193634005899685716871826423719625646426747558269702165756511184329619655347670068243997155131905259029188)*x + (24248697925268348872529059804338710060302712569840221176963494359366081199367428841016253792395712644151444832685466812074863404261*i+15018973850320512714107538202957168297855932877539799341889362835218708066058686050105122203765738814004071059341795706089687873098) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21281712606975001418980906188073750771991764572472486989644052601853357773459001061405087187723776488283914931948000328565054259758*i+18426031956981441060263021193634005899685716871826423719625646426747558269702165756511184329619655347670068243997155131905259029188)*x + (24248697925268348872529059804338710060302712569840221176963494359366081199367428841016253792395712644151444832685466812074863404261*i+15018973850320512714107538202957168297855932877539799341889362835218708066058686050105122203765738814004071059341795706089687873098) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9528058854385819882860059457734058912038406632721986286058518766269404382914867438164935694917208567653176295341641003588594000973*i+15167734054340444888831851570943188049834374094245004864457222185503148745613108249833542350287784573194635912980341601664682409571)*x + (19454275624563953241107433590940157149453622472476955603400749450555892572948636674265441158527870128585306356233507478407246882172*i+3462148769061759350590935307213309358341207105607354423178464399770886255226390450162610435958990800644635417461251467175013970839) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9528058854385819882860059457734058912038406632721986286058518766269404382914867438164935694917208567653176295341641003588594000973*i+15167734054340444888831851570943188049834374094245004864457222185503148745613108249833542350287784573194635912980341601664682409571)*x + (19454275624563953241107433590940157149453622472476955603400749450555892572948636674265441158527870128585306356233507478407246882172*i+3462148769061759350590935307213309358341207105607354423178464399770886255226390450162610435958990800644635417461251467175013970839) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2414342080938862730355476614398304891740835582186943526397166764721874067659950349750119057315791772268822938915846428928314226005*i+9280270804201660988702267953816850989361583047062180177667692094728150667392962129872002604038250404094862570893413876421370978158)*x + (18061090117350554182201626225588072182636759918059897264279051378640306543230704565290724428106499276673546074691617715332152430899*i+8008243276619725232884967464383649512997564668301558370958689810425248238366965213548579866546020893858250245733792734671159748679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2414342080938862730355476614398304891740835582186943526397166764721874067659950349750119057315791772268822938915846428928314226005*i+9280270804201660988702267953816850989361583047062180177667692094728150667392962129872002604038250404094862570893413876421370978158)*x + (18061090117350554182201626225588072182636759918059897264279051378640306543230704565290724428106499276673546074691617715332152430899*i+8008243276619725232884967464383649512997564668301558370958689810425248238366965213548579866546020893858250245733792734671159748679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16956739663861680481933032313906110045537936864246424174819318605239703555991615486444747503123236671748014548646381294513397892204*i+15996568518223748241684725699902378336457728143347906804620692566409425076024971367518974555994934940561165377337360683311237000335)*x + (454820551504543534347623326833370642401613419879907591700663672837916429489970161141448832913101685411328251238550728474071353572*i+18391888698589813517117167591095802018069228594672251902748407869428210131080668414364167922639302610128527201502527976925279055875) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16956739663861680481933032313906110045537936864246424174819318605239703555991615486444747503123236671748014548646381294513397892204*i+15996568518223748241684725699902378336457728143347906804620692566409425076024971367518974555994934940561165377337360683311237000335)*x + (454820551504543534347623326833370642401613419879907591700663672837916429489970161141448832913101685411328251238550728474071353572*i+18391888698589813517117167591095802018069228594672251902748407869428210131080668414364167922639302610128527201502527976925279055875) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23029065337610461097967580777785403137283497859317879775834443814902850428031447989817985093701529612128604409565567607819326333946*i+2894151899030373078965752566796797476803698360312315778595126897164878829594758661708079114076485758022150749996955652277865087219)*x + (22474784703252392656268980462225842897217301303507261079269718346894383448069249204414878387531838140882800118780618859254701783533*i+14171020651209196350640386612987575024126987883214214663140516523992326422856976852688258953801717420054975263105023184633695806363) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23029065337610461097967580777785403137283497859317879775834443814902850428031447989817985093701529612128604409565567607819326333946*i+2894151899030373078965752566796797476803698360312315778595126897164878829594758661708079114076485758022150749996955652277865087219)*x + (22474784703252392656268980462225842897217301303507261079269718346894383448069249204414878387531838140882800118780618859254701783533*i+14171020651209196350640386612987575024126987883214214663140516523992326422856976852688258953801717420054975263105023184633695806363) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19199761362956554976698140317201750133051974160431040891739961152299691931283402685252982482856661588786856089364134094129161692732*i+12157695535774081626087932001865308643192491248031873820222191391829755979680882187357710919301389438520222474495009237987804521311)*x + (3330408200535183225296182413424409527818094453822617160133744105162081874967669593286812230873202379644245081389631787689275004765*i+4490932092548936938823470440136772411785680352941477639101001887123429544464369925395994894877935769717725250615351596657499029942) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19199761362956554976698140317201750133051974160431040891739961152299691931283402685252982482856661588786856089364134094129161692732*i+12157695535774081626087932001865308643192491248031873820222191391829755979680882187357710919301389438520222474495009237987804521311)*x + (3330408200535183225296182413424409527818094453822617160133744105162081874967669593286812230873202379644245081389631787689275004765*i+4490932092548936938823470440136772411785680352941477639101001887123429544464369925395994894877935769717725250615351596657499029942) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10936764606617197702338863200662057607459197471004869430859784706273289336515706932511965062660418520874682334429299354701021329239*i+5076072292486800165767880828745026815521255153370383457738980013570366324702350854816241695377783475156274778857297505285394209399)*x + (3149464284713724589863909370864724934042647147957233615381736343118673417321763332724201392748501191105879463593187575283239036505*i+6796586748999692741257146202411633811552455571208309804760585113567084762252000708792817562358552723276119337339282744541883120945) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10936764606617197702338863200662057607459197471004869430859784706273289336515706932511965062660418520874682334429299354701021329239*i+5076072292486800165767880828745026815521255153370383457738980013570366324702350854816241695377783475156274778857297505285394209399)*x + (3149464284713724589863909370864724934042647147957233615381736343118673417321763332724201392748501191105879463593187575283239036505*i+6796586748999692741257146202411633811552455571208309804760585113567084762252000708792817562358552723276119337339282744541883120945) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17342982510816815837869950270403001295297131206273752538313451434972058904271939132664871962488123594738233091410376957650682161159*i+22987041830620603017205689228359895058535122489752406183522672843304081572910821812233299783202450538249751058686542803008070775495)*x + (22127289257569046113000693631496012997019218400364009347383856227655492580357313858781762510692220423853856107837959525178531023552*i+358202771753513482270842034154432760662557509072528339600662696148940951068227972118809149964107268820192116023650319239989447757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17342982510816815837869950270403001295297131206273752538313451434972058904271939132664871962488123594738233091410376957650682161159*i+22987041830620603017205689228359895058535122489752406183522672843304081572910821812233299783202450538249751058686542803008070775495)*x + (22127289257569046113000693631496012997019218400364009347383856227655492580357313858781762510692220423853856107837959525178531023552*i+358202771753513482270842034154432760662557509072528339600662696148940951068227972118809149964107268820192116023650319239989447757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11169842920799512623067221387841541399504095645547023755840331325234521382916383073276208284681656888469007410186292898419655714536*i+4301350334299616642440303351618041838539645036950153027038317407607516829619676581916998799516642076540259568353195980393782938403)*x + (11981395656990252792693385409380096536704225760020453641778168151528432709518181228305973074853011015345674216003342286915619118824*i+6617124909957485644611160464600507684795581726132997815807159291408461151588372173103151455755904703173371410764985509234334183424) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11169842920799512623067221387841541399504095645547023755840331325234521382916383073276208284681656888469007410186292898419655714536*i+4301350334299616642440303351618041838539645036950153027038317407607516829619676581916998799516642076540259568353195980393782938403)*x + (11981395656990252792693385409380096536704225760020453641778168151528432709518181228305973074853011015345674216003342286915619118824*i+6617124909957485644611160464600507684795581726132997815807159291408461151588372173103151455755904703173371410764985509234334183424) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13835144052805528706405554983303085783668114138249377409049762426889475316353892593239754751179403359769239722483698736747786211481*i+2835866150230544170961756397559854204424683418910030699009161159265461099306914845550058704995489266239293360077442228952987220866)*x + (14082953722324632020964653216615036687597580964521679319985912066761085323649844262698731924207955550086343768438330688093872214265*i+5765839169299354940493591186522844904403303775884052233359029595259064007315566802500438895964234077431975679093347322811034857662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13835144052805528706405554983303085783668114138249377409049762426889475316353892593239754751179403359769239722483698736747786211481*i+2835866150230544170961756397559854204424683418910030699009161159265461099306914845550058704995489266239293360077442228952987220866)*x + (14082953722324632020964653216615036687597580964521679319985912066761085323649844262698731924207955550086343768438330688093872214265*i+5765839169299354940493591186522844904403303775884052233359029595259064007315566802500438895964234077431975679093347322811034857662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12673881415289220193405884104019152331473221135281461157176251409186871404693863351352530812277517774874568330509759305593027277540*i+17025398079388395125579202260332288406213494711907889249137404551410173872386505253139397491302567993763529601374249628704759087684)*x + (7271736437523149207551992404390450916102016395459936085655716834535618907718709257015760071340559569883292472228609081430226509638*i+23168933670290728158645754569343695970715461195375513205739011222525302553928240810189173795536687486278777173842165764169061936186) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12673881415289220193405884104019152331473221135281461157176251409186871404693863351352530812277517774874568330509759305593027277540*i+17025398079388395125579202260332288406213494711907889249137404551410173872386505253139397491302567993763529601374249628704759087684)*x + (7271736437523149207551992404390450916102016395459936085655716834535618907718709257015760071340559569883292472228609081430226509638*i+23168933670290728158645754569343695970715461195375513205739011222525302553928240810189173795536687486278777173842165764169061936186) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3407820516624353588335094846362854831774084810282477962882417458311550546080896757258969786420319267482512561194662184542847976324*i+22847931094500406951224275202301133776018792590018577145224051264813142263486953935672363769245769943205903992289610094762282566064)*x + (1026194984636628691197134699687587764311687230728943632335765681141957801698431906814029057141981820001856815790431443643621323766*i+993029629234348612967644786005062642410929465949916994225699849099298111650174218939289586887323322449894406186529521469020387288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3407820516624353588335094846362854831774084810282477962882417458311550546080896757258969786420319267482512561194662184542847976324*i+22847931094500406951224275202301133776018792590018577145224051264813142263486953935672363769245769943205903992289610094762282566064)*x + (1026194984636628691197134699687587764311687230728943632335765681141957801698431906814029057141981820001856815790431443643621323766*i+993029629234348612967644786005062642410929465949916994225699849099298111650174218939289586887323322449894406186529521469020387288) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13942756705562489974937951493803649790501965596285168194044148134061252339746755769138315518683121050253321737547225750766899407435*i+3457858434094482203876060170382499433799553786154372905007593168947503391419910654951695409597386625907876476844382117075095625146)*x + (129370323196947815987761535277712111930332701770942072404618103241133812339092800586927620668155096506198813539386223495009037631*i+14362747742057390843036632687545825128874684609245264153440622345839913622488296506942063939007810257602585313921482594896315537780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13942756705562489974937951493803649790501965596285168194044148134061252339746755769138315518683121050253321737547225750766899407435*i+3457858434094482203876060170382499433799553786154372905007593168947503391419910654951695409597386625907876476844382117075095625146)*x + (129370323196947815987761535277712111930332701770942072404618103241133812339092800586927620668155096506198813539386223495009037631*i+14362747742057390843036632687545825128874684609245264153440622345839913622488296506942063939007810257602585313921482594896315537780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (785167862756856036475866113629713773153788193888834537696418007611835567082654180084472100199020859831266560912440170973148612582*i+5886507966303615550054652759280700075350777114256441404512548294284252015108131794469437434174676157473557775367022832000409493908)*x + (18409305784315212211471990094263857884189421682800342129332587679712960938476674980844251411828190588630845671050180951446416692704*i+6187932311884631698395747022422133806754849566514153832035426968758277462083844611542003717531848561478344054284412813549669254784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (785167862756856036475866113629713773153788193888834537696418007611835567082654180084472100199020859831266560912440170973148612582*i+5886507966303615550054652759280700075350777114256441404512548294284252015108131794469437434174676157473557775367022832000409493908)*x + (18409305784315212211471990094263857884189421682800342129332587679712960938476674980844251411828190588630845671050180951446416692704*i+6187932311884631698395747022422133806754849566514153832035426968758277462083844611542003717531848561478344054284412813549669254784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1035261161871313689884915765452506264270042030520228139329987159045592356814586670389299532054114853749091413106596540505110108892*i+6442185624846591398766635734712457266661517704377794819875900741542813284111894198604306650975222284718804871029326187217872066865)*x + (13699492092368063309537817050411198925726877791826897861353990526072400866973718914146541000185457941870084440654437255444316036609*i+6248498328443934306796135350056231470255765216483443562029695355848164553947156406666977186873205802937468877995278926526652959375) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1035261161871313689884915765452506264270042030520228139329987159045592356814586670389299532054114853749091413106596540505110108892*i+6442185624846591398766635734712457266661517704377794819875900741542813284111894198604306650975222284718804871029326187217872066865)*x + (13699492092368063309537817050411198925726877791826897861353990526072400866973718914146541000185457941870084440654437255444316036609*i+6248498328443934306796135350056231470255765216483443562029695355848164553947156406666977186873205802937468877995278926526652959375) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7434654208963203565817315448164949194143869287650817931120880260205839493578971914803466685787991444403252009630294900275352941803*i+24293389825434213490226173930695788636814619377933638408481247852559959249983478717607932856170640792772389830786722727182753014216)*x + (3143466551631004402731595520449417592995077058126835562623362923575364916654681941329901626006994124889716123362871418313199499267*i+6473187532724367841987901374855376526284134911465853109451393413718302962356406201584901041881390564619671757514107581373240746437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [100]:
Phi65 = isogeny_walk(E5, Phi5_P0 + S6 * Phi5_Q0, l_A,n_A)
Phi65
Out[100]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7434654208963203565817315448164949194143869287650817931120880260205839493578971914803466685787991444403252009630294900275352941803*i+24293389825434213490226173930695788636814619377933638408481247852559959249983478717607932856170640792772389830786722727182753014216)*x + (3143466551631004402731595520449417592995077058126835562623362923575364916654681941329901626006994124889716123362871418313199499267*i+6473187532724367841987901374855376526284134911465853109451393413718302962356406201584901041881390564619671757514107581373240746437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16578954961664537204068186398066383770755479436124488262504602755591697530217713170584405489931329769245011111528956342677317837196*i+18626727224877129101753587979824572972579059786584691445792511210633327388253373397850311714446385220130276814934703207218322715380)*x + (5327270066571484754058443760778535186765593866258906649646659058403613541841246175198809263796940998711893454228735264117947693156*i+1846804406553585814891394983777105780062322645351222933444620048139037571437418443998950743168158899298067546314949638945217293394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14120063476644848313445783036418189133316528181962002817825369420573684035663475729736782569975330573972922593230128897839507223754*i+7842964757528300508665019426233743507100649604826203237177831871634664433351481878378979542388045664425062821730843349717151345031)*x + (11153610813946942675702116225618064585248347894137289207710105335986603404405261515422198543906088591453755010006675881558980007557*i+19114228568618451816350750647421493846421916730836118946757493291019699498180857723061653426304368072704682810439885320799991764259) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14120063476644848313445783036418189133316528181962002817825369420573684035663475729736782569975330573972922593230128897839507223754*i+7842964757528300508665019426233743507100649604826203237177831871634664433351481878378979542388045664425062821730843349717151345031)*x + (11153610813946942675702116225618064585248347894137289207710105335986603404405261515422198543906088591453755010006675881558980007557*i+19114228568618451816350750647421493846421916730836118946757493291019699498180857723061653426304368072704682810439885320799991764259) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9301022756159903490466042857279329882403274976473812099936565119618551051197250955003335440830341427339874637897343850358230618073*i+21276977422472826122445797315126404534424139104367682747609548987947111351260334800696222331831805843050454655548523668752030254836)*x + (22594951806454947567789011761562748481679961950151577259816505420397956720765173873963428113294457505793392392928211817898092515097*i+12916950353721784777144966800038811420780663479654890811652462114149561868876843486414310509233063298011452975012160707675433873220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9301022756159903490466042857279329882403274976473812099936565119618551051197250955003335440830341427339874637897343850358230618073*i+21276977422472826122445797315126404534424139104367682747609548987947111351260334800696222331831805843050454655548523668752030254836)*x + (22594951806454947567789011761562748481679961950151577259816505420397956720765173873963428113294457505793392392928211817898092515097*i+12916950353721784777144966800038811420780663479654890811652462114149561868876843486414310509233063298011452975012160707675433873220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20541985835780177970020435978889343145583418097716422624858607861657756217565192074361481450125916653812098224600337009210373393972*i+2491655119401220546320157749047876842373420746718847096332359337249755090472357592575081929162614603791347242575288447230140964714)*x + (12483333259396876514984310508075906745580884479052039064871696599352600100958677050611866753489123949948375564174912790747581134341*i+3875944280011257748483648455125385014664527397791954606716006225900223121665884640893359768203711842688565433724837734035375789133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20541985835780177970020435978889343145583418097716422624858607861657756217565192074361481450125916653812098224600337009210373393972*i+2491655119401220546320157749047876842373420746718847096332359337249755090472357592575081929162614603791347242575288447230140964714)*x + (12483333259396876514984310508075906745580884479052039064871696599352600100958677050611866753489123949948375564174912790747581134341*i+3875944280011257748483648455125385014664527397791954606716006225900223121665884640893359768203711842688565433724837734035375789133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9838906401068952444676590305788839214839091330659091358629920955555192838614630315481290900912296205037384377959426010776844573167*i+3300219096109547838169061827350380645515777679082315299623993731449283101758961355505699274106657930303903910333554928803126489111)*x + (5794115757604846269326632344947141156294263233653367689181812725343451383950485283222889788698729523869726790670749612578746231644*i+10022477691504225462478605309388138835004094377945903793869456167777629937081147529030158276972157552741303321390142848398258006843) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9838906401068952444676590305788839214839091330659091358629920955555192838614630315481290900912296205037384377959426010776844573167*i+3300219096109547838169061827350380645515777679082315299623993731449283101758961355505699274106657930303903910333554928803126489111)*x + (5794115757604846269326632344947141156294263233653367689181812725343451383950485283222889788698729523869726790670749612578746231644*i+10022477691504225462478605309388138835004094377945903793869456167777629937081147529030158276972157552741303321390142848398258006843) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23113243114280905547859846184579391377485571111007795444370902531385332544984031985178124889547792625453265436833463062613121543636*i+11867319673728111763621019807460612703827901385135240506728128098856667514331147900549711288152085492750534347584399345785709360114)*x + (3098847797577985214039949990808659540186576602059896616108749686350101805068669801246950772382576555305151930220153451546187679698*i+19002500858788571088497506574765538176292720774800719143385223133825215772735645062375481525399164108506122655721891300520515400887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23113243114280905547859846184579391377485571111007795444370902531385332544984031985178124889547792625453265436833463062613121543636*i+11867319673728111763621019807460612703827901385135240506728128098856667514331147900549711288152085492750534347584399345785709360114)*x + (3098847797577985214039949990808659540186576602059896616108749686350101805068669801246950772382576555305151930220153451546187679698*i+19002500858788571088497506574765538176292720774800719143385223133825215772735645062375481525399164108506122655721891300520515400887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (88787252857993664639214641356570719320906364806810722556726502374815442657586234883093349567395906731115317004523018974334604708*i+886312050855347366087341962191336241673042542602241890963314343952305887182157793492613571176943161060499108346881161285617011107)*x + (17492986333085371414111268075858215039588183599079529695387756638165089496148186822789626340385084001088770966122424639628009456087*i+22053543177106634579100939318090661638645358474657419850305076108267989243224620185978619295563871843536015283993822488163800051934) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (88787252857993664639214641356570719320906364806810722556726502374815442657586234883093349567395906731115317004523018974334604708*i+886312050855347366087341962191336241673042542602241890963314343952305887182157793492613571176943161060499108346881161285617011107)*x + (17492986333085371414111268075858215039588183599079529695387756638165089496148186822789626340385084001088770966122424639628009456087*i+22053543177106634579100939318090661638645358474657419850305076108267989243224620185978619295563871843536015283993822488163800051934) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9242652009121985430897693035954023266836876695441400797993914211184690155653718496927468525967442863328832731990495595125962520911*i+12461906178676455219274261911574700591631533133711137983237803563272359866913292212455139200193338720256963819064741125173615853598)*x + (16493592170841644058299338354022843917319749522560857972448517199547629313639937794138791463602164419197673229022838667000808942124*i+11819858407672907306791452151133683658362420505395418516698956808527440647577922760776718686358318128113078092870713340352541941059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9242652009121985430897693035954023266836876695441400797993914211184690155653718496927468525967442863328832731990495595125962520911*i+12461906178676455219274261911574700591631533133711137983237803563272359866913292212455139200193338720256963819064741125173615853598)*x + (16493592170841644058299338354022843917319749522560857972448517199547629313639937794138791463602164419197673229022838667000808942124*i+11819858407672907306791452151133683658362420505395418516698956808527440647577922760776718686358318128113078092870713340352541941059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16820632530929466300805638646315659307934348905564030381360494016348415982256994234857292752053054512581040235290403167101477977709*i+12103970003326981454627665510572303901184132314789285091013761751213168148442596118489268214523006747227492183481330263803511597055)*x + (6635473273541861542479908494692420679986175053015188764429092185139731471682275831081918613217888523876490102240839977555561472297*i+9972407847070372986352402898528706294353915483255037834180651670983966435511745045178673610125040561897090388271149225976067770623) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16820632530929466300805638646315659307934348905564030381360494016348415982256994234857292752053054512581040235290403167101477977709*i+12103970003326981454627665510572303901184132314789285091013761751213168148442596118489268214523006747227492183481330263803511597055)*x + (6635473273541861542479908494692420679986175053015188764429092185139731471682275831081918613217888523876490102240839977555561472297*i+9972407847070372986352402898528706294353915483255037834180651670983966435511745045178673610125040561897090388271149225976067770623) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17804515553456145188969499349481927854477110934788078511564606478346216337598476947133148108815632301759752035446155917332703764079*i+14023380219949883220896725222541108655617176180581032234332934792382761364102927698161336774704617447704457797343565394101878064698)*x + (21341412796000987046539008820833051776154218070144049193117169563421551252538681320386471939940672452992195463584569593279137019462*i+22260053815575081847882977445600389607884188510799242035892769497160274019171442760208428461313165249089211155901778718751618014426) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17804515553456145188969499349481927854477110934788078511564606478346216337598476947133148108815632301759752035446155917332703764079*i+14023380219949883220896725222541108655617176180581032234332934792382761364102927698161336774704617447704457797343565394101878064698)*x + (21341412796000987046539008820833051776154218070144049193117169563421551252538681320386471939940672452992195463584569593279137019462*i+22260053815575081847882977445600389607884188510799242035892769497160274019171442760208428461313165249089211155901778718751618014426) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6838427348923184978197659804982679464353705867162023540827161350132773735558719972570477010202279675162228457822550320826293123501*i+2877054610217533632754956503295176046463022655071692172274435973199211690732499072719493842790765131183645492785584449953115121038)*x + (19602576277865487900381687502663318319493517564603430453769879982729687605296704350745949194980767807321400006091366933307228619978*i+6880765127272900260632244126063330802248778001403784315123858505125122293449828883764954838930757785980795035333163523808053739815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6838427348923184978197659804982679464353705867162023540827161350132773735558719972570477010202279675162228457822550320826293123501*i+2877054610217533632754956503295176046463022655071692172274435973199211690732499072719493842790765131183645492785584449953115121038)*x + (19602576277865487900381687502663318319493517564603430453769879982729687605296704350745949194980767807321400006091366933307228619978*i+6880765127272900260632244126063330802248778001403784315123858505125122293449828883764954838930757785980795035333163523808053739815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18243673329764061999060579513825578140818186890921625578049500958005645568996013832942644495233663236023899004341357473942027235569*i+18452329873109625515423344827039976458743252244435132593555034118730875025463670844557707376528039206892376105211238515788476570401)*x + (13527934595680894852372781382893052152189302221877732185477739105745574588579353582294932679395245348193493422608670060898699809861*i+8011487750300316979193320608351770442222496198844594562393315908941429533520975546654016109311946825818748580390975844200784781264) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18243673329764061999060579513825578140818186890921625578049500958005645568996013832942644495233663236023899004341357473942027235569*i+18452329873109625515423344827039976458743252244435132593555034118730875025463670844557707376528039206892376105211238515788476570401)*x + (13527934595680894852372781382893052152189302221877732185477739105745574588579353582294932679395245348193493422608670060898699809861*i+8011487750300316979193320608351770442222496198844594562393315908941429533520975546654016109311946825818748580390975844200784781264) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24245015661500846787311668402642024952807215159653773121788659874713890437547126120365176910266510657642832841470657463282746091399*i+18825141035922508494288855174933830444406930737012495143541751815090491134324668366937689875195486953281772323706008182882670656221)*x + (14319275881228147267907626107350828276101138359099738667241387429809725589510649789056757222084806570279782357239427117657464937950*i+3975132545911020003236290194388207946725589401743268882452772802936991636427316664838451698827351245096102018084281752795856860736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24245015661500846787311668402642024952807215159653773121788659874713890437547126120365176910266510657642832841470657463282746091399*i+18825141035922508494288855174933830444406930737012495143541751815090491134324668366937689875195486953281772323706008182882670656221)*x + (14319275881228147267907626107350828276101138359099738667241387429809725589510649789056757222084806570279782357239427117657464937950*i+3975132545911020003236290194388207946725589401743268882452772802936991636427316664838451698827351245096102018084281752795856860736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12313430780614010450621203284951981364927473370967653316359252400745600094239689185159410392639252726018339900822343651186890076236*i+4009045278218911930581744470447828138247597882364574087829282968130902751245504230502652724753536463325200003460360214086741271505)*x + (8514143781979441502724075228030365084155490523315859927642007895237287915384316245589666023794817768698444979279736743700252352244*i+22985899097574417122848999761889125960864710224792197208688236273370426346547587390726533902163936904692167735149265706179801197405) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12313430780614010450621203284951981364927473370967653316359252400745600094239689185159410392639252726018339900822343651186890076236*i+4009045278218911930581744470447828138247597882364574087829282968130902751245504230502652724753536463325200003460360214086741271505)*x + (8514143781979441502724075228030365084155490523315859927642007895237287915384316245589666023794817768698444979279736743700252352244*i+22985899097574417122848999761889125960864710224792197208688236273370426346547587390726533902163936904692167735149265706179801197405) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4762163346105682180461236688266935048103407020481424426140018380712616086031772830903555922933125944412551114935951943593504259106*i+18941960873147217698083302202572970788637464975737086152524590232576484987990190468361993008952882876320360469494655131825143417981)*x + (15655004332561929073510599210151185103560382189016890502883592803855403354255875031770135143259654795141080031496506143769079571022*i+16980790444092623363946650905298923423629757696948074630629943271089912014666112082465317674985047359711141291342139537467061267224) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4762163346105682180461236688266935048103407020481424426140018380712616086031772830903555922933125944412551114935951943593504259106*i+18941960873147217698083302202572970788637464975737086152524590232576484987990190468361993008952882876320360469494655131825143417981)*x + (15655004332561929073510599210151185103560382189016890502883592803855403354255875031770135143259654795141080031496506143769079571022*i+16980790444092623363946650905298923423629757696948074630629943271089912014666112082465317674985047359711141291342139537467061267224) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16124682697971556982854819544992370241884372341884258908366645808184627675337310885956864452658561491621469589688540027379858119246*i+228951257754493018044558875504596870633919488951641233747689213849814102921533976067561441642858688700837561985552240643520146925)*x + (16388935750466668514388659150262992371314719132878652894967792497093632144084400151629508487222814689878258100168234836115202012513*i+1706674773454873414677159355756308825340581834055170601680036438569433779407309775438158310686775871795307627855887753502266523799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16124682697971556982854819544992370241884372341884258908366645808184627675337310885956864452658561491621469589688540027379858119246*i+228951257754493018044558875504596870633919488951641233747689213849814102921533976067561441642858688700837561985552240643520146925)*x + (16388935750466668514388659150262992371314719132878652894967792497093632144084400151629508487222814689878258100168234836115202012513*i+1706674773454873414677159355756308825340581834055170601680036438569433779407309775438158310686775871795307627855887753502266523799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3414890087855188336575866102113299399139208886170971131720465548651606043973298663394245378567662429877995157129477007981888412076*i+13724384380394791465406306247916388455159899732345951880911068951242266889380898955148729357286736245096370030897092017035644532341)*x + (19162396566575702917345041568319982533720001441563381727081399612642279269065421844144439266182760156028124422608508652081980203976*i+2397468534876922619422407544155589493115824412110079182934008715997504343907329635763259000668725796080442428758805523808397436554) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3414890087855188336575866102113299399139208886170971131720465548651606043973298663394245378567662429877995157129477007981888412076*i+13724384380394791465406306247916388455159899732345951880911068951242266889380898955148729357286736245096370030897092017035644532341)*x + (19162396566575702917345041568319982533720001441563381727081399612642279269065421844144439266182760156028124422608508652081980203976*i+2397468534876922619422407544155589493115824412110079182934008715997504343907329635763259000668725796080442428758805523808397436554) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16647692058053390599762980732667873362811622306313537524341032041600478474572154395914519625427906781276488397677100403040518763948*i+6883203241132873429102113488143229773041647634765957327433410708829281162278810449275907541739005586478690602128909079740485396717)*x + (8045154538727193695793693344967528083538137903358171771308747640102215292275045492112924466605028173377572643417099570826348705346*i+15527698174661682418981963197434119053604024227452733315156233829808634434533284226048929031642307521169681346643017554871483783978) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16647692058053390599762980732667873362811622306313537524341032041600478474572154395914519625427906781276488397677100403040518763948*i+6883203241132873429102113488143229773041647634765957327433410708829281162278810449275907541739005586478690602128909079740485396717)*x + (8045154538727193695793693344967528083538137903358171771308747640102215292275045492112924466605028173377572643417099570826348705346*i+15527698174661682418981963197434119053604024227452733315156233829808634434533284226048929031642307521169681346643017554871483783978) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5769414653665472499427571187929169349051841420046660926145164617548782491077685054176837503918252312834816051627193122374894271640*i+2649980884067951463656988796698279988387084412900084551896029938740757339911978684094437154170143491945685188446392887275044195374)*x + (7735463640255399779380299461184163912094837420748170301428142759844906742208782645803616440291814281410187765288862628976454327178*i+4228625271471455807651324857417466533400527081933289577608605844597340483988897171757400443931534293960567582747448486943831402470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5769414653665472499427571187929169349051841420046660926145164617548782491077685054176837503918252312834816051627193122374894271640*i+2649980884067951463656988796698279988387084412900084551896029938740757339911978684094437154170143491945685188446392887275044195374)*x + (7735463640255399779380299461184163912094837420748170301428142759844906742208782645803616440291814281410187765288862628976454327178*i+4228625271471455807651324857417466533400527081933289577608605844597340483988897171757400443931534293960567582747448486943831402470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15170022544653056015753161449446793746381424484626613966302322148097300910211317182067959623338178263503003939868442354612932446476*i+10214855037271413652578478871707466491546223201259728034662901520488669621722161176613773326539305484426702141655830194710709169789)*x + (21326541125734700587231906931923413751187982196393634128659247040031210279162294332015658603077155233643705116691310926776383589670*i+782558401196056811626305661597195070867488277960217482147116415427327299970473230509033857324903609753578112171458227007626943633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15170022544653056015753161449446793746381424484626613966302322148097300910211317182067959623338178263503003939868442354612932446476*i+10214855037271413652578478871707466491546223201259728034662901520488669621722161176613773326539305484426702141655830194710709169789)*x + (21326541125734700587231906931923413751187982196393634128659247040031210279162294332015658603077155233643705116691310926776383589670*i+782558401196056811626305661597195070867488277960217482147116415427327299970473230509033857324903609753578112171458227007626943633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4233191647257067981564396422010705947889930860776940906878267439173343062777101484944080777009363218286346458642314414714736357890*i+2845672848417988786826745876898205358076309537226025680016047371311091987769186287016542049397423188835681436829400312730764977901)*x + (9209837937855443230350796268392670138093930564049973732499868760637279413892191348192384538267766689115021193071526165189768660074*i+23528508967790320660350630959559481498574505890631593638856592018888294239263040371559910413484991607025819546342735592901777702293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4233191647257067981564396422010705947889930860776940906878267439173343062777101484944080777009363218286346458642314414714736357890*i+2845672848417988786826745876898205358076309537226025680016047371311091987769186287016542049397423188835681436829400312730764977901)*x + (9209837937855443230350796268392670138093930564049973732499868760637279413892191348192384538267766689115021193071526165189768660074*i+23528508967790320660350630959559481498574505890631593638856592018888294239263040371559910413484991607025819546342735592901777702293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4593504191795939410985753029092291801533686474855797892582905053771607846254148021104214783747342973593087254661120905557413843916*i+13604130719874346203150490892259627781355769010419025290955131476341720458174439008831436016460866164005434427175700471363360228632)*x + (23921794648896416051244584628598386627562852706601659783065597833800201082394964270036974978031470505371444311843458761957213351889*i+20123365818282335256671797193097614193352092360426713603457679203914785443932969130306310936447977300356912579973435671639347051408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4593504191795939410985753029092291801533686474855797892582905053771607846254148021104214783747342973593087254661120905557413843916*i+13604130719874346203150490892259627781355769010419025290955131476341720458174439008831436016460866164005434427175700471363360228632)*x + (23921794648896416051244584628598386627562852706601659783065597833800201082394964270036974978031470505371444311843458761957213351889*i+20123365818282335256671797193097614193352092360426713603457679203914785443932969130306310936447977300356912579973435671639347051408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19969771430928288418071096604749630668195165164663228450541105895307288788929322942634942631564786429077377744796254802618947218976*i+21342411816288337868118953250156748954166607603401524023961242089398718400236732005620411664315202075531135684983925119664522095256)*x + (20525356663554094623475219619768141486535421928323496773784072399421685839536015446258966361087070523188503966707990275214074775843*i+23133088412235482715674920377743387578770109934120875479915638559548850174260770734334828922505585369173867456329518287496555817689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19969771430928288418071096604749630668195165164663228450541105895307288788929322942634942631564786429077377744796254802618947218976*i+21342411816288337868118953250156748954166607603401524023961242089398718400236732005620411664315202075531135684983925119664522095256)*x + (20525356663554094623475219619768141486535421928323496773784072399421685839536015446258966361087070523188503966707990275214074775843*i+23133088412235482715674920377743387578770109934120875479915638559548850174260770734334828922505585369173867456329518287496555817689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2534407310618307423315306571243093351566353325064156758775093973966500660840570077314895307345853995709650139391966643854809336029*i+20911650088662473813645537357881736494862851171849314567730027044671861134410605193642431296474771793976896072078918580427295194999)*x + (13956723298380892831167506290190738817281421247104118992686863644132882907290791543370150707833150920325846023579505411075082507088*i+9716965781903586579105237334875330747949142859276157060465653307658944423910941645158754688009165664888085889435768253446318691870) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2534407310618307423315306571243093351566353325064156758775093973966500660840570077314895307345853995709650139391966643854809336029*i+20911650088662473813645537357881736494862851171849314567730027044671861134410605193642431296474771793976896072078918580427295194999)*x + (13956723298380892831167506290190738817281421247104118992686863644132882907290791543370150707833150920325846023579505411075082507088*i+9716965781903586579105237334875330747949142859276157060465653307658944423910941645158754688009165664888085889435768253446318691870) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23621065879796359813492928874684202132851911079106094602772220310924069905860228775003719491607162132400268594849792689428395980810*i+4977188783586462439004642085710309905429378581030469780727704600365838418233167496175498060343349909149169751117966236536999240810)*x + (2436626578899296862765339488616669206481024383877744658976061086424716662234381520320022587791066725331741399056677054149145804100*i+17201829254786634561427772958650562187345423585602997490203592911553229807369169945536372119424267223861830591177746261898708655874) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23621065879796359813492928874684202132851911079106094602772220310924069905860228775003719491607162132400268594849792689428395980810*i+4977188783586462439004642085710309905429378581030469780727704600365838418233167496175498060343349909149169751117966236536999240810)*x + (2436626578899296862765339488616669206481024383877744658976061086424716662234381520320022587791066725331741399056677054149145804100*i+17201829254786634561427772958650562187345423585602997490203592911553229807369169945536372119424267223861830591177746261898708655874) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20022631628960244548608372569314957349422061759552663626929818385395146834697232772441951579065594581591567000000754466706528033359*i+22560016937219324036581536250397911260274506379064140303833815238679911352446129196958743161878501363153970991802710492103278179979)*x + (6960047677332348402957934788080597692555440168132338876770399260470878032889518527951510470087775021886933705802450145659586315808*i+13266792398422553999156333391255126019035151886046166925765471630703822926027863758240692176201517829492886293448179143944881402690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20022631628960244548608372569314957349422061759552663626929818385395146834697232772441951579065594581591567000000754466706528033359*i+22560016937219324036581536250397911260274506379064140303833815238679911352446129196958743161878501363153970991802710492103278179979)*x + (6960047677332348402957934788080597692555440168132338876770399260470878032889518527951510470087775021886933705802450145659586315808*i+13266792398422553999156333391255126019035151886046166925765471630703822926027863758240692176201517829492886293448179143944881402690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16873707228195479112809517327626018935665429441786791221244313421531141437803940337296830273477947246868379769698786045851183953736*i+18386986783993041824372927623976082659765014673915419537805765058149551386718095550740059708011415370987033322497724656760060822069)*x + (4691845007371708178569604223557343613932751762720304728169407560460880540595928299258162375461571840421314286418284574615422687347*i+21896204707601704364057884259628437882401288448659145765948431276935202069197939107370929109282223237348939076781265901515477648736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16873707228195479112809517327626018935665429441786791221244313421531141437803940337296830273477947246868379769698786045851183953736*i+18386986783993041824372927623976082659765014673915419537805765058149551386718095550740059708011415370987033322497724656760060822069)*x + (4691845007371708178569604223557343613932751762720304728169407560460880540595928299258162375461571840421314286418284574615422687347*i+21896204707601704364057884259628437882401288448659145765948431276935202069197939107370929109282223237348939076781265901515477648736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24209849902216227381595088021137262280296357799112004634311885174134654354935203395630756055177323844568952657687610062026999567443*i+9704553755295288207064836681141067926764601345704317577973644806316352420855627104467794269051235462799065562375814044305966777277)*x + (7769811222008416980705369887060778952624380979946435619774649065896098876884115108712103048348918038365555880852916423046534059829*i+4270761512261064109880627220089223729210323543626927298864064484516509548369096697008706001514464907670660501268315822570459780691) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24209849902216227381595088021137262280296357799112004634311885174134654354935203395630756055177323844568952657687610062026999567443*i+9704553755295288207064836681141067926764601345704317577973644806316352420855627104467794269051235462799065562375814044305966777277)*x + (7769811222008416980705369887060778952624380979946435619774649065896098876884115108712103048348918038365555880852916423046534059829*i+4270761512261064109880627220089223729210323543626927298864064484516509548369096697008706001514464907670660501268315822570459780691) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7736338972467034237040634039658187648074991206260592735063005719460878776087663492206232383651400511247840820283324020061484364574*i+1647110269821234720062600050461113337900134955075330124979696791688134458155657299590638777383137565467338654930637587547465638663)*x + (4316930154704629441362800848371074528228854156374959992923292210047349600448023964323438228358849296186574049075113728587756095072*i+24276522411813889500790461947266507660834344185715499366800038077092128120653764676486991199815769160474977733322453336998419897073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7736338972467034237040634039658187648074991206260592735063005719460878776087663492206232383651400511247840820283324020061484364574*i+1647110269821234720062600050461113337900134955075330124979696791688134458155657299590638777383137565467338654930637587547465638663)*x + (4316930154704629441362800848371074528228854156374959992923292210047349600448023964323438228358849296186574049075113728587756095072*i+24276522411813889500790461947266507660834344185715499366800038077092128120653764676486991199815769160474977733322453336998419897073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15097512242319140199873218634008933007963431229065786305635989420314681674167922932173039969669860221742940037865394889730966486467*i+3357676397027729333621540862986671974568821652701707872125652836759863965923223058318446727396550339586726744847820585804479872576)*x + (7519960355216652998485927684163259135366398490016766076660876207157494849665682721392993914634605839925661065901244678373164493042*i+23786349741251652613038357264356939410754892651686534249576969087707253870644762257989899118948120306758505678520828006013659288875) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15097512242319140199873218634008933007963431229065786305635989420314681674167922932173039969669860221742940037865394889730966486467*i+3357676397027729333621540862986671974568821652701707872125652836759863965923223058318446727396550339586726744847820585804479872576)*x + (7519960355216652998485927684163259135366398490016766076660876207157494849665682721392993914634605839925661065901244678373164493042*i+23786349741251652613038357264356939410754892651686534249576969087707253870644762257989899118948120306758505678520828006013659288875) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11293668417084715925486746816311488036958184685679472885237981360011687956115399200405021028856481792885308921595573608665888050475*i+17338822729407812680927055262516856102314947128230804627579276838169017366849495957385778376646585088696670101082711200968631031529)*x + (7304526347466539672746765124862412517609240514872749477078004245086644604490333153904363434077658537364382070719093968297353860492*i+12267245172152534873652665778172850501885763182361518557637299509491193833113826358205817933918440345677298616212424437674070151641) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11293668417084715925486746816311488036958184685679472885237981360011687956115399200405021028856481792885308921595573608665888050475*i+17338822729407812680927055262516856102314947128230804627579276838169017366849495957385778376646585088696670101082711200968631031529)*x + (7304526347466539672746765124862412517609240514872749477078004245086644604490333153904363434077658537364382070719093968297353860492*i+12267245172152534873652665778172850501885763182361518557637299509491193833113826358205817933918440345677298616212424437674070151641) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1084252367162568068938881214018209618848843251256143095543230270505053379583616677288452342715156209097973252563498843944292289904*i+8067151491325424898563721771163047006457481357983033064318393287413900385263637848775016877435033749150226444381872044097213719358)*x + (20172899025670841719705114083914106239090629051329909297309405719733872826746990059471751294974432898562472359788774646400772745290*i+20816291225680570362467619202632449015993587223557340054326179430781283125325104765190819023457098241270055732426409214498098394353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1084252367162568068938881214018209618848843251256143095543230270505053379583616677288452342715156209097973252563498843944292289904*i+8067151491325424898563721771163047006457481357983033064318393287413900385263637848775016877435033749150226444381872044097213719358)*x + (20172899025670841719705114083914106239090629051329909297309405719733872826746990059471751294974432898562472359788774646400772745290*i+20816291225680570362467619202632449015993587223557340054326179430781283125325104765190819023457098241270055732426409214498098394353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22262288083161888933573102140921364197517322213689275584298208784070378311149370790801585909311452529181077023661580077599893638092*i+14189338535085507531318604387930492293777240800668075116783832738782007386347831079875744491966681005576364788821529068519681309232)*x + (19588449347852134076897724008178079675781409959782519435827664152994984323334503540191876745467806878299528581865043934598128212643*i+14056885453896736163385340535163228677997320198331579225274292413579556709398397146362582724572034120256274051530466587443402190892) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22262288083161888933573102140921364197517322213689275584298208784070378311149370790801585909311452529181077023661580077599893638092*i+14189338535085507531318604387930492293777240800668075116783832738782007386347831079875744491966681005576364788821529068519681309232)*x + (19588449347852134076897724008178079675781409959782519435827664152994984323334503540191876745467806878299528581865043934598128212643*i+14056885453896736163385340535163228677997320198331579225274292413579556709398397146362582724572034120256274051530466587443402190892) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15424852173812654102803877960943771560897947919777800911761554349567535123592435220905254928640797798383480008212561347600822119864*i+12513465825134034852448259226897382917606343964377114155934735241079824616933080735677011889966293906120178089216495035252877779137)*x + (14929758613091925678016894537056068159534304584109120754386638643332140809348465844887809084072156061083552838436990818419438841614*i+6600101680262219410924184897086596886371103722350120577292170018627384144405953922050981496290757605877944412939010285591828736580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15424852173812654102803877960943771560897947919777800911761554349567535123592435220905254928640797798383480008212561347600822119864*i+12513465825134034852448259226897382917606343964377114155934735241079824616933080735677011889966293906120178089216495035252877779137)*x + (14929758613091925678016894537056068159534304584109120754386638643332140809348465844887809084072156061083552838436990818419438841614*i+6600101680262219410924184897086596886371103722350120577292170018627384144405953922050981496290757605877944412939010285591828736580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23438114520078837198270953575280876778920497751576481053714983987316782956775957886458677379613421236449754641533995119755023857711*i+16238764521200647722162205035599876928670468433318432335656646562454076726184886867150216797593348866193182272388597208924223857498)*x + (19761046917603719627499435772465210103802508480593504990419874652950943710960755134000290732382229522079961598720749951517258256645*i+10538964542811277941361963022025613145139855758505416376407008106466650015939418799860875902559934987773914704238566912483416101759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23438114520078837198270953575280876778920497751576481053714983987316782956775957886458677379613421236449754641533995119755023857711*i+16238764521200647722162205035599876928670468433318432335656646562454076726184886867150216797593348866193182272388597208924223857498)*x + (19761046917603719627499435772465210103802508480593504990419874652950943710960755134000290732382229522079961598720749951517258256645*i+10538964542811277941361963022025613145139855758505416376407008106466650015939418799860875902559934987773914704238566912483416101759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20389540706385999553587152199847315196361096696460721821476520448284493899701327339742459652786036983187925460740970880388745052652*i+1736453223097589543019380321977304431095677704285310579105692627164835647207153227110271826129552179376174846865281566424077266103)*x + (23126053183822302448440966888285621852753246934186728485260777660905105156941442205098945554510202825752163023782888306790907745796*i+13956635677683613132658695182029893781562529849050744485405062350742117924751704213681964265755829439592362662510142480156398443257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20389540706385999553587152199847315196361096696460721821476520448284493899701327339742459652786036983187925460740970880388745052652*i+1736453223097589543019380321977304431095677704285310579105692627164835647207153227110271826129552179376174846865281566424077266103)*x + (23126053183822302448440966888285621852753246934186728485260777660905105156941442205098945554510202825752163023782888306790907745796*i+13956635677683613132658695182029893781562529849050744485405062350742117924751704213681964265755829439592362662510142480156398443257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6927157329750057066163682842052735813409112905786630457184488391846983922279979995515453073256904182751821745268118044323504451358*i+18593274131738107677492296853052675342865923301966323928686356041515995984556552039608177285777547618954956112759870548616749212277)*x + (3309867660750034285431843618124551699248434481354144358700908640583043512475716164963601950190331165402794690493780435292810730002*i+715866873479325268566121632517546501065444858878826601189023304875871215605864389170817203315743546512074597423055750196742671760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6927157329750057066163682842052735813409112905786630457184488391846983922279979995515453073256904182751821745268118044323504451358*i+18593274131738107677492296853052675342865923301966323928686356041515995984556552039608177285777547618954956112759870548616749212277)*x + (3309867660750034285431843618124551699248434481354144358700908640583043512475716164963601950190331165402794690493780435292810730002*i+715866873479325268566121632517546501065444858878826601189023304875871215605864389170817203315743546512074597423055750196742671760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8746468320928269379255988578418105240223123934616247637438860929103803966169562030931435532289244573102363205871824243183020052470*i+4557171146766917605044470599131859415568118386832808082708000388040253128146124060113143950224320336221859560096261719746232974109)*x + (11169532684358356228862192215494140280286472974683322027432906350467762067192267528531164983997888072778342287027260870411826819199*i+22290765581482653193561662679193524122376749441373317659612409230535982401388331452530253170422042786814428894006222963619938817114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8746468320928269379255988578418105240223123934616247637438860929103803966169562030931435532289244573102363205871824243183020052470*i+4557171146766917605044470599131859415568118386832808082708000388040253128146124060113143950224320336221859560096261719746232974109)*x + (11169532684358356228862192215494140280286472974683322027432906350467762067192267528531164983997888072778342287027260870411826819199*i+22290765581482653193561662679193524122376749441373317659612409230535982401388331452530253170422042786814428894006222963619938817114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (397647674615091665937984739354236302879479840678676651559773548272219502402842269857344408039348473532529797729669611190594815299*i+3040109409827208297688022752114433221772326137565097497541665311903767296795290114035033419891018580334019068112340323345770146968)*x + (12948060657721009336156301589268515084892410955825903750871856945508112009763956306218076833030228924889301703561003912028231524816*i+24348040772820618019581661243233524133503684936357908420673177701599752793250570957592814576002537569803237567226721024945417753703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (397647674615091665937984739354236302879479840678676651559773548272219502402842269857344408039348473532529797729669611190594815299*i+3040109409827208297688022752114433221772326137565097497541665311903767296795290114035033419891018580334019068112340323345770146968)*x + (12948060657721009336156301589268515084892410955825903750871856945508112009763956306218076833030228924889301703561003912028231524816*i+24348040772820618019581661243233524133503684936357908420673177701599752793250570957592814576002537569803237567226721024945417753703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15675167999857924329837018573820970790997008854998638969332061420178654004352013158815206160766880776289556060177427115393632872*i+14401503980227126145781397713412659222634501965739649085493692285242544718413141628350348814141257587927543640161111112487580835767)*x + (17296292648082890797539713329671552804703222581991602572578119303143777770413946392698558253802537824936675287730273006395485329642*i+18244685150212717236399647208307929248881143832032412969310701999883953460658845808473155952453080641804435368789672829486403331290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15675167999857924329837018573820970790997008854998638969332061420178654004352013158815206160766880776289556060177427115393632872*i+14401503980227126145781397713412659222634501965739649085493692285242544718413141628350348814141257587927543640161111112487580835767)*x + (17296292648082890797539713329671552804703222581991602572578119303143777770413946392698558253802537824936675287730273006395485329642*i+18244685150212717236399647208307929248881143832032412969310701999883953460658845808473155952453080641804435368789672829486403331290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8124599287717134519343218955232915381592817134616032348004673843013903663768255014390486504615406057184455544763569747813397283157*i+14956549343783604038996397096764838477382020146477163265663477925310374324785762182470782155921522535988120018059475338413603770862)*x + (17111047225010380549334271027307606707546465882982538352888881156994833789104607797972898365237424802487820589954302411795364884307*i+5980428582982877710514356089886904887054388105785923376340219931221652699952714730132003387532482357532373823179870016476936597943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8124599287717134519343218955232915381592817134616032348004673843013903663768255014390486504615406057184455544763569747813397283157*i+14956549343783604038996397096764838477382020146477163265663477925310374324785762182470782155921522535988120018059475338413603770862)*x + (17111047225010380549334271027307606707546465882982538352888881156994833789104607797972898365237424802487820589954302411795364884307*i+5980428582982877710514356089886904887054388105785923376340219931221652699952714730132003387532482357532373823179870016476936597943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17461899498532819855719580305524195237947386356133477711502732969507430607923512229314308390173085037799332217983420361313819536519*i+17264061966628778167314488486053571420932292819895187769921567031595720913980105018204313364237593813618245323320020283426937997421)*x + (15391207452693643115721221024968738072714111566635560918611942166233318293157630228293270245011681484756286079770854737901507319604*i+6649186453026863938399984364659063294648397710729990177934953223609736157812067769897569951532998522035426167139209226154361959205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17461899498532819855719580305524195237947386356133477711502732969507430607923512229314308390173085037799332217983420361313819536519*i+17264061966628778167314488486053571420932292819895187769921567031595720913980105018204313364237593813618245323320020283426937997421)*x + (15391207452693643115721221024968738072714111566635560918611942166233318293157630228293270245011681484756286079770854737901507319604*i+6649186453026863938399984364659063294648397710729990177934953223609736157812067769897569951532998522035426167139209226154361959205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22094786406806207697936442923817895073659510000517384511097097361211180757191653774031311606550331339131109563409424728067733166158*i+17649298092770578063257392374733288258999325499985534974579227446163684928913292534192901102204373289502870021485593211315369559104)*x + (5204900442306156534718084129055614569949929923677118899265468989027429126627867165167670477898750386716645044288795561953311312726*i+1156796133878086840860037652146139643408829960732273887147643955352561753928351436751965078432406848421143909557551865457110788153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22094786406806207697936442923817895073659510000517384511097097361211180757191653774031311606550331339131109563409424728067733166158*i+17649298092770578063257392374733288258999325499985534974579227446163684928913292534192901102204373289502870021485593211315369559104)*x + (5204900442306156534718084129055614569949929923677118899265468989027429126627867165167670477898750386716645044288795561953311312726*i+1156796133878086840860037652146139643408829960732273887147643955352561753928351436751965078432406848421143909557551865457110788153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12279589453182858721830032211761417454993694251048851031428794983966259999371705774102665154069407556395130332188424955427006776237*i+3173485406203251768969309712073092449970279515470821776225428343372955838593578076364257362928354603054700510646342869638168115253)*x + (4151145804710156859178568362888380866597059876769357333111680378531868042792123845748967978475810330600120729006916129507531592117*i+18859312877256893532222102928928590434993670699238198269621215992851283876470695604483431698427558683943891636809625012736594425625) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12279589453182858721830032211761417454993694251048851031428794983966259999371705774102665154069407556395130332188424955427006776237*i+3173485406203251768969309712073092449970279515470821776225428343372955838593578076364257362928354603054700510646342869638168115253)*x + (4151145804710156859178568362888380866597059876769357333111680378531868042792123845748967978475810330600120729006916129507531592117*i+18859312877256893532222102928928590434993670699238198269621215992851283876470695604483431698427558683943891636809625012736594425625) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9137963482760232592173333120069116882390392510670956675117078915273845427967903242579582874591749774762361540661803984763278636903*i+16671019277119912058840826307001297789909919461866314701508516180565924872903851452898479870649658903108509745434586791138888982117)*x + (10648755771787445577045956080928634848589204730989577744897230439995863841101566207637774064322307938999855124989272227425968210087*i+10997718630315718696792040889808517948950117459943244386023500260746017683899523066401064990372069374048282842519093169163651821707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9137963482760232592173333120069116882390392510670956675117078915273845427967903242579582874591749774762361540661803984763278636903*i+16671019277119912058840826307001297789909919461866314701508516180565924872903851452898479870649658903108509745434586791138888982117)*x + (10648755771787445577045956080928634848589204730989577744897230439995863841101566207637774064322307938999855124989272227425968210087*i+10997718630315718696792040889808517948950117459943244386023500260746017683899523066401064990372069374048282842519093169163651821707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13171277610659664734637613433951781853140285520738625125665506107140783163384605538381331243808568846961890949868910224697157898635*i+6340225575984320488021281493687630405091590735465966837816245062461561684068066156161881234416152503951347527956667745935265711811)*x + (18505400272586662022593380033428848668875242407736778622306967417664243368829937295298929594864939569993526316077947687377371366950*i+20335648376242759708128547066371540006374536203663200383382333342363220861894650399143716190980893560584041703945975010649982298379) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13171277610659664734637613433951781853140285520738625125665506107140783163384605538381331243808568846961890949868910224697157898635*i+6340225575984320488021281493687630405091590735465966837816245062461561684068066156161881234416152503951347527956667745935265711811)*x + (18505400272586662022593380033428848668875242407736778622306967417664243368829937295298929594864939569993526316077947687377371366950*i+20335648376242759708128547066371540006374536203663200383382333342363220861894650399143716190980893560584041703945975010649982298379) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7301398890632584530375260700727812213567368151334004931232896589036380270272486200961955348579671803604843387468731817863288536205*i+5575549083844593883290007064711050822743272054247643662609538461256843530701290353287407423556919319775676330877720415357998941795)*x + (5473118482650633691791880206743322451707638146971625645804971073941731141679428025553735480131172612470570659088636684725762978531*i+3027008503678155279042605956266028887079692487075988831902400674304310079481843648549855515684738945409316548326895871755406380911) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7301398890632584530375260700727812213567368151334004931232896589036380270272486200961955348579671803604843387468731817863288536205*i+5575549083844593883290007064711050822743272054247643662609538461256843530701290353287407423556919319775676330877720415357998941795)*x + (5473118482650633691791880206743322451707638146971625645804971073941731141679428025553735480131172612470570659088636684725762978531*i+3027008503678155279042605956266028887079692487075988831902400674304310079481843648549855515684738945409316548326895871755406380911) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13982485738010698632262111272358233824765907754340968739881889665344964816346622458878601003188941727985394542953743358261914556578*i+1568987099022340794180499255289325856593929154293392225320873470838595669084284826109368976357668241091243876587525294784643692291)*x + (4958181268973773467853957485431076288283918996183487315965020437270783834518695796114580539996851778083588442026876949563208298708*i+3867581748961302456278895654407838557045728634108772943421893121166630700152698301742482825600063821749133912571958959020172201147) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13982485738010698632262111272358233824765907754340968739881889665344964816346622458878601003188941727985394542953743358261914556578*i+1568987099022340794180499255289325856593929154293392225320873470838595669084284826109368976357668241091243876587525294784643692291)*x + (4958181268973773467853957485431076288283918996183487315965020437270783834518695796114580539996851778083588442026876949563208298708*i+3867581748961302456278895654407838557045728634108772943421893121166630700152698301742482825600063821749133912571958959020172201147) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15495139650402644005146590863703649270577724022369966960652516390525578823776362752855477695117944719060110399230928168573069834149*i+5433951311098184094121791219614880116267716233218987525847704876862113357038956321611466839919400832628081484087548130637963547523)*x + (13730507582968021797698245278530294473177646481177412576388636196834792468274609963916282359428155947627959421293118991715183500275*i+17056523078612604243751882433669503834853455232957538651120070978124606400753420508750606822509037305745938827144127409823259870296) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15495139650402644005146590863703649270577724022369966960652516390525578823776362752855477695117944719060110399230928168573069834149*i+5433951311098184094121791219614880116267716233218987525847704876862113357038956321611466839919400832628081484087548130637963547523)*x + (13730507582968021797698245278530294473177646481177412576388636196834792468274609963916282359428155947627959421293118991715183500275*i+17056523078612604243751882433669503834853455232957538651120070978124606400753420508750606822509037305745938827144127409823259870296) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18252630156434936470043789667225000618959795637488692185147635753397812440269218384529465035602944868583360228828776720512115622005*i+20778226081746595532495497381413624035363278684553054162408304807575485555677090884163057599248798380024965664919391941167173102420)*x + (16883577906194210367699422847530033394830303480793565572437054380540416986164694566992719583646805409176918882341895680255972353015*i+16854341462076890319910251196786313047226419982115247302747559760055373854275792649083422313973731220340876993963650975869759221491) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18252630156434936470043789667225000618959795637488692185147635753397812440269218384529465035602944868583360228828776720512115622005*i+20778226081746595532495497381413624035363278684553054162408304807575485555677090884163057599248798380024965664919391941167173102420)*x + (16883577906194210367699422847530033394830303480793565572437054380540416986164694566992719583646805409176918882341895680255972353015*i+16854341462076890319910251196786313047226419982115247302747559760055373854275792649083422313973731220340876993963650975869759221491) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14158240347076990875840646700602476216271155322420098960336430034852992763725388450830758451048963310647676329963162462545346347241*i+15859614777165835769580396301685989219196317694855061596299852564397002101562639749855148739955016627708464806227385633369553196361)*x + (10445510566997756655440612700893189073208200007961746754362484670880280506748646137913742362651296053228290271319522080879744127078*i+22025596607695762870435063458267617059560439910693112644628284809574041405901111233502271150024552056337545689460240690394949869879) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14158240347076990875840646700602476216271155322420098960336430034852992763725388450830758451048963310647676329963162462545346347241*i+15859614777165835769580396301685989219196317694855061596299852564397002101562639749855148739955016627708464806227385633369553196361)*x + (10445510566997756655440612700893189073208200007961746754362484670880280506748646137913742362651296053228290271319522080879744127078*i+22025596607695762870435063458267617059560439910693112644628284809574041405901111233502271150024552056337545689460240690394949869879) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7810168836874833229990674595242184973790226585502328879258518902629729076900177356102074134712100176960422684659415685440840944196*i+12490859567071842977006989087747730651615918353051333249459501626695599540607509567950903837782620133973177522468002874146957883202)*x + (9611569826240612241502909525861132012219470930804730244818285957059457777825897184871718068967678518543292753466456514020269253250*i+19374789519742697507301166328701054315616796673353228710730265834255312926651934358002696239160689618427989186464370952055077262371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7810168836874833229990674595242184973790226585502328879258518902629729076900177356102074134712100176960422684659415685440840944196*i+12490859567071842977006989087747730651615918353051333249459501626695599540607509567950903837782620133973177522468002874146957883202)*x + (9611569826240612241502909525861132012219470930804730244818285957059457777825897184871718068967678518543292753466456514020269253250*i+19374789519742697507301166328701054315616796673353228710730265834255312926651934358002696239160689618427989186464370952055077262371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5053872610215980267657675199541481619757853367324597085821079815950560780937812929767817157115482238874540751392555423429636670812*i+22241121219905561312766700837110014427671644393940312220873737543623945193549165485850563402712928427973863227082378854540518096429)*x + (3849791935288244189331085671774741491735779274870805361956796820891757674890937507285278196091266062913634534956716897959218847175*i+14445297066360607514681848502778330925207424210094538400196873704199105157347885908064242484519251942751391249683561436120905241657) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5053872610215980267657675199541481619757853367324597085821079815950560780937812929767817157115482238874540751392555423429636670812*i+22241121219905561312766700837110014427671644393940312220873737543623945193549165485850563402712928427973863227082378854540518096429)*x + (3849791935288244189331085671774741491735779274870805361956796820891757674890937507285278196091266062913634534956716897959218847175*i+14445297066360607514681848502778330925207424210094538400196873704199105157347885908064242484519251942751391249683561436120905241657) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17803682135746899225030576904985900495517451884232605754120593167420673437241633624126560675567510564201389740820327101915628583484*i+20642458316381271354164652127155499908466159426485631402531264331257626992223833169749975477685062231722328516424185831996777391889)*x + (22010073818737006950761341057744890467608663950027970872340846520927389744156229063185367208961810910789472914070815683742148074069*i+3454758878753752816775057807984115812492682945758440273612922262979805908890566202418132861698661299252611503812601286229297961661) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17803682135746899225030576904985900495517451884232605754120593167420673437241633624126560675567510564201389740820327101915628583484*i+20642458316381271354164652127155499908466159426485631402531264331257626992223833169749975477685062231722328516424185831996777391889)*x + (22010073818737006950761341057744890467608663950027970872340846520927389744156229063185367208961810910789472914070815683742148074069*i+3454758878753752816775057807984115812492682945758440273612922262979805908890566202418132861698661299252611503812601286229297961661) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11003514249247943523343166006351462292361186547207822448806040760987400222197359434663498869242522594569639748716445334863030646307*i+3320330499551356401741811628017968865242999785004324584875776293164213280498825587639081324956552814865075000644909952909535851524)*x + (19445038226335211726503334519254835449141767877803615117722488957320068948090938023045899135904638177556292822475049150967373459810*i+15900076292540835777818672210581988470092843497627269257370010718673626462413452094706494474016324219434027889558783681339648588877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11003514249247943523343166006351462292361186547207822448806040760987400222197359434663498869242522594569639748716445334863030646307*i+3320330499551356401741811628017968865242999785004324584875776293164213280498825587639081324956552814865075000644909952909535851524)*x + (19445038226335211726503334519254835449141767877803615117722488957320068948090938023045899135904638177556292822475049150967373459810*i+15900076292540835777818672210581988470092843497627269257370010718673626462413452094706494474016324219434027889558783681339648588877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19968030929147236878731997264763526911287711200496198547083116020044583309322219586296968743832548411723663681747901236677297703824*i+21795084092139730567688082987250942934181233754277940290594275390623301212304551815360353147638849089563412021652241114461199258419)*x + (20961232359115132672567314254548415327028549448681483984169529316330037425312694280501116102229447081115051244578861022740185091321*i+23284820256635340097878752018728707027894931905775661439457745770583123893914088101406480376788347325625896260068415831133196263640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19968030929147236878731997264763526911287711200496198547083116020044583309322219586296968743832548411723663681747901236677297703824*i+21795084092139730567688082987250942934181233754277940290594275390623301212304551815360353147638849089563412021652241114461199258419)*x + (20961232359115132672567314254548415327028549448681483984169529316330037425312694280501116102229447081115051244578861022740185091321*i+23284820256635340097878752018728707027894931905775661439457745770583123893914088101406480376788347325625896260068415831133196263640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11606003110752390732426737245906924839268892023688917456206983111177566070672956876062640597192937795186298003901245754490468476653*i+13376308710620277348185770623042391420445563074838706094609660744157840059442640818600456349593808281035185372695648391482397764963)*x + (18698847758671110439595792077132529812605226404381304184795030524607244913316756031542866805229126621377261294389176878892676036600*i+11536247955787006386774169081584854132932452517910376098577176429485206698450667563232143054540980812842725154614623714197956350037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11606003110752390732426737245906924839268892023688917456206983111177566070672956876062640597192937795186298003901245754490468476653*i+13376308710620277348185770623042391420445563074838706094609660744157840059442640818600456349593808281035185372695648391482397764963)*x + (18698847758671110439595792077132529812605226404381304184795030524607244913316756031542866805229126621377261294389176878892676036600*i+11536247955787006386774169081584854132932452517910376098577176429485206698450667563232143054540980812842725154614623714197956350037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23139383265073502620058760961639726855530448900733691639467325214223649363553851689079741634069744816308072128837696497358309358505*i+1998994059958067833442094465759840977698740226764796927601401032895894721586531542736670881200673744975232147713996945913943198559)*x + (6931219737468634263827680977949142416299550841398540173600830058930632117445510384891778461195312546104907829022295351015788182953*i+5285246181363384557494137940051990618392900745961453373578926317153083911013352119255522587637397783690943899368487551612564132475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23139383265073502620058760961639726855530448900733691639467325214223649363553851689079741634069744816308072128837696497358309358505*i+1998994059958067833442094465759840977698740226764796927601401032895894721586531542736670881200673744975232147713996945913943198559)*x + (6931219737468634263827680977949142416299550841398540173600830058930632117445510384891778461195312546104907829022295351015788182953*i+5285246181363384557494137940051990618392900745961453373578926317153083911013352119255522587637397783690943899368487551612564132475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (530741941900535159024414448490939940077981399080834793938390398642259077848627405189260433208991262446901833548587816882333147628*i+541410653017660998656565326737589831016145729785692100186157991783608038134237143133333835187457748718412266633011053076558588889)*x + (7036534240508486628369186387895853821848348014135584158562734961924191346390528797348296814846438547488438252450326329263872820791*i+17826503798717439020160635034293348452078493953537441110909058010444189507145338068090216516206909648490463355743000167325218617920) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (530741941900535159024414448490939940077981399080834793938390398642259077848627405189260433208991262446901833548587816882333147628*i+541410653017660998656565326737589831016145729785692100186157991783608038134237143133333835187457748718412266633011053076558588889)*x + (7036534240508486628369186387895853821848348014135584158562734961924191346390528797348296814846438547488438252450326329263872820791*i+17826503798717439020160635034293348452078493953537441110909058010444189507145338068090216516206909648490463355743000167325218617920) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15463271183367973820442687111828518194660192251025064678082467483204995399465942323426173324556638873036729924451241682148479194131*i+4472560043757192157643749528530892501365970246204521555372934170030385677392758530190536999383794244103426177884829611742008884347)*x + (3258476909002647797966192401138548408284714598696054367270177821219997130032078261186437280618289925252210874714712946882151853185*i+12776752450327098576731936281831089697647801606476960174666923693373552757405394789966891146920698293675346416527273603310618182292) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15463271183367973820442687111828518194660192251025064678082467483204995399465942323426173324556638873036729924451241682148479194131*i+4472560043757192157643749528530892501365970246204521555372934170030385677392758530190536999383794244103426177884829611742008884347)*x + (3258476909002647797966192401138548408284714598696054367270177821219997130032078261186437280618289925252210874714712946882151853185*i+12776752450327098576731936281831089697647801606476960174666923693373552757405394789966891146920698293675346416527273603310618182292) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15842942960229481858906029718774404987223525542270945274709154897828562404359871348893482011225876293304872671106274854788783035194*i+8536546701252815989800439703905539887227502616009554911379629518382846002096221298873902594392657422853856467091083832902559208153)*x + (15377882733447655653064857754181978312231103915852268500410031123925822690088642550831953988482936954125384639379526801472018441485*i+19436360950191412605358325924854079491114566557033403249186686906771825126403261048219531561961320072040840694931147192525486751025) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15842942960229481858906029718774404987223525542270945274709154897828562404359871348893482011225876293304872671106274854788783035194*i+8536546701252815989800439703905539887227502616009554911379629518382846002096221298873902594392657422853856467091083832902559208153)*x + (15377882733447655653064857754181978312231103915852268500410031123925822690088642550831953988482936954125384639379526801472018441485*i+19436360950191412605358325924854079491114566557033403249186686906771825126403261048219531561961320072040840694931147192525486751025) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9141814094404944013718734827240953507925157684278504579361410965252900508824374511196082654393466233321753845182649094101995970313*i+7354865311117747687348722443395455259564681311490432477419272102196581798779219917470890122867500274788739012285589465269069432014)*x + (19016495704057063323820890375805766161585989664792420570822682253807140049867130061196728264505680857607439665414787460219755140334*i+4431167600213125070634017892060524530342502885218312614715411322506140822332922022827018566515484699739640906075080678653625709334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9141814094404944013718734827240953507925157684278504579361410965252900508824374511196082654393466233321753845182649094101995970313*i+7354865311117747687348722443395455259564681311490432477419272102196581798779219917470890122867500274788739012285589465269069432014)*x + (19016495704057063323820890375805766161585989664792420570822682253807140049867130061196728264505680857607439665414787460219755140334*i+4431167600213125070634017892060524530342502885218312614715411322506140822332922022827018566515484699739640906075080678653625709334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (838825690207596551024665235572330455766126258613161941978990859542972884650552286991048772618465274246250530396259767355427320224*i+7569353134141717916341448944894341948124639820792072513905870984002787436906925451519635384608565531923974355220977962849930211150)*x + (17089849089615443151648561471704211906664322854202623743303112309497686858263965601681964715773965623903327344432432599926622751765*i+18327679181142014255701250886870268283802015282918955104739515809168956508840076046402268342152952538554847913699332089214293971815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (838825690207596551024665235572330455766126258613161941978990859542972884650552286991048772618465274246250530396259767355427320224*i+7569353134141717916341448944894341948124639820792072513905870984002787436906925451519635384608565531923974355220977962849930211150)*x + (17089849089615443151648561471704211906664322854202623743303112309497686858263965601681964715773965623903327344432432599926622751765*i+18327679181142014255701250886870268283802015282918955104739515809168956508840076046402268342152952538554847913699332089214293971815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4682213313711390713937769506222601886711792555414167188487162046351935717853886755074485067510161082839643927383008318831645401434*i+11263466993659632504261327089839379445270260551454517407887468459385716366282420374325486612436387847952044736973720553503459677043)*x + (585854147073134443056165569365157858852764240957064657565860028014810139645419325472085873092783741123415921280255659511658822269*i+18641879103754888484281543002118079413183415910435838592076336836956644565809098019780661183356069067383966469365076781871578417871) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4682213313711390713937769506222601886711792555414167188487162046351935717853886755074485067510161082839643927383008318831645401434*i+11263466993659632504261327089839379445270260551454517407887468459385716366282420374325486612436387847952044736973720553503459677043)*x + (585854147073134443056165569365157858852764240957064657565860028014810139645419325472085873092783741123415921280255659511658822269*i+18641879103754888484281543002118079413183415910435838592076336836956644565809098019780661183356069067383966469365076781871578417871) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14531241992509682654104449592788207882545057352322821018423461358284840600579230801840582642157118173900942842548654154864929201608*i+12610455027851245829673495238498454152354691740649453753925415725542431414384751281066113371053542586533037822398421219072789761049)*x + (15029738836358765958561152387452190253772798729235168213682920253047665176403289630973861309498815178050740948186273718229797995655*i+18389595120038947546977330409515331497823667306072118159945733108383745852215775704040484229235537685198963468003931557252760340724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14531241992509682654104449592788207882545057352322821018423461358284840600579230801840582642157118173900942842548654154864929201608*i+12610455027851245829673495238498454152354691740649453753925415725542431414384751281066113371053542586533037822398421219072789761049)*x + (15029738836358765958561152387452190253772798729235168213682920253047665176403289630973861309498815178050740948186273718229797995655*i+18389595120038947546977330409515331497823667306072118159945733108383745852215775704040484229235537685198963468003931557252760340724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11204136599295367169085284458889847372884435499735879786783032574480391704757116276875490357951031850213970797024754770448301505767*i+17484886658189012733041637554181824311910823881291016277194178337172618792939891699973414637548138766012747721871459780233229551519)*x + (18392683194538286453239232161189532702444416605583376203819642663572607146454216363854522802754178679915311854849465629155699691174*i+19623164246940381164119165394944625254729828129234901088674677515352298165219321311761495672656748793414073162826595201087708750870) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11204136599295367169085284458889847372884435499735879786783032574480391704757116276875490357951031850213970797024754770448301505767*i+17484886658189012733041637554181824311910823881291016277194178337172618792939891699973414637548138766012747721871459780233229551519)*x + (18392683194538286453239232161189532702444416605583376203819642663572607146454216363854522802754178679915311854849465629155699691174*i+19623164246940381164119165394944625254729828129234901088674677515352298165219321311761495672656748793414073162826595201087708750870) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12006768903743758201443589111158331999093801866455885526759516914151493944042948435932981931065688904689951207939920511385236727559*i+8054418542087638525097217369582328858126719518267185411429391512097522872716480366195936727384645737501524628468276575213906985320)*x + (23278331944519573145468560577253194985518294381249948882993041915109121608688866774549516490967226611428201971746192176696981783320*i+22952206749171929492849065620877549199516360393219089446812131329202722182961523718859518071208559738062627529164268546934434616369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12006768903743758201443589111158331999093801866455885526759516914151493944042948435932981931065688904689951207939920511385236727559*i+8054418542087638525097217369582328858126719518267185411429391512097522872716480366195936727384645737501524628468276575213906985320)*x + (23278331944519573145468560577253194985518294381249948882993041915109121608688866774549516490967226611428201971746192176696981783320*i+22952206749171929492849065620877549199516360393219089446812131329202722182961523718859518071208559738062627529164268546934434616369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5414859231149604503023876520436146479524848255875650014394482083936497758498047045622064166389752006576864711802301477378129105559*i+14119333733738323364797773848452775105613980466961833129302119479748775614660160836152509125722776105088796204974932638941846168890)*x + (15617743770689472413020700001327290971972094380911444903133711090443220658977427174836614809046008055912760303979180822236184124221*i+14817540452662398850026531725416860840878896795645290812086498977747388263895254009629515384211754639988613699737376805343035036003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5414859231149604503023876520436146479524848255875650014394482083936497758498047045622064166389752006576864711802301477378129105559*i+14119333733738323364797773848452775105613980466961833129302119479748775614660160836152509125722776105088796204974932638941846168890)*x + (15617743770689472413020700001327290971972094380911444903133711090443220658977427174836614809046008055912760303979180822236184124221*i+14817540452662398850026531725416860840878896795645290812086498977747388263895254009629515384211754639988613699737376805343035036003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10111468412349453229885073295949261112374227455877501477484107137147023791277419735353611740054145369200499609616155838425792915467*i+23194188780692963152799653206579561285949339382564361582599171695788147490750379682103262777704565863891801560337776036397818578472)*x + (2224825627050528537985220719418410191348549906173128241071032507489046054898072920564866813963679394488259200555200939501248560630*i+14044477202162510974803565609016663436639180193746557749658538340310721342336297890273582061316399489808143631956767861055737589099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10111468412349453229885073295949261112374227455877501477484107137147023791277419735353611740054145369200499609616155838425792915467*i+23194188780692963152799653206579561285949339382564361582599171695788147490750379682103262777704565863891801560337776036397818578472)*x + (2224825627050528537985220719418410191348549906173128241071032507489046054898072920564866813963679394488259200555200939501248560630*i+14044477202162510974803565609016663436639180193746557749658538340310721342336297890273582061316399489808143631956767861055737589099) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20312248926370330238831835076697414841907150367254766607819902639501449143502918984503726272742156991878368749679006870160530193035*i+1805666771302190249865817444839490057314975919347087345881467622602367035321406586617934238381039470108052461615118689843485038756)*x + (17111602559843615771004442547327883539347128811742795609258927163314668583280014866008794216202343630936652339209312851157149781422*i+5960008402547390652917537612437137325526828639257382182196184036850535164422135156663685158836210376189709654812194140498934434741) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20312248926370330238831835076697414841907150367254766607819902639501449143502918984503726272742156991878368749679006870160530193035*i+1805666771302190249865817444839490057314975919347087345881467622602367035321406586617934238381039470108052461615118689843485038756)*x + (17111602559843615771004442547327883539347128811742795609258927163314668583280014866008794216202343630936652339209312851157149781422*i+5960008402547390652917537612437137325526828639257382182196184036850535164422135156663685158836210376189709654812194140498934434741) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18179326636301114115931024091441408598982143158230529868961833698698904822777606567289486951439283826532298584819789375076931759091*i+21582268089304237907658952195209923781015613975025060199217544798672664123397086797775083940256658088742867293412630207343145253526)*x + (17976796526018589768140805523172622044228964005283254771611515310546874873750327067175701678279074155423442836764247057588909432084*i+3073460405324319014187746146652050062097414315147293296223684290269811046909780550913788456882858769426408908106834381186278237407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18179326636301114115931024091441408598982143158230529868961833698698904822777606567289486951439283826532298584819789375076931759091*i+21582268089304237907658952195209923781015613975025060199217544798672664123397086797775083940256658088742867293412630207343145253526)*x + (17976796526018589768140805523172622044228964005283254771611515310546874873750327067175701678279074155423442836764247057588909432084*i+3073460405324319014187746146652050062097414315147293296223684290269811046909780550913788456882858769426408908106834381186278237407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9784369251165957492170279541478706900775732841454397756330106738864096696223440419045188843536100171135128411042067473380998366908*i+20834166070298236577074068256418341333344014310486685477982096508048467827585055347364494170051891611583140599637525051685143230354)*x + (9415687757021326113869754115994357486673901659098648459374973984218046813977934678932285981333296430444840626352887393402707085306*i+18784484287621989805994791762045278244174544964163363389389718595622393328690605210191229113451316976131432528098447242816169548632) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9784369251165957492170279541478706900775732841454397756330106738864096696223440419045188843536100171135128411042067473380998366908*i+20834166070298236577074068256418341333344014310486685477982096508048467827585055347364494170051891611583140599637525051685143230354)*x + (9415687757021326113869754115994357486673901659098648459374973984218046813977934678932285981333296430444840626352887393402707085306*i+18784484287621989805994791762045278244174544964163363389389718595622393328690605210191229113451316976131432528098447242816169548632) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9375478253519087475413262288038949986066888302013435610453611353956521286281271629491101201078341651841193837132348290695701512811*i+4076431397797035967242030604694414360325336849057632873379432115389536282760780030963799574561362636751231670046574493803061806901)*x + (16372478327363007410403612249799294853428389424809498586217637899594575838166939018548063967356374360743972503753207822926694264673*i+1113520774398625681865538667215274387063518860129826556039910484415947696581468960142786244733141091652902348466682457845067654681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9375478253519087475413262288038949986066888302013435610453611353956521286281271629491101201078341651841193837132348290695701512811*i+4076431397797035967242030604694414360325336849057632873379432115389536282760780030963799574561362636751231670046574493803061806901)*x + (16372478327363007410403612249799294853428389424809498586217637899594575838166939018548063967356374360743972503753207822926694264673*i+1113520774398625681865538667215274387063518860129826556039910484415947696581468960142786244733141091652902348466682457845067654681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20826276051208082200636357722473451432531201587812543076406616166715014995434859171231331398947167081355490060776137452902318942987*i+12033944198962201978451273221616471913409966032778312697590478321522261429153091879840320629463966913310473950998151120558518081258)*x + (12845471601644087510523567964971951669188179846893583496850739355703706219106200652391609246765762791586047155722964140936766542089*i+12441813551390498874711975520333037346666407679364571657848425530239561664241439283076325024435011403571876390081075871314827729308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20826276051208082200636357722473451432531201587812543076406616166715014995434859171231331398947167081355490060776137452902318942987*i+12033944198962201978451273221616471913409966032778312697590478321522261429153091879840320629463966913310473950998151120558518081258)*x + (12845471601644087510523567964971951669188179846893583496850739355703706219106200652391609246765762791586047155722964140936766542089*i+12441813551390498874711975520333037346666407679364571657848425530239561664241439283076325024435011403571876390081075871314827729308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17645185194152412916395916358926861449261209249210655422008583005076994186664572056635602213967469874250314546771949121764096199916*i+5611736332527495778159447835115771962110044450519875825555596225922995743248274702381757218808759294371036838465388673249791834802)*x + (806488999093514258387040433522577539793890983696291969397447958235723795351564674427580167823288844564617165884465655588332715827*i+16148177307917514342198396468233967614507329090776164403257114947917885467175822576288134684602689785930224971450432404031439461375) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17645185194152412916395916358926861449261209249210655422008583005076994186664572056635602213967469874250314546771949121764096199916*i+5611736332527495778159447835115771962110044450519875825555596225922995743248274702381757218808759294371036838465388673249791834802)*x + (806488999093514258387040433522577539793890983696291969397447958235723795351564674427580167823288844564617165884465655588332715827*i+16148177307917514342198396468233967614507329090776164403257114947917885467175822576288134684602689785930224971450432404031439461375) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14408305153702830984036377051781405156762342550275576294362696472278871688399863111577042472879415940473584888348466505161786990993*i+11848771205848211785299733872378424103329242057329226662262767045885412418474033875922056835575749384960713718233137211786512632665)*x + (10007787516735053429692677717605077930019371804864342121145322477415163049171991024849073840220105433483459825942229765083151827038*i+4032773698601909347459891648249812958407827758268887645039575360860711400118132619767003159430658930356297050214444023665347124251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14408305153702830984036377051781405156762342550275576294362696472278871688399863111577042472879415940473584888348466505161786990993*i+11848771205848211785299733872378424103329242057329226662262767045885412418474033875922056835575749384960713718233137211786512632665)*x + (10007787516735053429692677717605077930019371804864342121145322477415163049171991024849073840220105433483459825942229765083151827038*i+4032773698601909347459891648249812958407827758268887645039575360860711400118132619767003159430658930356297050214444023665347124251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6736779945912472745892782645125780845990947891065634424470236475022785542438313502830444454303460518596694657486001817352870941818*i+1219195739847048889824875060983579670281212585237525625097476597434394119901096639465231259655229061945718125819222056934570299110)*x + (1154474706570731672052681237596621012526737815702983573832454739358739528474510155189477276092310283088223113023571394518116052061*i+15080511111888758348301210130709067155032522578830999555677576084580038324622165283135469712730261790214198421220887437686639830936) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6736779945912472745892782645125780845990947891065634424470236475022785542438313502830444454303460518596694657486001817352870941818*i+1219195739847048889824875060983579670281212585237525625097476597434394119901096639465231259655229061945718125819222056934570299110)*x + (1154474706570731672052681237596621012526737815702983573832454739358739528474510155189477276092310283088223113023571394518116052061*i+15080511111888758348301210130709067155032522578830999555677576084580038324622165283135469712730261790214198421220887437686639830936) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15861667473418517499589667483517939175697533397363361601947845350487300880018240887219100950308883910798276999328702019789411047664*i+22557824576700038727683498528619460322622141442792979150266755748723754734520819299739698115836493311120030962521435838319848544747)*x + (20788457689972593795993139097890801050364987693439617970314449879276361035649140242988127041351789642580380396610206051407748037045*i+21736429155273949807168748453199044518246396411408563958968939715086452741313434274191756774462003206141118754296986905309629523087) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15861667473418517499589667483517939175697533397363361601947845350487300880018240887219100950308883910798276999328702019789411047664*i+22557824576700038727683498528619460322622141442792979150266755748723754734520819299739698115836493311120030962521435838319848544747)*x + (20788457689972593795993139097890801050364987693439617970314449879276361035649140242988127041351789642580380396610206051407748037045*i+21736429155273949807168748453199044518246396411408563958968939715086452741313434274191756774462003206141118754296986905309629523087) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14493489076173712244470980745458693070990426774155561637947835992864963761236419954540057353872067983555818447020263134003622080471*i+19340999975343670107031151461384780703536464401536645700039549622184444449681627234648787619867198482939500834521369095608270290359)*x + (12120256280922956462428409223307374796343258617602716702028930272054698241236067435028898484068975850038106789444143128559883814885*i+8472701659722021777151766212222701252444277075712096939004923132397151657656865497106110301449842166988442140872300641275856943724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14493489076173712244470980745458693070990426774155561637947835992864963761236419954540057353872067983555818447020263134003622080471*i+19340999975343670107031151461384780703536464401536645700039549622184444449681627234648787619867198482939500834521369095608270290359)*x + (12120256280922956462428409223307374796343258617602716702028930272054698241236067435028898484068975850038106789444143128559883814885*i+8472701659722021777151766212222701252444277075712096939004923132397151657656865497106110301449842166988442140872300641275856943724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12395425281627254638934470885161436178271253900993189637584447275959377341118848863949128157280368586223420746017062167001845191119*i+3076543065479859926332252857210597324778510242883533468183272299153646464451773183833748973138011113064416537533669145647754502953)*x + (24287117799043492345802615710871779950793832874683054454912440395567639675200547206023723450155234067078825682574501252044599660831*i+1630044779336884662744648713381451546017681819721979383387731746155714334043257598894745550734459291581170590683548173766391941040) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12395425281627254638934470885161436178271253900993189637584447275959377341118848863949128157280368586223420746017062167001845191119*i+3076543065479859926332252857210597324778510242883533468183272299153646464451773183833748973138011113064416537533669145647754502953)*x + (24287117799043492345802615710871779950793832874683054454912440395567639675200547206023723450155234067078825682574501252044599660831*i+1630044779336884662744648713381451546017681819721979383387731746155714334043257598894745550734459291581170590683548173766391941040) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5418271518230826941906794736196053626976329277667159579436887677704239747710857649810495998227542380873865772832774582573794641024*i+23199204286057236642531768207954007926437360871875615316881059592925254095076118821453280756225135921230019276516057068167409947426)*x + (3420333337087970199256182523428044716801520785843557425719017189228748575945086830227566959567713391586964687107346252844234058586*i+17581693191122550797990422788120243920134052135842019285439820807299443813388271547541895108435694606313660567916020699249706375467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5418271518230826941906794736196053626976329277667159579436887677704239747710857649810495998227542380873865772832774582573794641024*i+23199204286057236642531768207954007926437360871875615316881059592925254095076118821453280756225135921230019276516057068167409947426)*x + (3420333337087970199256182523428044716801520785843557425719017189228748575945086830227566959567713391586964687107346252844234058586*i+17581693191122550797990422788120243920134052135842019285439820807299443813388271547541895108435694606313660567916020699249706375467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15326760136989847445055993039866035481015725978322164673561993811304455462637063387139117052602146089257102969639847788397423749941*i+12556850349394729558470014229286066553115169527422411141395562391977553726763666590010482640423451840165920021574557308465509818138)*x + (6500304596617315165736403361402082158854957988969225444045982496179474292116115943336320439261643352029262405577601701030185622433*i+12808715392340849894341089652222888225948968342017256021995666976414733898478888246372134232529589742597382403766455425753204567329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15326760136989847445055993039866035481015725978322164673561993811304455462637063387139117052602146089257102969639847788397423749941*i+12556850349394729558470014229286066553115169527422411141395562391977553726763666590010482640423451840165920021574557308465509818138)*x + (6500304596617315165736403361402082158854957988969225444045982496179474292116115943336320439261643352029262405577601701030185622433*i+12808715392340849894341089652222888225948968342017256021995666976414733898478888246372134232529589742597382403766455425753204567329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3844933547813927756983292184255763950531962929845318066643898755206419580008501251244290173295888452031695134493715345804292255468*i+15118105478879555037557471892572071077204007729784954650615680996184410421569381411815442592854254057516481799081399496467820114135)*x + (9615086524916871563448953543229179615090823487036249120604432533124205265876516500750217854076997247550038926095811201070642823637*i+11801579814376027678046500423326760460834138237946524877805051270604839357311676423767486490471730649209037052768577266367942592360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3844933547813927756983292184255763950531962929845318066643898755206419580008501251244290173295888452031695134493715345804292255468*i+15118105478879555037557471892572071077204007729784954650615680996184410421569381411815442592854254057516481799081399496467820114135)*x + (9615086524916871563448953543229179615090823487036249120604432533124205265876516500750217854076997247550038926095811201070642823637*i+11801579814376027678046500423326760460834138237946524877805051270604839357311676423767486490471730649209037052768577266367942592360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9651408623181932679389712856427250130934051636044780040084774372582056858633893327181388204467034510052880051343827029219652427164*i+22100451341923877244557104880843032697165396809273319423369402830464627577200208396174772526542379990450290646296524970850744594383)*x + (12484940899445570722451634076487603289535840610002241666207391661027186221842926540228649777706774600203597608461596011602070669677*i+14174329771529323474241160572215982177349298906052814615973721885846968757759594246500081244379015757946280563137639579703968460707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9651408623181932679389712856427250130934051636044780040084774372582056858633893327181388204467034510052880051343827029219652427164*i+22100451341923877244557104880843032697165396809273319423369402830464627577200208396174772526542379990450290646296524970850744594383)*x + (12484940899445570722451634076487603289535840610002241666207391661027186221842926540228649777706774600203597608461596011602070669677*i+14174329771529323474241160572215982177349298906052814615973721885846968757759594246500081244379015757946280563137639579703968460707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19981999274985875507779722031047746327480650624746899587594398722851920882615087736697774215733718678103398776245708323214070013338*i+17196628721250409116400791384032040577078302672638639675403715585407532419672405573536270471064237484887440902282512459546302533511)*x + (13653827728379710035333120355262659487356131722418535340253270635677670466778685439335795182231189207513033210391264096146730949024*i+7462950023505559342942120970563870593936575507259295744961686041720392477633740206498491472214089968493395736291680405215419059750) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19981999274985875507779722031047746327480650624746899587594398722851920882615087736697774215733718678103398776245708323214070013338*i+17196628721250409116400791384032040577078302672638639675403715585407532419672405573536270471064237484887440902282512459546302533511)*x + (13653827728379710035333120355262659487356131722418535340253270635677670466778685439335795182231189207513033210391264096146730949024*i+7462950023505559342942120970563870593936575507259295744961686041720392477633740206498491472214089968493395736291680405215419059750) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2949710164059212352465934539637934562125377532149785366212672614912078810103579629607251185132781739797467731773806418851182209614*i+20436971411405658485245712762616660585469134301064396840485505617044280259971446041603791178347693308686012281830765580940627274357)*x + (22642170560521459139295686099637129963114062569325434194691072547793664634071098828816199799542643332163486580576061159442260742464*i+14733110756674047226974426403611537228917870931170700528219138044423690287401396553611668206351365837535507051653961692141623999810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2949710164059212352465934539637934562125377532149785366212672614912078810103579629607251185132781739797467731773806418851182209614*i+20436971411405658485245712762616660585469134301064396840485505617044280259971446041603791178347693308686012281830765580940627274357)*x + (22642170560521459139295686099637129963114062569325434194691072547793664634071098828816199799542643332163486580576061159442260742464*i+14733110756674047226974426403611537228917870931170700528219138044423690287401396553611668206351365837535507051653961692141623999810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1794009722680964371478604777316737686302589614846214212055389126128102545034010209666485857593199876652332976850671432738000103064*i+11810196929705527819352451971045673489483180634670965971027431449514637239237768378730470949984614858034954894696337455309429825908)*x + (5562639979860503703395977570090832576396961522801453749233335352019908941873736845388839359754467437096056205886236153979766905025*i+12477998930437451718867358355281410666022664144525930089629323862330338671321306895604594762467602811252089625536025957072481184823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1794009722680964371478604777316737686302589614846214212055389126128102545034010209666485857593199876652332976850671432738000103064*i+11810196929705527819352451971045673489483180634670965971027431449514637239237768378730470949984614858034954894696337455309429825908)*x + (5562639979860503703395977570090832576396961522801453749233335352019908941873736845388839359754467437096056205886236153979766905025*i+12477998930437451718867358355281410666022664144525930089629323862330338671321306895604594762467602811252089625536025957072481184823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22559288308532747473444970774270527565892286086037858592083558785237576049915215429812459346627846121481457118165610074829368357480*i+24017797721356726431018091091736242521611645167286175615602594525345017558340793237451032963238222455535806938549827782100661778907)*x + (3486795011281427826711046338087939425284440658344946910042034970536166567711287111940642173281261802481752405707093916020322220593*i+4302748368558171000811447236264881878338581668537784769713120842786878948400750257714101571680995428989715241026735167455968161841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22559288308532747473444970774270527565892286086037858592083558785237576049915215429812459346627846121481457118165610074829368357480*i+24017797721356726431018091091736242521611645167286175615602594525345017558340793237451032963238222455535806938549827782100661778907)*x + (3486795011281427826711046338087939425284440658344946910042034970536166567711287111940642173281261802481752405707093916020322220593*i+4302748368558171000811447236264881878338581668537784769713120842786878948400750257714101571680995428989715241026735167455968161841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10277975070538901584460306726333478943125404547032618013658527234518561266945119090352517212254732248030412762062504129199670483966*i+22636548332803941548450413994942657935516444007627531201543232796665191681800738998579578790683201412757564415414179557910145257068)*x + (3164145413264903824950330152110360512615327519395752461907721947743827595043943016770742030925684433704836735488913420854174558836*i+15276085339405277399210337665882249331447493924561560811374373790772598903123754692726172711070239544697338348376477865259342281610) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10277975070538901584460306726333478943125404547032618013658527234518561266945119090352517212254732248030412762062504129199670483966*i+22636548332803941548450413994942657935516444007627531201543232796665191681800738998579578790683201412757564415414179557910145257068)*x + (3164145413264903824950330152110360512615327519395752461907721947743827595043943016770742030925684433704836735488913420854174558836*i+15276085339405277399210337665882249331447493924561560811374373790772598903123754692726172711070239544697338348376477865259342281610) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14179658412329863112930932913461280467806434168401599630020904192178166395680817000914092642992295059149730765684702273831156158366*i+7889737489902588197084469371713660670001198813430893799154205179067236379833256425630112888947532128369399066870807878881389090427)*x + (11708253455505979506906528118963110657223844636285417741805531305468791327116989842524912178379548407596685148982399080551643720296*i+8301913459069422185541838515447531325170473322465721210573037661191196533788292451819025976963709995377468321069440150374660205784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14179658412329863112930932913461280467806434168401599630020904192178166395680817000914092642992295059149730765684702273831156158366*i+7889737489902588197084469371713660670001198813430893799154205179067236379833256425630112888947532128369399066870807878881389090427)*x + (11708253455505979506906528118963110657223844636285417741805531305468791327116989842524912178379548407596685148982399080551643720296*i+8301913459069422185541838515447531325170473322465721210573037661191196533788292451819025976963709995377468321069440150374660205784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12708261685254266957765517438375753942851611671264809464682535183295125140415702505174680044397112642770648443776074157249355121715*i+4911237652002051297326579938136186869650214976856615109362800041186057794153533550271925695457839601757924428838776979292376222276)*x + (19252594534814437214474802612085276817845218552254041065493729033104922597631328639404387686063560626053777327051656066441750488550*i+20577104451676959351892052736782314827150257985868962361074979786430009120341940195381956036510954629844434515026633659962886952759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12708261685254266957765517438375753942851611671264809464682535183295125140415702505174680044397112642770648443776074157249355121715*i+4911237652002051297326579938136186869650214976856615109362800041186057794153533550271925695457839601757924428838776979292376222276)*x + (19252594534814437214474802612085276817845218552254041065493729033104922597631328639404387686063560626053777327051656066441750488550*i+20577104451676959351892052736782314827150257985868962361074979786430009120341940195381956036510954629844434515026633659962886952759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6567511067831918852600417280672577188132131470689689236569169542928073460641020305855635585631317270918434665443475855162266564422*i+6117841686584198969826707746378250905715711546701287313612058302160673152299382817554116798934564081410057648313459580574363864252)*x + (13869927932592789374828946415349822628350521185115889494658847620981624659108443964252427650153432190264263496159634523407965051071*i+12956188904063780378517618654257394204933766161470546578118765994669644316152427425535099195013139690544155940175997754340896233980) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6567511067831918852600417280672577188132131470689689236569169542928073460641020305855635585631317270918434665443475855162266564422*i+6117841686584198969826707746378250905715711546701287313612058302160673152299382817554116798934564081410057648313459580574363864252)*x + (13869927932592789374828946415349822628350521185115889494658847620981624659108443964252427650153432190264263496159634523407965051071*i+12956188904063780378517618654257394204933766161470546578118765994669644316152427425535099195013139690544155940175997754340896233980) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23954188805248609813965229186163676424711618059955161210943952015050152105182033040458568242973308774064219893381509831875914530576*i+6769468767946090186243657715884846694812868181580733541538942223832788021005039338109056742435554142867023362993541592433136157340)*x + (9554399090321056864907729110732293273209501020244923613829791162389048547896699346598968516889951924122168751718184418846336193495*i+15515171820884665401770162069620719927695678407823697497113630027346732385186833311533514848613229805695754169735246736758763121855) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23954188805248609813965229186163676424711618059955161210943952015050152105182033040458568242973308774064219893381509831875914530576*i+6769468767946090186243657715884846694812868181580733541538942223832788021005039338109056742435554142867023362993541592433136157340)*x + (9554399090321056864907729110732293273209501020244923613829791162389048547896699346598968516889951924122168751718184418846336193495*i+15515171820884665401770162069620719927695678407823697497113630027346732385186833311533514848613229805695754169735246736758763121855) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15911464998390951948350624268711689271376605606672772089650866936843819184384099946443568898976441430807282827528555141522700909467*i+2976031794520630209450900997519973159665930912912824098350650193729031713919354873485034809809653669088737055612022465786349225202)*x + (4036792360548012417405127885116028013255796896698496560170590432830385290570438108147274400774889260253295771851585373905687945840*i+15386070721429312886339634089110621093598303341030512724368229789475257755690439843689242553674003059449164239007848776653267578988) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15911464998390951948350624268711689271376605606672772089650866936843819184384099946443568898976441430807282827528555141522700909467*i+2976031794520630209450900997519973159665930912912824098350650193729031713919354873485034809809653669088737055612022465786349225202)*x + (4036792360548012417405127885116028013255796896698496560170590432830385290570438108147274400774889260253295771851585373905687945840*i+15386070721429312886339634089110621093598303341030512724368229789475257755690439843689242553674003059449164239007848776653267578988) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18624349192694811759728633286276083747321290861518099759205163083447575714037468145918374619157286172244673928627944083760052860754*i+13862631321312605721576824811117813657637469446886147862098742616894805178771455166927218122067561574705085698001255916797715944121)*x + (3344290104751350381237792945851958663743629477710481042167858217869891833113783352282828265886498829912634760245141850990330741967*i+14138616996607353956868883543135434472340021501374704240548445682904405656198405240163439509639309741863281327555511064642995712586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18624349192694811759728633286276083747321290861518099759205163083447575714037468145918374619157286172244673928627944083760052860754*i+13862631321312605721576824811117813657637469446886147862098742616894805178771455166927218122067561574705085698001255916797715944121)*x + (3344290104751350381237792945851958663743629477710481042167858217869891833113783352282828265886498829912634760245141850990330741967*i+14138616996607353956868883543135434472340021501374704240548445682904405656198405240163439509639309741863281327555511064642995712586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13636115346959276542648435966757526861444417108271325162695101009055978808657484387260468507599628214827711369196362818885957333099*i+2426122744052615586153589644333510652702738861853273342678006333640506745781763696880224031307562687215491661496328406245452812142)*x + (19665808214042307910317643909000579314609894245055061657653882308599302615566830293603277738647613049954398882505909267414080541908*i+2443823235383695622010007701297288610607999343098970790711709130330506002368108015520901544227751512224643901686913230790285325087) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13636115346959276542648435966757526861444417108271325162695101009055978808657484387260468507599628214827711369196362818885957333099*i+2426122744052615586153589644333510652702738861853273342678006333640506745781763696880224031307562687215491661496328406245452812142)*x + (19665808214042307910317643909000579314609894245055061657653882308599302615566830293603277738647613049954398882505909267414080541908*i+2443823235383695622010007701297288610607999343098970790711709130330506002368108015520901544227751512224643901686913230790285325087) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16778512626740660338610393088393812059871460894201242770161107845492417894349087859816429724443616961696630740267421160182948261296*i+21962799898778327069374305419972376894344127601947905745247570985986607380283488871363619435560370449234492584083631847704207755814)*x + (23844429017103061117969736820839631691994807101460136946654030217713043931537782606833563878916819503148810510507184750787982237573*i+14238607559300586185697147481538218114740959015231794130900909364713868224115285499611516942922991875823137154916884759686496892538) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16778512626740660338610393088393812059871460894201242770161107845492417894349087859816429724443616961696630740267421160182948261296*i+21962799898778327069374305419972376894344127601947905745247570985986607380283488871363619435560370449234492584083631847704207755814)*x + (23844429017103061117969736820839631691994807101460136946654030217713043931537782606833563878916819503148810510507184750787982237573*i+14238607559300586185697147481538218114740959015231794130900909364713868224115285499611516942922991875823137154916884759686496892538) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4375275237754275595343134051792696487556881857800478162396806782486481316349048599300406141830409573994214559690214397645427606018*i+16461856888834925886503805318701263489007174446029343698932659525946184461040134932192935854916000854170689492866001651957257519594)*x + (17801832277741706326138461254572285054300221390172389776519684948706230577048308960346999778283963697323428859145717632071626196056*i+4642950027916832059588262492295067929727950982897038042313616638318884498361062195718834403753385186726403181651219227803665762467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4375275237754275595343134051792696487556881857800478162396806782486481316349048599300406141830409573994214559690214397645427606018*i+16461856888834925886503805318701263489007174446029343698932659525946184461040134932192935854916000854170689492866001651957257519594)*x + (17801832277741706326138461254572285054300221390172389776519684948706230577048308960346999778283963697323428859145717632071626196056*i+4642950027916832059588262492295067929727950982897038042313616638318884498361062195718834403753385186726403181651219227803665762467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22426910141935910504367627722916537080927220783701210661611133524825200133959572812585934174132837401638016461290096298121231938691*i+23388457834845942451399286432617791075413469293921466667550020162781882178464710038732539043622158414955693390538505969840358523646)*x + (6829044764881932492341206111370870025974817098280273205318107845146447404747941498811772081081702429385966505665849572626099905630*i+18154704571343109011656369487859002100674832039568134700088313273126779646643357180390846642257740348308152636657748768778833937045) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22426910141935910504367627722916537080927220783701210661611133524825200133959572812585934174132837401638016461290096298121231938691*i+23388457834845942451399286432617791075413469293921466667550020162781882178464710038732539043622158414955693390538505969840358523646)*x + (6829044764881932492341206111370870025974817098280273205318107845146447404747941498811772081081702429385966505665849572626099905630*i+18154704571343109011656369487859002100674832039568134700088313273126779646643357180390846642257740348308152636657748768778833937045) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11843683132948079165375731493832365665793347212113747405084357153697826025759035429999976067223654103275929967971475102370924935416*i+12237945360260528468090358513589703308857709273949655285257950161255550562839899355521829728386410291229175749983737340124280802882)*x + (13338846099387758518379962713504314555338204113408403835002640819689802498912959994764837417006189502201460878576547362074471328651*i+16045517714033309416950971398070701586551202880396122744546341101901662134955964171086465732316222328955194460021533737227927464186) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11843683132948079165375731493832365665793347212113747405084357153697826025759035429999976067223654103275929967971475102370924935416*i+12237945360260528468090358513589703308857709273949655285257950161255550562839899355521829728386410291229175749983737340124280802882)*x + (13338846099387758518379962713504314555338204113408403835002640819689802498912959994764837417006189502201460878576547362074471328651*i+16045517714033309416950971398070701586551202880396122744546341101901662134955964171086465732316222328955194460021533737227927464186) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5859757655927852609157790475720145138865098818951568698817498304596631803203416889333806934494498737608271498312519274862562458483*i+8241599780011635036448879044762477675087582747244047622039789530808240273596853738440151491924625694049444987493998187432680462337)*x + (14642307764518714930782339901447969446788070866338783883945554901840743928148841299455850554951645483227462672055175117568565982505*i+23131320812207595462091102809184004118451156308241587329010926462916819117713494532124186262153066023224283227481105594300559652569) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5859757655927852609157790475720145138865098818951568698817498304596631803203416889333806934494498737608271498312519274862562458483*i+8241599780011635036448879044762477675087582747244047622039789530808240273596853738440151491924625694049444987493998187432680462337)*x + (14642307764518714930782339901447969446788070866338783883945554901840743928148841299455850554951645483227462672055175117568565982505*i+23131320812207595462091102809184004118451156308241587329010926462916819117713494532124186262153066023224283227481105594300559652569) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4416765131178640594606740019837648515720469392439781715081958654800953101400195553124868509762714791661354022225469957771000196753*i+1532730706059731992041818091918482098911535926067679613100732201033855759014785717607926777004791273939052686595443931934617978369)*x + (6456675603148438347759195710713095007397844302259671264053295282310933569911865678733842274963013191909084896760839691315889416510*i+9962362874783900376879095167433654969326976884995836685948935099160328193627340424131735090905455595735886701456080643110467508496) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4416765131178640594606740019837648515720469392439781715081958654800953101400195553124868509762714791661354022225469957771000196753*i+1532730706059731992041818091918482098911535926067679613100732201033855759014785717607926777004791273939052686595443931934617978369)*x + (6456675603148438347759195710713095007397844302259671264053295282310933569911865678733842274963013191909084896760839691315889416510*i+9962362874783900376879095167433654969326976884995836685948935099160328193627340424131735090905455595735886701456080643110467508496) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18583615641374979815218666896990993278125859840066544204913425817471192467860514978052768004082350790484626927156506600228877944928*i+23636812190719326518316747334848798872279634450444407874238040056694288770283947614404950243202873047565506812968075427422500502763)*x + (20499225971496478448719542106742211617876188522232449470310011503469967528258244053838940929050449540793375451731806842763096662014*i+12604773992450938469909084678537395664701738122050850903480191329539176927889596030264627354456140948912286271230638460137696009364) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18583615641374979815218666896990993278125859840066544204913425817471192467860514978052768004082350790484626927156506600228877944928*i+23636812190719326518316747334848798872279634450444407874238040056694288770283947614404950243202873047565506812968075427422500502763)*x + (20499225971496478448719542106742211617876188522232449470310011503469967528258244053838940929050449540793375451731806842763096662014*i+12604773992450938469909084678537395664701738122050850903480191329539176927889596030264627354456140948912286271230638460137696009364) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20968281843252916554134312340006748493148791270357487908239860744300795627793495487052188605708800749864275509341168999661375598657*i+1624826387202499998557504056823034987944229160712610952795899700766511606675952661502286866407583066482805592762535471409609429965)*x + (8550748827393384053820012438982193123561155212095983285787573585038261342188616395690447190235943079101318696811872821185677436075*i+24060417667954871199217044640872947334373457631001443854237383805336705915079632571982586059129162757277443529487260827720899231481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20968281843252916554134312340006748493148791270357487908239860744300795627793495487052188605708800749864275509341168999661375598657*i+1624826387202499998557504056823034987944229160712610952795899700766511606675952661502286866407583066482805592762535471409609429965)*x + (8550748827393384053820012438982193123561155212095983285787573585038261342188616395690447190235943079101318696811872821185677436075*i+24060417667954871199217044640872947334373457631001443854237383805336705915079632571982586059129162757277443529487260827720899231481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9475714518763689402264540221956457004873472202956285753869174647159876361820659284272105243249829463067003108388600815448733965327*i+10704691033303872280282306098959079292695778310738674003029419739534485218546534230788897751028799633438577638189025245170163776010)*x + (4635525106699503101225909180959559706504113368496729606279124524027363284111422254885610224963019850331204055690683767156374502398*i+6534697638687845677563235868915864520422634633986740423395263406214306805741895888383826117065075019235644606302376591341413230163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9475714518763689402264540221956457004873472202956285753869174647159876361820659284272105243249829463067003108388600815448733965327*i+10704691033303872280282306098959079292695778310738674003029419739534485218546534230788897751028799633438577638189025245170163776010)*x + (4635525106699503101225909180959559706504113368496729606279124524027363284111422254885610224963019850331204055690683767156374502398*i+6534697638687845677563235868915864520422634633986740423395263406214306805741895888383826117065075019235644606302376591341413230163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1727681278054537547530307561060853755259812095192628539044193412962244173980206965656719359911384791617878121486253137274420180686*i+23863206104439199389799112938724655493854201300013261495482373033188294826467463067521908836748331369987211808941233193637511331070)*x + (16205764092946116065003439413885750405818511215014985570528229498639673273813422265199281794885804227215322139685365958774573303835*i+21452463535970137391383451185032014211104013269380644898216519170630909261838845272966669259636387365713449200194300151405567074654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1727681278054537547530307561060853755259812095192628539044193412962244173980206965656719359911384791617878121486253137274420180686*i+23863206104439199389799112938724655493854201300013261495482373033188294826467463067521908836748331369987211808941233193637511331070)*x + (16205764092946116065003439413885750405818511215014985570528229498639673273813422265199281794885804227215322139685365958774573303835*i+21452463535970137391383451185032014211104013269380644898216519170630909261838845272966669259636387365713449200194300151405567074654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13195219098191435593490212910929258067790240720950449851639233104113511693055708770667407342391218153549690783292075106887204220336*i+15594734649428449948421840944293402134675499584078246255267819924636284737975443878703170132004785036502942070402482041446354652587)*x + (15933619989745181193616014963931723222766081682104003048821716451670886601700923450730557841261194091777856226351795489200339480027*i+8354589192157400725026363735158512009841152727312379783800134577149509524129743660705964050201105500958064552768472107534582751940) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13195219098191435593490212910929258067790240720950449851639233104113511693055708770667407342391218153549690783292075106887204220336*i+15594734649428449948421840944293402134675499584078246255267819924636284737975443878703170132004785036502942070402482041446354652587)*x + (15933619989745181193616014963931723222766081682104003048821716451670886601700923450730557841261194091777856226351795489200339480027*i+8354589192157400725026363735158512009841152727312379783800134577149509524129743660705964050201105500958064552768472107534582751940) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18159101884332502179672343925468150240489322391737002648239295461560273601273803929520794159734070973919054169038612754062970091757*i+20157137050518236424121637300958828699419373265984651459433136457867645513270279528069945709451335299593627425858486565835773105278)*x + (5990471838457367085438829049649642561650751019490675460816034242386061836058144540859311057301725991913204043668017419069118574938*i+12543903862809124459846683817501250773705380404934655292236134979316363207168482898456748062734465312640993296798821255144608007747) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18159101884332502179672343925468150240489322391737002648239295461560273601273803929520794159734070973919054169038612754062970091757*i+20157137050518236424121637300958828699419373265984651459433136457867645513270279528069945709451335299593627425858486565835773105278)*x + (5990471838457367085438829049649642561650751019490675460816034242386061836058144540859311057301725991913204043668017419069118574938*i+12543903862809124459846683817501250773705380404934655292236134979316363207168482898456748062734465312640993296798821255144608007747) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17072238367068930518483666315353981562081594523474140491106055684638501546513887713778828405616856239528005724324629684086877176136*i+21963355448558765991025851797023882382103284314825471162233107400629025917245086547008972646833785623039576956013160848412264988417)*x + (15722304147339074920212893551926199998671969123049527198115963634756622497754439185272194918764133833090084643127383219418622747597*i+9414202734533473925572385620375490580986412354118523830854809521274423845906363767098395135445770734593976170851678648964180074609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17072238367068930518483666315353981562081594523474140491106055684638501546513887713778828405616856239528005724324629684086877176136*i+21963355448558765991025851797023882382103284314825471162233107400629025917245086547008972646833785623039576956013160848412264988417)*x + (15722304147339074920212893551926199998671969123049527198115963634756622497754439185272194918764133833090084643127383219418622747597*i+9414202734533473925572385620375490580986412354118523830854809521274423845906363767098395135445770734593976170851678648964180074609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14370829511653789909605231185453124211998837002345846965093856482109773017377422350701513708873607230984417617649366950450462235189*i+13751490932470165926077777055385395238017898335737903426741862303141876621076711254523651811908449935311540275760183174353715428909)*x + (693607136826783814150318252597188904290157721893470144700690242077475307257374941205942998431494346826442860189381711398529878421*i+4551256093013416870922531914597472378132266222925286627537897247276828703179141460159726047411429140090362399600504355504298349826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14370829511653789909605231185453124211998837002345846965093856482109773017377422350701513708873607230984417617649366950450462235189*i+13751490932470165926077777055385395238017898335737903426741862303141876621076711254523651811908449935311540275760183174353715428909)*x + (693607136826783814150318252597188904290157721893470144700690242077475307257374941205942998431494346826442860189381711398529878421*i+4551256093013416870922531914597472378132266222925286627537897247276828703179141460159726047411429140090362399600504355504298349826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17549366725737402173063498359465647101519761253595640394967256843618014041264730718851904019323371093590109006371890657048028054620*i+12969515002233760640418562093610528146650218617339451976696743727867828907100390940771918024230823884772646461361963138075642839526)*x + (24231540595888068067113283048415017809226002058734809310496933304554556753507042259745114569073073273780418065604897066478155741578*i+18972782714472284153053329709148448727731614459553056922431491358871240146542818613253093474189320464722368292548485843284990141701) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17549366725737402173063498359465647101519761253595640394967256843618014041264730718851904019323371093590109006371890657048028054620*i+12969515002233760640418562093610528146650218617339451976696743727867828907100390940771918024230823884772646461361963138075642839526)*x + (24231540595888068067113283048415017809226002058734809310496933304554556753507042259745114569073073273780418065604897066478155741578*i+18972782714472284153053329709148448727731614459553056922431491358871240146542818613253093474189320464722368292548485843284990141701) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (749940665962235912135729560918827916405174916064902491537120470544048171967168161571038863243835172109635020368903088362000274610*i+19155257047653953901336601673571085418778559665335905696140988257265512416024287783827162930756935309816009739292234581240297191796)*x + (13164884046324464435281148960288485306500662452463670899108508058191015472012395118640497036020686593024129872689502750629308991817*i+2135039418869761255057933052037976942104902121156773099818346332516490114615662248865741036533581723676037228340406419872400166730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (749940665962235912135729560918827916405174916064902491537120470544048171967168161571038863243835172109635020368903088362000274610*i+19155257047653953901336601673571085418778559665335905696140988257265512416024287783827162930756935309816009739292234581240297191796)*x + (13164884046324464435281148960288485306500662452463670899108508058191015472012395118640497036020686593024129872689502750629308991817*i+2135039418869761255057933052037976942104902121156773099818346332516490114615662248865741036533581723676037228340406419872400166730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1652727589736621348899415651876172825192539762588906756392787582549545211173854481295666959811024266614268726498575926234453927003*i+20142610877656498461233443771519020947621664399260580841041789568614198108831156592615050971782561540443613265308072092683414911290)*x + (4680464146560595202791246100148350664200371331711978081301892302783541671601407934261276018623418810706706826604935675509501778410*i+24140780659445097402680091120907625670069744142302199721464405966958635680242743178799135996753027710614807800965160015737767322652) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1652727589736621348899415651876172825192539762588906756392787582549545211173854481295666959811024266614268726498575926234453927003*i+20142610877656498461233443771519020947621664399260580841041789568614198108831156592615050971782561540443613265308072092683414911290)*x + (4680464146560595202791246100148350664200371331711978081301892302783541671601407934261276018623418810706706826604935675509501778410*i+24140780659445097402680091120907625670069744142302199721464405966958635680242743178799135996753027710614807800965160015737767322652) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3028032750334094264811668044576901206486208597542520518719951055710524371718593077356153445098939863970921340782793736372362077917*i+13649852025030074086757877749551990553366169148350858698959207343011189548529469520317495601136697145670625779752080075229341773665)*x + (20254420329609241811328314259176864900153318268437302525187544140995285246113922978706966292050123756293117344109850734942537411073*i+22246767111191002684293411131012689007784772043395026292526505402124500616149898976883150977546758302151832126237141195853669501555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3028032750334094264811668044576901206486208597542520518719951055710524371718593077356153445098939863970921340782793736372362077917*i+13649852025030074086757877749551990553366169148350858698959207343011189548529469520317495601136697145670625779752080075229341773665)*x + (20254420329609241811328314259176864900153318268437302525187544140995285246113922978706966292050123756293117344109850734942537411073*i+22246767111191002684293411131012689007784772043395026292526505402124500616149898976883150977546758302151832126237141195853669501555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9218346409278515373213174798963897096664452373383705031637656345709639490102150489733090964976277489439127021900540984164477403738*i+14492289155657615881830145323104042372053967348119443488799866108242312353343980504924038661348980908606658416430670796126452967486)*x + (1226574247212841552751472916624023538172740279263265679065021170089649934183338151180701878790395309594487966963192454886172805308*i+15004803714630279862531130174158475196995798893907985583637861358521407097976933344472962427979865867887187567514270818637915103788) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9218346409278515373213174798963897096664452373383705031637656345709639490102150489733090964976277489439127021900540984164477403738*i+14492289155657615881830145323104042372053967348119443488799866108242312353343980504924038661348980908606658416430670796126452967486)*x + (1226574247212841552751472916624023538172740279263265679065021170089649934183338151180701878790395309594487966963192454886172805308*i+15004803714630279862531130174158475196995798893907985583637861358521407097976933344472962427979865867887187567514270818637915103788) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7467879915978615535974233208617487793296330352134832701758941801910724519261662254365305582855316396642933602103213603494240465774*i+19809873833474232288654399048955153329187159974650405910193510643069843542547606495636236542414914641977073409072165300451574148276)*x + (16536085015777539538783695027767106144275221158757098652792476145268452940861945053237046129868367664564684059864420030937401259840*i+17237245890576454857373157266981034558517465404562204774249568687376959603053124898861684717748955616380378981847194222968792821402) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7467879915978615535974233208617487793296330352134832701758941801910724519261662254365305582855316396642933602103213603494240465774*i+19809873833474232288654399048955153329187159974650405910193510643069843542547606495636236542414914641977073409072165300451574148276)*x + (16536085015777539538783695027767106144275221158757098652792476145268452940861945053237046129868367664564684059864420030937401259840*i+17237245890576454857373157266981034558517465404562204774249568687376959603053124898861684717748955616380378981847194222968792821402) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5646677534114695867131601224533481821755764784933491942436021351073816696984909042234044584285215895522378778494663740091304818161*i+22129212065372225572050848967825090896699751951739514154883266623727459500537039444228407074738907793308564267730815836932164286480)*x + (1650711460803037440998595869943012947846064072329966433303403043772156250807171990881784207985656429706797943437705263742902186437*i+11235848916234529639356433660506008945939799855280117585726287384184663280963487391149350577351151108449330152436892722744423434324) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5646677534114695867131601224533481821755764784933491942436021351073816696984909042234044584285215895522378778494663740091304818161*i+22129212065372225572050848967825090896699751951739514154883266623727459500537039444228407074738907793308564267730815836932164286480)*x + (1650711460803037440998595869943012947846064072329966433303403043772156250807171990881784207985656429706797943437705263742902186437*i+11235848916234529639356433660506008945939799855280117585726287384184663280963487391149350577351151108449330152436892722744423434324) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15719242970494433179117061139185947316321533396909693234393582897078326484966039814653651197918842143894653764941292095089291791659*i+14468251170045155435020507443319253311635762868181286244968773082248447724264702806613638230848247406441134329400671315155405774301)*x + (18785223723639111248746572917202481401768195045869689575391513454905870687988056849365658933271704550536042903601462428906175958382*i+19167494040498914719560031619474596620518924458985009865954293749110518724051995351330735806942280661509419810014642352095012477591) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15719242970494433179117061139185947316321533396909693234393582897078326484966039814653651197918842143894653764941292095089291791659*i+14468251170045155435020507443319253311635762868181286244968773082248447724264702806613638230848247406441134329400671315155405774301)*x + (18785223723639111248746572917202481401768195045869689575391513454905870687988056849365658933271704550536042903601462428906175958382*i+19167494040498914719560031619474596620518924458985009865954293749110518724051995351330735806942280661509419810014642352095012477591) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5393151005312405593817116139260889907552606512854363565412474474018160032604114274225996430736040265654853090090338442003284322330*i+17767192753095330555615464701283161803991368026742160738842386696896380637393006082359185235146299301687353216684729546943173563657)*x + (17327425113491007119869705483399867937406704748098504668422732125339324685368195849699228647906712116685118605819668727919781807373*i+3070244707822254357567364286877764584332247215322608824373210200740643963625239435929358251306577499322435721432039442488872374038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5393151005312405593817116139260889907552606512854363565412474474018160032604114274225996430736040265654853090090338442003284322330*i+17767192753095330555615464701283161803991368026742160738842386696896380637393006082359185235146299301687353216684729546943173563657)*x + (17327425113491007119869705483399867937406704748098504668422732125339324685368195849699228647906712116685118605819668727919781807373*i+3070244707822254357567364286877764584332247215322608824373210200740643963625239435929358251306577499322435721432039442488872374038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (170343669489689516535924650371052192628560429612890032453362772675854481892882820001054687430061477024444120872444974871716962010*i+365066795211041973394759372158280722351133932203504416865387778892888625944896135837551414976603005727150224544067566849170932325)*x + (14112314641522773156653532105477333488986028408909310207215093861325640317182247387967013516008543915241363405948929808153554954973*i+22046799870048950277059761811100702900393590596342513557317517464306393916736659508932482761976467841147005121140502604075066807695) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (170343669489689516535924650371052192628560429612890032453362772675854481892882820001054687430061477024444120872444974871716962010*i+365066795211041973394759372158280722351133932203504416865387778892888625944896135837551414976603005727150224544067566849170932325)*x + (14112314641522773156653532105477333488986028408909310207215093861325640317182247387967013516008543915241363405948929808153554954973*i+22046799870048950277059761811100702900393590596342513557317517464306393916736659508932482761976467841147005121140502604075066807695) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7928145832314980995266955736195821034084673344543669513651141636793763189806792192245800667151222116610976255345078036133139001410*i+10395284032498616867013221818943449050983953571881736121952230859869750696704161348447986281796190608666761204969674623129211265357)*x + (6343251309480691219389977952291352874129735651717244231246348278592494632152392692986704703728549113651267057817392742889193836165*i+12412315417800591134626393485227663518449925262408708977447406455461898729199337699522325977267257876133885219781143537526279600226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7928145832314980995266955736195821034084673344543669513651141636793763189806792192245800667151222116610976255345078036133139001410*i+10395284032498616867013221818943449050983953571881736121952230859869750696704161348447986281796190608666761204969674623129211265357)*x + (6343251309480691219389977952291352874129735651717244231246348278592494632152392692986704703728549113651267057817392742889193836165*i+12412315417800591134626393485227663518449925262408708977447406455461898729199337699522325977267257876133885219781143537526279600226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11112039629726666628583687273020688905802584511458301285142733691651770483993835685298792596108912768561310094080873773121194012789*i+21282540984183626928576573856278440621190992324665808039104767462584978387049891149119736934980159744481780664830577686477520757003)*x + (2846534243121254330319768822228578811977881914924549193808053776446965358386462692892986163049805113979213312031890339201467315246*i+17290879575375009744350564441350195724140579583390966801451581611095133909825464275858915668451550999869388127122776000059322865776) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11112039629726666628583687273020688905802584511458301285142733691651770483993835685298792596108912768561310094080873773121194012789*i+21282540984183626928576573856278440621190992324665808039104767462584978387049891149119736934980159744481780664830577686477520757003)*x + (2846534243121254330319768822228578811977881914924549193808053776446965358386462692892986163049805113979213312031890339201467315246*i+17290879575375009744350564441350195724140579583390966801451581611095133909825464275858915668451550999869388127122776000059322865776) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22685745417360317674628159429777953744442751229192666589154249003477432551857959048301560115455875256871556575840776398451206363051*i+652068336483157730472063689752623271665232190667607543758661019209043398453306399083795551975786452647407749630035765871421272712)*x + (16413407003100219470440979553725211731062205160296088189311925872525244088453717664224987809842947623012008749954908541459830643792*i+8785016329058321454030367961683017572651834466159928149647956489234249740213739525083334453789623487684350664000514726748092405431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22685745417360317674628159429777953744442751229192666589154249003477432551857959048301560115455875256871556575840776398451206363051*i+652068336483157730472063689752623271665232190667607543758661019209043398453306399083795551975786452647407749630035765871421272712)*x + (16413407003100219470440979553725211731062205160296088189311925872525244088453717664224987809842947623012008749954908541459830643792*i+8785016329058321454030367961683017572651834466159928149647956489234249740213739525083334453789623487684350664000514726748092405431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1988904457941062342752198573010872885644429010570450918747461608202605828676261470998414353749646108885942599613464866296040101031*i+12893271939328762620277436662607231469897558918378995867777175090958096587504530704773005267027322614632000844849565365797848640055)*x + (15639513634553138243460910539708490540936035262590975258371611912467208568541270432646998112326045289682178880679207843258514451824*i+15008626593493781911297195688232112018325141361118809227646567225965981259689371501688676020544032218075445679450267820418758312543) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1988904457941062342752198573010872885644429010570450918747461608202605828676261470998414353749646108885942599613464866296040101031*i+12893271939328762620277436662607231469897558918378995867777175090958096587504530704773005267027322614632000844849565365797848640055)*x + (15639513634553138243460910539708490540936035262590975258371611912467208568541270432646998112326045289682178880679207843258514451824*i+15008626593493781911297195688232112018325141361118809227646567225965981259689371501688676020544032218075445679450267820418758312543) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18160109645503050600193390605682343226486587643755160773126791585211604160260060083130802564436202614801734187226101291096543565166*i+21588980740783244041946211363019774079717252432995444702602573612103447860267757705396790941032379613496314537918004923749391828755)*x + (8735685757700510325943726111756113405691976535569328710742666833771815543451746477996465511929844386952260298539114599838692156687*i+8838869274043075885918165679927438804127261541793580639024175085150061990637950029866553675626315528856408805420659274173479507765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18160109645503050600193390605682343226486587643755160773126791585211604160260060083130802564436202614801734187226101291096543565166*i+21588980740783244041946211363019774079717252432995444702602573612103447860267757705396790941032379613496314537918004923749391828755)*x + (8735685757700510325943726111756113405691976535569328710742666833771815543451746477996465511929844386952260298539114599838692156687*i+8838869274043075885918165679927438804127261541793580639024175085150061990637950029866553675626315528856408805420659274173479507765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16105324475494684096610473227477885175351247180241250709285558217201796786096913402034168291079301839156975336703191842673172167303*i+8001506669013545605700688999881456588466281707477141315257657334083104312482339673838138890133984399751578146216343189634763543901)*x + (5023739456884811206295842977917522983827263429400171913126283945370028998260925545156114713066942666633759791244499870039981934311*i+61349823914843607769528768952685895336884278817326743901789466879569806381920368619467167479185566941653464997500402407172300964) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16105324475494684096610473227477885175351247180241250709285558217201796786096913402034168291079301839156975336703191842673172167303*i+8001506669013545605700688999881456588466281707477141315257657334083104312482339673838138890133984399751578146216343189634763543901)*x + (5023739456884811206295842977917522983827263429400171913126283945370028998260925545156114713066942666633759791244499870039981934311*i+61349823914843607769528768952685895336884278817326743901789466879569806381920368619467167479185566941653464997500402407172300964) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6008191173414235835710271859725059115110171038262450964913047258328425634923977431079418549644101215142775549140296184365999700409*i+13655396482155762601800675875433540332819708808222710680825405316363896872005684811961594523014907526331083084315405677386572418956)*x + (8292309471173956365053854731397977067323805859633106856477518182457664011286512329881475941986979152574704733293686616108118691292*i+779288997632859912446391258258268768263654601094881612069717257176803590732593794108957965995107756767068725604935488443011913596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6008191173414235835710271859725059115110171038262450964913047258328425634923977431079418549644101215142775549140296184365999700409*i+13655396482155762601800675875433540332819708808222710680825405316363896872005684811961594523014907526331083084315405677386572418956)*x + (8292309471173956365053854731397977067323805859633106856477518182457664011286512329881475941986979152574704733293686616108118691292*i+779288997632859912446391258258268768263654601094881612069717257176803590732593794108957965995107756767068725604935488443011913596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10424778307949894495892410788711000965409327554981903121225001179244653033588097153563352525583929482401628154958811977837239540420*i+14138406228416775105482167901708582950141146646687304813268348160057438907059234769247288138682848077452503593003602911658381988878)*x + (19169401783538472201295679549212898197855823891401954757560789882371378406509573931854701610276020237939611376022187118367703728445*i+8540044450710737898462576487881642038037135201701479303293138773540150655927326908901611740848120533118130480469837652273914145216) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10424778307949894495892410788711000965409327554981903121225001179244653033588097153563352525583929482401628154958811977837239540420*i+14138406228416775105482167901708582950141146646687304813268348160057438907059234769247288138682848077452503593003602911658381988878)*x + (19169401783538472201295679549212898197855823891401954757560789882371378406509573931854701610276020237939611376022187118367703728445*i+8540044450710737898462576487881642038037135201701479303293138773540150655927326908901611740848120533118130480469837652273914145216) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4179866209572628357904479714285752566749002355582259617768150065800104661460269153999406008017689382337160536745018806176994408892*i+8194775937445893979580226214092230118998583457952924605844725743659886909724836574390513283111448706040580835977910152699098439665)*x + (15511379066126145345786187242930405133352547134296213890415329080128935664875347232286299826894811946004842483317476226672574311874*i+13154165770440043702358909558025690492298877145344103312696643835802287199626151541835558219058694212108461721487329565805594774704) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4179866209572628357904479714285752566749002355582259617768150065800104661460269153999406008017689382337160536745018806176994408892*i+8194775937445893979580226214092230118998583457952924605844725743659886909724836574390513283111448706040580835977910152699098439665)*x + (15511379066126145345786187242930405133352547134296213890415329080128935664875347232286299826894811946004842483317476226672574311874*i+13154165770440043702358909558025690492298877145344103312696643835802287199626151541835558219058694212108461721487329565805594774704) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (629258390886641834080397874599625042700166340520457682746555124202980484565613598185573938381931737171370522705977586569225706909*i+23536136152031894163506803261474216081383188357099616994485200617326893598944927433735823681570781823668653233992268173263630509756)*x + (20621529465436010551072182165850974009570833266420651859075251389476944663842780119949292578606247631753289061364756223709257875715*i+5925275314629156202376356765875560287609727374810683344480319188661285144348099924925043812218379110791554501137543995886626716416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (629258390886641834080397874599625042700166340520457682746555124202980484565613598185573938381931737171370522705977586569225706909*i+23536136152031894163506803261474216081383188357099616994485200617326893598944927433735823681570781823668653233992268173263630509756)*x + (20621529465436010551072182165850974009570833266420651859075251389476944663842780119949292578606247631753289061364756223709257875715*i+5925275314629156202376356765875560287609727374810683344480319188661285144348099924925043812218379110791554501137543995886626716416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22590993730101392238500208776949259401007700575763438599278259192627597656360108186298798183609806710606762091223732387646567105874*i+11517828045103462263856975165674280854354116843079916734060392736479956723302756891046325111036733031798798269495048279672462009771)*x + (5415301972082623174253376264125375274102270197687940288706307921922503530732118775266969775149044713478253305591010928451494085820*i+4726850905119392423453767392557534440539935283406739826001223112658146504902572893505298708692034996179523993025169468902831327668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22590993730101392238500208776949259401007700575763438599278259192627597656360108186298798183609806710606762091223732387646567105874*i+11517828045103462263856975165674280854354116843079916734060392736479956723302756891046325111036733031798798269495048279672462009771)*x + (5415301972082623174253376264125375274102270197687940288706307921922503530732118775266969775149044713478253305591010928451494085820*i+4726850905119392423453767392557534440539935283406739826001223112658146504902572893505298708692034996179523993025169468902831327668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2160902802436661974906413680849270425680075286797147434554659690880207132802448223817422080427750339894274457445784752986309584622*i+2661966456129975794203496907971464691956470649015587497310832895298983429955096638992093893732913563341426875750805241675797017240)*x + (22619954551986731550722197407017015121319995753240270986258073302252553214670960781088127133241871693262743587476260525025604006993*i+10352935386191169389064494691406078037158684049324602855885884148001187205635575268574372564943125533034889500413627173367569637924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2160902802436661974906413680849270425680075286797147434554659690880207132802448223817422080427750339894274457445784752986309584622*i+2661966456129975794203496907971464691956470649015587497310832895298983429955096638992093893732913563341426875750805241675797017240)*x + (22619954551986731550722197407017015121319995753240270986258073302252553214670960781088127133241871693262743587476260525025604006993*i+10352935386191169389064494691406078037158684049324602855885884148001187205635575268574372564943125533034889500413627173367569637924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19597042580175959715970026409743410575287256381845407767280663085547667411879751933331242969438713115641846532618457206967217954774*i+17959495531177653934451445365574215760470473249410813333298176871433456229417370128706784237803800166556878098782310387121723850701)*x + (11908894324870674647188054600299822823476422093632647439159852649152288946722263894617517671645189082301835851452564677823279724422*i+15901730933152580193654177999930878831258288292951238386990968108164368619287259819958615589882953108855581401963797495594550358702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19597042580175959715970026409743410575287256381845407767280663085547667411879751933331242969438713115641846532618457206967217954774*i+17959495531177653934451445365574215760470473249410813333298176871433456229417370128706784237803800166556878098782310387121723850701)*x + (11908894324870674647188054600299822823476422093632647439159852649152288946722263894617517671645189082301835851452564677823279724422*i+15901730933152580193654177999930878831258288292951238386990968108164368619287259819958615589882953108855581401963797495594550358702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1789943212981493206352437701051409766630879222453341600897752965034930441503603174423209132894952936095151517060694558738006224216*i+15388379637121625637198310394668736770567159581441670545802618471579085253001023018488744014839170044717033793388050199302446345605)*x + (19560503385051437668527584228158014902672222632470052264209014247312575551012417202464185106434559299169182873038434553345108896547*i+18206309944453684061944233702819125459287229681385949842820330979220351102801906771042702807068401454225953686638323150297735765841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1789943212981493206352437701051409766630879222453341600897752965034930441503603174423209132894952936095151517060694558738006224216*i+15388379637121625637198310394668736770567159581441670545802618471579085253001023018488744014839170044717033793388050199302446345605)*x + (19560503385051437668527584228158014902672222632470052264209014247312575551012417202464185106434559299169182873038434553345108896547*i+18206309944453684061944233702819125459287229681385949842820330979220351102801906771042702807068401454225953686638323150297735765841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23248443531924634405746357106034849142943159193034960421550388354077169362009683435591389075817547782809147935702660789485246717443*i+10841382840189515507584550550174026412250997295035797741135839222120816852426133664945049873148530662035317223257215893985108355013)*x + (1360076668657144998905268454826907437219251851720750785389210024691176592008327315274669587487050606939230867782903971272432786399*i+21669084233594592818349569179602862513917939209006262621908683444523398135875068455395602963992608661549288224696046981925245450634) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23248443531924634405746357106034849142943159193034960421550388354077169362009683435591389075817547782809147935702660789485246717443*i+10841382840189515507584550550174026412250997295035797741135839222120816852426133664945049873148530662035317223257215893985108355013)*x + (1360076668657144998905268454826907437219251851720750785389210024691176592008327315274669587487050606939230867782903971272432786399*i+21669084233594592818349569179602862513917939209006262621908683444523398135875068455395602963992608661549288224696046981925245450634) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18585756693563916426617844852486358741986969868618296117989127623300650165697900202985289307576445812523278452248430266534065246353*i+9314951123267659860895728122513213530423453352120899926964072233809258882815359960050859911273565519717531612900088054334074933785)*x + (10196316521317639319478496869664329076658300627549173157711672114044642459306235388542984826285122349989789464533857742211661598039*i+14522896637378296728516494198853703179160077730054096535988231032953009023721343578836319904588790878625885222309021776106450391378) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18585756693563916426617844852486358741986969868618296117989127623300650165697900202985289307576445812523278452248430266534065246353*i+9314951123267659860895728122513213530423453352120899926964072233809258882815359960050859911273565519717531612900088054334074933785)*x + (10196316521317639319478496869664329076658300627549173157711672114044642459306235388542984826285122349989789464533857742211661598039*i+14522896637378296728516494198853703179160077730054096535988231032953009023721343578836319904588790878625885222309021776106450391378) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15256800288376050897495891530102160497058066872249904074333119201968692884628503034796705725346331797420440389897467512489912091423*i+10476834717807023169985471409995994770507815993055018509463999404932366454750033376555412898575475128033857130240494917282467227108)*x + (14100455746024605721580318375532480019739234760356096537993730757591622888689230690463113170430995534362456286846046670650485766181*i+18458367639099573760242811077438054391501808609948855585409098735935905427829458508621017365013453138833183933300603706915253692635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15256800288376050897495891530102160497058066872249904074333119201968692884628503034796705725346331797420440389897467512489912091423*i+10476834717807023169985471409995994770507815993055018509463999404932366454750033376555412898575475128033857130240494917282467227108)*x + (14100455746024605721580318375532480019739234760356096537993730757591622888689230690463113170430995534362456286846046670650485766181*i+18458367639099573760242811077438054391501808609948855585409098735935905427829458508621017365013453138833183933300603706915253692635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18434683568845800088357704800568713149177641236017831069693320796173648921261605550668752927343373895645217641534122328114770348469*i+6341643232738610554762031950728610943741643308950514854573002999122431082900896515095461848814563968101856592460480090804292582600)*x + (12576476837370446121965549909544914306437376891764234798421475446753142387417717139895249673327814893069474686441654361450298434103*i+9460264209659479125670677339182925412447770186848114655482763138768788595574360425724696103462717090873464901245496239326300312270) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18434683568845800088357704800568713149177641236017831069693320796173648921261605550668752927343373895645217641534122328114770348469*i+6341643232738610554762031950728610943741643308950514854573002999122431082900896515095461848814563968101856592460480090804292582600)*x + (12576476837370446121965549909544914306437376891764234798421475446753142387417717139895249673327814893069474686441654361450298434103*i+9460264209659479125670677339182925412447770186848114655482763138768788595574360425724696103462717090873464901245496239326300312270) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17121297615767598757446973933278518609726338308567624286226730251849597491846436812334425886126295280126517699548753932194782942670*i+6855246435062488722826606616594904870248654791814191897618169171146670643044071451756565962371014938681913127316721216294718113485)*x + (8185453907526837972479929662917172576863015943807840300995026327792805562694826852025669124749518001085193265445437380523287559298*i+11193597888318113267537132567928529515111876986354050350940287264522052699108039140320962715009034344929351816992297726971046688238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17121297615767598757446973933278518609726338308567624286226730251849597491846436812334425886126295280126517699548753932194782942670*i+6855246435062488722826606616594904870248654791814191897618169171146670643044071451756565962371014938681913127316721216294718113485)*x + (8185453907526837972479929662917172576863015943807840300995026327792805562694826852025669124749518001085193265445437380523287559298*i+11193597888318113267537132567928529515111876986354050350940287264522052699108039140320962715009034344929351816992297726971046688238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7933464690848391036501318564496726203661244072608356747835420758538544448445272037753832385569782804496155931462399129341382948156*i+24135318931838719292363698957719266170359114931117842420772766758495172474694821101892388076549761263441673697094338404206689510903)*x + (11116008575561526244030852370770216537441402168431083062889823041849915136134863734905730375012312169720237959191688727578832196975*i+3225533257054102900627615546390852144965262103467736555864883299759790907404034129556248226625854026534459919214915676441513827120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7933464690848391036501318564496726203661244072608356747835420758538544448445272037753832385569782804496155931462399129341382948156*i+24135318931838719292363698957719266170359114931117842420772766758495172474694821101892388076549761263441673697094338404206689510903)*x + (11116008575561526244030852370770216537441402168431083062889823041849915136134863734905730375012312169720237959191688727578832196975*i+3225533257054102900627615546390852144965262103467736555864883299759790907404034129556248226625854026534459919214915676441513827120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14660204846727249028858197520948179208840467520429934674052880428104790606659435939689331929945884897245048304330360843808066573353*i+17330961381407755560990402857146290648759991897392482632416577528119818480863412557895717965888718389695989923483882658505987571758)*x + (23237598660176814820648947964212627680324211260337266677979743895278997940215151309595974138187279741476609529508158193417458240823*i+14124646270684740813129661041305589880642262878043712528951727444783851928099129679078384253518668036913143746570994354438524897460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14660204846727249028858197520948179208840467520429934674052880428104790606659435939689331929945884897245048304330360843808066573353*i+17330961381407755560990402857146290648759991897392482632416577528119818480863412557895717965888718389695989923483882658505987571758)*x + (23237598660176814820648947964212627680324211260337266677979743895278997940215151309595974138187279741476609529508158193417458240823*i+14124646270684740813129661041305589880642262878043712528951727444783851928099129679078384253518668036913143746570994354438524897460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17204328412268615797067221520712776023924657896073542734011369854460088549671731762855490961008164967520871682802808676525591520823*i+14032756644876201604603416512347575361295486347916872471068593516227112369329870441804955670361647935408914830311834069686368131901)*x + (14680068980548490380443102100388122669145693626432446264111462929657200030925783619812195928517989804348116909128838357852513764794*i+23400273418538960974554285513246219215584606413329630893684769844438442612943774040152451779027498418024084147312568571734839847344) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17204328412268615797067221520712776023924657896073542734011369854460088549671731762855490961008164967520871682802808676525591520823*i+14032756644876201604603416512347575361295486347916872471068593516227112369329870441804955670361647935408914830311834069686368131901)*x + (14680068980548490380443102100388122669145693626432446264111462929657200030925783619812195928517989804348116909128838357852513764794*i+23400273418538960974554285513246219215584606413329630893684769844438442612943774040152451779027498418024084147312568571734839847344) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6028134083585692256231182384425191733732255313018783400548725415306696779569819578015726909930186166433149208681514672057065107619*i+460329673526112105578700885578518893148010936454981126240487555941151745115279137308228632246801920330391641526182950079759162165)*x + (3727360204006031867384664431487400379830661525634674005057674324117267960614721547997114457416512435069347840222837168255460359444*i+7750708385362076482037164034629733592568864364923644521469272199461339582488024476661955232867966740768106000767617841863679843070) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6028134083585692256231182384425191733732255313018783400548725415306696779569819578015726909930186166433149208681514672057065107619*i+460329673526112105578700885578518893148010936454981126240487555941151745115279137308228632246801920330391641526182950079759162165)*x + (3727360204006031867384664431487400379830661525634674005057674324117267960614721547997114457416512435069347840222837168255460359444*i+7750708385362076482037164034629733592568864364923644521469272199461339582488024476661955232867966740768106000767617841863679843070) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14168702499733920123592564588013244611026483116175361860414261559182501704524595729716606279764315884854271743718208548136420232335*i+20702822008153963146136218985979585100157830086976229522566951751524396381435311750462094112419326427175999236369332952099115470058)*x + (18312249791920314673963524544061640161495715884138431882832060146158405739948206204029075552588178585844144767001116290551120942816*i+20877573908379481977436639434567250741679402733435216883102784339678254312962186657162705619738935490046137579117859266552566362323) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14168702499733920123592564588013244611026483116175361860414261559182501704524595729716606279764315884854271743718208548136420232335*i+20702822008153963146136218985979585100157830086976229522566951751524396381435311750462094112419326427175999236369332952099115470058)*x + (18312249791920314673963524544061640161495715884138431882832060146158405739948206204029075552588178585844144767001116290551120942816*i+20877573908379481977436639434567250741679402733435216883102784339678254312962186657162705619738935490046137579117859266552566362323) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8557928109546243348040499678539078065604729842776031180984088619546765142626594075299997913050459799338910271009029898474973378415*i+6476520415614764597538254823141501939814433784377840727659323029780761815893257941708347461428701616023526103497270269973099859354)*x + (1960918206461321744235919181081171755825116001197039849726664565994551618897431876625006575000523203365848479911417909311946625176*i+23217650629608356614820250665842307191427829529563919723767530484383352217147218706376777063080282840055857427771055444142185171004) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8557928109546243348040499678539078065604729842776031180984088619546765142626594075299997913050459799338910271009029898474973378415*i+6476520415614764597538254823141501939814433784377840727659323029780761815893257941708347461428701616023526103497270269973099859354)*x + (1960918206461321744235919181081171755825116001197039849726664565994551618897431876625006575000523203365848479911417909311946625176*i+23217650629608356614820250665842307191427829529563919723767530484383352217147218706376777063080282840055857427771055444142185171004) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2812980050282375422679398554637895029371554308165521987439876827292096840382710618737337431716172642724209904900705049440108040453*i+18168172551525648055957230492591235350697198631987265155217968923055652867859131027811742231404253117972592324825977454305901732165)*x + (12854516983403410597477050555366360497735886396164048823567100733311930543358356179618010850187253508566787173654896330653713328533*i+18464677361554254068617231485546787212782469658964517580267502815246148672534762161980591803553276005080557800108569203372322185103) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2812980050282375422679398554637895029371554308165521987439876827292096840382710618737337431716172642724209904900705049440108040453*i+18168172551525648055957230492591235350697198631987265155217968923055652867859131027811742231404253117972592324825977454305901732165)*x + (12854516983403410597477050555366360497735886396164048823567100733311930543358356179618010850187253508566787173654896330653713328533*i+18464677361554254068617231485546787212782469658964517580267502815246148672534762161980591803553276005080557800108569203372322185103) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21652324158917546404474113891904784467266957741521503623466411823014007471148812812172792804079430965500931750582246584823776956871*i+15776243782310942515203916802874668001273159323235958697274732745631116417734837077256156739206903747634066424250238202262921714012)*x + (17294766454532433329584702826394133815964986963371321105086136644836437480145322411353004482110633189324758316837225875324148998996*i+16145129376389207093801741240684248005894917181855547008627079202570643621955278926544778060874552409643135572624204046619438069860) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21652324158917546404474113891904784467266957741521503623466411823014007471148812812172792804079430965500931750582246584823776956871*i+15776243782310942515203916802874668001273159323235958697274732745631116417734837077256156739206903747634066424250238202262921714012)*x + (17294766454532433329584702826394133815964986963371321105086136644836437480145322411353004482110633189324758316837225875324148998996*i+16145129376389207093801741240684248005894917181855547008627079202570643621955278926544778060874552409643135572624204046619438069860) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11084622788944856231254918782475274621254407656793481551385945562718272029935145498366400624638515534322542616604553488442814600085*i+13150321338960699219159659825789384463474675976589410087619148954637074778941824672809378922835389746758173998487916078438050703486)*x + (17061983372195567140666828483422714167032831481454674487423681421172836208800099799534277234720852088061073456802319184560938019426*i+2375102172027264494695047642513623645563988983982944505286254009958900757153548808197018731533686548082358340167398044108014527689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11084622788944856231254918782475274621254407656793481551385945562718272029935145498366400624638515534322542616604553488442814600085*i+13150321338960699219159659825789384463474675976589410087619148954637074778941824672809378922835389746758173998487916078438050703486)*x + (17061983372195567140666828483422714167032831481454674487423681421172836208800099799534277234720852088061073456802319184560938019426*i+2375102172027264494695047642513623645563988983982944505286254009958900757153548808197018731533686548082358340167398044108014527689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8724100702617805739132233144642612745835229504250564480924812310209833919248143198789150516369936429432933702853410920173370648469*i+22894524316604273053206852229188484322205818748514655269047716326877166847435959538502794269076532637796777775486385685183532675221)*x + (5072763322753317731541204445881559201217797910669388082461479429363937966721728338567184325511496738137194667918403794284592845197*i+15312922550567976107845949787477143465746995782475028029465481497334747355453661984542401520163748777791114366599728192746208121430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8724100702617805739132233144642612745835229504250564480924812310209833919248143198789150516369936429432933702853410920173370648469*i+22894524316604273053206852229188484322205818748514655269047716326877166847435959538502794269076532637796777775486385685183532675221)*x + (5072763322753317731541204445881559201217797910669388082461479429363937966721728338567184325511496738137194667918403794284592845197*i+15312922550567976107845949787477143465746995782475028029465481497334747355453661984542401520163748777791114366599728192746208121430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4418130429731870691591136641586273097855191085670908448556483342802234428998679350214133187629036033804267071701673768124453951392*i+8432472681375726434414278990181945933761545008597440081178980891653670333689971363909004348185644511824446667113740288701730612683)*x + (19012854225837925691376851613695930679457088600054090220491754687862162889422740650784750207201216706506005464803029651115361675662*i+6911652598255075260997427426102042658473947642226819467140647393383216580425042652836556482969124829806993440175983036308064374281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4418130429731870691591136641586273097855191085670908448556483342802234428998679350214133187629036033804267071701673768124453951392*i+8432472681375726434414278990181945933761545008597440081178980891653670333689971363909004348185644511824446667113740288701730612683)*x + (19012854225837925691376851613695930679457088600054090220491754687862162889422740650784750207201216706506005464803029651115361675662*i+6911652598255075260997427426102042658473947642226819467140647393383216580425042652836556482969124829806993440175983036308064374281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17341960097224062349332518171602000997868464041446306365501100358298212712283884552975695445759663391935222641391065793585900775018*i+3329702713409811701230366099558849662675716838314100459384276014480527265389979714954899893328219005133201857623899501259862117382)*x + (2523981135084876081111416155185672740583039039760990835551033180883820376762046812849441965303185123400025058528595886579789845680*i+9441913147470006939783427768409686101593069965696029289695859006345742547500226319839148861233629306551030803234319728342873672824) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17341960097224062349332518171602000997868464041446306365501100358298212712283884552975695445759663391935222641391065793585900775018*i+3329702713409811701230366099558849662675716838314100459384276014480527265389979714954899893328219005133201857623899501259862117382)*x + (2523981135084876081111416155185672740583039039760990835551033180883820376762046812849441965303185123400025058528595886579789845680*i+9441913147470006939783427768409686101593069965696029289695859006345742547500226319839148861233629306551030803234319728342873672824) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3305492318087789131103991306528161670085092722467226591635094630565418427509662230248547804129282218496143989905935231023662253126*i+5708542165535799245900657417540749473603283393778988436938466593356901351689315025932112100234825752039117150990323712954203372596)*x + (17722077619977013206751022585764246902642560686611939196690179594071103790952530486490670757947931529808856468436934688478245256648*i+14871159641034481135545220149729083439390206146761905490431819649278544434714552314916862268319761747502219732040586347821329648692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3305492318087789131103991306528161670085092722467226591635094630565418427509662230248547804129282218496143989905935231023662253126*i+5708542165535799245900657417540749473603283393778988436938466593356901351689315025932112100234825752039117150990323712954203372596)*x + (17722077619977013206751022585764246902642560686611939196690179594071103790952530486490670757947931529808856468436934688478245256648*i+14871159641034481135545220149729083439390206146761905490431819649278544434714552314916862268319761747502219732040586347821329648692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13804480027500233637460472107159077953007686487218482752944684071500429581832334525363079757141030890584989886159507151836783264501*i+8308856376440956542508984250998708078509711118795487231968945842442366050308141185465553113210366756248055393069414214673892748757)*x + (6289894989515693514719175688370232557292602613994119266305334410065987155891404358608279003099649640992373547924642382654060033704*i+5858147822272801732196752239913127165697254901718085409320140222046111813328179304808324906083781480947772829096965129951791145904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13804480027500233637460472107159077953007686487218482752944684071500429581832334525363079757141030890584989886159507151836783264501*i+8308856376440956542508984250998708078509711118795487231968945842442366050308141185465553113210366756248055393069414214673892748757)*x + (6289894989515693514719175688370232557292602613994119266305334410065987155891404358608279003099649640992373547924642382654060033704*i+5858147822272801732196752239913127165697254901718085409320140222046111813328179304808324906083781480947772829096965129951791145904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23334799983094506235455456930246367869132307736359371849732501055084472529739722862358171720251795726658161427471747878660766922077*i+23091184261403393610357990354192353260258728034147146902765478636321663250777533131507476378472379409116864932662083209199069371272)*x + (24575197613833608542963139874953297456660252831772809988371186937853587452161885217965264717325268881346467823085226741023128014*i+4956938039399274034742663512462879280934303047618406993583969001309906911697808500466463765307458089276306381519936509324680838524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23334799983094506235455456930246367869132307736359371849732501055084472529739722862358171720251795726658161427471747878660766922077*i+23091184261403393610357990354192353260258728034147146902765478636321663250777533131507476378472379409116864932662083209199069371272)*x + (24575197613833608542963139874953297456660252831772809988371186937853587452161885217965264717325268881346467823085226741023128014*i+4956938039399274034742663512462879280934303047618406993583969001309906911697808500466463765307458089276306381519936509324680838524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9064155673442526278917274119604781056661312455649968410910327705914255571959658885215546556554270651764616661836853487368254412848*i+16582971571184519259078993379682955247874200635914110897015145035529893264243815418535618184767990014512766112346871640773133942082)*x + (22941408093272529772861761703947622391401845637087486276599929689962704179902482689575485725811275087470022093016951419456747164246*i+23132849689954476340999815475769121206298356099811275394000458251200332366720532949551333430648747224390956943785851089451333102476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9064155673442526278917274119604781056661312455649968410910327705914255571959658885215546556554270651764616661836853487368254412848*i+16582971571184519259078993379682955247874200635914110897015145035529893264243815418535618184767990014512766112346871640773133942082)*x + (22941408093272529772861761703947622391401845637087486276599929689962704179902482689575485725811275087470022093016951419456747164246*i+23132849689954476340999815475769121206298356099811275394000458251200332366720532949551333430648747224390956943785851089451333102476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8039241439041940548438913597207616681519205484963951899874362746648925343460807750963303739232088797832811186467608377168998937660*i+12918955040069150247342570383177373856430152509759521554498777831879469526846476978853480843933349462698290318720036778609743119428)*x + (14806025760646539396864953840782585439342459764142935071626267008514556647357324427437100160831207778703466666039416962373352461928*i+8798056409129317664116760055741305156218475681905706727306431590044602373589227110398920753099035775574479990362399726302240602813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8039241439041940548438913597207616681519205484963951899874362746648925343460807750963303739232088797832811186467608377168998937660*i+12918955040069150247342570383177373856430152509759521554498777831879469526846476978853480843933349462698290318720036778609743119428)*x + (14806025760646539396864953840782585439342459764142935071626267008514556647357324427437100160831207778703466666039416962373352461928*i+8798056409129317664116760055741305156218475681905706727306431590044602373589227110398920753099035775574479990362399726302240602813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10314317222657013072731269144191079701608361820061648990014080885506515614081986874853153872803536012801854715455066899698192147662*i+24137147297966182790380112573422801160894690750461481578527374690967098911248938724216462495484017041281928749699358512174454531104)*x + (10932242705735863669914116594569800719894406616832573608986699055309924046335762001768143048052023122098084834159337637062936600897*i+7550478707000074585393710782689094846211830380241665065480506674383323634024897191892218081119269744701597029327702733631783984440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10314317222657013072731269144191079701608361820061648990014080885506515614081986874853153872803536012801854715455066899698192147662*i+24137147297966182790380112573422801160894690750461481578527374690967098911248938724216462495484017041281928749699358512174454531104)*x + (10932242705735863669914116594569800719894406616832573608986699055309924046335762001768143048052023122098084834159337637062936600897*i+7550478707000074585393710782689094846211830380241665065480506674383323634024897191892218081119269744701597029327702733631783984440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14640871843510876920209179506470025700104737817900163635395669098288049245952540752299297114922278044407026810756705224368999532223*i+15530242492852247280780093180549933362871628615151524857133274052126412419173462489175219747589934131335920415539984972375485273896)*x + (23765654502640401410286814056810503229120739930720747615797708703244540671756839590734590356558512546710368035922593795027606000886*i+2023476337492960580738880656903772466319915389811951024890836531734106948596400920322067684798902288345252539404927462866030382072) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14640871843510876920209179506470025700104737817900163635395669098288049245952540752299297114922278044407026810756705224368999532223*i+15530242492852247280780093180549933362871628615151524857133274052126412419173462489175219747589934131335920415539984972375485273896)*x + (23765654502640401410286814056810503229120739930720747615797708703244540671756839590734590356558512546710368035922593795027606000886*i+2023476337492960580738880656903772466319915389811951024890836531734106948596400920322067684798902288345252539404927462866030382072) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18104128522520162757172390831051180314914674015665351277001625689652309375168709820392963747900103289476354099425130340413187933679*i+9961726547054263383672563815613536628658701566532906615589766110002078940216187272237586440820842832494953019396958390880487736671)*x + (8350219801410704566602933826660776041071421656858152764961803935275816284571712524886836098709283449239488528220051916982262608544*i+2752533685818955956121157272155427448827528155381836738581811806096196702020877967420711634427732868114794507883152669854754369564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18104128522520162757172390831051180314914674015665351277001625689652309375168709820392963747900103289476354099425130340413187933679*i+9961726547054263383672563815613536628658701566532906615589766110002078940216187272237586440820842832494953019396958390880487736671)*x + (8350219801410704566602933826660776041071421656858152764961803935275816284571712524886836098709283449239488528220051916982262608544*i+2752533685818955956121157272155427448827528155381836738581811806096196702020877967420711634427732868114794507883152669854754369564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9294671178869026162604984326937374203538786780611534894063671560601456604210366307406605082361561581826486838882002873304384084503*i+17509236174093530503275311707330636605541897901351294454210186688672428973199268542700040353494788988358283683435644220317218814304)*x + (18668778836840004736666091164250576062152663026478043734651855860888771160844178957566455727037372498509042016452894993276338718504*i+4023587124731498145763331684658023707714588818902533577411169217222976620260780068154071781832329319507302775085210096038324766455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9294671178869026162604984326937374203538786780611534894063671560601456604210366307406605082361561581826486838882002873304384084503*i+17509236174093530503275311707330636605541897901351294454210186688672428973199268542700040353494788988358283683435644220317218814304)*x + (18668778836840004736666091164250576062152663026478043734651855860888771160844178957566455727037372498509042016452894993276338718504*i+4023587124731498145763331684658023707714588818902533577411169217222976620260780068154071781832329319507302775085210096038324766455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13567623955868236666008531215391081211476555061984671094608734856668459671707381214512933180775651657913194898408920413242325325764*i+7464748942297187281522589753066038802501219528836338735229064956403186004457957984734668398905048835328289016893915312351340741178)*x + (1858710171877262739729448491145191501266093211092799091460606609679214817313499874282894709821245665751847537505699630801899438181*i+15640788778824415988172987928766867574211225094054993092035880368200457073744123030754162539121049165387696653892160610202711378587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13567623955868236666008531215391081211476555061984671094608734856668459671707381214512933180775651657913194898408920413242325325764*i+7464748942297187281522589753066038802501219528836338735229064956403186004457957984734668398905048835328289016893915312351340741178)*x + (1858710171877262739729448491145191501266093211092799091460606609679214817313499874282894709821245665751847537505699630801899438181*i+15640788778824415988172987928766867574211225094054993092035880368200457073744123030754162539121049165387696653892160610202711378587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7159273753913859834554922548783183350047355232418692538664755923307324244139336358256540809731401299912800179429161612541448801608*i+16385436263414363926992949197674371824102360161110134865654824962848377888656900684559614824609820321978100405452340164456724029569)*x + (18167292598597207880595106178336326673506027028696978403561412239435091538283528258638423392042637493371623837900053308136849761263*i+8897267794820265890245273037813855497765150674778702976060189382410480838375986673748870242364978968595584875888376229687133490550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7159273753913859834554922548783183350047355232418692538664755923307324244139336358256540809731401299912800179429161612541448801608*i+16385436263414363926992949197674371824102360161110134865654824962848377888656900684559614824609820321978100405452340164456724029569)*x + (18167292598597207880595106178336326673506027028696978403561412239435091538283528258638423392042637493371623837900053308136849761263*i+8897267794820265890245273037813855497765150674778702976060189382410480838375986673748870242364978968595584875888376229687133490550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7532746510466785602316800894636112446306051315103938719033135716807829251175051021357406479448767114020690278799031234038364481215*i+638848333294281050482067929164580544140950740017398697119241093471182702368609347485867396768829626130700906843283644465355510981)*x + (12118430569266154587759628550080842150103812482197552944960609333815697008628935389444217721391016852119499912159604646511462060178*i+17401926905523132605909971745763524744466061840646757933634474234311048869314885644675159658778104766045670617194297156462681010977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7532746510466785602316800894636112446306051315103938719033135716807829251175051021357406479448767114020690278799031234038364481215*i+638848333294281050482067929164580544140950740017398697119241093471182702368609347485867396768829626130700906843283644465355510981)*x + (12118430569266154587759628550080842150103812482197552944960609333815697008628935389444217721391016852119499912159604646511462060178*i+17401926905523132605909971745763524744466061840646757933634474234311048869314885644675159658778104766045670617194297156462681010977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17069457334770480975120267745221993900192542784048829398945927779305147084161619290566083128708509812982054626549155119252789836401*i+18847272282801684262547849417228057834445890761152788807158259989324641122222168359334088759054085162517357326185216199195681590954)*x + (1729214402076071255083116822645781155708887388245998449314654494177227654141268824060838561950274727157297236338270824059506566035*i+14532013388922041056048987972338038166567886050872270386146205106130768175270144506105640444963365554351604267285115944761363536486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17069457334770480975120267745221993900192542784048829398945927779305147084161619290566083128708509812982054626549155119252789836401*i+18847272282801684262547849417228057834445890761152788807158259989324641122222168359334088759054085162517357326185216199195681590954)*x + (1729214402076071255083116822645781155708887388245998449314654494177227654141268824060838561950274727157297236338270824059506566035*i+14532013388922041056048987972338038166567886050872270386146205106130768175270144506105640444963365554351604267285115944761363536486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5606901905992608928857053685517008770807082190787140053217574121198431563519861146759804444989236781150412947270172695639748957769*i+5309548793547750492590533504791589940152150320892380623693733654876328535642526969330953645041987481246147602417680742278377955668)*x + (8072669990482999240318763316048125533174901879265516176398216000407033256399825290023440632364979651223123302632126273461356757467*i+14861964894385418974044725793169640719148420646152966357074188702140808594878612293545812613718340067387434528597668146393376566530) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5606901905992608928857053685517008770807082190787140053217574121198431563519861146759804444989236781150412947270172695639748957769*i+5309548793547750492590533504791589940152150320892380623693733654876328535642526969330953645041987481246147602417680742278377955668)*x + (8072669990482999240318763316048125533174901879265516176398216000407033256399825290023440632364979651223123302632126273461356757467*i+14861964894385418974044725793169640719148420646152966357074188702140808594878612293545812613718340067387434528597668146393376566530) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10232750510406239491712712584573543475531138031237536703890011917556044030963523102985601911877809997388674515276305294195644015724*i+19495682146099045143991507554713227711520309174665225180689795934497016587429685315859380100800283161347376016084940155813216712932)*x + (19629311202682914960913590230551260108828656534776797835425928315555544678568274555677452475897012378398525772176009941933621872075*i+19197398570841654579750922831905856493688189179687845084354829049190896812114433266078507624130890970443750233684357797766667563791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10232750510406239491712712584573543475531138031237536703890011917556044030963523102985601911877809997388674515276305294195644015724*i+19495682146099045143991507554713227711520309174665225180689795934497016587429685315859380100800283161347376016084940155813216712932)*x + (19629311202682914960913590230551260108828656534776797835425928315555544678568274555677452475897012378398525772176009941933621872075*i+19197398570841654579750922831905856493688189179687845084354829049190896812114433266078507624130890970443750233684357797766667563791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19881104381840198969914664943049086783231304778643353716114779833106322187007459529829057796891120572433570377822128850584479686043*i+20328439244256148702162861808285052079400163773374047310197860827038188468896007260202001408743887490028137402949824015757035119350)*x + (20705125435153286802751530641533840568819551637858616257100085867518859136072229253617055027798603774087975870487583603321235756605*i+9728536975834242893887976034989915904014754034363970555139913709998457948425453634785000015961033032303230222657517872712288845397) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19881104381840198969914664943049086783231304778643353716114779833106322187007459529829057796891120572433570377822128850584479686043*i+20328439244256148702162861808285052079400163773374047310197860827038188468896007260202001408743887490028137402949824015757035119350)*x + (20705125435153286802751530641533840568819551637858616257100085867518859136072229253617055027798603774087975870487583603321235756605*i+9728536975834242893887976034989915904014754034363970555139913709998457948425453634785000015961033032303230222657517872712288845397) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15272071116340727445320283401467348703450819465045521056380556426040813684892756851620323436889564113633813168080448030773628768052*i+2544308212046648268537006424699758097000550715559826208405687191583641226242654567760546327224928728057959946219376533623601225101)*x + (17673703717291837521558663049003606436491618022633657729983098029087553251995106927514127276627599596400315477228878090442778150411*i+8900730210768771499513331592731300248640861971862996919142311412513097453033161010516447667251229111360264476166384949061396507867) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15272071116340727445320283401467348703450819465045521056380556426040813684892756851620323436889564113633813168080448030773628768052*i+2544308212046648268537006424699758097000550715559826208405687191583641226242654567760546327224928728057959946219376533623601225101)*x + (17673703717291837521558663049003606436491618022633657729983098029087553251995106927514127276627599596400315477228878090442778150411*i+8900730210768771499513331592731300248640861971862996919142311412513097453033161010516447667251229111360264476166384949061396507867) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3261626243555488311937899620000593666920819137237641667557844162053928834116594925079477364700812753666446641593640430552427321274*i+19600025649831553976128932267803179538453156381101308550586131377943186629639647536765810842927254535752757690073432802324286058820)*x + (6276763046984145231118239954696549004247996542645691826905793386873088482919494661341071308239406022349401461107163464890938972041*i+6615473912495133379275011123166616049349400263242105852203494054666133200634118793946184136092890490581404662418199132392258310943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3261626243555488311937899620000593666920819137237641667557844162053928834116594925079477364700812753666446641593640430552427321274*i+19600025649831553976128932267803179538453156381101308550586131377943186629639647536765810842927254535752757690073432802324286058820)*x + (6276763046984145231118239954696549004247996542645691826905793386873088482919494661341071308239406022349401461107163464890938972041*i+6615473912495133379275011123166616049349400263242105852203494054666133200634118793946184136092890490581404662418199132392258310943) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11200803914618525790350794718911492379782456871892880543370728667091196733045356359866603419310352018883122248780992242590916764511*i+22426421001836280525242809857807178953359927453510837560975157743227695023554580767877379771212739290142069696238157189615161150017)*x + (4692741590859423725857998823058123382594981942055597251795827864185862563234402772571367797536624378048471149187817617314522976161*i+18602439590991892625359054779104711802997345584884635212632514899355195038123104335949884002778552219453726764603840264940653107635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11200803914618525790350794718911492379782456871892880543370728667091196733045356359866603419310352018883122248780992242590916764511*i+22426421001836280525242809857807178953359927453510837560975157743227695023554580767877379771212739290142069696238157189615161150017)*x + (4692741590859423725857998823058123382594981942055597251795827864185862563234402772571367797536624378048471149187817617314522976161*i+18602439590991892625359054779104711802997345584884635212632514899355195038123104335949884002778552219453726764603840264940653107635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22971857854257189972433620470569786508201244130509125497143982529924807290893059617019669937105816329942321460324176934366126542944*i+12633083978410373104433700971347104865448372901420004387097761430527176206848799011953569908944592439641517032892263149141378153323)*x + (8968029833775660501705517111707290451140801485016970425291457417207683324804424207079055682048042572270762710302342669133986835835*i+11628136438105207952844631906426054709426296877131943972599805415387627364171242632810469528280238140660488018896851934706268810437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22971857854257189972433620470569786508201244130509125497143982529924807290893059617019669937105816329942321460324176934366126542944*i+12633083978410373104433700971347104865448372901420004387097761430527176206848799011953569908944592439641517032892263149141378153323)*x + (8968029833775660501705517111707290451140801485016970425291457417207683324804424207079055682048042572270762710302342669133986835835*i+11628136438105207952844631906426054709426296877131943972599805415387627364171242632810469528280238140660488018896851934706268810437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10457037852238691544893137356369473307523881328817429844314503546654885460814842655110267118747099358709555178935552629594989825675*i+4903456451223287099022648975188587640876594117710979950692708819104868589407192924130748943463874563501291773917552388663577942818)*x + (7222202810637992413422593470918757948572591118056988822296899161268081456208693695293175836084512210964024560650927518350458626855*i+17818974246273895962191961155654789824377801403286774437427466675663851208536859167896792825363808098432129781849522269096205798654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10457037852238691544893137356369473307523881328817429844314503546654885460814842655110267118747099358709555178935552629594989825675*i+4903456451223287099022648975188587640876594117710979950692708819104868589407192924130748943463874563501291773917552388663577942818)*x + (7222202810637992413422593470918757948572591118056988822296899161268081456208693695293175836084512210964024560650927518350458626855*i+17818974246273895962191961155654789824377801403286774437427466675663851208536859167896792825363808098432129781849522269096205798654) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21601593205243821094421072476048873891778252024560357818527600927602244007138180240409000679867381975529528614184543856104016542167*i+10673348646832848086654511908643229052680412231899284571168566014442337524375565995890920962010597534610613838223861904130629751821)*x + (3450247175358247356291102209976878968809710637625230670772937899242772117402921479323256389279616751722535819312237797476591715184*i+8267839658488799046018869665883844447760221821420791871885057767975186363583246972253333815032582508600904009379073563164520913062) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21601593205243821094421072476048873891778252024560357818527600927602244007138180240409000679867381975529528614184543856104016542167*i+10673348646832848086654511908643229052680412231899284571168566014442337524375565995890920962010597534610613838223861904130629751821)*x + (3450247175358247356291102209976878968809710637625230670772937899242772117402921479323256389279616751722535819312237797476591715184*i+8267839658488799046018869665883844447760221821420791871885057767975186363583246972253333815032582508600904009379073563164520913062) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18506016499397215886337856190811703148337035107430903777160806236381012095534126213374090068753685798328959188683941625448768006850*i+10083220168491903988739889283374624820940000038088476900757565417221494036548176958338885138529511467193740660970658389919705707939)*x + (19940989183564422082350269059663339120437729341868282956147455663059871340029745411344480228047774142290441580963444942208927351095*i+20410300388175902198411829757401015850893899691986468760852345311428758039099101867263779802043230253464851030441612822428379937853) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18506016499397215886337856190811703148337035107430903777160806236381012095534126213374090068753685798328959188683941625448768006850*i+10083220168491903988739889283374624820940000038088476900757565417221494036548176958338885138529511467193740660970658389919705707939)*x + (19940989183564422082350269059663339120437729341868282956147455663059871340029745411344480228047774142290441580963444942208927351095*i+20410300388175902198411829757401015850893899691986468760852345311428758039099101867263779802043230253464851030441612822428379937853) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22050760694072905089802883617198822331445506040447458671755849221927378941030859572601336377952549585085833918762944582506334738741*i+7258523847683629178985061099457419866189719053159585163354152659171788069319125944317668632038362089364254244963370527025869944384)*x + (850009128291704417099334601191740171239505687104456633505558274136103213899518402644978208002106400202054294784853868251773946475*i+7016525989947387205367193188197526663836298436480991414519143132364183137709018146772238580548084086313534173679793756875343278384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22050760694072905089802883617198822331445506040447458671755849221927378941030859572601336377952549585085833918762944582506334738741*i+7258523847683629178985061099457419866189719053159585163354152659171788069319125944317668632038362089364254244963370527025869944384)*x + (850009128291704417099334601191740171239505687104456633505558274136103213899518402644978208002106400202054294784853868251773946475*i+7016525989947387205367193188197526663836298436480991414519143132364183137709018146772238580548084086313534173679793756875343278384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1925737778092179754080416453163982693219198846827045335199007905175835194189132976722955155245926902666752846654569292384691333589*i+22455249607956809516541342795342205612132737006940321436725066857273763817451509603122417735403404914234095489676965670235266065781)*x + (19559662984910584053214833340327135176820519330252060650324255129151990293230609166309100056342207549637808663399882376265759652836*i+1573343843069981649334710075567383850657552829094156716051929761051196638720153237837016542214399551816300468292603010886377746544) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1925737778092179754080416453163982693219198846827045335199007905175835194189132976722955155245926902666752846654569292384691333589*i+22455249607956809516541342795342205612132737006940321436725066857273763817451509603122417735403404914234095489676965670235266065781)*x + (19559662984910584053214833340327135176820519330252060650324255129151990293230609166309100056342207549637808663399882376265759652836*i+1573343843069981649334710075567383850657552829094156716051929761051196638720153237837016542214399551816300468292603010886377746544) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23040447907639295313261098986080416740734107265448246820542101280889010193416870122690495816235420815322080115291764182847042725193*i+1103105252805062932817190425656334211987091500683412437472391976296484565217672660973504450638704528641923059012492893545252766400)*x + (17977813592488403807406135292881070901395039833801379111438243152496863631799551771760875948213974044285810656775240942534124183473*i+572424158210536326183470839647968673043392582392719009459498472914184528549687478626402395138556923064390678450741774618200552731) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23040447907639295313261098986080416740734107265448246820542101280889010193416870122690495816235420815322080115291764182847042725193*i+1103105252805062932817190425656334211987091500683412437472391976296484565217672660973504450638704528641923059012492893545252766400)*x + (17977813592488403807406135292881070901395039833801379111438243152496863631799551771760875948213974044285810656775240942534124183473*i+572424158210536326183470839647968673043392582392719009459498472914184528549687478626402395138556923064390678450741774618200552731) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12467249211793772449896645636461410368526411479238455480598587727465650619251046762228285869927489559153048080056914154116255238696*i+3917569720729051225687776412234126866312983936425728364228523656879654719719263400893055501485087019039997145325422066563178285344)*x + (6545634131668896388589690359763966891452541202776866755401930359517708206661746664986876214614405635198049705403846838610830287457*i+8778476579354988798257062966895536760286557994688680501949032537954633996125398776100040034724055211723318841911767821589454739933) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12467249211793772449896645636461410368526411479238455480598587727465650619251046762228285869927489559153048080056914154116255238696*i+3917569720729051225687776412234126866312983936425728364228523656879654719719263400893055501485087019039997145325422066563178285344)*x + (6545634131668896388589690359763966891452541202776866755401930359517708206661746664986876214614405635198049705403846838610830287457*i+8778476579354988798257062966895536760286557994688680501949032537954633996125398776100040034724055211723318841911767821589454739933) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12740591302371872322501716420296579414696251772268801119544470440687950969615136163866685912739169357205466078190079825602452774451*i+847068155514335856226025006620518045179616439067147372565935655366097287867010452740111123648386219409269684549780745115829515551)*x + (308555193479093574137536923071618110587757264568926613821833164486144867918070058372753085526678175105583976898061617743317454083*i+17935811110046958124906769684970593216381140643871214493585001358765903234168753819720906019934172502430259986041161728336928349545) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12740591302371872322501716420296579414696251772268801119544470440687950969615136163866685912739169357205466078190079825602452774451*i+847068155514335856226025006620518045179616439067147372565935655366097287867010452740111123648386219409269684549780745115829515551)*x + (308555193479093574137536923071618110587757264568926613821833164486144867918070058372753085526678175105583976898061617743317454083*i+17935811110046958124906769684970593216381140643871214493585001358765903234168753819720906019934172502430259986041161728336928349545) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1320780467129971749538133421228902202661358819706602393425704264447967386879310126173008378250324243367603738409440011443353309201*i+14637027822610630856829429321169872900162172906226978955889466305727048124077118286864399960397557372246399150119720948778220643976)*x + (1665585630439862320533882855529345278955266282226471496434337403367301367121072808569862081812884428772031213635871045509739950900*i+24313530459654455157480466503730072472468375551618283363812124516553045837510502301197546681040604052435308167513503955246112307219) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1320780467129971749538133421228902202661358819706602393425704264447967386879310126173008378250324243367603738409440011443353309201*i+14637027822610630856829429321169872900162172906226978955889466305727048124077118286864399960397557372246399150119720948778220643976)*x + (1665585630439862320533882855529345278955266282226471496434337403367301367121072808569862081812884428772031213635871045509739950900*i+24313530459654455157480466503730072472468375551618283363812124516553045837510502301197546681040604052435308167513503955246112307219) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17736220223288269009148461705134280083145963489821482357579313846497303779084970169207182605953923502807409524834029214660305103507*i+2776752680967270943690758553555184786362562022190604772541201096664205455306793697762017318268266214503023817496130336375344202722)*x + (23858721155483264872011200710907184052136725444909416516196726648892610452508776764222280083480612488387674239048070686085107561538*i+2190215804286609235989411502603733831938331610073702886617565537527704702301093532945382053275108089578572097595924236129451877740) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17736220223288269009148461705134280083145963489821482357579313846497303779084970169207182605953923502807409524834029214660305103507*i+2776752680967270943690758553555184786362562022190604772541201096664205455306793697762017318268266214503023817496130336375344202722)*x + (23858721155483264872011200710907184052136725444909416516196726648892610452508776764222280083480612488387674239048070686085107561538*i+2190215804286609235989411502603733831938331610073702886617565537527704702301093532945382053275108089578572097595924236129451877740) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4786473717508092307943657967061613032174391274965568302481483907941160268897544114165998268699403641225413379746322135949299216874*i+13395691266360065108032593095658355658417642646415712772488312573251371455580388758154024863753295528811618157939155649300821713391)*x + (16044532633661401811843587725500361258873702102350388021961496554851761125362178897064652987764256368845333431005505067228140621170*i+2943614705877466894105027067541254903436089160710151775095324961036883302811700681145442419344759654757286117241040967618824922416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4786473717508092307943657967061613032174391274965568302481483907941160268897544114165998268699403641225413379746322135949299216874*i+13395691266360065108032593095658355658417642646415712772488312573251371455580388758154024863753295528811618157939155649300821713391)*x + (16044532633661401811843587725500361258873702102350388021961496554851761125362178897064652987764256368845333431005505067228140621170*i+2943614705877466894105027067541254903436089160710151775095324961036883302811700681145442419344759654757286117241040967618824922416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22181930170030008120691875402034693580596475495563412114719832293622781946428406933366553462507368834738758789928720986979824437767*i+22146617014506375276519016192283640220004247789265192943450190531496733874092547041983727431538009857173277643321028522409117775137)*x + (1051010661579218652465341495068335930399813184787315356502532433074727099479859308650347760795515143571589226827734246987359646724*i+960152637718263746324402669896642209577993674384057766795719732911014899776821004546739223630421604154923607154768908698879465068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22181930170030008120691875402034693580596475495563412114719832293622781946428406933366553462507368834738758789928720986979824437767*i+22146617014506375276519016192283640220004247789265192943450190531496733874092547041983727431538009857173277643321028522409117775137)*x + (1051010661579218652465341495068335930399813184787315356502532433074727099479859308650347760795515143571589226827734246987359646724*i+960152637718263746324402669896642209577993674384057766795719732911014899776821004546739223630421604154923607154768908698879465068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18970169251660178631824719195952236993359785843368982966666184248160882597917332344052221992402228085399713468797611534895811607090*i+18363443160520115843675724165297597628912072976970214460449560533344431681534713185465622140265401406028956851242295882556808326975)*x + (12901217544249891307942820509306879744427819470324335882335578522905811259935395553297342672663223914896898143796544825282860833770*i+11231134283934515746322742991013969245864809616529461723717870436914583059175832338942564178008099343954411551441876169169613074459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18970169251660178631824719195952236993359785843368982966666184248160882597917332344052221992402228085399713468797611534895811607090*i+18363443160520115843675724165297597628912072976970214460449560533344431681534713185465622140265401406028956851242295882556808326975)*x + (12901217544249891307942820509306879744427819470324335882335578522905811259935395553297342672663223914896898143796544825282860833770*i+11231134283934515746322742991013969245864809616529461723717870436914583059175832338942564178008099343954411551441876169169613074459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8594552891901358961799628298553711038337056372832065386105359324848652850040757586080998137064506870294954062184988443699138049465*i+14029284293455651910908030244078157060711159629466137555953932650284692127818512768006290524538822301993948448808301498427309648066)*x + (1653164871250921657744865253352411372645180938758189991401155180922974549952521353304588172360105647227688035448628622733431112852*i+302653662192872275981634282156069025569728043496215238126755838794384017534200562280862890744347612410874155643218877886025340913) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8594552891901358961799628298553711038337056372832065386105359324848652850040757586080998137064506870294954062184988443699138049465*i+14029284293455651910908030244078157060711159629466137555953932650284692127818512768006290524538822301993948448808301498427309648066)*x + (1653164871250921657744865253352411372645180938758189991401155180922974549952521353304588172360105647227688035448628622733431112852*i+302653662192872275981634282156069025569728043496215238126755838794384017534200562280862890744347612410874155643218877886025340913) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19023541503145316126996835005973656874165455820986565210333747530424304051301584646390337498884936545622830038452581118158087479263*i+7075735973160270485935188781779754564445276370020548677571816738443701893932415086340261126872829074776346947345679944393438665682)*x + (23925074835123186563854277921545609251550486737613807549575137590966863756015676593289089664233361878035133602468186180395136250639*i+6706648879428152759638927464734204462547032922517496591756869877625781255794020400367736188723856940992637516607861171072322677144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19023541503145316126996835005973656874165455820986565210333747530424304051301584646390337498884936545622830038452581118158087479263*i+7075735973160270485935188781779754564445276370020548677571816738443701893932415086340261126872829074776346947345679944393438665682)*x + (23925074835123186563854277921545609251550486737613807549575137590966863756015676593289089664233361878035133602468186180395136250639*i+6706648879428152759638927464734204462547032922517496591756869877625781255794020400367736188723856940992637516607861171072322677144) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20167026370786234052434875690797281373502382613028062238462102701522963182232729945278521686174664653935562702118048953990215330178*i+2056857403369608526127747334779680772644679023565310989433998944075345820397146011955959323561285316624781774915265596462767039438)*x + (11790743801689937934512778842490625911276119837068255062326244291259697193848541268829539818899169132250777488310535693083763793499*i+1581612725659148635194493135425926770420340188098669923748164068777049736635555498645713346479498659604222844613311707005915520938) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20167026370786234052434875690797281373502382613028062238462102701522963182232729945278521686174664653935562702118048953990215330178*i+2056857403369608526127747334779680772644679023565310989433998944075345820397146011955959323561285316624781774915265596462767039438)*x + (11790743801689937934512778842490625911276119837068255062326244291259697193848541268829539818899169132250777488310535693083763793499*i+1581612725659148635194493135425926770420340188098669923748164068777049736635555498645713346479498659604222844613311707005915520938) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12650800267549450934554560603784419990273813056530484500656545087265445240534333438728449707929982106127796574464810815509322207538*i+6164732031364712926593378791454183033462782979858514072308902674650045771055507800849486465809803916935499807865456253416581315053)*x + (21494486729457271460791809792415324819558589704023536918354077837870733105583442643953017558349507880699352837060897309091442056761*i+8634809401635549065710891758915584263269414269846028808630650435193406046303488307290946897537343211006446427539800736021730061162) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12650800267549450934554560603784419990273813056530484500656545087265445240534333438728449707929982106127796574464810815509322207538*i+6164732031364712926593378791454183033462782979858514072308902674650045771055507800849486465809803916935499807865456253416581315053)*x + (21494486729457271460791809792415324819558589704023536918354077837870733105583442643953017558349507880699352837060897309091442056761*i+8634809401635549065710891758915584263269414269846028808630650435193406046303488307290946897537343211006446427539800736021730061162) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3442587744604702941602123368548633040168876735886823138296718881032710953398749086020225221531311600066756069089193486176062863215*i+7963174259359964380382828223872487652117572336881739030155999817274573048654259540514584065642418114942820695328911114424956713913)*x + (21331215840100571876477667225551218233966845201317121419307320882973460242380331893182236970653493497218069524223537490082788746017*i+4718638022914799318729504893658621759332974345643389160743062483550681849130695277269495927323283481435193463384073487306544618977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3442587744604702941602123368548633040168876735886823138296718881032710953398749086020225221531311600066756069089193486176062863215*i+7963174259359964380382828223872487652117572336881739030155999817274573048654259540514584065642418114942820695328911114424956713913)*x + (21331215840100571876477667225551218233966845201317121419307320882973460242380331893182236970653493497218069524223537490082788746017*i+4718638022914799318729504893658621759332974345643389160743062483550681849130695277269495927323283481435193463384073487306544618977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16859973545733493816212694548445954788590756658519632370113417590723397614963198178762519740028057408812020874663969006921648112486*i+22479726897708865301823139076403290606164873827800183659014948923751550638675622443434686559212633101856771314961869416279227071836)*x + (18314517034860673388445315478983011537290069265184820542542508589190041695581713502102933050861729012563574098514620450204745698831*i+16648923988734785374148017561913135524792658396220585368107631818168240332185974143394518044186898568569317733891532617588704822197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16859973545733493816212694548445954788590756658519632370113417590723397614963198178762519740028057408812020874663969006921648112486*i+22479726897708865301823139076403290606164873827800183659014948923751550638675622443434686559212633101856771314961869416279227071836)*x + (18314517034860673388445315478983011537290069265184820542542508589190041695581713502102933050861729012563574098514620450204745698831*i+16648923988734785374148017561913135524792658396220585368107631818168240332185974143394518044186898568569317733891532617588704822197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11140138119820563367529242742974863725960530590578059612106573821896383280942478492012356638651412096246331185696234851588333448847*i+486721929345165637364551724297367095986417666915588313644108374946447346887105894897801349561456964061456842225030899238870351071)*x + (12637400873648981056922315003702987467223296869602572459012678915426129911624513211200904786463114632053613137063653590066497028475*i+13080731458444623724463955119486449905347143375455993578687050338306555141387093751332359580713180768380777879946180168617307723360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11140138119820563367529242742974863725960530590578059612106573821896383280942478492012356638651412096246331185696234851588333448847*i+486721929345165637364551724297367095986417666915588313644108374946447346887105894897801349561456964061456842225030899238870351071)*x + (12637400873648981056922315003702987467223296869602572459012678915426129911624513211200904786463114632053613137063653590066497028475*i+13080731458444623724463955119486449905347143375455993578687050338306555141387093751332359580713180768380777879946180168617307723360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5275580815864027356317429867316063519532160774676876814868642358795232311164313818700317884449498817989234445740875353688245302593*i+9909707623238018890951348825712227182276972113345189213046052788662197591484283516582735191019497320947633838916039587707418655362)*x + (14669629953520424659796825242242761344345231236948397897411289847658493225645804222696474796758579810569631903044419670403849852888*i+3936703823794777203562222260118259718863960273529977550375588146783234075126054488445252176018034047321111803398661198480034174154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5275580815864027356317429867316063519532160774676876814868642358795232311164313818700317884449498817989234445740875353688245302593*i+9909707623238018890951348825712227182276972113345189213046052788662197591484283516582735191019497320947633838916039587707418655362)*x + (14669629953520424659796825242242761344345231236948397897411289847658493225645804222696474796758579810569631903044419670403849852888*i+3936703823794777203562222260118259718863960273529977550375588146783234075126054488445252176018034047321111803398661198480034174154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3363614086428158520731690120913338623809366646207052690048780183868280487461326623044850721689030604348345711246251635306887642022*i+24274231967287553200562281441266341810628194701751550318615279160557657170791543013767175403588930541209267139610481969842686239192)*x + (17644358669798712075653926667105913974144258785339342575197637289167493396751531270151549543485128871067679794434499744539552302986*i+23121953209473751726857742649156274066911352400406241835977916422934366694496514966865794201616432524727668222334010254518158799317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3363614086428158520731690120913338623809366646207052690048780183868280487461326623044850721689030604348345711246251635306887642022*i+24274231967287553200562281441266341810628194701751550318615279160557657170791543013767175403588930541209267139610481969842686239192)*x + (17644358669798712075653926667105913974144258785339342575197637289167493396751531270151549543485128871067679794434499744539552302986*i+23121953209473751726857742649156274066911352400406241835977916422934366694496514966865794201616432524727668222334010254518158799317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23833419538387634426475379419861571906972732418281827354041326152274215332504542723504129647858713240015573150714853247162035000044*i+19002766119143568995076989642735152816412061373801405274371267668873736350734823076951275704838734390477288749393259105443701603449)*x + (11822745497132119941899431783273687206735546162501500225200739153748372996173021099121367774206245186106067084985364956345423012516*i+18661843670072082790671346955564093985783562336472462219429085589142839354719788669792582836657352104197065093445881852010274197014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23833419538387634426475379419861571906972732418281827354041326152274215332504542723504129647858713240015573150714853247162035000044*i+19002766119143568995076989642735152816412061373801405274371267668873736350734823076951275704838734390477288749393259105443701603449)*x + (11822745497132119941899431783273687206735546162501500225200739153748372996173021099121367774206245186106067084985364956345423012516*i+18661843670072082790671346955564093985783562336472462219429085589142839354719788669792582836657352104197065093445881852010274197014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6244702065763784561655069082608052832515772301753314089265161080254229532572565038485873228821502251817829720902581156348024250125*i+11975194816859894411881232582039218246207751928159458591094850034757353392004858965254557535769222254839618117908694649462555615231)*x + (17544602683602882498711907252880041164149818681488912055935240046080864010492259653330922048931002181610403571828439077420836564604*i+22539962024481891342265336298729401240899779477285897139982314578893543504509611702371237938473245187931146639221582601643614283805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6244702065763784561655069082608052832515772301753314089265161080254229532572565038485873228821502251817829720902581156348024250125*i+11975194816859894411881232582039218246207751928159458591094850034757353392004858965254557535769222254839618117908694649462555615231)*x + (17544602683602882498711907252880041164149818681488912055935240046080864010492259653330922048931002181610403571828439077420836564604*i+22539962024481891342265336298729401240899779477285897139982314578893543504509611702371237938473245187931146639221582601643614283805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11497558572165427329509867200417464147438759452288655996882909396636232139450009461113862127052312809023307012363509815459409177823*i+16696989032544412132555505778284895374085669880343396071689134239673660477819717300400593976683904180456620096944845607065265682870)*x + (23956724662648425975922924290799998836543472667631639856256583738169689188776270522190147500850640098148493735868317798107054707119*i+20998199475059347918025278314790874621314383258341619489023588122769999371852337894811562763599304435881240374461573166660605064947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11497558572165427329509867200417464147438759452288655996882909396636232139450009461113862127052312809023307012363509815459409177823*i+16696989032544412132555505778284895374085669880343396071689134239673660477819717300400593976683904180456620096944845607065265682870)*x + (23956724662648425975922924290799998836543472667631639856256583738169689188776270522190147500850640098148493735868317798107054707119*i+20998199475059347918025278314790874621314383258341619489023588122769999371852337894811562763599304435881240374461573166660605064947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19369078685719289685046818364976534569298128288732595977608489725420746951022201082859848776857736934476440456849400271070432780955*i+177765368763989344354667374527513299663119685823515696742488293295755708796316819530841809953260909401296327290338091554009681487)*x + (18042947497419720760382436502813970248765346947168523397336317830053381209419237141137333887744615633852518178057689368377110158356*i+1618136452020243934363138435525962883051698216888014562216497730804045235922275777498114938249560655608144763281961047933579661712) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19369078685719289685046818364976534569298128288732595977608489725420746951022201082859848776857736934476440456849400271070432780955*i+177765368763989344354667374527513299663119685823515696742488293295755708796316819530841809953260909401296327290338091554009681487)*x + (18042947497419720760382436502813970248765346947168523397336317830053381209419237141137333887744615633852518178057689368377110158356*i+1618136452020243934363138435525962883051698216888014562216497730804045235922275777498114938249560655608144763281961047933579661712) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3860169671141384007547437672274991152957392173706298659354093247672417033537671505459321051722351723280052489509523788123720699422*i+20546515373055714527435177571766189941451026652711818865691039042861062854384407902632374626036573120553038804946277022979475648417)*x + (14510037239292568664379816365639026143339836689732293589617469014814321184527665780290092534639045539184185219813647560714472715939*i+22443527194177073838724300873776405791493000159019412255934363912295725928586387439842244853415547592806310250876271737035453687802) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3860169671141384007547437672274991152957392173706298659354093247672417033537671505459321051722351723280052489509523788123720699422*i+20546515373055714527435177571766189941451026652711818865691039042861062854384407902632374626036573120553038804946277022979475648417)*x + (14510037239292568664379816365639026143339836689732293589617469014814321184527665780290092534639045539184185219813647560714472715939*i+22443527194177073838724300873776405791493000159019412255934363912295725928586387439842244853415547592806310250876271737035453687802) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11249625110164127394279575738961926094456780480022800425322891528030368150479613556052067940894329942738660329032069482235356395556*i+6790648105384359044710753055445088250319598262558003116007276127105316815125519501843532467155576184161367472566522820334196991259)*x + (1900790010454511823850983722452147101349287551308714206456047427815093643500192433282332477025689323052857919751677863781443328508*i+1364557048682652936397159303569057426056895860341818472137013483091267068973008710785537845619821891013167299743211853601419810116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11249625110164127394279575738961926094456780480022800425322891528030368150479613556052067940894329942738660329032069482235356395556*i+6790648105384359044710753055445088250319598262558003116007276127105316815125519501843532467155576184161367472566522820334196991259)*x + (1900790010454511823850983722452147101349287551308714206456047427815093643500192433282332477025689323052857919751677863781443328508*i+1364557048682652936397159303569057426056895860341818472137013483091267068973008710785537845619821891013167299743211853601419810116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14244471533958227734768836046780342259348877393674190942915710627502751334520604876552854217908836376829165753272664199368353052419*i+5040586275905271627529390012139471026268501595266804495464367425138852564732016942677834098372720849003455372633244265664254449076)*x + (16604782495076125547265184356901302449265117610480905432928509644649806701384425281935850885838424617477615631365219820527089755395*i+3311270317437899093001090866201767923287256149858543968727795699022151434014950093570747542316061764076879044936109418235038624147) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14244471533958227734768836046780342259348877393674190942915710627502751334520604876552854217908836376829165753272664199368353052419*i+5040586275905271627529390012139471026268501595266804495464367425138852564732016942677834098372720849003455372633244265664254449076)*x + (16604782495076125547265184356901302449265117610480905432928509644649806701384425281935850885838424617477615631365219820527089755395*i+3311270317437899093001090866201767923287256149858543968727795699022151434014950093570747542316061764076879044936109418235038624147) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (550084334938434018409818489962968453988747306143145789561654669255013705552268162350595093682544786062872372777122687799961270043*i+22878900474375432549788700999892285295674941788608738619710708683333645971672773864729501390754793804386519918783773210592238339713)*x + (13193333269008422094238091111989765174842586749740414395998825068098007793171940419110252351535297151016820534575438317500802803765*i+12806236355354358139068441815660351028420550510963315068480538292483585848237020550638510360875119566436411875283420981234270800198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (550084334938434018409818489962968453988747306143145789561654669255013705552268162350595093682544786062872372777122687799961270043*i+22878900474375432549788700999892285295674941788608738619710708683333645971672773864729501390754793804386519918783773210592238339713)*x + (13193333269008422094238091111989765174842586749740414395998825068098007793171940419110252351535297151016820534575438317500802803765*i+12806236355354358139068441815660351028420550510963315068480538292483585848237020550638510360875119566436411875283420981234270800198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11702513554485460356957777327032361284000182105830063924832159203778728381087025874365983326229451748760304247458702871876589257184*i+15044795308738044350763372005710602947776226047076621201909974690084484510600889398159549469573535387720850472075369899476464123549)*x + (10183853648679552218889389141571843408424378725435367695967052250073742120213899362240260323843029597172335514103583682953836956201*i+19563771544617031760951998988326754520929230589394032751615824829800253985778537997589540374804479339656147890507429065863202936453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11702513554485460356957777327032361284000182105830063924832159203778728381087025874365983326229451748760304247458702871876589257184*i+15044795308738044350763372005710602947776226047076621201909974690084484510600889398159549469573535387720850472075369899476464123549)*x + (10183853648679552218889389141571843408424378725435367695967052250073742120213899362240260323843029597172335514103583682953836956201*i+19563771544617031760951998988326754520929230589394032751615824829800253985778537997589540374804479339656147890507429065863202936453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (149707202675249627767662246300912934956244591050316960514570628263810659784019048066371461318722668095196818548600354130060490786*i+2582092544088129195164902667061975079775053703343699507387099823792087932926707086754153185426019534023792769086190223325221653805)*x + (13688666320041107346316917473403556781294166678746162175721169423049363024326933955300176968417840053191037192925310374782983359073*i+8499730461110210659089558841969220007810176901182325472318123552767988877773914338308114038610400087364847491919482060524938901449) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (149707202675249627767662246300912934956244591050316960514570628263810659784019048066371461318722668095196818548600354130060490786*i+2582092544088129195164902667061975079775053703343699507387099823792087932926707086754153185426019534023792769086190223325221653805)*x + (13688666320041107346316917473403556781294166678746162175721169423049363024326933955300176968417840053191037192925310374782983359073*i+8499730461110210659089558841969220007810176901182325472318123552767988877773914338308114038610400087364847491919482060524938901449) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2825319947557290102277803733887828167414526731925269293336350492921521629724957340597867223117285367170571816748614356637662160797*i+22128274909243058189947911880602740731939840931414500963765011589928710137533840882469458112322794953053222460514302587231662796195)*x + (7519623798349061664988897167491813876021569434667902537787357615078194082644237513434614621458887700778126355591309416435565530724*i+14750880596759191314522489311042305419391426566885393705463691707523219686916055015339251638977083680928956498562439500904491172786) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2825319947557290102277803733887828167414526731925269293336350492921521629724957340597867223117285367170571816748614356637662160797*i+22128274909243058189947911880602740731939840931414500963765011589928710137533840882469458112322794953053222460514302587231662796195)*x + (7519623798349061664988897167491813876021569434667902537787357615078194082644237513434614621458887700778126355591309416435565530724*i+14750880596759191314522489311042305419391426566885393705463691707523219686916055015339251638977083680928956498562439500904491172786) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21157827638587223052212496165705053628651904236615046193501892710398314218255929856494395290523672865260050829557504591993208906412*i+6603574726657076331278599835666682518094847604387215097099281162544072958580186969797811614919408298227010819617890390056214904441)*x + (16941247898311174831580522590618683138108931129087662167575759740929217757862765197885474029283154282322493496970619881653087700982*i+16301062751706447907607081844825224937567729647605029634599801667854159548736927770032432545910468049575249078641717990602434711977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21157827638587223052212496165705053628651904236615046193501892710398314218255929856494395290523672865260050829557504591993208906412*i+6603574726657076331278599835666682518094847604387215097099281162544072958580186969797811614919408298227010819617890390056214904441)*x + (16941247898311174831580522590618683138108931129087662167575759740929217757862765197885474029283154282322493496970619881653087700982*i+16301062751706447907607081844825224937567729647605029634599801667854159548736927770032432545910468049575249078641717990602434711977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10300394014611521176716803291753590135989261072428517553660635568956582923566924821348519142816754434520144807919307785138320323607*i+15989313117748160747875396375752551778360592370396262302127691429116451153961483291644244306578751804019942941085744414611590247247)*x + (12354418664552183000160937691570261904232484164484250632397032860302478171922523570309600975981367096232657602459503159960126878543*i+21695104818036384640330214714585781233576931902587700555292709777067660755320530604281952509222022673791470751207076967179637690409) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10300394014611521176716803291753590135989261072428517553660635568956582923566924821348519142816754434520144807919307785138320323607*i+15989313117748160747875396375752551778360592370396262302127691429116451153961483291644244306578751804019942941085744414611590247247)*x + (12354418664552183000160937691570261904232484164484250632397032860302478171922523570309600975981367096232657602459503159960126878543*i+21695104818036384640330214714585781233576931902587700555292709777067660755320530604281952509222022673791470751207076967179637690409) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12681289781498676786526403812561243288027052505161211553324130479575954852530862194693487298605113670134993426491311834414554512838*i+5728275054129307656077068633247346813038069261539215044371482410559683495796931953401900998304287942798731676763546790409345864829)*x + (24364480846178022115122451478860135711220441227553751188086722545396022141784596728663868427668073098059624544409929485927472518082*i+9546307518885875799675576771244232999290175842962398093981237664060069646788364753657056142132959800466890019520623137213631197735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12681289781498676786526403812561243288027052505161211553324130479575954852530862194693487298605113670134993426491311834414554512838*i+5728275054129307656077068633247346813038069261539215044371482410559683495796931953401900998304287942798731676763546790409345864829)*x + (24364480846178022115122451478860135711220441227553751188086722545396022141784596728663868427668073098059624544409929485927472518082*i+9546307518885875799675576771244232999290175842962398093981237664060069646788364753657056142132959800466890019520623137213631197735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8013853063956268654658998644619362231130118532994322356834161104381545976226550920981105851537758442089129761869331462115717130701*i+23835858182415762875131985980262274984412358014961723534396838159103986864580438262629069094130608126741790933576431353313771459794)*x + (16906511387369096797404130897338744658143349734944354748461445073784332602186189660249181433016872777546883948601122907927249445451*i+15427657572945430003586159865058201498705565393445077471889033293089642014999106765891440137731576114997675996478919547418801009856) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8013853063956268654658998644619362231130118532994322356834161104381545976226550920981105851537758442089129761869331462115717130701*i+23835858182415762875131985980262274984412358014961723534396838159103986864580438262629069094130608126741790933576431353313771459794)*x + (16906511387369096797404130897338744658143349734944354748461445073784332602186189660249181433016872777546883948601122907927249445451*i+15427657572945430003586159865058201498705565393445077471889033293089642014999106765891440137731576114997675996478919547418801009856) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18221675012217853100075977691725138385382027395099389329595553723025991187429535611208574667568686359122219354162697897683156453967*i+4069498619557590096212810297225393436695970261065942469603586462215347021573434287119739508119362557131274658776219550054589084431)*x + (3886035761717413736565247061336512064453066135714615988564858716916198102818913069740808719831756917645567555804209220344581591613*i+21702268799652630966971949711460211082550981734342932445474494025473118117688252804297458450664891984279681688114559065642929132701) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18221675012217853100075977691725138385382027395099389329595553723025991187429535611208574667568686359122219354162697897683156453967*i+4069498619557590096212810297225393436695970261065942469603586462215347021573434287119739508119362557131274658776219550054589084431)*x + (3886035761717413736565247061336512064453066135714615988564858716916198102818913069740808719831756917645567555804209220344581591613*i+21702268799652630966971949711460211082550981734342932445474494025473118117688252804297458450664891984279681688114559065642929132701) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16026535039589136899468433085481565472871722303360011062767136692181837417730739916870787936815079528253581261456596754541570180632*i+13942589112602367384881777322374651706590697675293786522352642876687649493927418339885316822046658132738952722166804651594077915356)*x + (17544052033740780243165747179703334325413838910201454558722814568385345599962201378111706634233890953978669783442456865788541052750*i+19590992460910237980078909818107123321318222383079166330279517695296730077568335636475796940898456563336382507961422729981494073495) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16026535039589136899468433085481565472871722303360011062767136692181837417730739916870787936815079528253581261456596754541570180632*i+13942589112602367384881777322374651706590697675293786522352642876687649493927418339885316822046658132738952722166804651594077915356)*x + (17544052033740780243165747179703334325413838910201454558722814568385345599962201378111706634233890953978669783442456865788541052750*i+19590992460910237980078909818107123321318222383079166330279517695296730077568335636475796940898456563336382507961422729981494073495) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11425199891736205729738661565330828734055543563462624748085287999110105506548072702607213123387904112810188309722321447654625491371*i+23946123736847926006247244203175546699641766738224520559034723837981401207302626067378697356396495093326560118347667010013526482525)*x + (14057322673534239453953357265027254719967476892015144688251517404641080004507648830316029204664979495234409078547153240620008318822*i+20664165616841481735698643589741233626460471624631118421537274031697521915703858459058374309725706794097541669525801706787943411543) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11425199891736205729738661565330828734055543563462624748085287999110105506548072702607213123387904112810188309722321447654625491371*i+23946123736847926006247244203175546699641766738224520559034723837981401207302626067378697356396495093326560118347667010013526482525)*x + (14057322673534239453953357265027254719967476892015144688251517404641080004507648830316029204664979495234409078547153240620008318822*i+20664165616841481735698643589741233626460471624631118421537274031697521915703858459058374309725706794097541669525801706787943411543) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20513930321868315927305983817181211511882979441004701520687783489887051393609385582499893747153373957070080587810270585887595938399*i+6869197619399235155519256066431817401767375705637814644173743737229320602626276087067953501604814133860216100626351196825918295482)*x + (3551021823389649354991920165726782360010629586379423164972267491122317065813785695513544458357857356298868456114674113849833967032*i+301340891412645397515250715124392196670061883951215877559151538173111762192666206343346883131084622271889484191964798694364956621) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20513930321868315927305983817181211511882979441004701520687783489887051393609385582499893747153373957070080587810270585887595938399*i+6869197619399235155519256066431817401767375705637814644173743737229320602626276087067953501604814133860216100626351196825918295482)*x + (3551021823389649354991920165726782360010629586379423164972267491122317065813785695513544458357857356298868456114674113849833967032*i+301340891412645397515250715124392196670061883951215877559151538173111762192666206343346883131084622271889484191964798694364956621) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3742736295714408217795908157891426472959570530569701932680578540841409852335584044485541612493471514772005996029826363841121328649*i+1379403880868599736448674957061018367318007979703189825957014711251947122047448196639711142571433181398079100449483467785579235938)*x + (19099364430347419975796478228239101614045191287027825822265353102748168399423410448645466251748011839767933150109351133274831528865*i+19339475800234368791816304472656335885366508860576536943683257295452374622294338344511108211174786975651348506593306677847042653130) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3742736295714408217795908157891426472959570530569701932680578540841409852335584044485541612493471514772005996029826363841121328649*i+1379403880868599736448674957061018367318007979703189825957014711251947122047448196639711142571433181398079100449483467785579235938)*x + (19099364430347419975796478228239101614045191287027825822265353102748168399423410448645466251748011839767933150109351133274831528865*i+19339475800234368791816304472656335885366508860576536943683257295452374622294338344511108211174786975651348506593306677847042653130) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15943354848637559740173778651498145470897625058498348584663731177194296252982885143027964947833877847672388754663114839112753492374*i+2218941660541068167709077336291079641741833365577949314988114504636434908303006391032761267585930435840665289144063075268804549081)*x + (16932289502122626728805980935673273768002586784886035350066286652916589120336352755897535194906629044344451021283457156260030231613*i+12240378391189707278912184620648525756361823687030614150426097559242942671220357385941570618013832298461322377094493064232652512465) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15943354848637559740173778651498145470897625058498348584663731177194296252982885143027964947833877847672388754663114839112753492374*i+2218941660541068167709077336291079641741833365577949314988114504636434908303006391032761267585930435840665289144063075268804549081)*x + (16932289502122626728805980935673273768002586784886035350066286652916589120336352755897535194906629044344451021283457156260030231613*i+12240378391189707278912184620648525756361823687030614150426097559242942671220357385941570618013832298461322377094493064232652512465) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15674601633887716462170142115809179960521230505558705254769373313810598546778547048421304632071065801627987452870938088758070263270*i+23179022849445689805361571326303764996564368992057467959552133351029978293212061497514752856706989839245895680472226141013464342694)*x + (20682048509333303605408546956125164232648127237492071437961633517645289726035323116674760036010896414514861665072473405963736086205*i+12437951412287120548409932286379642786336216548225688099893086594235010439301974958267550681991492945312943650499798393250344234084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15674601633887716462170142115809179960521230505558705254769373313810598546778547048421304632071065801627987452870938088758070263270*i+23179022849445689805361571326303764996564368992057467959552133351029978293212061497514752856706989839245895680472226141013464342694)*x + (20682048509333303605408546956125164232648127237492071437961633517645289726035323116674760036010896414514861665072473405963736086205*i+12437951412287120548409932286379642786336216548225688099893086594235010439301974958267550681991492945312943650499798393250344234084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21055213409490811597937853684295825408904158529401970127397178537172222645280533169885610710819914535118882088394400863198367169149*i+4276167592930180027940587635095604449400735652976479303126422715167097749331535548184964500113824473793417345661018075790702048037)*x + (24014028135925852436831585319722280424003334248636249276141792384415309857655687378013187787679447308819948026691571485024656499854*i+18964588072707441831756683686296039208358168073398588579641170270872033341714227913113385483183714074651606551945267501588405964252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21055213409490811597937853684295825408904158529401970127397178537172222645280533169885610710819914535118882088394400863198367169149*i+4276167592930180027940587635095604449400735652976479303126422715167097749331535548184964500113824473793417345661018075790702048037)*x + (24014028135925852436831585319722280424003334248636249276141792384415309857655687378013187787679447308819948026691571485024656499854*i+18964588072707441831756683686296039208358168073398588579641170270872033341714227913113385483183714074651606551945267501588405964252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7434654208963203565817315448164949194143869287650817931120880260205839493578971914803466685787991444403252009630294900275352941803*i+24293389825434213490226173930695788636814619377933638408481247852559959249983478717607932856170640792772389830786722727182753014216)*x + (3143466551631004402731595520449417592995077058126835562623362923575364916654681941329901626006994124889716123362871418313199499267*i+6473187532724367841987901374855376526284134911465853109451393413718302962356406201584901041881390564619671757514107581373240746437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [101]:
E56 = Phi56.codomain()
E56, E56.j_invariant()
Out[101]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7434654208963203565817315448164949194143869287650817931120880260205839493578971914803466685787991444403252009630294900275352941803*i+24293389825434213490226173930695788636814619377933638408481247852559959249983478717607932856170640792772389830786722727182753014216)*x + (3143466551631004402731595520449417592995077058126835562623362923575364916654681941329901626006994124889716123362871418313199499267*i+6473187532724367841987901374855376526284134911465853109451393413718302962356406201584901041881390564619671757514107581373240746437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 19565747674757421254880586776487718907763831207894595999145426937479764484546512065292760352161997715255715087708144173683629097445*i + 147959462976681888575211366478514590097009147322969862634525453311712922491148230314044311094492506048318521319070218664748742225)
In [102]:
E65 = Phi65.codomain()
E65, E65.j_invariant()
Out[102]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7434654208963203565817315448164949194143869287650817931120880260205839493578971914803466685787991444403252009630294900275352941803*i+24293389825434213490226173930695788636814619377933638408481247852559959249983478717607932856170640792772389830786722727182753014216)*x + (3143466551631004402731595520449417592995077058126835562623362923575364916654681941329901626006994124889716123362871418313199499267*i+6473187532724367841987901374855376526284134911465853109451393413718302962356406201584901041881390564619671757514107581373240746437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 19565747674757421254880586776487718907763831207894595999145426937479764484546512065292760352161997715255715087708144173683629097445*i + 147959462976681888575211366478514590097009147322969862634525453311712922491148230314044311094492506048318521319070218664748742225)
In [103]:
E56.j_invariant() == E65.j_invariant()
Out[103]:
True
In [104]:
a = E56.j_invariant()
a
Out[104]:
19565747674757421254880586776487718907763831207894595999145426937479764484546512065292760352161997715255715087708144173683629097445*i + 147959462976681888575211366478514590097009147322969862634525453311712922491148230314044311094492506048318521319070218664748742225
In [105]:
b = E65.j_invariant()
b, b.norm(), a.norm() == b.norm()
Out[105]:
(19565747674757421254880586776487718907763831207894595999145426937479764484546512065292760352161997715255715087708144173683629097445*i + 147959462976681888575211366478514590097009147322969862634525453311712922491148230314044311094492506048318521319070218664748742225,
 12731802020788625280437640619986989337673210207617421502779333249872047904746463056686503255681569622997452971193564933188789460691,
 True)
In [106]:
S2 = Mod(b.norm(), (l_A)^n_A)
S2
Out[106]:
10357977289597618529389338138192188329182175130094152332018441939
In [107]:
S1 = Mod(E34.j_invariant().norm(), (l_B)^n_B)
S1
Out[107]:
169743568965516384947270059537650157240795350437339719642819207565
In [108]:
R1 = P1 + Integer(S1) * Q1
R1
Out[108]:
(2091543116941117639868845282444458008232032728104584128187412971590147446923963291555320709004277801963609847520885380268861851866*i + 23282926934533621689855429415983783939939878417843093170191544556203280508484538415088624699921287573908725727115193714887205167596 : 14146790827839409653135008042040507649276931480300766192580646579626869191520714167359638317059570216608490128715111303920890301805*i + 2783263085773338323869982144023252152291420064856777985220550365686535531132705704926856861962315190484156962529960322448898499292 : 1)
In [109]:
Phi1 = isogeny_walk (E, R1, l_B, n_B)
Phi1
Out[109]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16264328278441693026446628550150754358028597070839862896395824851591678174920761704289096293504878615679540011251399434411416908669*i+37908285522918324500945949253535104230646997693213226140160460062501)*x + (11093789427780056109713931727046060078870013396590862878855222423576074114080494179648839400502504771751962687177082668902732466929*i+24439423661345221551909145011457493619085780243761596511325807025357279951401715818213432792840763754593337942344430590026542221371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16264328278441693026446628550150754358028597070839862896395824851591678174920761704289096293504878615679540011251399434411416908669*i+37908285522918324500945949253535104230646997693213226140160460062501)*x + (11093789427780056109713931727046060078870013396590862878855222423576074114080494179648839400502504771751962687177082668902732466929*i+24439423661345221551909145011457493619085780243761596511325807025357279951401715818213432792840763754593337942344430590026542221371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23673413115031571135727729863718690998127148017048034919475293230998593815969834580135162139277228968226927732290388295630352031648*i+23185986457803467989384313484886955096768607087071215143415886718945174597336273789352875421943676753952235612399909562944164416255)*x + (17395431058675083554615701539602992155234350486729709548401021122951751982456266713034767174313671524029585037826500549919823974730*i+1345234880532227913035668982225774375856926102156149746836896671139073249249630413900166622428244942092617913805821397689795394580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23673413115031571135727729863718690998127148017048034919475293230998593815969834580135162139277228968226927732290388295630352031648*i+23185986457803467989384313484886955096768607087071215143415886718945174597336273789352875421943676753952235612399909562944164416255)*x + (17395431058675083554615701539602992155234350486729709548401021122951751982456266713034767174313671524029585037826500549919823974730*i+1345234880532227913035668982225774375856926102156149746836896671139073249249630413900166622428244942092617913805821397689795394580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4178645906006929076022983979384107923693138643419391319675895302614114922641044299731276390220611492310631201644240727923458755439*i+18451827325683674382009458347136166337060810337185649371969290617084720379208836621338278137889229832267018241238585244161903767223)*x + (18609172180157637306771828507439011874391359280506509171212740270362194999190782304019500787803306797297419200038050478819001004946*i+12577482241258738125366432080027465326741923093524633840984924489746302823474956297308930255486884194096235601461827149106000270825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4178645906006929076022983979384107923693138643419391319675895302614114922641044299731276390220611492310631201644240727923458755439*i+18451827325683674382009458347136166337060810337185649371969290617084720379208836621338278137889229832267018241238585244161903767223)*x + (18609172180157637306771828507439011874391359280506509171212740270362194999190782304019500787803306797297419200038050478819001004946*i+12577482241258738125366432080027465326741923093524633840984924489746302823474956297308930255486884194096235601461827149106000270825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20528517889188714127538378085871621903777823912979867997487156380774999860091091494358748789670809518696359910200556260237362910500*i+9412052876193228431019208727173104708583342174322219216027805382085265235380629874837870735197981520801921285156679780243888423514)*x + (23413122488885930330369080298088456847664360212659831899991981848662792312549773771654431347838282723388345840786075584450717439879*i+2454458935215183717085633981948286520410434375956812436788201760694664447553749486106610313360621100912785255446110409279652788878) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20528517889188714127538378085871621903777823912979867997487156380774999860091091494358748789670809518696359910200556260237362910500*i+9412052876193228431019208727173104708583342174322219216027805382085265235380629874837870735197981520801921285156679780243888423514)*x + (23413122488885930330369080298088456847664360212659831899991981848662792312549773771654431347838282723388345840786075584450717439879*i+2454458935215183717085633981948286520410434375956812436788201760694664447553749486106610313360621100912785255446110409279652788878) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23881868248248064394749946405698182078732710001636552182468146502406352190954194695913600639875147249161647958675103011324212223404*i+10104003865681394899926174479651998477234580677799066691736127576727338686385231687631526439802724830724101341084842276319633649623)*x + (23051862702887627406161563836109177103367236445467092792422696408514247184351847458704586578740028212847489719836709776851757810652*i+3118794379495830778001864163366220110257285948400631998211305026083932098335009772585004031726590408354560094240855075878840177451) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23881868248248064394749946405698182078732710001636552182468146502406352190954194695913600639875147249161647958675103011324212223404*i+10104003865681394899926174479651998477234580677799066691736127576727338686385231687631526439802724830724101341084842276319633649623)*x + (23051862702887627406161563836109177103367236445467092792422696408514247184351847458704586578740028212847489719836709776851757810652*i+3118794379495830778001864163366220110257285948400631998211305026083932098335009772585004031726590408354560094240855075878840177451) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11519616006019473689311569559680994152666339664875413536790306442095227096786930671596096635088449672315317516018276693487811576300*i+17717602652393895684384528676401847896522076266239004666131147280096433533971224852964671960233021753410390287966188292293286806593)*x + (8235173622483812017013274026488826666929939508861320424840353959123702741461743369206646712803282295512463394311099679508393226114*i+16486690740105863832282929598854092032884812540727925679597532389269869845188390862976492955083901209711269307352220277861698582354) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11519616006019473689311569559680994152666339664875413536790306442095227096786930671596096635088449672315317516018276693487811576300*i+17717602652393895684384528676401847896522076266239004666131147280096433533971224852964671960233021753410390287966188292293286806593)*x + (8235173622483812017013274026488826666929939508861320424840353959123702741461743369206646712803282295512463394311099679508393226114*i+16486690740105863832282929598854092032884812540727925679597532389269869845188390862976492955083901209711269307352220277861698582354) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18878783688591461975088942407288306735188098471886497884201199646888688532055888538170462881903059359550382972437402463022913640398*i+3160048612814568823355166491080089550618751065462452232475668341564300739855081830744179094129234831107502170425127408219706103946)*x + (4200676031932668336837540095196204710038672373576268183638242730149002008037698008717564100361682659627608130652633982235660036131*i+526031473008537503981820723194436878672960358294688512480298667651278088073881999724316284292901422500197566506370123116450772594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18878783688591461975088942407288306735188098471886497884201199646888688532055888538170462881903059359550382972437402463022913640398*i+3160048612814568823355166491080089550618751065462452232475668341564300739855081830744179094129234831107502170425127408219706103946)*x + (4200676031932668336837540095196204710038672373576268183638242730149002008037698008717564100361682659627608130652633982235660036131*i+526031473008537503981820723194436878672960358294688512480298667651278088073881999724316284292901422500197566506370123116450772594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3227998383550905012696891704511650001882099675994840744232297351171305003046810863172988905521735364775000990465757275808996241000*i+17328831739436764941275058000620504143448770444532616188070528205247538218968812326993825917126973259251835643902172900472932379972)*x + (3832149700751761981050794120328460847880849093779015327316092906696262980860406678230059350010301221463687666346315129373724586670*i+18449530184513618088554499335035723399752551236101209028745621298992282796926723869872711295469931411721759924654485362664668772272) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3227998383550905012696891704511650001882099675994840744232297351171305003046810863172988905521735364775000990465757275808996241000*i+17328831739436764941275058000620504143448770444532616188070528205247538218968812326993825917126973259251835643902172900472932379972)*x + (3832149700751761981050794120328460847880849093779015327316092906696262980860406678230059350010301221463687666346315129373724586670*i+18449530184513618088554499335035723399752551236101209028745621298992282796926723869872711295469931411721759924654485362664668772272) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8239086579677061199130204112873352020792804752742187492777651454048934821621147199921773037042867306670305916415250664878220727581*i+12962759003578859172841129223691363326918895878044653448056701900890587378417524812852746191262912113965176744238425531416552475962)*x + (4501726263185161591641878386636930261424510505022494735896500890475528302780575029322305941757758934562321770936298742383940906365*i+6509203903060606007818973787531682602779837411815609905225247481010344051140145851666750042936036174955416486057800795487028200799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8239086579677061199130204112873352020792804752742187492777651454048934821621147199921773037042867306670305916415250664878220727581*i+12962759003578859172841129223691363326918895878044653448056701900890587378417524812852746191262912113965176744238425531416552475962)*x + (4501726263185161591641878386636930261424510505022494735896500890475528302780575029322305941757758934562321770936298742383940906365*i+6509203903060606007818973787531682602779837411815609905225247481010344051140145851666750042936036174955416486057800795487028200799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (713920694407623308316024607645564976974134125142065358653604017854705065293672464677708957730889509382787391021327130646747733813*i+141603180914807194404420684964758375889592067408599227234890146286684255085607846618897327634982447245853391942434663211419791338)*x + (12966182789885301177562437011166247503723870307738010773270982258182546927665995086200607508272000162331065290460808192673996618148*i+3251254781175283253624044033328450478922542681418124168260954415807170885553621516845042708033890249944582063706490473673435209019) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (713920694407623308316024607645564976974134125142065358653604017854705065293672464677708957730889509382787391021327130646747733813*i+141603180914807194404420684964758375889592067408599227234890146286684255085607846618897327634982447245853391942434663211419791338)*x + (12966182789885301177562437011166247503723870307738010773270982258182546927665995086200607508272000162331065290460808192673996618148*i+3251254781175283253624044033328450478922542681418124168260954415807170885553621516845042708033890249944582063706490473673435209019) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23864797850188257187263946550236914259464477072950914661242303452384513369197463571251612369748551607115150813368470870596660522256*i+24188108313215969637440851247223946899622355487832795676209772521376022921972412096329781440896003830185052726497688379733505591169)*x + (8502036561062866223786574972730484956742399876809274598692945561023948408807585012453574396005688159708172064510197079887691630843*i+7209608657818344428862734748433598530272357928802279608322278497965786370731829729772762214734910341640459242991541262373220663058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23864797850188257187263946550236914259464477072950914661242303452384513369197463571251612369748551607115150813368470870596660522256*i+24188108313215969637440851247223946899622355487832795676209772521376022921972412096329781440896003830185052726497688379733505591169)*x + (8502036561062866223786574972730484956742399876809274598692945561023948408807585012453574396005688159708172064510197079887691630843*i+7209608657818344428862734748433598530272357928802279608322278497965786370731829729772762214734910341640459242991541262373220663058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6582998983974167905201985300684642250341497519271792050068130739515251590607518592639430822497458161606837025824340906395847192412*i+2818157594549248040684810279329181109839586935520255810299940372959598140246663141357729432353158863030069323865784755504637692266)*x + (16408953497499429950718125353122995391262554137344298913283146949677140350585277658006805781355083689391892916357250776110199290047*i+22883801979810989166817093053354867722125704710753315386896907529572809335956207998215917445425259192149837396119115882845945725150) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6582998983974167905201985300684642250341497519271792050068130739515251590607518592639430822497458161606837025824340906395847192412*i+2818157594549248040684810279329181109839586935520255810299940372959598140246663141357729432353158863030069323865784755504637692266)*x + (16408953497499429950718125353122995391262554137344298913283146949677140350585277658006805781355083689391892916357250776110199290047*i+22883801979810989166817093053354867722125704710753315386896907529572809335956207998215917445425259192149837396119115882845945725150) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23982109775644950509826027970604159762403846145344675605135887610117208808329100932167411964781664262410013081601268217965584033411*i+11271898532682079196384243678488034699913299045683949058197303782840569937091222941004693059759023167054651532207096383586846445046)*x + (7414529179059122385257806699494375004250742609491198035769212280132924698005542443893640793500994028478013826595352719489790590598*i+17290780119336388207829268391019603983323192887548379144837580877157060230282330212478362781078809322780075893838625896650023954656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23982109775644950509826027970604159762403846145344675605135887610117208808329100932167411964781664262410013081601268217965584033411*i+11271898532682079196384243678488034699913299045683949058197303782840569937091222941004693059759023167054651532207096383586846445046)*x + (7414529179059122385257806699494375004250742609491198035769212280132924698005542443893640793500994028478013826595352719489790590598*i+17290780119336388207829268391019603983323192887548379144837580877157060230282330212478362781078809322780075893838625896650023954656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9891571852028179624325119434173251118458464664489660163694664677947389054071350329543566000072888888566049046988465918742534850337*i+13206609100303861467164827025195226000938576250978873757863613840404846761898627231207576850824721917812539952693983240041184088031)*x + (23138537354492133292981948524810218609960120568921602304837329122173462472324551442292146988450984688428897966305985201877780934962*i+1930389191387357283313001974309008991025044679841356674432532777441550673614572001227207082098306482049678027314464089744229842511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9891571852028179624325119434173251118458464664489660163694664677947389054071350329543566000072888888566049046988465918742534850337*i+13206609100303861467164827025195226000938576250978873757863613840404846761898627231207576850824721917812539952693983240041184088031)*x + (23138537354492133292981948524810218609960120568921602304837329122173462472324551442292146988450984688428897966305985201877780934962*i+1930389191387357283313001974309008991025044679841356674432532777441550673614572001227207082098306482049678027314464089744229842511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8886272520977703482256560220253139762000852237606363878787847850478226514216430625483662143156195128628031673653724451166742903408*i+14803866353088989466890471186941270314432187589480482534178562011652237813494776583484399943310595935676009047686167651611674382761)*x + (14452469429147907890920208803240515333420318437956786056225346890269855327854715993121027793807906156207523250808671615824893901529*i+8426174459332150126496464348791078305317306071856936436670456014566720628681630839150457508093969034955464229040760310642935303773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8886272520977703482256560220253139762000852237606363878787847850478226514216430625483662143156195128628031673653724451166742903408*i+14803866353088989466890471186941270314432187589480482534178562011652237813494776583484399943310595935676009047686167651611674382761)*x + (14452469429147907890920208803240515333420318437956786056225346890269855327854715993121027793807906156207523250808671615824893901529*i+8426174459332150126496464348791078305317306071856936436670456014566720628681630839150457508093969034955464229040760310642935303773) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10421516449351150535645683650315213536775655568534787842936112231612652733544720246342775107834579930898551552781465510535323755159*i+4692258907469003477964690610995423191591886949603845715535676753930213401925530274387274641536457166218047569834592508754632522642)*x + (875139176249441526434940640135522452139405561838335852842191270122527968353110845211241114150812764132499879492049428235893643286*i+3926529747892198645164537074169539456911667790630648700670525998972404346509702021621066069561936676844353346135157058537769418804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10421516449351150535645683650315213536775655568534787842936112231612652733544720246342775107834579930898551552781465510535323755159*i+4692258907469003477964690610995423191591886949603845715535676753930213401925530274387274641536457166218047569834592508754632522642)*x + (875139176249441526434940640135522452139405561838335852842191270122527968353110845211241114150812764132499879492049428235893643286*i+3926529747892198645164537074169539456911667790630648700670525998972404346509702021621066069561936676844353346135157058537769418804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18948427661476314132863128959604455643069656701530254045715162941592159223096888486976509629067257174942050057623561989241803989102*i+23483386445287906851649767570664991279915770656538671580366209762904000450485191830242757915323674334754555115800462342500270614802)*x + (8836265798639696768776236000685572083743015493917751729737887225942938759720782726183518202491430918319636386091652644177772987448*i+6692251836826530461900689471204851087686686262874244573665433231346540015988058540457201451044773491193606383757868556041043576557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18948427661476314132863128959604455643069656701530254045715162941592159223096888486976509629067257174942050057623561989241803989102*i+23483386445287906851649767570664991279915770656538671580366209762904000450485191830242757915323674334754555115800462342500270614802)*x + (8836265798639696768776236000685572083743015493917751729737887225942938759720782726183518202491430918319636386091652644177772987448*i+6692251836826530461900689471204851087686686262874244573665433231346540015988058540457201451044773491193606383757868556041043576557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10302978024281998222614484190902266483666899177628513872757711839676939222963216602178997269203904990119528106172850595535760861681*i+23212077157315081976036558206381814282604989650643876752540567186829439008271364600179137814275864554281436619953592178895250666886)*x + (2277063540761788749347456319744617116087432932621882943037051263920643813784421639631384835749676193865633368922026679393395290570*i+4232214779014204549641736891043365703932568653681102205203764398950145424691568539698788985862574443285964192865187581783701478242) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10302978024281998222614484190902266483666899177628513872757711839676939222963216602178997269203904990119528106172850595535760861681*i+23212077157315081976036558206381814282604989650643876752540567186829439008271364600179137814275864554281436619953592178895250666886)*x + (2277063540761788749347456319744617116087432932621882943037051263920643813784421639631384835749676193865633368922026679393395290570*i+4232214779014204549641736891043365703932568653681102205203764398950145424691568539698788985862574443285964192865187581783701478242) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12391415200898895141291875545348802652894292408722874153508998614010116822384185063452454813150643523284758944455252497230569853867*i+1176174570118715667436288485723417415293438184749470475215261128215672324592096829855411881543878231185461937976703880690917002784)*x + (8173117928073289995639611547933837579782639250463292872317898902107403005195347328147145554562567276343512456236652691422733092137*i+20906498246077130450216106159091119101315271761796568369667442690939479575044899261405717664473937082941255086737601414865797091558) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12391415200898895141291875545348802652894292408722874153508998614010116822384185063452454813150643523284758944455252497230569853867*i+1176174570118715667436288485723417415293438184749470475215261128215672324592096829855411881543878231185461937976703880690917002784)*x + (8173117928073289995639611547933837579782639250463292872317898902107403005195347328147145554562567276343512456236652691422733092137*i+20906498246077130450216106159091119101315271761796568369667442690939479575044899261405717664473937082941255086737601414865797091558) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17062929478981711756863696908301403587221713237055817865402336801791113086715374168409224319313219356888692762315572212845790261784*i+4125308962533695037325159361020903212437993146328133251051699733324507038616387642219920400074192385281915576769695370289630968205)*x + (15736993019688138369723195088874890085963528479141896261560519086654116631143902373052724774426991032220404060176336763997445714280*i+11734911985802060990447875362790013584924899431209726431585969260839373922102411933038836871891170656515550215540106118515339820430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17062929478981711756863696908301403587221713237055817865402336801791113086715374168409224319313219356888692762315572212845790261784*i+4125308962533695037325159361020903212437993146328133251051699733324507038616387642219920400074192385281915576769695370289630968205)*x + (15736993019688138369723195088874890085963528479141896261560519086654116631143902373052724774426991032220404060176336763997445714280*i+11734911985802060990447875362790013584924899431209726431585969260839373922102411933038836871891170656515550215540106118515339820430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21723985773140261651578563318182512561718777688747903427408746884435796889066249682675410167181973079256845364037153154992891636061*i+4038271388307395063769232417665470573310665166447044984996390870790663316415076268901773270148456634341650958705667405061865348517)*x + (16634365894573918919510549502446414044786790525585730887887994817657326915954779500327506522630149917301027267199365147204096800215*i+9217872933293735830748001105781264568727949112435614936457211557708427505296376128817443516486056871562140501824434765900969601407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21723985773140261651578563318182512561718777688747903427408746884435796889066249682675410167181973079256845364037153154992891636061*i+4038271388307395063769232417665470573310665166447044984996390870790663316415076268901773270148456634341650958705667405061865348517)*x + (16634365894573918919510549502446414044786790525585730887887994817657326915954779500327506522630149917301027267199365147204096800215*i+9217872933293735830748001105781264568727949112435614936457211557708427505296376128817443516486056871562140501824434765900969601407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23467421062035584004020107903788520055653652683690299654334029536273819740729965733813200439748611041833873615819981308468026394926*i+11971789062289221234634775214052243555980621461416598950375848536168130942331127040115085900851502367571419000028921730278441709218)*x + (24197693025040359121171726006896841346450703494414566747316175229431482720971642580019687240483922826626683757836132489089313283613*i+3949182188271904760570147279977556114683412249501788113568295158684061534663330591710626059201806188543620514621160177419260265833) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23467421062035584004020107903788520055653652683690299654334029536273819740729965733813200439748611041833873615819981308468026394926*i+11971789062289221234634775214052243555980621461416598950375848536168130942331127040115085900851502367571419000028921730278441709218)*x + (24197693025040359121171726006896841346450703494414566747316175229431482720971642580019687240483922826626683757836132489089313283613*i+3949182188271904760570147279977556114683412249501788113568295158684061534663330591710626059201806188543620514621160177419260265833) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1132387684525226863641727389824082537653756826012317969548609494892113057477093100903108703945695002563397838436656373764324520869*i+19134219073798986627299674544078834168667987347900631071754902120127704418989985160083597120103890667441220644645618934896299135679)*x + (23085433758926733326471363116290548316028687542063123769577479278751527793488159666960617119329890609332673696797817779677483515377*i+1231341283364114870478904507814472705351179516142994190475668928818911845039811460995352352028030485081627235062157978901113452267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1132387684525226863641727389824082537653756826012317969548609494892113057477093100903108703945695002563397838436656373764324520869*i+19134219073798986627299674544078834168667987347900631071754902120127704418989985160083597120103890667441220644645618934896299135679)*x + (23085433758926733326471363116290548316028687542063123769577479278751527793488159666960617119329890609332673696797817779677483515377*i+1231341283364114870478904507814472705351179516142994190475668928818911845039811460995352352028030485081627235062157978901113452267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4645723608858115194970022071573541178311099368114011207451616069286089649229580370134157871987283205854974714286460871831488678196*i+362895954470626343902732984905823386750818393188022914224615065887297307296271770045125041268630807252117269317051712811997324400)*x + (16208385495152533294032710992967093719281194289378410975011778107944543456100728653425316549785668415033088953688399065760987494680*i+37534122519820436780983306517175826720136075189399443326122017253770113116323206433795135410580168498862616895617112648022567455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4645723608858115194970022071573541178311099368114011207451616069286089649229580370134157871987283205854974714286460871831488678196*i+362895954470626343902732984905823386750818393188022914224615065887297307296271770045125041268630807252117269317051712811997324400)*x + (16208385495152533294032710992967093719281194289378410975011778107944543456100728653425316549785668415033088953688399065760987494680*i+37534122519820436780983306517175826720136075189399443326122017253770113116323206433795135410580168498862616895617112648022567455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19420397114293670918678534405862425837760171990924136991389090114688773779280119753918937257429057827665896382266152304913018237972*i+7587759760610641912052128846524894941920911296555549993948006526947901642465829204411556832899645753075991539116730111837376738703)*x + (18723767547574443158872597953854830829454002264808330056967211122927303387761375250167661278280956964454471201216399953694957907295*i+22926772238826592382803126516749800234052688863899671057588660321305839069613785810621575475809530548204344934279109930698909534625) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19420397114293670918678534405862425837760171990924136991389090114688773779280119753918937257429057827665896382266152304913018237972*i+7587759760610641912052128846524894941920911296555549993948006526947901642465829204411556832899645753075991539116730111837376738703)*x + (18723767547574443158872597953854830829454002264808330056967211122927303387761375250167661278280956964454471201216399953694957907295*i+22926772238826592382803126516749800234052688863899671057588660321305839069613785810621575475809530548204344934279109930698909534625) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5063650971519431885460892417771549402086081488781680214325988220316281139464576811873731699134406090046606158289584303541925947115*i+23738334816730815016065103132057037302687017103499142557963060494276701176967574162600674574765902489037910532883706011987527164694)*x + (11881511070897881776454637294897512156633522662002106337435029500953124202078720855635937388886857642460413595158065897025237214903*i+13756604729814885995639796205617867879172949829640952004049650284404070834072321538962877854983522223322821167073854724239728756935) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5063650971519431885460892417771549402086081488781680214325988220316281139464576811873731699134406090046606158289584303541925947115*i+23738334816730815016065103132057037302687017103499142557963060494276701176967574162600674574765902489037910532883706011987527164694)*x + (11881511070897881776454637294897512156633522662002106337435029500953124202078720855635937388886857642460413595158065897025237214903*i+13756604729814885995639796205617867879172949829640952004049650284404070834072321538962877854983522223322821167073854724239728756935) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19091420377165661601008272052327794331051491487434342973756945095138377464941809200596665309824824251505142652890885971738180353180*i+19922822813690897028761408811767639783944657239616519498104274776946034454184908949176464296198780604512415572190842736698728501761)*x + (6976011298180445355799626187055699896835030768440496712585152368337515009406557795789782611609539087267731537239502770531473156774*i+18882211260560289544481469777243508320121334088201865953862297251385125189698378312792929190101797356862964294847599667163638394348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19091420377165661601008272052327794331051491487434342973756945095138377464941809200596665309824824251505142652890885971738180353180*i+19922822813690897028761408811767639783944657239616519498104274776946034454184908949176464296198780604512415572190842736698728501761)*x + (6976011298180445355799626187055699896835030768440496712585152368337515009406557795789782611609539087267731537239502770531473156774*i+18882211260560289544481469777243508320121334088201865953862297251385125189698378312792929190101797356862964294847599667163638394348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21920692551945358266324591421167663846296142447260574487363794579194179680329889161365094209728111190306857777257846470980251272491*i+19177103829739491857777804027062232190096835187579536149868213815136336815134242163948367747812893298133772356623675074896866006142)*x + (19273937267338809736955335971487792475935397583362303874261787254476770658073435058237903159702932909610063396381264887267696692711*i+13163421839041974307690517915507551658847735777765171467505496167470204013954218660761853620195370017924652846684573414396029130851) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21920692551945358266324591421167663846296142447260574487363794579194179680329889161365094209728111190306857777257846470980251272491*i+19177103829739491857777804027062232190096835187579536149868213815136336815134242163948367747812893298133772356623675074896866006142)*x + (19273937267338809736955335971487792475935397583362303874261787254476770658073435058237903159702932909610063396381264887267696692711*i+13163421839041974307690517915507551658847735777765171467505496167470204013954218660761853620195370017924652846684573414396029130851) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19687206803641339888372011608759748812437675458984603548055536850915937810922719982551963170228345666003586720538865744513143401428*i+23198374050968788712158698512781874557434603918628494337510189326675974329411599857089319727663138417814978516820699910552138047680)*x + (21688130774061116183790570894991045007192056582479657117119105083211334645283457542798909744704384040884322650618573145665915307083*i+14332530367816112874556293481709787575982189460087614490840265890400031133627391476656320142300512118380153003670278795011159229748) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19687206803641339888372011608759748812437675458984603548055536850915937810922719982551963170228345666003586720538865744513143401428*i+23198374050968788712158698512781874557434603918628494337510189326675974329411599857089319727663138417814978516820699910552138047680)*x + (21688130774061116183790570894991045007192056582479657117119105083211334645283457542798909744704384040884322650618573145665915307083*i+14332530367816112874556293481709787575982189460087614490840265890400031133627391476656320142300512118380153003670278795011159229748) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5843832620182120131033061518446265358355048634954275546228456195714231884140087945559791159232093913230543367036490406756595399671*i+9897852235739788609324511565906511438417429824990539282212885834528623545413566190219275279131255521770330392042447716383481976629)*x + (15873036324756306859985034549345478888444098711308675738289198354906458301247913537505074458264896716228511559624159131979100295249*i+16219391170762811893059651948418742014081986673332042777697425085114572455777413472604131682497748489217845414029269777381409824397) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5843832620182120131033061518446265358355048634954275546228456195714231884140087945559791159232093913230543367036490406756595399671*i+9897852235739788609324511565906511438417429824990539282212885834528623545413566190219275279131255521770330392042447716383481976629)*x + (15873036324756306859985034549345478888444098711308675738289198354906458301247913537505074458264896716228511559624159131979100295249*i+16219391170762811893059651948418742014081986673332042777697425085114572455777413472604131682497748489217845414029269777381409824397) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24197053580839503487084683326401233444939116825495765725716746204743071687862453562621285462492859323093327652978103642791873029635*i+18894531274356375599239976283980584032665563557667680216960907540326397225351810794868632374599444051962978254946591036493779483143)*x + (21713747292805452431273331821593070774892450963761723219034879608449397437873984039312719870220757572048436845172592779671517912688*i+8402017473181194600941924747276851555675028044451975171367477741776524486862779512804435474966342640087843624495166153738060908056) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24197053580839503487084683326401233444939116825495765725716746204743071687862453562621285462492859323093327652978103642791873029635*i+18894531274356375599239976283980584032665563557667680216960907540326397225351810794868632374599444051962978254946591036493779483143)*x + (21713747292805452431273331821593070774892450963761723219034879608449397437873984039312719870220757572048436845172592779671517912688*i+8402017473181194600941924747276851555675028044451975171367477741776524486862779512804435474966342640087843624495166153738060908056) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17710244299023957114266194118165591790482839499293776096816707136226787763804677079146424203666169553802095593742011012729088487502*i+19958734125655402565900871655833288994092893087200698164000576371185369108430326874772432088616770202291531110675484023143031539864)*x + (13766662938681030229774149313042067218796860790448380406101100057927658820191036095414639223222415548159694470168776916959047163208*i+24064936408113466983402233630366815270099635168097609212886088656769470869484198204425713918610383037775100630680600134091457337225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17710244299023957114266194118165591790482839499293776096816707136226787763804677079146424203666169553802095593742011012729088487502*i+19958734125655402565900871655833288994092893087200698164000576371185369108430326874772432088616770202291531110675484023143031539864)*x + (13766662938681030229774149313042067218796860790448380406101100057927658820191036095414639223222415548159694470168776916959047163208*i+24064936408113466983402233630366815270099635168097609212886088656769470869484198204425713918610383037775100630680600134091457337225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (225449808342056716070830706417894227519091924089685819235945721599585447373608513982246457767723011703151067416692516133151595628*i+9279110562346607548233189536932355095003473359276716488592072485918862010352618296131612796071375657108677424798737339588055049304)*x + (10353254736101524866627207480102702343329557085045717398141778859988360777347208430176903820967854559769185443938513875915656783349*i+13080839519399816224599098985611973151743980563241288695131293407630037974575345941798066835822270924117841120714253439699565183530) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (225449808342056716070830706417894227519091924089685819235945721599585447373608513982246457767723011703151067416692516133151595628*i+9279110562346607548233189536932355095003473359276716488592072485918862010352618296131612796071375657108677424798737339588055049304)*x + (10353254736101524866627207480102702343329557085045717398141778859988360777347208430176903820967854559769185443938513875915656783349*i+13080839519399816224599098985611973151743980563241288695131293407630037974575345941798066835822270924117841120714253439699565183530) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20781473261163185104175587135806834096805485331222599023891693828573720851518421437948451680559719600596307480856783106584559074253*i+19755534311974665585515645659471523827126126718301559460180172140821892808948229256161326040847138603207490541817339444436927015771)*x + (4845343663044033626889837930524102886540474669964559862533899729551703511718588131719267583302039019053775216953267070925640556035*i+24121525975640749782346078507383556867723772366168462639988382980666372197432990537046930515475420246423308334789099240677458195815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20781473261163185104175587135806834096805485331222599023891693828573720851518421437948451680559719600596307480856783106584559074253*i+19755534311974665585515645659471523827126126718301559460180172140821892808948229256161326040847138603207490541817339444436927015771)*x + (4845343663044033626889837930524102886540474669964559862533899729551703511718588131719267583302039019053775216953267070925640556035*i+24121525975640749782346078507383556867723772366168462639988382980666372197432990537046930515475420246423308334789099240677458195815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20898383412010362067216468277055750438280295372571094833602986544335316142958370337115595448846899456451380998188885951018666901165*i+581051545512427002108638865734649185470682384360429894814923672505943463334862501516289952069974518159142766207032876624699820797)*x + (10653473584782509168769516803182168466547508644058773104267098692432766358293014440323676445801404721798446627722267893460580486717*i+13569310046658061883811301121307124894657522285455408019309924985076820304631084833125638911657058799577525163171846901850023310827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20898383412010362067216468277055750438280295372571094833602986544335316142958370337115595448846899456451380998188885951018666901165*i+581051545512427002108638865734649185470682384360429894814923672505943463334862501516289952069974518159142766207032876624699820797)*x + (10653473584782509168769516803182168466547508644058773104267098692432766358293014440323676445801404721798446627722267893460580486717*i+13569310046658061883811301121307124894657522285455408019309924985076820304631084833125638911657058799577525163171846901850023310827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1427596115475673359390186071309603449347773333490145319013775658327585719157630008705513247727677110133335693703960087391149367322*i+17487749221447990193264615154157117031101759510881623824924742174366380329395297468220945944610970816494808263213904793495898120054)*x + (13105275545273854649440742547056582975762133110314305721051897930324325160776133146540619214480811745049652171478096405130383093184*i+9683390790494507323780336451725553999657765608539642916009171676150512908378298626074205724195360166092233854242767385896117440613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1427596115475673359390186071309603449347773333490145319013775658327585719157630008705513247727677110133335693703960087391149367322*i+17487749221447990193264615154157117031101759510881623824924742174366380329395297468220945944610970816494808263213904793495898120054)*x + (13105275545273854649440742547056582975762133110314305721051897930324325160776133146540619214480811745049652171478096405130383093184*i+9683390790494507323780336451725553999657765608539642916009171676150512908378298626074205724195360166092233854242767385896117440613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6028012847007962248174431544059800568715713015685761111598082238466580266370793472169554153682787669686854727876037180404212939244*i+3864029763303402968667436568687975034988191551627911234115691734064253280960856130399244044493369692492047406187680116096212572202)*x + (2076782681861429420350747180308970767647299889380211885743690485602624850313068417750990930386524819465957206732782352551317238641*i+20980969372908378453838284320711590913534190717284106183241069029365611983264566970722729359277729013999261692522611303035386953919) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6028012847007962248174431544059800568715713015685761111598082238466580266370793472169554153682787669686854727876037180404212939244*i+3864029763303402968667436568687975034988191551627911234115691734064253280960856130399244044493369692492047406187680116096212572202)*x + (2076782681861429420350747180308970767647299889380211885743690485602624850313068417750990930386524819465957206732782352551317238641*i+20980969372908378453838284320711590913534190717284106183241069029365611983264566970722729359277729013999261692522611303035386953919) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6765517341983569314821841419700122818106930390197561715650036733633949997589874368541827448750499323589050514098055269822556873469*i+8824831354509861606078940348782080544033491571671609692992521338415826635380964764012146548671358683869052299834981168380385924298)*x + (3484720248592841717790707520113184379867204340386800045523030569783984245125245864074976231093448380987470951082785393107557934850*i+11931302816127260108452674078849160286523813042022174769152990655903299011662477819660412244036600150911223437930151673530541090440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6765517341983569314821841419700122818106930390197561715650036733633949997589874368541827448750499323589050514098055269822556873469*i+8824831354509861606078940348782080544033491571671609692992521338415826635380964764012146548671358683869052299834981168380385924298)*x + (3484720248592841717790707520113184379867204340386800045523030569783984245125245864074976231093448380987470951082785393107557934850*i+11931302816127260108452674078849160286523813042022174769152990655903299011662477819660412244036600150911223437930151673530541090440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23705774776249300620178908376559128686146971741275429575655577873391305097767251406279225842175537181194696103751677144748836837665*i+5178752276871554785777984759265233699279277238758012119757105175125633976883242008521134682709515138216671495210665111996656668931)*x + (16249693076269764603137282865261680385776050304117382829790080889365838917944130847346566920761623257788961455807557754069071319742*i+22258677402783610414992118304370248501110163984163088909375385072150108536594449907241279995712136469885428889044809868963181745723) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23705774776249300620178908376559128686146971741275429575655577873391305097767251406279225842175537181194696103751677144748836837665*i+5178752276871554785777984759265233699279277238758012119757105175125633976883242008521134682709515138216671495210665111996656668931)*x + (16249693076269764603137282865261680385776050304117382829790080889365838917944130847346566920761623257788961455807557754069071319742*i+22258677402783610414992118304370248501110163984163088909375385072150108536594449907241279995712136469885428889044809868963181745723) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10649976118965570982798587583246841844306948608484069642912124917859713631374576055210546490146480987242616021827355495162013020712*i+2345596649533933307107765690030815558675889395106289269870838480945413633284688308472650055156808266131394267573664731259474529674)*x + (17633778200884136173154586105672488949674870612667450427911976175491499172181014872633401663254223558682659786049297028624603499417*i+784776357644627836341700351746771579475262970918424961821461155713507832105210455715422480820015157326141828379417130722494564703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10649976118965570982798587583246841844306948608484069642912124917859713631374576055210546490146480987242616021827355495162013020712*i+2345596649533933307107765690030815558675889395106289269870838480945413633284688308472650055156808266131394267573664731259474529674)*x + (17633778200884136173154586105672488949674870612667450427911976175491499172181014872633401663254223558682659786049297028624603499417*i+784776357644627836341700351746771579475262970918424961821461155713507832105210455715422480820015157326141828379417130722494564703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1783147961302326853455154579780781218789149396142521494365773357842292767326162625272741913967133817361402036165248688430233099798*i+21265807746538749907883328140800166155804505611367454939669906664673594742207961052165797265111699552673892375382102724441947482533)*x + (6967411896845551251619433347204363501486404364022591297383191897765869978520024195059415237788315346000450496336569411638983738773*i+13396649609724153999866420160659930054077636700670427976562922657158826585727782014494142948237254588701472845644284457150542383189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1783147961302326853455154579780781218789149396142521494365773357842292767326162625272741913967133817361402036165248688430233099798*i+21265807746538749907883328140800166155804505611367454939669906664673594742207961052165797265111699552673892375382102724441947482533)*x + (6967411896845551251619433347204363501486404364022591297383191897765869978520024195059415237788315346000450496336569411638983738773*i+13396649609724153999866420160659930054077636700670427976562922657158826585727782014494142948237254588701472845644284457150542383189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16784790664682994148891890096302858019605415232921694227514333715275374235816550918232124517519026486564608631833002254175500326014*i+22753910340227366311132792711485026491791708208377860609715727041574845222035388771092438269534207218548413467304762079119228273332)*x + (295777487535178161835599407450577868112729414715676600113608210961274018419941279862834274440110469668921484752368444916020909794*i+15908895326754290739790126471668384627825036786222407797499904173199501749510266444557768205703859725768269935497940048348114233818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16784790664682994148891890096302858019605415232921694227514333715275374235816550918232124517519026486564608631833002254175500326014*i+22753910340227366311132792711485026491791708208377860609715727041574845222035388771092438269534207218548413467304762079119228273332)*x + (295777487535178161835599407450577868112729414715676600113608210961274018419941279862834274440110469668921484752368444916020909794*i+15908895326754290739790126471668384627825036786222407797499904173199501749510266444557768205703859725768269935497940048348114233818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (874101704110561565975546117913570663361979319475212900183825941600646844920739386378218604891374739807887615443280956279282519902*i+17847229322330856434377017650085622366686809931720952637527157955733899797138915399850209688460179555516600300904532313946494416596)*x + (6364969511848464090864119446889441451354444086554042932953102880324112092239841749830524909747533774897219527391684713352777301266*i+14229002984151504776326145191077878205010238561683172826394948067855500287869550709871586657932191417416746716984133744832596523611) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (874101704110561565975546117913570663361979319475212900183825941600646844920739386378218604891374739807887615443280956279282519902*i+17847229322330856434377017650085622366686809931720952637527157955733899797138915399850209688460179555516600300904532313946494416596)*x + (6364969511848464090864119446889441451354444086554042932953102880324112092239841749830524909747533774897219527391684713352777301266*i+14229002984151504776326145191077878205010238561683172826394948067855500287869550709871586657932191417416746716984133744832596523611) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5205367439176755269276882809865514504327934902886939219097343012238772051880415924693965855293622641043072965459241190377988758243*i+4346916006158133137261266102502477072864816247263752195145154476507956698674392422079772388912472314172006197864840985722742117119)*x + (1345426748191961765098114603195748514879844373633851167068139007487824702908121199281494701809064809184266928364451229501947316088*i+8599734282276192275870783920241200395869093433266444605530140888971282521376316362253271243890884483896805016001803258372406279753) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5205367439176755269276882809865514504327934902886939219097343012238772051880415924693965855293622641043072965459241190377988758243*i+4346916006158133137261266102502477072864816247263752195145154476507956698674392422079772388912472314172006197864840985722742117119)*x + (1345426748191961765098114603195748514879844373633851167068139007487824702908121199281494701809064809184266928364451229501947316088*i+8599734282276192275870783920241200395869093433266444605530140888971282521376316362253271243890884483896805016001803258372406279753) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13756442179332048573157791033557209061433155289609649103605627598494371235801947883043571962082557023395921104684889835074856819859*i+1533465635225424207471172809723575648895391614627384190232666937761700159026849482077502781674529964575290820712728190243978327495)*x + (11129666378834228798823836488683487886182873160935096623079893873118612126626041202129191291571158232773802647380595639878215977434*i+4050362488489717435066969107764342473974822527394819199290585375138419348917899998537105283690220052669258710337391655779875235653) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13756442179332048573157791033557209061433155289609649103605627598494371235801947883043571962082557023395921104684889835074856819859*i+1533465635225424207471172809723575648895391614627384190232666937761700159026849482077502781674529964575290820712728190243978327495)*x + (11129666378834228798823836488683487886182873160935096623079893873118612126626041202129191291571158232773802647380595639878215977434*i+4050362488489717435066969107764342473974822527394819199290585375138419348917899998537105283690220052669258710337391655779875235653) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18014404236287453610203840631162710453153550750361855120943668467882906413235978501450676777067248368523835991204255606392513972334*i+12495463307327813422604625834879229165829500712927940848251394090874497624699027092831617199415759636160934705709522999441730504602)*x + (22775115161740850016121905605283085459905242959251467940468822229588933727234355760797054676539176711867313382917409140466491317872*i+12719497361332091917200154229085306227605365077940984957673891613598614485745513331186503338248412794768838226334960713109870876213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18014404236287453610203840631162710453153550750361855120943668467882906413235978501450676777067248368523835991204255606392513972334*i+12495463307327813422604625834879229165829500712927940848251394090874497624699027092831617199415759636160934705709522999441730504602)*x + (22775115161740850016121905605283085459905242959251467940468822229588933727234355760797054676539176711867313382917409140466491317872*i+12719497361332091917200154229085306227605365077940984957673891613598614485745513331186503338248412794768838226334960713109870876213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5677873845468087185985895886292330874456609512874296355587595469089031405395455347970923109212889393969579495463935174884252885721*i+701766031861855379063235464808466802563119647676322246085231127823693404122707834701354365885345824289910769270637902193272119843)*x + (5042966891865598692085841364887891443005777453555236586456540192381270086019754354164374757177601832440998672353247745015344875434*i+24233021153618448467286191975482296262237088473364967086699151534713733575167083677724977499335473436250324575512150385328135066005) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5677873845468087185985895886292330874456609512874296355587595469089031405395455347970923109212889393969579495463935174884252885721*i+701766031861855379063235464808466802563119647676322246085231127823693404122707834701354365885345824289910769270637902193272119843)*x + (5042966891865598692085841364887891443005777453555236586456540192381270086019754354164374757177601832440998672353247745015344875434*i+24233021153618448467286191975482296262237088473364967086699151534713733575167083677724977499335473436250324575512150385328135066005) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2522890715844597071744695650261305708602327335907121493704153962625519111486730947093654395210309456955941099545929204082046527976*i+23010173475551280262207340531757170821417972170619646817562364064052610349820712266619728787432482500968382909382646517425400213570)*x + (9317030324467043375842415070602400739293835808403415843902048369403890510562327136688936823811107330854477935420827817213434618956*i+1242665063275784730462194047167144958314889162605645284513955085506184437110426352455128353464619910332844251762648205229614365074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2522890715844597071744695650261305708602327335907121493704153962625519111486730947093654395210309456955941099545929204082046527976*i+23010173475551280262207340531757170821417972170619646817562364064052610349820712266619728787432482500968382909382646517425400213570)*x + (9317030324467043375842415070602400739293835808403415843902048369403890510562327136688936823811107330854477935420827817213434618956*i+1242665063275784730462194047167144958314889162605645284513955085506184437110426352455128353464619910332844251762648205229614365074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16011885237721425885127427183832523967822906056466372343212358895898152116144264106508296717826874598245916954420345263024603633772*i+18509070910148190810991051909528867915127997484670993447580744816725307517325459107564049057689226742955525672990421356794462754978)*x + (17813916927597066399681987477697808564103612774840166025932590624907777437019723450424938733140518579070513658462145903262685133922*i+19629421690638352485194242359259996500605021010389547337304039898821417305297962759897323010613945599673321004150834667725215461156) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16011885237721425885127427183832523967822906056466372343212358895898152116144264106508296717826874598245916954420345263024603633772*i+18509070910148190810991051909528867915127997484670993447580744816725307517325459107564049057689226742955525672990421356794462754978)*x + (17813916927597066399681987477697808564103612774840166025932590624907777437019723450424938733140518579070513658462145903262685133922*i+19629421690638352485194242359259996500605021010389547337304039898821417305297962759897323010613945599673321004150834667725215461156) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4904741100119508039282129218566174895976277603955935318735051125464286125474678571451498599508257910814666911294870435936986637415*i+2969602909839630288824613314689643775302937215878528677680653426453696693004724836510386828138733258861800130910585837803200594074)*x + (14694145869596270685170935435666337982916880667930292568677475060169060072844904557255378659714411776504486573426855835167508369549*i+17824472005797426165875624780791026101688077862464707245758171131165911089736063474330721366473701273394379305337812761092412778741) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4904741100119508039282129218566174895976277603955935318735051125464286125474678571451498599508257910814666911294870435936986637415*i+2969602909839630288824613314689643775302937215878528677680653426453696693004724836510386828138733258861800130910585837803200594074)*x + (14694145869596270685170935435666337982916880667930292568677475060169060072844904557255378659714411776504486573426855835167508369549*i+17824472005797426165875624780791026101688077862464707245758171131165911089736063474330721366473701273394379305337812761092412778741) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11682979727516632576111815536949233576327839940608149824387318141159284526441043625147132773500946118917714329751394809305080421196*i+9159181583688965311678729559191362452591047814502730915095498751096760999315743513293628726030427108950249035674406841032659949373)*x + (12275104999206926268490109669115100254670610739893333515927366545508677313674082025570479356268513500614253594818264864797285344037*i+20109544029701627453175986749404232868429498654201067066276819665295982994661407424059645010525972565375179569319435875521267125864) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11682979727516632576111815536949233576327839940608149824387318141159284526441043625147132773500946118917714329751394809305080421196*i+9159181583688965311678729559191362452591047814502730915095498751096760999315743513293628726030427108950249035674406841032659949373)*x + (12275104999206926268490109669115100254670610739893333515927366545508677313674082025570479356268513500614253594818264864797285344037*i+20109544029701627453175986749404232868429498654201067066276819665295982994661407424059645010525972565375179569319435875521267125864) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6237173273624765772576460579769278934632664100452260076191783711177214307938097153656907011736457903674317690547029544583528945546*i+4874197894450101689460594232396181323283792625559474552356495442408474139032589313213742663002017757537935088477145478914276582191)*x + (2373931311593998395345193965597856311687703906070261197910283291693656306286520492826939190873978531979194269260435634861771815163*i+10743262674043628818251819001551972943931719844422896097440102926873419213404168329895149079687242576765386854717077067250456288857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6237173273624765772576460579769278934632664100452260076191783711177214307938097153656907011736457903674317690547029544583528945546*i+4874197894450101689460594232396181323283792625559474552356495442408474139032589313213742663002017757537935088477145478914276582191)*x + (2373931311593998395345193965597856311687703906070261197910283291693656306286520492826939190873978531979194269260435634861771815163*i+10743262674043628818251819001551972943931719844422896097440102926873419213404168329895149079687242576765386854717077067250456288857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10039725173079059813828124580950977927930040874539032654943200163247941948258059606171660066422943873463848887511497623885434962750*i+19819729078081301712296669842551529988353421352166454128851707357842150645917947395666263440316559497863608222010476036870100960120)*x + (13011120658014417548326861798021120687576956281634091625790078676264401890678597849929795387751612812942935462649656057495408290716*i+14548788624939760448455032297984306391555478430564500626925259246349043489814420039519292331055395825965870496264774872492840350984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10039725173079059813828124580950977927930040874539032654943200163247941948258059606171660066422943873463848887511497623885434962750*i+19819729078081301712296669842551529988353421352166454128851707357842150645917947395666263440316559497863608222010476036870100960120)*x + (13011120658014417548326861798021120687576956281634091625790078676264401890678597849929795387751612812942935462649656057495408290716*i+14548788624939760448455032297984306391555478430564500626925259246349043489814420039519292331055395825965870496264774872492840350984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4129468903979862839492626471137554169754430712147827952010927933337026706656015089947162000005466185163115117102906376058360472019*i+24363125213997609408977596410436912399647455662028429681491913189637910491708489964369577609767294610034736314484840256800946933858)*x + (8628052270961712819559385655734353766135755817057730895366119071033889385892949200365158646705693291950879671357047017169150573487*i+3041658631364230606157485639626672405701718640394929262902502505410526527392804844476903174813982948006734569351574745907458863456) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4129468903979862839492626471137554169754430712147827952010927933337026706656015089947162000005466185163115117102906376058360472019*i+24363125213997609408977596410436912399647455662028429681491913189637910491708489964369577609767294610034736314484840256800946933858)*x + (8628052270961712819559385655734353766135755817057730895366119071033889385892949200365158646705693291950879671357047017169150573487*i+3041658631364230606157485639626672405701718640394929262902502505410526527392804844476903174813982948006734569351574745907458863456) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13383039780249258703140986258736611333382854548020944797878614537316378420964584874354475670085281686396815523108581989053277319868*i+11502340952392166514733836167780015400504006225082087683283054417759825933582628779239610406663719372639523491493492845588194273462)*x + (21301290688564888187646449083288068920184682077040647708025697478783102460753571873431257145425435669312407059138285501291130828968*i+19394845996133107772545656885308946269542573464694351095431454681572681726519315875569070751649005457205467069679538399896750585806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13383039780249258703140986258736611333382854548020944797878614537316378420964584874354475670085281686396815523108581989053277319868*i+11502340952392166514733836167780015400504006225082087683283054417759825933582628779239610406663719372639523491493492845588194273462)*x + (21301290688564888187646449083288068920184682077040647708025697478783102460753571873431257145425435669312407059138285501291130828968*i+19394845996133107772545656885308946269542573464694351095431454681572681726519315875569070751649005457205467069679538399896750585806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1404158434637183068482096412964348298003812540285274923854671296634406140067331965645565933028464364022098331182078752683410482613*i+467974888081731220541157977675697557486699723844086466369581494695871464434010093738225711310800755535543407601679282804868830658)*x + (9968003159196363586707940175096611690731949076966580082630980961158871868965897360985724171981692189922275015771944886347326739594*i+10903339162968949153795010328488521809102993737580754802887287427434006191840432777123192547975424615862445862337075786295287643032) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1404158434637183068482096412964348298003812540285274923854671296634406140067331965645565933028464364022098331182078752683410482613*i+467974888081731220541157977675697557486699723844086466369581494695871464434010093738225711310800755535543407601679282804868830658)*x + (9968003159196363586707940175096611690731949076966580082630980961158871868965897360985724171981692189922275015771944886347326739594*i+10903339162968949153795010328488521809102993737580754802887287427434006191840432777123192547975424615862445862337075786295287643032) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2090373408778151530894621698364529791123299350506942876031698278484064098062044548576428380402295906688956772063424639965031717032*i+9232081360005643824732319633713392044173312111065526039565413818089513866193561846899227935737071466455486986739503481408188106174)*x + (997762590428390804626531209005580866137609667636214949113305515041833465670644955334720737350592916620001693367050197777025376781*i+3362173957224293940027536318447469417896977900669699114489569366652713986985289625352409344113377564817397057109871087807284301020) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2090373408778151530894621698364529791123299350506942876031698278484064098062044548576428380402295906688956772063424639965031717032*i+9232081360005643824732319633713392044173312111065526039565413818089513866193561846899227935737071466455486986739503481408188106174)*x + (997762590428390804626531209005580866137609667636214949113305515041833465670644955334720737350592916620001693367050197777025376781*i+3362173957224293940027536318447469417896977900669699114489569366652713986985289625352409344113377564817397057109871087807284301020) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10222015137641267272271335371629971921001109404258161018174964220977908003661680039834144406985575934005044561974809881218984395941*i+17786640862578689285519371168297237471768250425493733331579540375724698218801605232664061446417679918390512523615692711652584948451)*x + (6317782770334587869849041795754313912924608817984947031697441104409121622551052882895490273084968723066932587858410958101020820938*i+904490816563795837161142487909160410203101401698665760077709064168644114519215999366788622962620292471941276514287859435786863948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10222015137641267272271335371629971921001109404258161018174964220977908003661680039834144406985575934005044561974809881218984395941*i+17786640862578689285519371168297237471768250425493733331579540375724698218801605232664061446417679918390512523615692711652584948451)*x + (6317782770334587869849041795754313912924608817984947031697441104409121622551052882895490273084968723066932587858410958101020820938*i+904490816563795837161142487909160410203101401698665760077709064168644114519215999366788622962620292471941276514287859435786863948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22167542223106124804458436261032122625516093343377597327617741942396439824655802648412454341076916014363394093000056966922932789084*i+6197704316797114978304571402233231203141901931656418661921866920141088166671366458383500899153830474511166941668510608148303209742)*x + (7053399617062214907234013563858559906622611661856074048504346478191628211868946898106771432609053493174646911338905349347028002282*i+8793270327151497258980923469876365407406335345147876432724892606820933761704540072924089260939751876861242816878147633391887837366) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22167542223106124804458436261032122625516093343377597327617741942396439824655802648412454341076916014363394093000056966922932789084*i+6197704316797114978304571402233231203141901931656418661921866920141088166671366458383500899153830474511166941668510608148303209742)*x + (7053399617062214907234013563858559906622611661856074048504346478191628211868946898106771432609053493174646911338905349347028002282*i+8793270327151497258980923469876365407406335345147876432724892606820933761704540072924089260939751876861242816878147633391887837366) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11778403437876443971678178562229022409240797502418670692852578643865059163452201227547437343210772377975558909558554112550618226659*i+20035907554192795154748936269048205071190562633117290975506034434468823070777906059309355668097708853145964168779841037981690704001)*x + (11924315877913030530820731283003318641315875702718248304771755908757107438572007311785425170529643485201280596053878405667474064023*i+23351151586829828983972269303350255327515965957552225365954585203117076607472519521864835536652915775788223731024009326947637758832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11778403437876443971678178562229022409240797502418670692852578643865059163452201227547437343210772377975558909558554112550618226659*i+20035907554192795154748936269048205071190562633117290975506034434468823070777906059309355668097708853145964168779841037981690704001)*x + (11924315877913030530820731283003318641315875702718248304771755908757107438572007311785425170529643485201280596053878405667474064023*i+23351151586829828983972269303350255327515965957552225365954585203117076607472519521864835536652915775788223731024009326947637758832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10289428669493149127522796050257528951873160746673119660292137371777160993966879460630154617710078057691199168094423616009284351372*i+18770069037993397023450821268609054130074512644660954488245117090561986521291612560994271778740241069345250921019121768462152993283)*x + (9989362922193744322226722798023206597198588592124357467387299237352964992045257482749720622310191443116262082711771687393128472761*i+23185887761691942303886252963099241201601117161481935766788775163104552981443634388215144453504237635410442327639820313737327510539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10289428669493149127522796050257528951873160746673119660292137371777160993966879460630154617710078057691199168094423616009284351372*i+18770069037993397023450821268609054130074512644660954488245117090561986521291612560994271778740241069345250921019121768462152993283)*x + (9989362922193744322226722798023206597198588592124357467387299237352964992045257482749720622310191443116262082711771687393128472761*i+23185887761691942303886252963099241201601117161481935766788775163104552981443634388215144453504237635410442327639820313737327510539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18860925705364993479140812949955856653969723359910214030697367820653415860090096198212471221474581197280587132630546342210448212173*i+2620605504676997885251991473731015879829141003881668774311988443564647198416717156601968063491892452560286172887360094955932607783)*x + (22842909514481017488742028986441170425170697929032550700576890349914382332997923734155374390365862468141425085002337627174493977704*i+2923028205922690122012280278806707050278029849092565222548384442538858276427793655341211168774714858488844230452292353839994467093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18860925705364993479140812949955856653969723359910214030697367820653415860090096198212471221474581197280587132630546342210448212173*i+2620605504676997885251991473731015879829141003881668774311988443564647198416717156601968063491892452560286172887360094955932607783)*x + (22842909514481017488742028986441170425170697929032550700576890349914382332997923734155374390365862468141425085002337627174493977704*i+2923028205922690122012280278806707050278029849092565222548384442538858276427793655341211168774714858488844230452292353839994467093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22285272293170957394372004049201234119174038851374036555567316358400115276075820570267051012436634579926342386196150530893136544929*i+12648814900526287507013186156858983126765329114840069242767535479475338048446227709504207417997634736270062972431660848257284500859)*x + (6147382114740590115256995303852442419463724902273445072241240463832075627078699028349147710553846674462499041586430014864402066054*i+1380858605797216694312700168135638631399126903729464765537900132239317489864952215124457338841789163499019668456970097530178957149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22285272293170957394372004049201234119174038851374036555567316358400115276075820570267051012436634579926342386196150530893136544929*i+12648814900526287507013186156858983126765329114840069242767535479475338048446227709504207417997634736270062972431660848257284500859)*x + (6147382114740590115256995303852442419463724902273445072241240463832075627078699028349147710553846674462499041586430014864402066054*i+1380858605797216694312700168135638631399126903729464765537900132239317489864952215124457338841789163499019668456970097530178957149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23605590948131673151131863062001126931200296897792187309680653775491777165806770312475161195350682901949831562681169019080104502790*i+3445922106070973133373162276742968878203646505281461153366562092386291587106019794596353892029389332778787422659985655725235730631)*x + (19556060245103562412930524839164705835479095371106450970313496772824496117720080465468082132083858991187207370547061718269284154795*i+15201473513243262358060016032230128320027877941644659681508841505294259703093864753057316055340867280491844135628158588943740513522) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23605590948131673151131863062001126931200296897792187309680653775491777165806770312475161195350682901949831562681169019080104502790*i+3445922106070973133373162276742968878203646505281461153366562092386291587106019794596353892029389332778787422659985655725235730631)*x + (19556060245103562412930524839164705835479095371106450970313496772824496117720080465468082132083858991187207370547061718269284154795*i+15201473513243262358060016032230128320027877941644659681508841505294259703093864753057316055340867280491844135628158588943740513522) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14293924763675567988495339181111336275131429955472908473325183252430548569580225087886769789593786726939126420667307738092278957528*i+544806449339880716220716630927386475398037093595431164605436333292755550763520021053512349441032015044749519020741645447836651071)*x + (12983726351596253021747759284368371538102679906211755935388932181259958443239675010575490651900421574504381394654554479575433684528*i+4571919789785777055969957215354062805932419005049384135912068383012625874016619154240651624100483654915812263230409686237614020172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14293924763675567988495339181111336275131429955472908473325183252430548569580225087886769789593786726939126420667307738092278957528*i+544806449339880716220716630927386475398037093595431164605436333292755550763520021053512349441032015044749519020741645447836651071)*x + (12983726351596253021747759284368371538102679906211755935388932181259958443239675010575490651900421574504381394654554479575433684528*i+4571919789785777055969957215354062805932419005049384135912068383012625874016619154240651624100483654915812263230409686237614020172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5351474137666387599105499403291127143888359638997951819471419024236049495620250090681363244439377126973438196352251695540752705122*i+13888698312310175525629376347340668056113648655556608835694021702177013728573979542472560993438247204395711441606095053986128279028)*x + (22957453891173520086008729351771528188939537218275039718984983218362632934425216880796879596257667871008193783709653683614857319728*i+12904431166586676846278294192177473757758355293052589720646568933318967544749503613706320552670887659965895462219608348859008000815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5351474137666387599105499403291127143888359638997951819471419024236049495620250090681363244439377126973438196352251695540752705122*i+13888698312310175525629376347340668056113648655556608835694021702177013728573979542472560993438247204395711441606095053986128279028)*x + (22957453891173520086008729351771528188939537218275039718984983218362632934425216880796879596257667871008193783709653683614857319728*i+12904431166586676846278294192177473757758355293052589720646568933318967544749503613706320552670887659965895462219608348859008000815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11008025836552977216333167996336122563334812350720707757122003050782406472013038222908407571706774561603885229874372309137449037566*i+2150476940832388163915249264402552809412231052831994382140203439189938230803606146750749817635963608571148169830518406639636539919)*x + (4860446095114915096254799229778094319957890275560256368288533793445299439869322380790677774614178983155594039723651566653527667021*i+23701538772285458165386205341122540583387846679894578768701557950235807608639872265775814185943991427315749898919154541054937952946) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11008025836552977216333167996336122563334812350720707757122003050782406472013038222908407571706774561603885229874372309137449037566*i+2150476940832388163915249264402552809412231052831994382140203439189938230803606146750749817635963608571148169830518406639636539919)*x + (4860446095114915096254799229778094319957890275560256368288533793445299439869322380790677774614178983155594039723651566653527667021*i+23701538772285458165386205341122540583387846679894578768701557950235807608639872265775814185943991427315749898919154541054937952946) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13817330177764633036913655216595865781962242290952425300876626708195308115514030549985286280524743477969969070492062341583723560311*i+443876529013333814086197163884074934464056861500923599602805316695851750227744898682568182848742034829093180600114930839937117649)*x + (15020699803343847365348343083734182750935394159309186941604359581621169256423434268807148937675022563338195857691720211586831788928*i+8212940089965373814989335272184921706982995454258620588377375035073258156850682132433038896894875225490809116647667348825756055832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13817330177764633036913655216595865781962242290952425300876626708195308115514030549985286280524743477969969070492062341583723560311*i+443876529013333814086197163884074934464056861500923599602805316695851750227744898682568182848742034829093180600114930839937117649)*x + (15020699803343847365348343083734182750935394159309186941604359581621169256423434268807148937675022563338195857691720211586831788928*i+8212940089965373814989335272184921706982995454258620588377375035073258156850682132433038896894875225490809116647667348825756055832) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10143946507571157957335493323982990306831653279896519216704716852473537819819291188811327748556916738163110047523107299081477934675*i+3254249640153446440857335770806241345726136259096049429031670816940800163164563662097720272781142669040537900768536167708117935748)*x + (17060324946895471130635848260227178898024582291616147512678809223247629895329260320368375793247821722250741222485689090329381556869*i+16952553974938309463186176791245983428734899167416411039848510581616620413045085705215120249002011286355924429260222909502526226815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10143946507571157957335493323982990306831653279896519216704716852473537819819291188811327748556916738163110047523107299081477934675*i+3254249640153446440857335770806241345726136259096049429031670816940800163164563662097720272781142669040537900768536167708117935748)*x + (17060324946895471130635848260227178898024582291616147512678809223247629895329260320368375793247821722250741222485689090329381556869*i+16952553974938309463186176791245983428734899167416411039848510581616620413045085705215120249002011286355924429260222909502526226815) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10839471866990203624425352524469836777033948541234565298891702993481920355871753835798692377037924308789818998176267444977902076369*i+24425441451919244106696010422320041607631765292639494954182610110898193306642130805875351685499355556548537483870158025954671246293)*x + (16718106557380258698826093448890092817522111051109046066949690877855095583152561952946552832826782501962451275082761025546149386496*i+12032241858601940934602390897405276394385324754344863644364255838750659426587647090612243940356570051323534526813225494542717021044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10839471866990203624425352524469836777033948541234565298891702993481920355871753835798692377037924308789818998176267444977902076369*i+24425441451919244106696010422320041607631765292639494954182610110898193306642130805875351685499355556548537483870158025954671246293)*x + (16718106557380258698826093448890092817522111051109046066949690877855095583152561952946552832826782501962451275082761025546149386496*i+12032241858601940934602390897405276394385324754344863644364255838750659426587647090612243940356570051323534526813225494542717021044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21120736219439794788161153512512492608830616439074662588162829532573489579208884198780745259574112039447779350358639603327192942402*i+7375299431347944769192289550100851250531299422836551808747438797083739598977553235902290181416764569887385336178521992994952403529)*x + (4082323308918387111332057282077864733033292027759973375963461840597058286699181747091132736286741317338609621803666198908460932019*i+5965154371425416635486427675164640465765922749203305966004591143878580695163324224597615037729508582793951025661861764620185405635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21120736219439794788161153512512492608830616439074662588162829532573489579208884198780745259574112039447779350358639603327192942402*i+7375299431347944769192289550100851250531299422836551808747438797083739598977553235902290181416764569887385336178521992994952403529)*x + (4082323308918387111332057282077864733033292027759973375963461840597058286699181747091132736286741317338609621803666198908460932019*i+5965154371425416635486427675164640465765922749203305966004591143878580695163324224597615037729508582793951025661861764620185405635) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12999812686519017991564701470744911012404923907007390466342310888692629606759383516133584805595473546198418966154448159572264352920*i+2631792749693363362163017803393073184672201419969693376323040389458117705695711263417972242251289623565756164230421692039289883472)*x + (6132885052931149864234301108417207784818157980586834740380157583358941472954866304671719165589052180827987779989402082494103998337*i+13427399279232623725156767270324963527884924991326016560154944573873850544668053177977941480363252617156881005903831064395468866728) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12999812686519017991564701470744911012404923907007390466342310888692629606759383516133584805595473546198418966154448159572264352920*i+2631792749693363362163017803393073184672201419969693376323040389458117705695711263417972242251289623565756164230421692039289883472)*x + (6132885052931149864234301108417207784818157980586834740380157583358941472954866304671719165589052180827987779989402082494103998337*i+13427399279232623725156767270324963527884924991326016560154944573873850544668053177977941480363252617156881005903831064395468866728) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12681100924672134359078712659497791950607152717444164098658526939576729468031037306569536493588586060500916608920300977496658311776*i+13949915870635160740985358200580377898336933551948080438630594837626218412047148279999588829306264428011967433898258298310309791690)*x + (10883396984155117199204391049654086398035213100160948402613910740859194155341913900428144789262016282921978461982119785774303842974*i+11173204621155757046517871193035703725824100309077980465866425465579819142475796003341637558021396877589935548878006955951343874724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12681100924672134359078712659497791950607152717444164098658526939576729468031037306569536493588586060500916608920300977496658311776*i+13949915870635160740985358200580377898336933551948080438630594837626218412047148279999588829306264428011967433898258298310309791690)*x + (10883396984155117199204391049654086398035213100160948402613910740859194155341913900428144789262016282921978461982119785774303842974*i+11173204621155757046517871193035703725824100309077980465866425465579819142475796003341637558021396877589935548878006955951343874724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14673270398577716321189185221195195983626076276042000051379160123774033909744375458560487990837099645300810385975780965573166101551*i+6993349364648914974220687713794529329117047778797679526374420636296256477900488757657087559615877519758016517451465254752128875906)*x + (9513048284492202341111448311236890850135361483944992418404735990397161846497841062003349913354376622660542485095710733171416619660*i+12841746691429164188463158012346312826507256850019790750306851154186386384496992382564258420701526017190261326057716837420906861018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14673270398577716321189185221195195983626076276042000051379160123774033909744375458560487990837099645300810385975780965573166101551*i+6993349364648914974220687713794529329117047778797679526374420636296256477900488757657087559615877519758016517451465254752128875906)*x + (9513048284492202341111448311236890850135361483944992418404735990397161846497841062003349913354376622660542485095710733171416619660*i+12841746691429164188463158012346312826507256850019790750306851154186386384496992382564258420701526017190261326057716837420906861018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17367522403320027750955140151791122071089217392907411110406700110771499783786660870174535404543974245411617843425974971001749473627*i+135737479794360051270876517380167366095803912132374397802575846098399828113192640892282270702855802827315020950331569203407271261)*x + (13479041108428037081564988184032563630600217895171311282281432496245448715286123232409271760558084365556594712975190191263496978393*i+17161208645674584888122488400093334812969628316794849614176529203330846040311883369901074477760511867331832808509041321262834115918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17367522403320027750955140151791122071089217392907411110406700110771499783786660870174535404543974245411617843425974971001749473627*i+135737479794360051270876517380167366095803912132374397802575846098399828113192640892282270702855802827315020950331569203407271261)*x + (13479041108428037081564988184032563630600217895171311282281432496245448715286123232409271760558084365556594712975190191263496978393*i+17161208645674584888122488400093334812969628316794849614176529203330846040311883369901074477760511867331832808509041321262834115918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17590182795367329102003081107535818292477428724636430306330705515731430928435008551512196355544556171065923530954294534997249443165*i+187178987580283668990252658504620865893751045779470258748566339337324079052614653538757094300237557627956164795475743656571979394)*x + (8115643217819730319590854222550005673589160015963125513548851743445461523898737467078354106393008403368497027739226331881786147398*i+13228884465888606912057350716424556009019444364208143437488666937650476269589555432204842065768067416101523325846165969820743392555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17590182795367329102003081107535818292477428724636430306330705515731430928435008551512196355544556171065923530954294534997249443165*i+187178987580283668990252658504620865893751045779470258748566339337324079052614653538757094300237557627956164795475743656571979394)*x + (8115643217819730319590854222550005673589160015963125513548851743445461523898737467078354106393008403368497027739226331881786147398*i+13228884465888606912057350716424556009019444364208143437488666937650476269589555432204842065768067416101523325846165969820743392555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21006135464460273418459518450936911426847383729530044283013006280558764240187631149187135994053759078531906670701873325962105475775*i+8535110536237953685168346154815016336713596621107891455644576450762533871900789820933231505782902323654829776899281490639088706711)*x + (1256507103145519182316480223656122535657813396173683305059859574799918278287902878023912553824658984693736327926351390217868214052*i+5166542176046882657479026902101603733734941263973631368626834112164892920074990283412550598417272280973254645672186424411922211809) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21006135464460273418459518450936911426847383729530044283013006280558764240187631149187135994053759078531906670701873325962105475775*i+8535110536237953685168346154815016336713596621107891455644576450762533871900789820933231505782902323654829776899281490639088706711)*x + (1256507103145519182316480223656122535657813396173683305059859574799918278287902878023912553824658984693736327926351390217868214052*i+5166542176046882657479026902101603733734941263973631368626834112164892920074990283412550598417272280973254645672186424411922211809) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7175895664345678467920808327101788922903287253479126907070122843269088534073669221442107343177415415375263715907648887367910590915*i+4366244427679974980092968739656453361780202011123754952920329771547540335780277736695049481731498280118903928274939148070907248633)*x + (5733279078249991657010118482098119865436925098944962573997883371517874500010244597513245393105841664596109345750004357648979270833*i+19802103187999027497962219421281195105396429598988517580244766381188961689714903686257833604302802208449015001190151301845068320877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7175895664345678467920808327101788922903287253479126907070122843269088534073669221442107343177415415375263715907648887367910590915*i+4366244427679974980092968739656453361780202011123754952920329771547540335780277736695049481731498280118903928274939148070907248633)*x + (5733279078249991657010118482098119865436925098944962573997883371517874500010244597513245393105841664596109345750004357648979270833*i+19802103187999027497962219421281195105396429598988517580244766381188961689714903686257833604302802208449015001190151301845068320877) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (379982068751149927669650498029059799899518124721338243111136149423846011340767457084700664944844376336635484421072688518795696807*i+22961744659609809580317532770771452603576477935866641245309713087039283225623806976722508072605568718720385114001742911327784132154)*x + (12139456548055746043347681921555529245594744144902444525493386772286540624000264450134173828143903181220257215324866862414487582777*i+6005903795507524956291520999310433866144389758475806764465849673561374204381972300437853035917290524364153854711547065794305602035) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (379982068751149927669650498029059799899518124721338243111136149423846011340767457084700664944844376336635484421072688518795696807*i+22961744659609809580317532770771452603576477935866641245309713087039283225623806976722508072605568718720385114001742911327784132154)*x + (12139456548055746043347681921555529245594744144902444525493386772286540624000264450134173828143903181220257215324866862414487582777*i+6005903795507524956291520999310433866144389758475806764465849673561374204381972300437853035917290524364153854711547065794305602035) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22043063557466138360418574943991740240283109150933348787765226828363206689837722837469786771579982242498251732082887249663811450274*i+7168533232298981934601633144856829341883882474282850711726684326751665517974108553623481030499646696315508007179062864524200462241)*x + (13095157409619285451211544198158701070488318468317552697952799154278065314675622547095312523304638215266758890791142306694330087844*i+21114341724992555420424086355419659113645271771721013093222722254112233580364323462053383689312921606724781127150494779193267118903) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22043063557466138360418574943991740240283109150933348787765226828363206689837722837469786771579982242498251732082887249663811450274*i+7168533232298981934601633144856829341883882474282850711726684326751665517974108553623481030499646696315508007179062864524200462241)*x + (13095157409619285451211544198158701070488318468317552697952799154278065314675622547095312523304638215266758890791142306694330087844*i+21114341724992555420424086355419659113645271771721013093222722254112233580364323462053383689312921606724781127150494779193267118903) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22519445962809515759242796419096370871593429511237207781028696259301479930597600022076684491516167190799107126905375032317474657474*i+18307508279613414878050078159974546354559824463250119256573568883495617256385249711274746121060753178564885962491132079033652699430)*x + (18732110087600512949340975579402705890385140543808751769051065591330800190999787680711353610576141080392621635940202821891445704898*i+20265956872546047307577636851842107700549263266004587077175918321431071665283299627052728695739611422819593007395780311913347617242) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22519445962809515759242796419096370871593429511237207781028696259301479930597600022076684491516167190799107126905375032317474657474*i+18307508279613414878050078159974546354559824463250119256573568883495617256385249711274746121060753178564885962491132079033652699430)*x + (18732110087600512949340975579402705890385140543808751769051065591330800190999787680711353610576141080392621635940202821891445704898*i+20265956872546047307577636851842107700549263266004587077175918321431071665283299627052728695739611422819593007395780311913347617242) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5017954652743058710843383683585805337713175645350373484455395188322960358783219136029820819907226682779713488811915542577929255720*i+14020126431272603823389775354828972024659465700459454603289162246139393586265324557797277060699420819326987403409505985643676056374)*x + (6479828374177660305169991500586263854415675126126358667606105275623342569722275087631688025587148422944892172011491483005444461840*i+19903130494661068420627621561834270813260981686359254974592014969313794160628800142297118586678104814954090658673704850615081177901) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5017954652743058710843383683585805337713175645350373484455395188322960358783219136029820819907226682779713488811915542577929255720*i+14020126431272603823389775354828972024659465700459454603289162246139393586265324557797277060699420819326987403409505985643676056374)*x + (6479828374177660305169991500586263854415675126126358667606105275623342569722275087631688025587148422944892172011491483005444461840*i+19903130494661068420627621561834270813260981686359254974592014969313794160628800142297118586678104814954090658673704850615081177901) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1708144848300329370273136508861314582254235079382771280310909211202284220215054012345065648038062003570431602010689204794695254040*i+9007469654470076186256407660974243109541125182545920361119094621816407103024320461699571462220434070398225762135289337557473659575)*x + (24130338131265465386788597022061841334131049346372393479885836768481421382448830865082176096138420271066798617760688628877254526212*i+21129614066040095314198178447797462825161540068070512764580384565657496815898357002206980870540199537190349083967213233932746225795) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1708144848300329370273136508861314582254235079382771280310909211202284220215054012345065648038062003570431602010689204794695254040*i+9007469654470076186256407660974243109541125182545920361119094621816407103024320461699571462220434070398225762135289337557473659575)*x + (24130338131265465386788597022061841334131049346372393479885836768481421382448830865082176096138420271066798617760688628877254526212*i+21129614066040095314198178447797462825161540068070512764580384565657496815898357002206980870540199537190349083967213233932746225795) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17975666788864036419328123763858779439513164808300404874204020352152877199229863302128023711640104446898644194626005127759343844009*i+23357106622309496518688132957282965111136438265296976738319321667705608071179181703278742324914147210642127975011552284054593892907)*x + (13628138437793475318065193354430850578764602064366485652956617661758887306356911126126921522617884730229192859115472898621292433310*i+20963218411008648494937893240331158942369006365876956076030669024030562452241290480544031777022430386169660640563179862506685374857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17975666788864036419328123763858779439513164808300404874204020352152877199229863302128023711640104446898644194626005127759343844009*i+23357106622309496518688132957282965111136438265296976738319321667705608071179181703278742324914147210642127975011552284054593892907)*x + (13628138437793475318065193354430850578764602064366485652956617661758887306356911126126921522617884730229192859115472898621292433310*i+20963218411008648494937893240331158942369006365876956076030669024030562452241290480544031777022430386169660640563179862506685374857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22268049288581448337592278625361904601455273495831811358389118903262809022597482482811752282541719510856026215353143146808348145767*i+19829125970651602069302149236877250593332542794132337774983634550762794941914907580181647039718035109992694227109785041122952908407)*x + (3775994547515497886486936147944001031349498357243690136964839802623267730537948856315165187091685750642161357443817483546566876793*i+23056763849649156017123945444444004052580311180940927579853625655460079521818920816161732183163408127716744112674204626310838679448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22268049288581448337592278625361904601455273495831811358389118903262809022597482482811752282541719510856026215353143146808348145767*i+19829125970651602069302149236877250593332542794132337774983634550762794941914907580181647039718035109992694227109785041122952908407)*x + (3775994547515497886486936147944001031349498357243690136964839802623267730537948856315165187091685750642161357443817483546566876793*i+23056763849649156017123945444444004052580311180940927579853625655460079521818920816161732183163408127716744112674204626310838679448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1074882249251387105795885526108719762980193929751431345496726339999136531693205804817503587128934344733240685989217405761043072133*i+17436937280450614299130040990923593922771398638509007509048543810379266739176508985411371756608296737812068927804546760334687085468)*x + (20138003174279911813484026361885712105156132669181687578273853506627598673553164360957431154554546098772320206212840664199558912414*i+23842318231823878730029330492838706786094994421830364980411963841154081106744904208353427125200380962338506839768774175878703717672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1074882249251387105795885526108719762980193929751431345496726339999136531693205804817503587128934344733240685989217405761043072133*i+17436937280450614299130040990923593922771398638509007509048543810379266739176508985411371756608296737812068927804546760334687085468)*x + (20138003174279911813484026361885712105156132669181687578273853506627598673553164360957431154554546098772320206212840664199558912414*i+23842318231823878730029330492838706786094994421830364980411963841154081106744904208353427125200380962338506839768774175878703717672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23455092725509790870337472542870131471016439012922336592038868711733805517242941661016784724043277537910127276500171494107539360373*i+1606724552286698326427322797095119223156507960556126334715032108900688838624229904947133158024493259903250832466510527433646607473)*x + (13699821519305477149844668278859456191226655422298213949560066826767944527977124708549223188960441720962203155917449979384602760932*i+15264076127016579882211702173502560837333864836313198014112084506624374716993650899302034415461332158615836039113647695300293916453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23455092725509790870337472542870131471016439012922336592038868711733805517242941661016784724043277537910127276500171494107539360373*i+1606724552286698326427322797095119223156507960556126334715032108900688838624229904947133158024493259903250832466510527433646607473)*x + (13699821519305477149844668278859456191226655422298213949560066826767944527977124708549223188960441720962203155917449979384602760932*i+15264076127016579882211702173502560837333864836313198014112084506624374716993650899302034415461332158615836039113647695300293916453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16464101876268777803025909261226019007731953423824841787516880924246434530310772072983687114983558514614913721993520473710047205647*i+2667199788428093818397444722969796736525013270283249059376153439112653196281229484278498792659016239030386803540788102996424329958)*x + (3282446090651395965687060130389710666678870311086551475757898882251072704466027210148172692698676690273806215275940127668320675738*i+684821202286530057869491542978872753256676645420327250958527393844552982033761407271069323394461593111773610112851742023794190842) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16464101876268777803025909261226019007731953423824841787516880924246434530310772072983687114983558514614913721993520473710047205647*i+2667199788428093818397444722969796736525013270283249059376153439112653196281229484278498792659016239030386803540788102996424329958)*x + (3282446090651395965687060130389710666678870311086551475757898882251072704466027210148172692698676690273806215275940127668320675738*i+684821202286530057869491542978872753256676645420327250958527393844552982033761407271069323394461593111773610112851742023794190842) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14554188323162253533296463177220135725958004883822052458650956109275265422834736514706711841077719993405256665892178022958078612478*i+14413726796675349582156414999052298565370204251219542592113596335600701806669017509886508138634819523145235563437419755803360900010)*x + (12119122037588140913468855154038519343599020455798470875308773932953167145773749521465737809034813838853188800846148529934732529957*i+18691842551566413884411997943510645245309947559975729574184449090436046766661748148991084597163683532190509029567875243550197795314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14554188323162253533296463177220135725958004883822052458650956109275265422834736514706711841077719993405256665892178022958078612478*i+14413726796675349582156414999052298565370204251219542592113596335600701806669017509886508138634819523145235563437419755803360900010)*x + (12119122037588140913468855154038519343599020455798470875308773932953167145773749521465737809034813838853188800846148529934732529957*i+18691842551566413884411997943510645245309947559975729574184449090436046766661748148991084597163683532190509029567875243550197795314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18908301158988728475299306466803973929737303387568141139725132499289583835575850980732326557411507934622766109787389143762562113290*i+21335159539725666562587614354557661495368080016809053955337013936302981761784884114085019005859109056133534146608611809067366389309)*x + (22272536679852753688103110892750933094366512420991666975794496996909950241321572673923274644668802191517983473788075000478238437235*i+13297789381394922343746927574873418772599803407822195077737026647863432863067758535670883043127770813076021879793503468557346230436) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18908301158988728475299306466803973929737303387568141139725132499289583835575850980732326557411507934622766109787389143762562113290*i+21335159539725666562587614354557661495368080016809053955337013936302981761784884114085019005859109056133534146608611809067366389309)*x + (22272536679852753688103110892750933094366512420991666975794496996909950241321572673923274644668802191517983473788075000478238437235*i+13297789381394922343746927574873418772599803407822195077737026647863432863067758535670883043127770813076021879793503468557346230436) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5033289085181522630813647822898505969198741416126799751740016326763551641247575587035477882985652121608676427264524639140892627390*i+16737098198370180552027717869782972500264099732799319731531925200866896717468496688168044936303955439995101004061748638159403087601)*x + (16642853022950988850201294741675134985247097351436384417536763977984617008897162623506458011995088565195390093672780252042649215532*i+882638345340603898889408796104595497097889770119818996186924356003313677187280041698305803468660650000676856032248172504315847388) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5033289085181522630813647822898505969198741416126799751740016326763551641247575587035477882985652121608676427264524639140892627390*i+16737098198370180552027717869782972500264099732799319731531925200866896717468496688168044936303955439995101004061748638159403087601)*x + (16642853022950988850201294741675134985247097351436384417536763977984617008897162623506458011995088565195390093672780252042649215532*i+882638345340603898889408796104595497097889770119818996186924356003313677187280041698305803468660650000676856032248172504315847388) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8601207171895696165677958284181510499189565884727274764307677645740081837610009703745259389718566404537836918984497975482268694736*i+19115484175096258311252421377476367149710780663818958006766457741251588574717564045375101605971480435114364433660295412668462926272)*x + (16809997732298808381953179775786292536184597602700657557793997710298839000300761843440091505810327375628584053332713741183861970934*i+2182697409203362068943241979229493376675277120809589765452202870780284798964293292892462341559936819996341069901022572786409434902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8601207171895696165677958284181510499189565884727274764307677645740081837610009703745259389718566404537836918984497975482268694736*i+19115484175096258311252421377476367149710780663818958006766457741251588574717564045375101605971480435114364433660295412668462926272)*x + (16809997732298808381953179775786292536184597602700657557793997710298839000300761843440091505810327375628584053332713741183861970934*i+2182697409203362068943241979229493376675277120809589765452202870780284798964293292892462341559936819996341069901022572786409434902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4615376654742330439033376843026422414636654345333305756166442593706130572427023508897460511044894849885004119454667697185770140138*i+6641065525540340675898941207750286924319262156372958454710813435986391963077389006784016006735758138143671782200491325250230723066)*x + (14849374941125522647834299875422599975509942373658631122066504817554234000317500545198521508452131895897305772958571763529950351698*i+10338175810764421453692052938783941895450441343821321698791761562624575015026248428728035651140315735242645226579112930102921156120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4615376654742330439033376843026422414636654345333305756166442593706130572427023508897460511044894849885004119454667697185770140138*i+6641065525540340675898941207750286924319262156372958454710813435986391963077389006784016006735758138143671782200491325250230723066)*x + (14849374941125522647834299875422599975509942373658631122066504817554234000317500545198521508452131895897305772958571763529950351698*i+10338175810764421453692052938783941895450441343821321698791761562624575015026248428728035651140315735242645226579112930102921156120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10190598091337438374284877388772175031897031450818499894494239090956939567762632672174089232098214964275735662572981050221850402726*i+6632930658895488175458563317989637424448784106067556199800801842378482527352748638762676868259340627726101430154502630846496218366)*x + (19926980728926604734063766472384730461290023697627445498500645129005804745253426011879704439672888502369107099175021090796329431581*i+9406458691480714264594144715649642605597728412846697797061242953796877181426768748033897119535659437213854887286492659461036665874) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10190598091337438374284877388772175031897031450818499894494239090956939567762632672174089232098214964275735662572981050221850402726*i+6632930658895488175458563317989637424448784106067556199800801842378482527352748638762676868259340627726101430154502630846496218366)*x + (19926980728926604734063766472384730461290023697627445498500645129005804745253426011879704439672888502369107099175021090796329431581*i+9406458691480714264594144715649642605597728412846697797061242953796877181426768748033897119535659437213854887286492659461036665874) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2610667155620799372509771065016715177960594259528139547790553971264997385379108800117422681517346801343867665050582146009550238078*i+8574831176951386753336335692762203644715145354862091156789757851141702225752128903012288328809347019832878284088683333946361096967)*x + (7877566618728678606529716575664371158459331488425261515462485281483525681993357096438177316116407385524857629977815574533437481397*i+622992351759750577873688736407371845655340249432094431651622844236395087254749924487259659592020369721816060858919562733180718466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2610667155620799372509771065016715177960594259528139547790553971264997385379108800117422681517346801343867665050582146009550238078*i+8574831176951386753336335692762203644715145354862091156789757851141702225752128903012288328809347019832878284088683333946361096967)*x + (7877566618728678606529716575664371158459331488425261515462485281483525681993357096438177316116407385524857629977815574533437481397*i+622992351759750577873688736407371845655340249432094431651622844236395087254749924487259659592020369721816060858919562733180718466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22607022795853915788248678435175384104058011110225098427665871578289199340271743171550385067236939100345224523686282649055346179577*i+11076392651616643453221774313901398304305033959061463196305745184345277387681338179179881027226022409279822158508398870399414069088)*x + (125473484333639499484498632504609895759345056780593864532602462318497258181370640850000159675733745972781325322691676689484054467*i+15486517293406113789425326136613607753630051927847242419679901119274252209241007261530778153000169616067225887226588710553464286280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22607022795853915788248678435175384104058011110225098427665871578289199340271743171550385067236939100345224523686282649055346179577*i+11076392651616643453221774313901398304305033959061463196305745184345277387681338179179881027226022409279822158508398870399414069088)*x + (125473484333639499484498632504609895759345056780593864532602462318497258181370640850000159675733745972781325322691676689484054467*i+15486517293406113789425326136613607753630051927847242419679901119274252209241007261530778153000169616067225887226588710553464286280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9040744625879686056280218927705947238156919407711810787079941369004662581695217381492323695520676054243912760110010598475854689256*i+478584487661685094243397056382381957711747742258994734755097945119853515798724860485891183846209068304834826686757834371138755282)*x + (1352498388197032930766705252261248770975410456034701583367444454327712322075893089599803960222218069410847956479401284067718020569*i+5052655522204662604047312940695154100270863749959658467964972124611063395836692308394393124423274430737850317148628918106986547137) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9040744625879686056280218927705947238156919407711810787079941369004662581695217381492323695520676054243912760110010598475854689256*i+478584487661685094243397056382381957711747742258994734755097945119853515798724860485891183846209068304834826686757834371138755282)*x + (1352498388197032930766705252261248770975410456034701583367444454327712322075893089599803960222218069410847956479401284067718020569*i+5052655522204662604047312940695154100270863749959658467964972124611063395836692308394393124423274430737850317148628918106986547137) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17138428388183280668985327323454494012319089470829547793966177227335301303309518184523258611281207165206820869213021655758296032733*i+23849680850887812960554495602584263730851306934526196144871303744574361434155081502073272607875653313639105678181290912784949189686)*x + (20026518654172296945126029433968707985532814849956322928651552370004148069981633084086990222491081278999683636136051568628894099973*i+3199176885991677231049612031835004739551389096862370917390145479240740525572255508485577098181507478033000006598910143685795337336) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17138428388183280668985327323454494012319089470829547793966177227335301303309518184523258611281207165206820869213021655758296032733*i+23849680850887812960554495602584263730851306934526196144871303744574361434155081502073272607875653313639105678181290912784949189686)*x + (20026518654172296945126029433968707985532814849956322928651552370004148069981633084086990222491081278999683636136051568628894099973*i+3199176885991677231049612031835004739551389096862370917390145479240740525572255508485577098181507478033000006598910143685795337336) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4692141915937571828411410389022867748015601322839276090424224661769618231018472049404775897986885195727753248627652801444136151648*i+3727377134900791650257414845144307173259601331867839467515713383524651425533196937247338491951495434070581260997889091645624067175)*x + (6663476779584633331322827964662951981838685416355772992141268681416168446344007524308868199516278779448057433590319845566636939071*i+7010360221345481742825004192580362376550485932828378069847777814689546574918849186984842523423868484086239230713051849478738023521) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4692141915937571828411410389022867748015601322839276090424224661769618231018472049404775897986885195727753248627652801444136151648*i+3727377134900791650257414845144307173259601331867839467515713383524651425533196937247338491951495434070581260997889091645624067175)*x + (6663476779584633331322827964662951981838685416355772992141268681416168446344007524308868199516278779448057433590319845566636939071*i+7010360221345481742825004192580362376550485932828378069847777814689546574918849186984842523423868484086239230713051849478738023521) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19304381493745685934770799814416529625238314858940455719104276511214663525971646765435346945904683729442972676026708003132373484645*i+11380167703751551629754279082712262289495339581388537902243153592210288218764771864269265496085287485260291009824255873894614890847)*x + (1126993622485805788912718418611768253757023592378780698758045507791757325354397890972859865959161511336487083104790345668415378204*i+4588893218827707768545071576304586025609030504266358304884674113044791724480487206669454511945689515271845087792065273635649228851) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19304381493745685934770799814416529625238314858940455719104276511214663525971646765435346945904683729442972676026708003132373484645*i+11380167703751551629754279082712262289495339581388537902243153592210288218764771864269265496085287485260291009824255873894614890847)*x + (1126993622485805788912718418611768253757023592378780698758045507791757325354397890972859865959161511336487083104790345668415378204*i+4588893218827707768545071576304586025609030504266358304884674113044791724480487206669454511945689515271845087792065273635649228851) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5439519002695431374519106317185370617438778333389759353402709344667679714814008056165444626818685936661370169699589012962067343223*i+21916057267043557331483278172540433287714827906600936945928874015647001687546215138227188890306985581579071781104506727516404201926)*x + (20185590619296010452622627600160590329958417398851396843246874957090885541134271646122099068869277986112047566738917878542767707670*i+17145884782624454733238847229356882756699816448131799411415393971135678016401077822601240759084401164615220819589038686491666351438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5439519002695431374519106317185370617438778333389759353402709344667679714814008056165444626818685936661370169699589012962067343223*i+21916057267043557331483278172540433287714827906600936945928874015647001687546215138227188890306985581579071781104506727516404201926)*x + (20185590619296010452622627600160590329958417398851396843246874957090885541134271646122099068869277986112047566738917878542767707670*i+17145884782624454733238847229356882756699816448131799411415393971135678016401077822601240759084401164615220819589038686491666351438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6786942868452848340155879365712709845850090460599046830546484056091602132171192859794585429356070193203436622654408540227401212722*i+16184067741295275693144278637491080021382295010527461258758223286703044643487687966226177707873307199792205878975308684120622526157)*x + (9834339521598371324019244747816884711279285006771449768230106939244113383485921721506525479997005967234759925947428173662578925340*i+19984016052089405036224974982341096062924355483256851856988440755437577855719607865326559793981426180237138713158291443333657289154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6786942868452848340155879365712709845850090460599046830546484056091602132171192859794585429356070193203436622654408540227401212722*i+16184067741295275693144278637491080021382295010527461258758223286703044643487687966226177707873307199792205878975308684120622526157)*x + (9834339521598371324019244747816884711279285006771449768230106939244113383485921721506525479997005967234759925947428173662578925340*i+19984016052089405036224974982341096062924355483256851856988440755437577855719607865326559793981426180237138713158291443333657289154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23630222461001376816031042876720154225713159806715738330255564078296695190677088519561873282417857399720716752971995664793900011868*i+22920099851248697818657686868444976569415953516143080101263589314015917809652501939042822645893154680744915723059267333752248520374)*x + (14441390660234164554698374817016690702146982705245213524792147935120421322283179833131946606779129774197677814272269642758189289849*i+24107622956335219361193876534241891512428761950657813204388369629665983356587082636770076160336428833197619777675472501664430614193) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23630222461001376816031042876720154225713159806715738330255564078296695190677088519561873282417857399720716752971995664793900011868*i+22920099851248697818657686868444976569415953516143080101263589314015917809652501939042822645893154680744915723059267333752248520374)*x + (14441390660234164554698374817016690702146982705245213524792147935120421322283179833131946606779129774197677814272269642758189289849*i+24107622956335219361193876534241891512428761950657813204388369629665983356587082636770076160336428833197619777675472501664430614193) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (806162927938907209199169011174134416813556508476173388421036129962137736125726446537952511559846827043429394357254438967558647779*i+13880407640416852973567599202485488518840302391591048469648577694348887465098251495668455031838540923079860076307481732440432235946)*x + (6425565462520294550760582430418969154222941679753861351483290246053429985068085786138325348440757670652990474755922304100015065209*i+18831762190811386677585809110202721751251179374632049105832609800881359058113749609665751159844908042175096155167324061854844817844) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (806162927938907209199169011174134416813556508476173388421036129962137736125726446537952511559846827043429394357254438967558647779*i+13880407640416852973567599202485488518840302391591048469648577694348887465098251495668455031838540923079860076307481732440432235946)*x + (6425565462520294550760582430418969154222941679753861351483290246053429985068085786138325348440757670652990474755922304100015065209*i+18831762190811386677585809110202721751251179374632049105832609800881359058113749609665751159844908042175096155167324061854844817844) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21269630618134673114085269917192879763117127410698654133693504850303897357458408349513194563757411594729887895559409913833205534103*i+16214080201501893748152881826348797685669025482089130408495126656966877832180719164290576865781263216571738811189636968808207076282)*x + (11493112673910430368149257305164650982641261930306124712709281991817713708068935566305224899475147829835428664916752242721681978241*i+611095738143654367140195447053528348235240228687211710193527223479095075028533606604650494133532569095631273869446744963936) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21269630618134673114085269917192879763117127410698654133693504850303897357458408349513194563757411594729887895559409913833205534103*i+16214080201501893748152881826348797685669025482089130408495126656966877832180719164290576865781263216571738811189636968808207076282)*x + (11493112673910430368149257305164650982641261930306124712709281991817713708068935566305224899475147829835428664916752242721681978241*i+611095738143654367140195447053528348235240228687211710193527223479095075028533606604650494133532569095631273869446744963936) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2967256936070394762287958539990170378200274057135571766952773140363482353269785087131418895875610825279813899060712870211979449955*i+21806731074223690818690805020355988133610832964648937212913431384277796910293640886149570929241776451447171944288979881258471690621)*x + (11952249776704818424047967514208225264261386492924188817790489219697150505417349047121059664491326963352850562533324287199354858256*i+23888679903315927890719847546226760600998871023872920599647893576583633078910521716696409650195993950278019767304254726818663877336) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2967256936070394762287958539990170378200274057135571766952773140363482353269785087131418895875610825279813899060712870211979449955*i+21806731074223690818690805020355988133610832964648937212913431384277796910293640886149570929241776451447171944288979881258471690621)*x + (11952249776704818424047967514208225264261386492924188817790489219697150505417349047121059664491326963352850562533324287199354858256*i+23888679903315927890719847546226760600998871023872920599647893576583633078910521716696409650195993950278019767304254726818663877336) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11355130290075302684419780085111970971306418806330988790610896806207530229459036549740437042084614697995813464903002884908941081844*i+20201650164878679181280490080312777865084158100221090267654642402532553889120473633131575304278584940762764549803572449674606876355)*x + (7360504054738707984475172336572355702453308079047278972269409482026892803990271920139357656845849970474661545746691251506748188378*i+15929157846475714743603503869098415791614669970940864355326373548424153004139014023867332281196969629786772093300836302144678332626) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11355130290075302684419780085111970971306418806330988790610896806207530229459036549740437042084614697995813464903002884908941081844*i+20201650164878679181280490080312777865084158100221090267654642402532553889120473633131575304278584940762764549803572449674606876355)*x + (7360504054738707984475172336572355702453308079047278972269409482026892803990271920139357656845849970474661545746691251506748188378*i+15929157846475714743603503869098415791614669970940864355326373548424153004139014023867332281196969629786772093300836302144678332626) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16887250009474405744018773267082681383654435780770339838733102560507918846920486790785052623445980570276311783732032376843374835742*i+23499786023608849351028878240155052550259700339787212963291774830341795739155228721873164097145558241147052786369328652671291312000)*x + (8415347890821785625060547239544918835034895597591910995006846707890686237412120623465120020898525029752035883012972864199840340219*i+3204627956310175842450368306378506252216538267222823229816001554874389150601122717336071536900574738079973886443982077616703822633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16887250009474405744018773267082681383654435780770339838733102560507918846920486790785052623445980570276311783732032376843374835742*i+23499786023608849351028878240155052550259700339787212963291774830341795739155228721873164097145558241147052786369328652671291312000)*x + (8415347890821785625060547239544918835034895597591910995006846707890686237412120623465120020898525029752035883012972864199840340219*i+3204627956310175842450368306378506252216538267222823229816001554874389150601122717336071536900574738079973886443982077616703822633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3811331459334850505170968211795562836159744807885539497493093045791491052051242866903343056850108875686783477496043730912334371187*i+20231812144107521364701401448117429173159862009939816870694984143020704194088661462618366337865846143449164688297479414000707170470)*x + (13640295191994949570784910029640387418453266502803178128077783929166658672413657510867212563184466254635405893322693695283289574732*i+8622920309572716766288419646224418291229787415512229891635520655234502618287119489575757988162366914879349063961742754170096055065) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3811331459334850505170968211795562836159744807885539497493093045791491052051242866903343056850108875686783477496043730912334371187*i+20231812144107521364701401448117429173159862009939816870694984143020704194088661462618366337865846143449164688297479414000707170470)*x + (13640295191994949570784910029640387418453266502803178128077783929166658672413657510867212563184466254635405893322693695283289574732*i+8622920309572716766288419646224418291229787415512229891635520655234502618287119489575757988162366914879349063961742754170096055065) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12395610533156746211602888280919767512789591246576867690404322825248646500535571956069927999223457583295742625623472494377405568159*i+21173975800003573782325600764706812168858139083776409025269749436372045110881292211457249223152540898435804352043202831006933067815)*x + (13095053322201238427057074246015007079329343898264046465365169604274773335014104712253712627380993662733889248254077467329207508471*i+13669023586295242280902321399048078611132825191171790300101791021162065412294617631819572074337459677182796285368117721419085657494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12395610533156746211602888280919767512789591246576867690404322825248646500535571956069927999223457583295742625623472494377405568159*i+21173975800003573782325600764706812168858139083776409025269749436372045110881292211457249223152540898435804352043202831006933067815)*x + (13095053322201238427057074246015007079329343898264046465365169604274773335014104712253712627380993662733889248254077467329207508471*i+13669023586295242280902321399048078611132825191171790300101791021162065412294617631819572074337459677182796285368117721419085657494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20445157642535618625865781960172845546327420569003324370621466004660856910062509695826402502360016760163857262558796558693074708596*i+950822001921913854889241896885037323441526737822673417252739658688748183791198640410535049704315919992700067457945353033329049046)*x + (6292391286985711881442917754408397560393724301213667565337205614015420191648654604420619887396532277838818032201937066179797103394*i+1096654078097172506994375479016858516589566411225246158087736144902772887455157241837342071600916936022186529906922285041572979275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20445157642535618625865781960172845546327420569003324370621466004660856910062509695826402502360016760163857262558796558693074708596*i+950822001921913854889241896885037323441526737822673417252739658688748183791198640410535049704315919992700067457945353033329049046)*x + (6292391286985711881442917754408397560393724301213667565337205614015420191648654604420619887396532277838818032201937066179797103394*i+1096654078097172506994375479016858516589566411225246158087736144902772887455157241837342071600916936022186529906922285041572979275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6411211203544578947662969294748754862754899821922274308262261831010869092365168354132444856607758027550764831806034984088616848970*i+5980369297888344856180847601216355223931900268761256241918677369077434425467082866945306484734977168213861129456507895997694344021)*x + (11050941166301044699340790603439465187962054852177461364426241728795363347669622434460673867018047198930053248096072911648071722804*i+10670636029631174678139097964683888595753784606881168016222815113372193127805247663569095413673093536582126103746255669730369778314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6411211203544578947662969294748754862754899821922274308262261831010869092365168354132444856607758027550764831806034984088616848970*i+5980369297888344856180847601216355223931900268761256241918677369077434425467082866945306484734977168213861129456507895997694344021)*x + (11050941166301044699340790603439465187962054852177461364426241728795363347669622434460673867018047198930053248096072911648071722804*i+10670636029631174678139097964683888595753784606881168016222815113372193127805247663569095413673093536582126103746255669730369778314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13471118456642200885727479647682126034999153432193820167739206827311189306982850105144354225856999818956578913233079176360358832652*i+1259666554279014697082173699431237339244830736239845909979983453421676706159402009698769514882708741779195767023209458143114537146)*x + (958707047638036884603711201368039465693245869889334187685770047952667121649522311700990793539800296276148914018919287641866955409*i+24276316359900253217488139913101920679743164804352691880150869161121611361257590755887469583625901234531193368725595303201712581733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13471118456642200885727479647682126034999153432193820167739206827311189306982850105144354225856999818956578913233079176360358832652*i+1259666554279014697082173699431237339244830736239845909979983453421676706159402009698769514882708741779195767023209458143114537146)*x + (958707047638036884603711201368039465693245869889334187685770047952667121649522311700990793539800296276148914018919287641866955409*i+24276316359900253217488139913101920679743164804352691880150869161121611361257590755887469583625901234531193368725595303201712581733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19797981365436243601194848809941591822193351367360946306392781737877133877026333167837756745130802840925106100993163781359061987489*i+1682643561366219524320600707023360720476560316603149884985147663624649460768911589990262272922587461949372123146028642514270095792)*x + (3159299197485172812603693491527944576144131417820921797050088231628576997281503563150810387776573093725057460712224535985857271263*i+1695055235998201934739557323474010778375490234179380513088655835503162263641457672496788056304068223234224428197082561819894161898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19797981365436243601194848809941591822193351367360946306392781737877133877026333167837756745130802840925106100993163781359061987489*i+1682643561366219524320600707023360720476560316603149884985147663624649460768911589990262272922587461949372123146028642514270095792)*x + (3159299197485172812603693491527944576144131417820921797050088231628576997281503563150810387776573093725057460712224535985857271263*i+1695055235998201934739557323474010778375490234179380513088655835503162263641457672496788056304068223234224428197082561819894161898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21962428015211658879316098255119443730247742528748539630837299388810759732104554957887784479281806215444661720617394425106487403192*i+6363358060259132544040581447803448505447336433524559298263291933485441575704266848759674375174978082630974130082902258066975244789)*x + (10439074673798735026639252108416733507779524738435135243730801578015317497942946389215268891636697313454036492598316194527236569500*i+7857819051914276097584213787392909467595270287722071639055395958879119152837865327094131833404728211944546846401830827436834877639) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21962428015211658879316098255119443730247742528748539630837299388810759732104554957887784479281806215444661720617394425106487403192*i+6363358060259132544040581447803448505447336433524559298263291933485441575704266848759674375174978082630974130082902258066975244789)*x + (10439074673798735026639252108416733507779524738435135243730801578015317497942946389215268891636697313454036492598316194527236569500*i+7857819051914276097584213787392909467595270287722071639055395958879119152837865327094131833404728211944546846401830827436834877639) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4726142054003394428226340450878962076564214221793915578497974796253226339477101643247156777976272818784889184408410810062517108721*i+8604522713024880499866763700295041098718545690727998782278242791845634062417835622899806222602499867941197302357281430002988091383)*x + (13708700074266865424024541621857729095125651489386717655360177017879177268211403705441534627721762820404822627500891293237526686458*i+21213603573585208075773527148695113095962940693026575887274617923526173107929092177780890628043292386364152465661771053007309510419) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4726142054003394428226340450878962076564214221793915578497974796253226339477101643247156777976272818784889184408410810062517108721*i+8604522713024880499866763700295041098718545690727998782278242791845634062417835622899806222602499867941197302357281430002988091383)*x + (13708700074266865424024541621857729095125651489386717655360177017879177268211403705441534627721762820404822627500891293237526686458*i+21213603573585208075773527148695113095962940693026575887274617923526173107929092177780890628043292386364152465661771053007309510419) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24389136738223675296225012919280209724623536404576260252310867841762045646413701264422082191260943438339537662052528172772610212446*i+19054001765086360433137878347352730331205494719746957519421229157200814102508750464851432579084725106172210062241124419874970450524)*x + (17908760258621184421203414814182816627247074828842224689600129316471483115237440737873673953848175635629628134459399182817124375891*i+1357976789638009289931891730754917091201542759739591488753681381248469683540206201177948923785220191285389724492252262771286002114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24389136738223675296225012919280209724623536404576260252310867841762045646413701264422082191260943438339537662052528172772610212446*i+19054001765086360433137878347352730331205494719746957519421229157200814102508750464851432579084725106172210062241124419874970450524)*x + (17908760258621184421203414814182816627247074828842224689600129316471483115237440737873673953848175635629628134459399182817124375891*i+1357976789638009289931891730754917091201542759739591488753681381248469683540206201177948923785220191285389724492252262771286002114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1417720402205632654473212854023549146039705720252198240832005744335518702603972040012827284243451849227101503111449024495602758868*i+22729299907503368670210505865041438910071880599090951047471807768431015391046573702434937277929505460159284778751692797106525890858)*x + (2697338113405692333129899995015892777944687270783077020995261260615916972181806554688855111805128764981601218204670043019372419161*i+3160400492324537798633086530169123832840485220077833353393642418873365830753020173389772969528795645955425614287279986182628955539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1417720402205632654473212854023549146039705720252198240832005744335518702603972040012827284243451849227101503111449024495602758868*i+22729299907503368670210505865041438910071880599090951047471807768431015391046573702434937277929505460159284778751692797106525890858)*x + (2697338113405692333129899995015892777944687270783077020995261260615916972181806554688855111805128764981601218204670043019372419161*i+3160400492324537798633086530169123832840485220077833353393642418873365830753020173389772969528795645955425614287279986182628955539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15381932342147546159639273820434790865689487427006802096336315594509775694521341967738584928437335382070442696852618714883383579430*i+2148898702681361524032550257235626506754820802169585873659412015109258558033967586566209710895103568516839894558755805423577076702)*x + (15139979704600829950688982405377306167968662919599604125773772225314920585735381848600225106738243996989461672997871377850002786499*i+15472143309581315401491997807107217009738276519277160710217646832457780269364218716272612373528841504625799398766962701373877210765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15381932342147546159639273820434790865689487427006802096336315594509775694521341967738584928437335382070442696852618714883383579430*i+2148898702681361524032550257235626506754820802169585873659412015109258558033967586566209710895103568516839894558755805423577076702)*x + (15139979704600829950688982405377306167968662919599604125773772225314920585735381848600225106738243996989461672997871377850002786499*i+15472143309581315401491997807107217009738276519277160710217646832457780269364218716272612373528841504625799398766962701373877210765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20991046315148092581626642527852698866656001536711155444678324530014549670026270806223249947665069849105176579991757255462727004677*i+1802428230558545131933601525318064006853552421662641363721106813112598293835502494050954402768895345877478678025026006564373677509)*x + (2934138539394690755716340673789446420089630468224830882753126646360514251425325313435188071122057023588277659768784232388903987669*i+11719220097775446177662843917071085659011684386321410958045632832307208841454517215097157845402703398961808810145811269444322015167) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20991046315148092581626642527852698866656001536711155444678324530014549670026270806223249947665069849105176579991757255462727004677*i+1802428230558545131933601525318064006853552421662641363721106813112598293835502494050954402768895345877478678025026006564373677509)*x + (2934138539394690755716340673789446420089630468224830882753126646360514251425325313435188071122057023588277659768784232388903987669*i+11719220097775446177662843917071085659011684386321410958045632832307208841454517215097157845402703398961808810145811269444322015167) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5943036884410024686654089140676376044869979722741096145885646114489491272025658488177434955844982238524149040545653251629884323111*i+1051855913533257136966520285218610258244293526457558711704805683371077667546863601349651421263008445174621858632355651345046276180)*x + (17133894906573123431003247983955280026901699395137868032069570449961220965446929105522119004217983737533493065816479141359496033275*i+14560455735246987411684945135884608785119123155920112568942476243830713840309280397439611604220420324670231721787853460345481168208) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5943036884410024686654089140676376044869979722741096145885646114489491272025658488177434955844982238524149040545653251629884323111*i+1051855913533257136966520285218610258244293526457558711704805683371077667546863601349651421263008445174621858632355651345046276180)*x + (17133894906573123431003247983955280026901699395137868032069570449961220965446929105522119004217983737533493065816479141359496033275*i+14560455735246987411684945135884608785119123155920112568942476243830713840309280397439611604220420324670231721787853460345481168208) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12532784675627140277212770745953571704819902431806788913472081487868459505262587374216469637972355148276730002875811643085227349253*i+5685347871878037546707068220583232954691112298567301959029767406245396901394318043417842312601114252010305210297709972375704806177)*x + (1875961330476946757613866814134850788526769491163430518934057247615937655716501296608709352259466476740048223291652654652360578767*i+14996683033832356999695325400437234355484058454705160738702301732794872221647255136624161723353933918633714028280926418257057693354) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12532784675627140277212770745953571704819902431806788913472081487868459505262587374216469637972355148276730002875811643085227349253*i+5685347871878037546707068220583232954691112298567301959029767406245396901394318043417842312601114252010305210297709972375704806177)*x + (1875961330476946757613866814134850788526769491163430518934057247615937655716501296608709352259466476740048223291652654652360578767*i+14996683033832356999695325400437234355484058454705160738702301732794872221647255136624161723353933918633714028280926418257057693354) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18969971898381183128241964549242901197211578071823733030027928886446280811715753106020182803971765861470824113056772198470073354238*i+23016812083769364609993668656701152268178196358741006419705957419399415390727062055212897539155465682261447464767313467110057664330)*x + (5211851381423952851561872733575816214237730475681175155778151285454722640475981971985084469604365139654072686616786762518042895974*i+665692333816440684741964736225520204316209985714684396676280562762915913678743425312255964052212276673233266719997146715968669893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18969971898381183128241964549242901197211578071823733030027928886446280811715753106020182803971765861470824113056772198470073354238*i+23016812083769364609993668656701152268178196358741006419705957419399415390727062055212897539155465682261447464767313467110057664330)*x + (5211851381423952851561872733575816214237730475681175155778151285454722640475981971985084469604365139654072686616786762518042895974*i+665692333816440684741964736225520204316209985714684396676280562762915913678743425312255964052212276673233266719997146715968669893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2141144096860097639208593292795423269508959530675344778429939186083627434093757662051482276127537317164756503700264812456188588551*i+22471088872479098428002669601334393633712368541788044419418946291239174894470390780753665855893792683666187208203851245674654243368)*x + (23066096586929652600938704784908669206202717514552319693640714654759449081066634920773243827903813413643357640651843324980232003731*i+6211522160420528905217495634966793771850892090019059126216784838488164539290106616094263889055781306615632498065544615190586420069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2141144096860097639208593292795423269508959530675344778429939186083627434093757662051482276127537317164756503700264812456188588551*i+22471088872479098428002669601334393633712368541788044419418946291239174894470390780753665855893792683666187208203851245674654243368)*x + (23066096586929652600938704784908669206202717514552319693640714654759449081066634920773243827903813413643357640651843324980232003731*i+6211522160420528905217495634966793771850892090019059126216784838488164539290106616094263889055781306615632498065544615190586420069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22412148295167444633053619677169921942969052994980642343623192804135872990332784902903641090353697212976805172284711105275038878826*i+12938273987268075249714562803188303254057568776586618072402864057684756682518434261459702905248519472575720306815657785472064096605)*x + (22082243540535469998544866216715760118311946929911260478629479214907259359948082666183593561838388121680170593236135835917961146667*i+8882038965156492106830265031666450569002770599622907846856539648505340549542966869265687220714683552311940784815525014827649872696) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22412148295167444633053619677169921942969052994980642343623192804135872990332784902903641090353697212976805172284711105275038878826*i+12938273987268075249714562803188303254057568776586618072402864057684756682518434261459702905248519472575720306815657785472064096605)*x + (22082243540535469998544866216715760118311946929911260478629479214907259359948082666183593561838388121680170593236135835917961146667*i+8882038965156492106830265031666450569002770599622907846856539648505340549542966869265687220714683552311940784815525014827649872696) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3254363477705220001916869525823814567104745559787277073011418634882508371485125017078313415665735560650441229161360155127053709861*i+24307010979065430114937445872220446361655821495345157156968460925563311868511802380044673100456801384718645629520397570188385416716)*x + (22615158122071446867253219325639404953118114753487525018125531730237107560633325737527509517948042118161416843177668357311807694687*i+6306837326698915430785042572826850815482984419170101039198419528724929267035690005585850588245272948174390700709265317367639896226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3254363477705220001916869525823814567104745559787277073011418634882508371485125017078313415665735560650441229161360155127053709861*i+24307010979065430114937445872220446361655821495345157156968460925563311868511802380044673100456801384718645629520397570188385416716)*x + (22615158122071446867253219325639404953118114753487525018125531730237107560633325737527509517948042118161416843177668357311807694687*i+6306837326698915430785042572826850815482984419170101039198419528724929267035690005585850588245272948174390700709265317367639896226) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16117233663124957616178854335592229144338639774278059912110537441210342960702593223373257903878221095397758876470192639353875636401*i+1314628127912495908751578698593709461839981277141954427360186502340509810532337985066508189218446390172665307826335816641446246169)*x + (9176738039809810779298963973821265473553882882729909430601966537743087337583399113201483227295012914430056514929311205506241962915*i+7490871156312462730419680110450556826329611448931045822591626839152181214731887955306088535143992855960685088766865500886274317820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16117233663124957616178854335592229144338639774278059912110537441210342960702593223373257903878221095397758876470192639353875636401*i+1314628127912495908751578698593709461839981277141954427360186502340509810532337985066508189218446390172665307826335816641446246169)*x + (9176738039809810779298963973821265473553882882729909430601966537743087337583399113201483227295012914430056514929311205506241962915*i+7490871156312462730419680110450556826329611448931045822591626839152181214731887955306088535143992855960685088766865500886274317820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23356105190863142451994004535454399391163459325000168160743401921143371563977983821574759177213679552378740962993928178215886453544*i+15945503325752175476015553455772083132946043082497203381434166306564197623551581183782487274847305310872951769875059434435962529077)*x + (19992381300317653211043681625563629208947314423884201391661816036276127480495288342900791952660353069145967462850349879864179462906*i+12342909842786443308535753701949349006745703319916961630721760098031869930831583997770004231028418190839351169556688552382340849768) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23356105190863142451994004535454399391163459325000168160743401921143371563977983821574759177213679552378740962993928178215886453544*i+15945503325752175476015553455772083132946043082497203381434166306564197623551581183782487274847305310872951769875059434435962529077)*x + (19992381300317653211043681625563629208947314423884201391661816036276127480495288342900791952660353069145967462850349879864179462906*i+12342909842786443308535753701949349006745703319916961630721760098031869930831583997770004231028418190839351169556688552382340849768) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18574762626596179238737596587366324684185531090681054416518370792495412537280220349447901844558101806295994558989159942309556203705*i+23816470620712942368117589712003241348816945629923992459588104159020024188459677257364765538558047018739512502013531994388565555064)*x + (4075676130610306942377018940717350624857907436172223712700808488263446416990686229804516621050985161290742005647205361079594027129*i+7104612557536147001193211314497556427604532195972898358655513867048949482339688519634481599456493661748873913484501423352900461829) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18574762626596179238737596587366324684185531090681054416518370792495412537280220349447901844558101806295994558989159942309556203705*i+23816470620712942368117589712003241348816945629923992459588104159020024188459677257364765538558047018739512502013531994388565555064)*x + (4075676130610306942377018940717350624857907436172223712700808488263446416990686229804516621050985161290742005647205361079594027129*i+7104612557536147001193211314497556427604532195972898358655513867048949482339688519634481599456493661748873913484501423352900461829) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22209736014380084620717268602849785610509375233252565914311768304720765966330404402736488368260504720875428393698303236179768818928*i+10567296354935577061911842733406885485257912194154333088107154518897029984503093309423401356488178793731221421088544747737615410494)*x + (2896329376210744020271007982756569461410796195433324383716242170430239540423083544844092360517365939899866384951712519786267768209*i+4435246671620651768039522849605487110871342705086355083425693239719672542837610952922303104790811333026030131529839073427667615472) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22209736014380084620717268602849785610509375233252565914311768304720765966330404402736488368260504720875428393698303236179768818928*i+10567296354935577061911842733406885485257912194154333088107154518897029984503093309423401356488178793731221421088544747737615410494)*x + (2896329376210744020271007982756569461410796195433324383716242170430239540423083544844092360517365939899866384951712519786267768209*i+4435246671620651768039522849605487110871342705086355083425693239719672542837610952922303104790811333026030131529839073427667615472) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15526762921323179396130056695874582170136826300829026069467028887514157252032712476700168566939339582609474337279336170201790798242*i+8693244950341649352169034906889470061584116058410521136062175065895676176732430962525425376315462886885864914563272281497120746797)*x + (11934555892914935402721787388920047046668992711847421294131219762376426610822577584866128685415976540751299939104170915994511745216*i+9794619508951976318372720318477933331805522455401042439710806378501817462353531270168729223057926004096739820699179896279611491794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15526762921323179396130056695874582170136826300829026069467028887514157252032712476700168566939339582609474337279336170201790798242*i+8693244950341649352169034906889470061584116058410521136062175065895676176732430962525425376315462886885864914563272281497120746797)*x + (11934555892914935402721787388920047046668992711847421294131219762376426610822577584866128685415976540751299939104170915994511745216*i+9794619508951976318372720318477933331805522455401042439710806378501817462353531270168729223057926004096739820699179896279611491794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7361304930820678702021475785217037184038628857330904718254957384817127869802260065941418103781458132717386535058257611157787553560*i+17957730542475215273672549298654058745669553730592847911518532826555843012328146904279050208705727227600497664014490447469408049313)*x + (10288404303717778342750875819342631656734251389102036547091229831853776489869465317045819077376407516178800670467815031255237487654*i+5588332100615529880192690633362048283731208745611383792958341495821897334166424975393631911226136323251361642610246931178733847968) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7361304930820678702021475785217037184038628857330904718254957384817127869802260065941418103781458132717386535058257611157787553560*i+17957730542475215273672549298654058745669553730592847911518532826555843012328146904279050208705727227600497664014490447469408049313)*x + (10288404303717778342750875819342631656734251389102036547091229831853776489869465317045819077376407516178800670467815031255237487654*i+5588332100615529880192690633362048283731208745611383792958341495821897334166424975393631911226136323251361642610246931178733847968) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4893101412256915687135678015741193706605694485711822509988344919794664922188403887516573089270313219855461528774042358987765350092*i+10874624807813779787668005421237339751584483784140488406917755217844060088347168756377723820727518178636389688780892019268477693370)*x + (1600293764476389668656314152379809355212250415947214953287355223854038751416034227465577698803533054921541209697685806900753645857*i+8047395362478853260386832910098622208893583567723922890573479947650345963661989700093589183288086451524791192001698880993279094291) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4893101412256915687135678015741193706605694485711822509988344919794664922188403887516573089270313219855461528774042358987765350092*i+10874624807813779787668005421237339751584483784140488406917755217844060088347168756377723820727518178636389688780892019268477693370)*x + (1600293764476389668656314152379809355212250415947214953287355223854038751416034227465577698803533054921541209697685806900753645857*i+8047395362478853260386832910098622208893583567723922890573479947650345963661989700093589183288086451524791192001698880993279094291) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13029640171375780228729284758935213712471412592433787964362679509786294477753594016018336617876245148758384990808538014121575027669*i+10066127387586022750780814791883136461450673439197177405565479928365522177229225252152099929750377989627410860931449602299448520325)*x + (20273253822580026572316896418717894212711876000234070694988511050837872953887709442652355231569150854028191240182480693623346137592*i+15385440827400562627677303015945933717575115602896801974553346059720903017376622228980041142610424548517451730016973552711421902683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13029640171375780228729284758935213712471412592433787964362679509786294477753594016018336617876245148758384990808538014121575027669*i+10066127387586022750780814791883136461450673439197177405565479928365522177229225252152099929750377989627410860931449602299448520325)*x + (20273253822580026572316896418717894212711876000234070694988511050837872953887709442652355231569150854028191240182480693623346137592*i+15385440827400562627677303015945933717575115602896801974553346059720903017376622228980041142610424548517451730016973552711421902683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5581817278408810938890493412584159675914304266005133367665600178394432614615212501066200916474853056843112093340430934371813920763*i+3237155395473407581181246155093138879212521126993296999571648671417645127715252193144087199481462066812454741058518338894274087782)*x + (18783479573069255842830906114522868890979191965745252868426986026974607033159320824699182586763087495075693078036718464064267251686*i+14333613414165203657791064557791572763985319585192536137548887535172571130413656193736748697517437420292422587015531643316535495811) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5581817278408810938890493412584159675914304266005133367665600178394432614615212501066200916474853056843112093340430934371813920763*i+3237155395473407581181246155093138879212521126993296999571648671417645127715252193144087199481462066812454741058518338894274087782)*x + (18783479573069255842830906114522868890979191965745252868426986026974607033159320824699182586763087495075693078036718464064267251686*i+14333613414165203657791064557791572763985319585192536137548887535172571130413656193736748697517437420292422587015531643316535495811) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6212517786461772370303828333147704282789146997084810786599888442239922605520397567764411402484261871189466047822271909453848315200*i+14795642664526268383800594760547315962628259143000710326182951365186727052317630810631417335544720032854619564607690929609148054096)*x + (11444505928738003390546683262143234418382250138184099416905197978584566847477077238899037034752993527086599041614337254352765130900*i+4499765544603841873324468778761986478582229279044992806513557483798560632864198182839427912667718425721230548354203940206812667895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6212517786461772370303828333147704282789146997084810786599888442239922605520397567764411402484261871189466047822271909453848315200*i+14795642664526268383800594760547315962628259143000710326182951365186727052317630810631417335544720032854619564607690929609148054096)*x + (11444505928738003390546683262143234418382250138184099416905197978584566847477077238899037034752993527086599041614337254352765130900*i+4499765544603841873324468778761986478582229279044992806513557483798560632864198182839427912667718425721230548354203940206812667895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [110]:
R2 = P0 + Integer(S2) * Q0
R2
Out[110]:
(413824307849274837878444173495381832481711271542660877665776090136738013002360706081905101741970366182852000735413026755334136024*i + 11116354930849730160363859019457408042441864311713507625018166951795380650419459935789302014459877120237310975181238254899073419098 : 7672066798063453498975606895537472491554619160381186530457996151398596200414700709454061374784016144616804741366494723726950024669*i + 21249470597031425200007203229349009324147658895770006959881087256303260042223210302698498057290951567848509824093159692435191138129 : 1)
In [111]:
Phi2 = isogeny_walk (E, R2, l_A, n_A)
Phi2
Out[111]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733563*x + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733543 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733563*x + 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733543 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 76*x + 136 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 76*x + 136 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 716*x + (7168*i+1416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 716*x + (7168*i+1416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 19009467025665401313364637134673339819966410390957391045113091565844912139535648360371247131255557018598065268878923246016210142456*x + (14886837798508871975687887971583688541932805750786834897768997102934126364528688585512426472931496925600684205584053203673168195306*i+13579510389985581074820129257889186020847040538153185578900375795484603039739319994772277590682495591297411511064961552690105551329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 19009467025665401313364637134673339819966410390957391045113091565844912139535648360371247131255557018598065268878923246016210142456*x + (14886837798508871975687887971583688541932805750786834897768997102934126364528688585512426472931496925600684205584053203673168195306*i+13579510389985581074820129257889186020847040538153185578900375795484603039739319994772277590682495591297411511064961552690105551329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2270842527812401074999286254755908615011464695470121906731652507509262698347900441774525965498398486998673713217923858508932582636*i+9237601572060956917719131857603046097231812285343826737172739167660580496998161549707478499684046091554233060114638749688141407)*x + (7018859179513146309515975342623666732089914291673865213324062687740270639502989686054792101163826600845545676851904651386120709654*i+8095788289802260337980186131696004363979391823739869139844667794934478600881172829461023734020016701477149279477021305775315857162) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2270842527812401074999286254755908615011464695470121906731652507509262698347900441774525965498398486998673713217923858508932582636*i+9237601572060956917719131857603046097231812285343826737172739167660580496998161549707478499684046091554233060114638749688141407)*x + (7018859179513146309515975342623666732089914291673865213324062687740270639502989686054792101163826600845545676851904651386120709654*i+8095788289802260337980186131696004363979391823739869139844667794934478600881172829461023734020016701477149279477021305775315857162) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13470941743124937973528352937689633396282044746095475920366680657559379998917983189496083044021673943179749485019259264703292437157*i+729379979284832835438362690520363025421085364462901583695743643839679275851228068595527079746906953426961639233629648627930256571)*x + (1727558605362907317233095334689922198259763407019147334808039209061546348951367057951363213759621173301969361418987209833763916826*i+7277579819780463476013089596569242134442959918930399461309605228838153033132574910234424023804825238176511794409706174482889072744) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13470941743124937973528352937689633396282044746095475920366680657559379998917983189496083044021673943179749485019259264703292437157*i+729379979284832835438362690520363025421085364462901583695743643839679275851228068595527079746906953426961639233629648627930256571)*x + (1727558605362907317233095334689922198259763407019147334808039209061546348951367057951363213759621173301969361418987209833763916826*i+7277579819780463476013089596569242134442959918930399461309605228838153033132574910234424023804825238176511794409706174482889072744) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (955290199930559767493138543067232119169792424384965862833246574472531274991240194797492811481109287091748909225417564287350260269*i+3812893249190027787955532040984239039082880678404686136877368604981239420055869234285497764787888620135636892162257100524856964865)*x + (19132976066540033091487326010949894606045043797953533119353524363956329228215262848781532930720381927880580216450080884045535694972*i+4898492834358667948655125336638205725573482458052841775038427007465937525745574201139566442882978149915969518078526269284427186223) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (955290199930559767493138543067232119169792424384965862833246574472531274991240194797492811481109287091748909225417564287350260269*i+3812893249190027787955532040984239039082880678404686136877368604981239420055869234285497764787888620135636892162257100524856964865)*x + (19132976066540033091487326010949894606045043797953533119353524363956329228215262848781532930720381927880580216450080884045535694972*i+4898492834358667948655125336638205725573482458052841775038427007465937525745574201139566442882978149915969518078526269284427186223) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6441520528593479810680144809634013083275887993530539045310687083834483694667350248328528694347755741319352131217476872708812790693*i+5569481357747439943339284556097457560360694818157915787681045454715643699394637780917977836787646901597138030410757344092419350115)*x + (11068607984999597134561765606315987557309513642697951565772751492950440580092720271699268359376464359639422825345458480826845664915*i+3665995294916647314262996356371237842441357277050556800963714095699684822410709183259240869569644570436220995771124208566024241470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6441520528593479810680144809634013083275887993530539045310687083834483694667350248328528694347755741319352131217476872708812790693*i+5569481357747439943339284556097457560360694818157915787681045454715643699394637780917977836787646901597138030410757344092419350115)*x + (11068607984999597134561765606315987557309513642697951565772751492950440580092720271699268359376464359639422825345458480826845664915*i+3665995294916647314262996356371237842441357277050556800963714095699684822410709183259240869569644570436220995771124208566024241470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1969255093306126136106574449287790015401158936178568260415077862123019374710814363223909612122516625915355642625368796010587733639*i+17216349889613142228270112607081181562889433872146834677301038078281575050357223658074581524636375462665293057779611836691940992688)*x + (7848288334667170762561933283536803345829580872266440783778172192244687305762437052257792876973554236583109005359497934037307429421*i+3885474188553831101521297921176444346461044477671776764687766693618782219891706357105785287621920097998969285052157555631021863887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1969255093306126136106574449287790015401158936178568260415077862123019374710814363223909612122516625915355642625368796010587733639*i+17216349889613142228270112607081181562889433872146834677301038078281575050357223658074581524636375462665293057779611836691940992688)*x + (7848288334667170762561933283536803345829580872266440783778172192244687305762437052257792876973554236583109005359497934037307429421*i+3885474188553831101521297921176444346461044477671776764687766693618782219891706357105785287621920097998969285052157555631021863887) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6932471913956925989300355648547606089672761340833977316371355755025987957964225312303674592342736511502532941957187690964935795796*i+19791168872915703848394248911819813572581784685662052215377277045896764050366466338133380949961702557196528017211545553384811600745)*x + (8459141510657113795204346288215334875873262653055453219238603948134094830737702847823164616839506754784590746486931105143915528909*i+11531863776638384873813649173259035294832915561399382890320623964600952674253620226910532747199846239731384108043096400562852411950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6932471913956925989300355648547606089672761340833977316371355755025987957964225312303674592342736511502532941957187690964935795796*i+19791168872915703848394248911819813572581784685662052215377277045896764050366466338133380949961702557196528017211545553384811600745)*x + (8459141510657113795204346288215334875873262653055453219238603948134094830737702847823164616839506754784590746486931105143915528909*i+11531863776638384873813649173259035294832915561399382890320623964600952674253620226910532747199846239731384108043096400562852411950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14459569211901135753466624568662559991347754640758513525031822399053000562849436350560556096658638608931266170413611272634506530310*i+6991125997116685859090840867918825587936109130293527897520882534446922896253292869045741859980082356357300102790343765358062909014)*x + (23596716056248821521821829637629597951164156911992110586967848674368517481457039803807509983527155779701269925582201328165208460015*i+14919247498445642654307255789990428387893965617798557085653643359904548112243773382327279303096986677750484839116949028247978591315) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14459569211901135753466624568662559991347754640758513525031822399053000562849436350560556096658638608931266170413611272634506530310*i+6991125997116685859090840867918825587936109130293527897520882534446922896253292869045741859980082356357300102790343765358062909014)*x + (23596716056248821521821829637629597951164156911992110586967848674368517481457039803807509983527155779701269925582201328165208460015*i+14919247498445642654307255789990428387893965617798557085653643359904548112243773382327279303096986677750484839116949028247978591315) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4124846312406463918405691488669083715389263565963998259169232448418551105850421472582920063461062288049914433946687447773421981549*i+14354426800834699859027660085468954926015937525738209595252745896561250316141363383062180374581376162375190110087188285828201390832)*x + (5920492202427248409462328185296246166874081947331352721568031302609643648473813883776843898640000845267122194946595763276207371008*i+20261581247050991062453974790012477762940729579934649238936600128092606365493301921164857798640511533816267058108850988029293558450) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4124846312406463918405691488669083715389263565963998259169232448418551105850421472582920063461062288049914433946687447773421981549*i+14354426800834699859027660085468954926015937525738209595252745896561250316141363383062180374581376162375190110087188285828201390832)*x + (5920492202427248409462328185296246166874081947331352721568031302609643648473813883776843898640000845267122194946595763276207371008*i+20261581247050991062453974790012477762940729579934649238936600128092606365493301921164857798640511533816267058108850988029293558450) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1937228278370529219726098657616161732541337858456563144425527722214876757468336546531390573988661896472112438428949463320134066505*i+15007877741067720729555716172018098671539631638422953547940036814483721783728315963557670877775463679768111007553294493202696003643)*x + (2018794835423997992945972058436801277716182454161119449301147247676145338051096587262930204299538693630586292481059277551198886842*i+19593866058143061100228244979173243696469812932993906025793613157048653421031470870382348191098298813133487354846834493686158871004) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1937228278370529219726098657616161732541337858456563144425527722214876757468336546531390573988661896472112438428949463320134066505*i+15007877741067720729555716172018098671539631638422953547940036814483721783728315963557670877775463679768111007553294493202696003643)*x + (2018794835423997992945972058436801277716182454161119449301147247676145338051096587262930204299538693630586292481059277551198886842*i+19593866058143061100228244979173243696469812932993906025793613157048653421031470870382348191098298813133487354846834493686158871004) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2480422380946023535554984587564905396497001735567917196986221783114165473710689462680724098041494588155161503656818821346979934344*i+1575884437865835456014963536445667986784058960728103878609497076993073319972753510631131416712934152879021053473960850796512772002)*x + (17627649950147593561366794400572986514551855511447907329450414994827083959632085506377109171830946183178166887765079694107244880362*i+20527216515062710209356166353756765498586055349889956665835738461225638091872630490732429750260992930343017361532134613696586387454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2480422380946023535554984587564905396497001735567917196986221783114165473710689462680724098041494588155161503656818821346979934344*i+1575884437865835456014963536445667986784058960728103878609497076993073319972753510631131416712934152879021053473960850796512772002)*x + (17627649950147593561366794400572986514551855511447907329450414994827083959632085506377109171830946183178166887765079694107244880362*i+20527216515062710209356166353756765498586055349889956665835738461225638091872630490732429750260992930343017361532134613696586387454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1452086753423337627591833472082570370335333155525132006721962869093917225410312316238616597412751332407709215505933354526513329072*i+4244608469644527896797877750589994581683655234625608776781962666345397401556986572523370263645252766637284814061491327420137612338)*x + (15943993879949950009798933790607276972718507654956610575966753689696285058491146198194660253425139172774464228587907039381869261529*i+3248177535543807652382006144194378305035499647863579415399778789420817753980654514888551963082664895933482930301222819179799209377) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1452086753423337627591833472082570370335333155525132006721962869093917225410312316238616597412751332407709215505933354526513329072*i+4244608469644527896797877750589994581683655234625608776781962666345397401556986572523370263645252766637284814061491327420137612338)*x + (15943993879949950009798933790607276972718507654956610575966753689696285058491146198194660253425139172774464228587907039381869261529*i+3248177535543807652382006144194378305035499647863579415399778789420817753980654514888551963082664895933482930301222819179799209377) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8557410130224736721859748879681504198533104059237821546935823907696406230263961631225471093308137301443487390095435913619615736641*i+24036955279716411501156983478202108378272222198617957097733326128487831453441357936608479652673997609111075892815465819770698654467)*x + (17340088846094553277293282920164934888876789997650813410891106509956529321697297789748034868540856687161283027589029784838572022089*i+22225739241867364324313618063351293270151437133476933398928437183598775065615597046392875665683509817285715658655506676341323642279) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8557410130224736721859748879681504198533104059237821546935823907696406230263961631225471093308137301443487390095435913619615736641*i+24036955279716411501156983478202108378272222198617957097733326128487831453441357936608479652673997609111075892815465819770698654467)*x + (17340088846094553277293282920164934888876789997650813410891106509956529321697297789748034868540856687161283027589029784838572022089*i+22225739241867364324313618063351293270151437133476933398928437183598775065615597046392875665683509817285715658655506676341323642279) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20329594806569024477098692958902373226603667250748283827277336045468109816112703646147606330394741426122407565060354142687752319914*i+6002722066578149236498950195616547485772173415320828793419302180372449020831375474803058936455194972207886836313213955917389313870)*x + (10324978801474056654438474724325646252896498477981347458886870946248720940821359736745239457386784695504997467702363950184025173282*i+19175598454687288464082716907829251019492164435287860746793420340202375775022931487684521379794034764367606977042718231376085420073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20329594806569024477098692958902373226603667250748283827277336045468109816112703646147606330394741426122407565060354142687752319914*i+6002722066578149236498950195616547485772173415320828793419302180372449020831375474803058936455194972207886836313213955917389313870)*x + (10324978801474056654438474724325646252896498477981347458886870946248720940821359736745239457386784695504997467702363950184025173282*i+19175598454687288464082716907829251019492164435287860746793420340202375775022931487684521379794034764367606977042718231376085420073) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1818172018390096640530035739487398386337886060904788867850407998937001919726457115356801802641667133778442574072006099181331659899*i+19871208092477498764787482668753953296729959730631157030180109574774668572505813224714176758821686652568476832891377484681552166900)*x + (9762513795215293066500279096368474293654549223675391737874798950304705413411029477757682760644554456458574286655586803423572230324*i+15827725860539688959765420524105087796125812957450016854061046669515872171540245298091574388105432123924485909122928230068564017462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1818172018390096640530035739487398386337886060904788867850407998937001919726457115356801802641667133778442574072006099181331659899*i+19871208092477498764787482668753953296729959730631157030180109574774668572505813224714176758821686652568476832891377484681552166900)*x + (9762513795215293066500279096368474293654549223675391737874798950304705413411029477757682760644554456458574286655586803423572230324*i+15827725860539688959765420524105087796125812957450016854061046669515872171540245298091574388105432123924485909122928230068564017462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11425063133319544917262323146044514685265204601210147602761058407142459333287126088923691467636845868467211164550957626544344789121*i+15931924854567098187122217392080492126655214479700642025740859798510192425251851558344711971690250180988334133348710128640137563792)*x + (451984508160770872697055595857466007625523704936031358905922560133678003300273956705973693677094510412469091431350094224242059449*i+22671100615573658991915385440738592802586258201986609932978095861659548463559995528078312422147831497258750805681326536453158065597) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11425063133319544917262323146044514685265204601210147602761058407142459333287126088923691467636845868467211164550957626544344789121*i+15931924854567098187122217392080492126655214479700642025740859798510192425251851558344711971690250180988334133348710128640137563792)*x + (451984508160770872697055595857466007625523704936031358905922560133678003300273956705973693677094510412469091431350094224242059449*i+22671100615573658991915385440738592802586258201986609932978095861659548463559995528078312422147831497258750805681326536453158065597) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14159858769494109151080586232578067695055610149056909864302296126139447937094201803989607841243915904410900288670207135077555075310*i+12790546848088400474490138373067742696551771704562152964300018601097678972917185679338268665466698697760793888089382832526535222746)*x + (6493045695640211594947784534925289279940224773248413694139724735617535708407574642404901963492165753728989747990920975636789231740*i+22507333353506198878148943887124806632217839923117281976736026748048524828876226504480171891162343498551038655608668008708953786633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14159858769494109151080586232578067695055610149056909864302296126139447937094201803989607841243915904410900288670207135077555075310*i+12790546848088400474490138373067742696551771704562152964300018601097678972917185679338268665466698697760793888089382832526535222746)*x + (6493045695640211594947784534925289279940224773248413694139724735617535708407574642404901963492165753728989747990920975636789231740*i+22507333353506198878148943887124806632217839923117281976736026748048524828876226504480171891162343498551038655608668008708953786633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21732238316862773537761404819740087271542905004978277059768551263311019110709666529902596052280477820752447783142900852331109539651*i+11221975377116424595143573200983031435892112215230521574811453144272475844559984771133075771514005908649329913062257287743102215107)*x + (12660565019870399400853181523552858357037075540348078785361002508937674511990205746292059954969205176225992689135256825031248016097*i+2189977520521754831185168707195821660832578721384572668718604341369914421626735342785092286289575893687338452901039373350817687880) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21732238316862773537761404819740087271542905004978277059768551263311019110709666529902596052280477820752447783142900852331109539651*i+11221975377116424595143573200983031435892112215230521574811453144272475844559984771133075771514005908649329913062257287743102215107)*x + (12660565019870399400853181523552858357037075540348078785361002508937674511990205746292059954969205176225992689135256825031248016097*i+2189977520521754831185168707195821660832578721384572668718604341369914421626735342785092286289575893687338452901039373350817687880) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20291251249481606311271617275098987019710012744678380943266512187007782866701079166488545971398188863821052361137784852763873777628*i+15413429110293522725627486726675959827365982716390474230039640898361677344316278711140094343668003913674927520448230716246229869555)*x + (18212131152645774935577044891142576821530624884247245646310161019892304308215820684577627690269751944824661135043146512707182634328*i+16917236007296671496207905194028002118638326290807653679584948477794582745803471064841366363449054027110915729184573448040714010500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20291251249481606311271617275098987019710012744678380943266512187007782866701079166488545971398188863821052361137784852763873777628*i+15413429110293522725627486726675959827365982716390474230039640898361677344316278711140094343668003913674927520448230716246229869555)*x + (18212131152645774935577044891142576821530624884247245646310161019892304308215820684577627690269751944824661135043146512707182634328*i+16917236007296671496207905194028002118638326290807653679584948477794582745803471064841366363449054027110915729184573448040714010500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10768743159609827917277845019139073707980266406685139540129560946529867472104699742298732620177094629182941655902651005670124350680*i+18329894153689487036243240028801387010268591981951708385778957019630803340047609760711844813574592506159373367413555186630762405344)*x + (13204700899067365273559764609999235596320530922560866347526748895734661433464607796853705958237575885503628349581080213047363297084*i+3544879124940875273229788829657826687674133500924826530682670714342457879930614496469952927788990079203174930925776326853763698757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10768743159609827917277845019139073707980266406685139540129560946529867472104699742298732620177094629182941655902651005670124350680*i+18329894153689487036243240028801387010268591981951708385778957019630803340047609760711844813574592506159373367413555186630762405344)*x + (13204700899067365273559764609999235596320530922560866347526748895734661433464607796853705958237575885503628349581080213047363297084*i+3544879124940875273229788829657826687674133500924826530682670714342457879930614496469952927788990079203174930925776326853763698757) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20435092424880270134148129603176226700288348116989883099015134401532637068367778357510230765173073671811653247422747739803582300118*i+19556569532785147488497173189224207557321955723371485977879631692248878398804881569999493161505594064670627269257724282973075163910)*x + (20440860774296300630904021769353554562454155057960951764554696945605854296965243139628476178585754937157731229079742559906066556598*i+4676858946838801571713176230744498522404763088942054029192515153294055587738120742507509007715092391666057758854533149592880687359) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20435092424880270134148129603176226700288348116989883099015134401532637068367778357510230765173073671811653247422747739803582300118*i+19556569532785147488497173189224207557321955723371485977879631692248878398804881569999493161505594064670627269257724282973075163910)*x + (20440860774296300630904021769353554562454155057960951764554696945605854296965243139628476178585754937157731229079742559906066556598*i+4676858946838801571713176230744498522404763088942054029192515153294055587738120742507509007715092391666057758854533149592880687359) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2143041084590181160073759073951701370858954718684745143865908365152533757684967841448996353718786391673766697786425811104059348462*i+10860626578099174161944780032140143867780491309785952979014834090516941217801429265300206892194402677909799619584212221208144401186)*x + (10980619987996447113405680070712710880298270138488303359421214472874896970939077457127771361781660005993529082223897484726647511193*i+21720107998080000918095417708228142541011275191893954363943039680449990184145434398545073786477400726312621679886038037667500756605) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2143041084590181160073759073951701370858954718684745143865908365152533757684967841448996353718786391673766697786425811104059348462*i+10860626578099174161944780032140143867780491309785952979014834090516941217801429265300206892194402677909799619584212221208144401186)*x + (10980619987996447113405680070712710880298270138488303359421214472874896970939077457127771361781660005993529082223897484726647511193*i+21720107998080000918095417708228142541011275191893954363943039680449990184145434398545073786477400726312621679886038037667500756605) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4841536567901928193030273278739583146806583040387583201473594548181917276535621668246394966970216707730773254930966139215113013612*i+10962411281868032747445028913488777377712144564485350430776288967493867063883970309970212769534076902822648638589237723529035848093)*x + (19250138065794712647421617649126688214173941858752192064009255569803316393802842698731977291548387641927879695724119858752317597687*i+15650124486840227756948696625226339650885360107949895780502662489225041045094708425617340395765864456650629070809196798230057203358) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4841536567901928193030273278739583146806583040387583201473594548181917276535621668246394966970216707730773254930966139215113013612*i+10962411281868032747445028913488777377712144564485350430776288967493867063883970309970212769534076902822648638589237723529035848093)*x + (19250138065794712647421617649126688214173941858752192064009255569803316393802842698731977291548387641927879695724119858752317597687*i+15650124486840227756948696625226339650885360107949895780502662489225041045094708425617340395765864456650629070809196798230057203358) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21096366410052033502979337597417944015498569276765670067587033412881002529315169099658234402237293672397112570542946515387844778128*i+18352410500060773499727757516437248586836251590374685509405936737459346481808374853693746424950854630163159415004652351329095326556)*x + (2830524303483302435184877790468318305097408837946993722943242639518904435491602002164437105519191344164049485203578928760073077368*i+3143432570528799663430312686088311435466835109378860273549493307492105937551696249385798479270059563314915941726141543571417903702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21096366410052033502979337597417944015498569276765670067587033412881002529315169099658234402237293672397112570542946515387844778128*i+18352410500060773499727757516437248586836251590374685509405936737459346481808374853693746424950854630163159415004652351329095326556)*x + (2830524303483302435184877790468318305097408837946993722943242639518904435491602002164437105519191344164049485203578928760073077368*i+3143432570528799663430312686088311435466835109378860273549493307492105937551696249385798479270059563314915941726141543571417903702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9609095293003982323454139550183514812759213582507199709684243273522655502825889408914274345913931539098612588040097458590619622009*i+8438436732472963175417233599618699095890911556737665623797207765732529822378323843554872357622464672809095238944090215899471836016)*x + (9079402640319027768926140887139241164863734653358595506622485026274072292761594792691060008466328115339033770947807405206025002225*i+5929748127255960270147296758298038677790329203546620206773536700101146852348097772622998318673346910335315174622518246089843360562) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9609095293003982323454139550183514812759213582507199709684243273522655502825889408914274345913931539098612588040097458590619622009*i+8438436732472963175417233599618699095890911556737665623797207765732529822378323843554872357622464672809095238944090215899471836016)*x + (9079402640319027768926140887139241164863734653358595506622485026274072292761594792691060008466328115339033770947807405206025002225*i+5929748127255960270147296758298038677790329203546620206773536700101146852348097772622998318673346910335315174622518246089843360562) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21240330038272862295237731362727209148620073971070513292304344322395505738188463305187930537198848467701508178113069434149188755455*i+3530726537088934238639010130596156035501121535298142017434366420392220594079853150802387061833079692663966495947436498594923772119)*x + (2693724430527591775221234175574383752647423694628386837778334649419469961749471339780687602256789565365716291355817256759741887553*i+9584677040313421743882336842683836465167159816223810396364248234551676021351322726388025055502342168643908554644579093859924082267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21240330038272862295237731362727209148620073971070513292304344322395505738188463305187930537198848467701508178113069434149188755455*i+3530726537088934238639010130596156035501121535298142017434366420392220594079853150802387061833079692663966495947436498594923772119)*x + (2693724430527591775221234175574383752647423694628386837778334649419469961749471339780687602256789565365716291355817256759741887553*i+9584677040313421743882336842683836465167159816223810396364248234551676021351322726388025055502342168643908554644579093859924082267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22552482892880249806985016711790490095336308411454697393266636357376035415550582113303012393213435544867884505380863528246597595961*i+17779277402699454236539985517169986503459534329798766348252810545165357602064688534476774546589406630876084190583333720179502106348)*x + (19416693990306034390305415794055611747571023619814531181234790732814593910188730906909085320544942900276086935207429680613362684734*i+17695962461447509279860880185968381151691896251969884714823300039074025243543070436880598315205297921970081623711342811535582715528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22552482892880249806985016711790490095336308411454697393266636357376035415550582113303012393213435544867884505380863528246597595961*i+17779277402699454236539985517169986503459534329798766348252810545165357602064688534476774546589406630876084190583333720179502106348)*x + (19416693990306034390305415794055611747571023619814531181234790732814593910188730906909085320544942900276086935207429680613362684734*i+17695962461447509279860880185968381151691896251969884714823300039074025243543070436880598315205297921970081623711342811535582715528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21988629778871893941942962670231290101644037035620366948717519720344153332174604943495127123343445251468918203313109969832478058802*i+10957958136619349854252501815680033456933967225295890976333460912758092770594035890947864900711192705501805025962878197982669520054)*x + (6058716044545868788720388525659126511779779564889904452871170164445239270879645990782728298805996828132397247197068248548810481207*i+7057749328910897992307697184160257972142767802542369414670349368862374384368247693977692903448714555293156040355954946210153309819) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21988629778871893941942962670231290101644037035620366948717519720344153332174604943495127123343445251468918203313109969832478058802*i+10957958136619349854252501815680033456933967225295890976333460912758092770594035890947864900711192705501805025962878197982669520054)*x + (6058716044545868788720388525659126511779779564889904452871170164445239270879645990782728298805996828132397247197068248548810481207*i+7057749328910897992307697184160257972142767802542369414670349368862374384368247693977692903448714555293156040355954946210153309819) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7747813766716597892542661783326204075598400561336608135880638322975542882807133774177240341480061373056424848164509185047395722321*i+21759184749594962631504430970554039354311448369930003338814589856491530605471137083095228728477875985652114775617380484937772119006)*x + (21160426216462363595903030786029203916658693401065275329353019233410587705734429557506572270578161663050411196133795836267603390035*i+19168491168420274424987403112225218313887157112744086349022212763017609161055186809750186195481133591391280349030990862041256096544) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7747813766716597892542661783326204075598400561336608135880638322975542882807133774177240341480061373056424848164509185047395722321*i+21759184749594962631504430970554039354311448369930003338814589856491530605471137083095228728477875985652114775617380484937772119006)*x + (21160426216462363595903030786029203916658693401065275329353019233410587705734429557506572270578161663050411196133795836267603390035*i+19168491168420274424987403112225218313887157112744086349022212763017609161055186809750186195481133591391280349030990862041256096544) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6097505799765811734695290127295162444153461391452372222020113649650776164030016003843986336189938517005420291306374476823454252317*i+8485903686412044814376255309025031859703168807795851872838041529711708819401276113005125710487878198534021520485874130557014896774)*x + (18418393916151702047980892270870262943692889848683866449317004666766715482449360974880478741400365555371150745790188257627554979698*i+6109808619705419734920655438955003699226828468057037956135430767190798174596460962589702874812343090567242315377465292516035462950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6097505799765811734695290127295162444153461391452372222020113649650776164030016003843986336189938517005420291306374476823454252317*i+8485903686412044814376255309025031859703168807795851872838041529711708819401276113005125710487878198534021520485874130557014896774)*x + (18418393916151702047980892270870262943692889848683866449317004666766715482449360974880478741400365555371150745790188257627554979698*i+6109808619705419734920655438955003699226828468057037956135430767190798174596460962589702874812343090567242315377465292516035462950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15258316961559763932024660604861603796361257768960635185554924251358364771833166759281060221751638235347535879048394784882828686673*i+14503317439293472481777815343692758102869234321216706517876101676459371465045974865289982344115637679625177472777777210293581648185)*x + (259524901833665538215183001281217950054180267328833113350989980106109966027575876868942517502251244438868756126675924425315984591*i+5178649617785648028380948217173421796596601898047376351796783136241704243670935873981622693621000060818056125783240608204711907967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15258316961559763932024660604861603796361257768960635185554924251358364771833166759281060221751638235347535879048394784882828686673*i+14503317439293472481777815343692758102869234321216706517876101676459371465045974865289982344115637679625177472777777210293581648185)*x + (259524901833665538215183001281217950054180267328833113350989980106109966027575876868942517502251244438868756126675924425315984591*i+5178649617785648028380948217173421796596601898047376351796783136241704243670935873981622693621000060818056125783240608204711907967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4189843292901693439058918362438582067836069060040436653753211880336738778092572678874684403327100564063737158100296786853988648493*i+18700507679906777032347993881512988500858090656520561795566163021161939422589292748892228878277177897741777112276792682546198959958)*x + (16384327986198347454273342842418150501353177298038519102290114796959120616166479165251425759984353402457116719519349479199931973501*i+22122686311895798137869312543866550568598975800293377670083583600863901975588916495368075655995507658085954565988446704959376933207) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4189843292901693439058918362438582067836069060040436653753211880336738778092572678874684403327100564063737158100296786853988648493*i+18700507679906777032347993881512988500858090656520561795566163021161939422589292748892228878277177897741777112276792682546198959958)*x + (16384327986198347454273342842418150501353177298038519102290114796959120616166479165251425759984353402457116719519349479199931973501*i+22122686311895798137869312543866550568598975800293377670083583600863901975588916495368075655995507658085954565988446704959376933207) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4691953000410176028407240105244048165203457035519491845319608233637359781026031477436595656453612425469917128841491185238509840859*i+8053987809612981446797520997776653783787235210724326678609708606213274837469106809477855170540287314218537165964992202383550232312)*x + (9986109792969742946350500552738261602288014463955153583602454281915035897193482012148315700248659305332965200838234312869295501098*i+11900695548420834723872739408251872508903524665436404831513882718682104786329916601220117011938550869710055527159426324310987581135) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4691953000410176028407240105244048165203457035519491845319608233637359781026031477436595656453612425469917128841491185238509840859*i+8053987809612981446797520997776653783787235210724326678609708606213274837469106809477855170540287314218537165964992202383550232312)*x + (9986109792969742946350500552738261602288014463955153583602454281915035897193482012148315700248659305332965200838234312869295501098*i+11900695548420834723872739408251872508903524665436404831513882718682104786329916601220117011938550869710055527159426324310987581135) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4476677183843330140618217576026970296334869054866938910463561931717721053869507164204411890874742963426810227224352611658879310905*i+17845408498270445881945923331602096687781938333420825623114754167277917253771011238238227161247719031848543950088177782448001470395)*x + (16964712083647221328957859754395003317427218166493450433554439712442839848778947531599137959153282855499703638854956691168697869750*i+6500171759520441782804731343583925515923548968029365986135435412863280624518657580988941518322589330149841294118701988500719021978) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4476677183843330140618217576026970296334869054866938910463561931717721053869507164204411890874742963426810227224352611658879310905*i+17845408498270445881945923331602096687781938333420825623114754167277917253771011238238227161247719031848543950088177782448001470395)*x + (16964712083647221328957859754395003317427218166493450433554439712442839848778947531599137959153282855499703638854956691168697869750*i+6500171759520441782804731343583925515923548968029365986135435412863280624518657580988941518322589330149841294118701988500719021978) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11144670831925960548562932307345459387460538808490308159703265280097764731573672048660297236290684832111580917888610675709411382946*i+10985277945488911596986919638672377729661312702507757529674548203884970205630096443976031731564764554888043916918610772745752337648)*x + (1338795641076957199991403822076262973011874651303316206053945425012881529736948989353812896790361316888072926790010965836641555934*i+21192523375680875223821064452479564234334821076695244713395346784783191383024881729678012577131609956335629121988362805046077860782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11144670831925960548562932307345459387460538808490308159703265280097764731573672048660297236290684832111580917888610675709411382946*i+10985277945488911596986919638672377729661312702507757529674548203884970205630096443976031731564764554888043916918610772745752337648)*x + (1338795641076957199991403822076262973011874651303316206053945425012881529736948989353812896790361316888072926790010965836641555934*i+21192523375680875223821064452479564234334821076695244713395346784783191383024881729678012577131609956335629121988362805046077860782) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21664908505327681571229440920868265863654160397969206665732949567218079351231539098498087802743440364756454516768903484313781731099*i+12614051292979257763216404818577510471389212851021446049672877770989841639459757465408091262583366068577201452799643539154235724722)*x + (9259132445542585886915409225682145512360658691815499684384519415033792786280450585489655711546989240122995366146676264622000169453*i+21610805707157026396527389666987357461696111465568674437399944363553339224062684909372895017196880799404848467749115505679441553418) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21664908505327681571229440920868265863654160397969206665732949567218079351231539098498087802743440364756454516768903484313781731099*i+12614051292979257763216404818577510471389212851021446049672877770989841639459757465408091262583366068577201452799643539154235724722)*x + (9259132445542585886915409225682145512360658691815499684384519415033792786280450585489655711546989240122995366146676264622000169453*i+21610805707157026396527389666987357461696111465568674437399944363553339224062684909372895017196880799404848467749115505679441553418) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15877706101949644742946420867036215994557623867820216275595384466986555657666217215212250370075320265953740470354004552187019245378*i+1880200315684846095927861021958886438558581424297148294243218567222471852451213214901665390265817884330186200547727943403008099207)*x + (20587714640258011245858934235092891012969627408098940258959347170001054340520140606536629907160745585394203959910336823516154035231*i+9039770388808274818008875752614538390715852016184466430514901627018701487010089170113781859440991222436314111862617501856121718753) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15877706101949644742946420867036215994557623867820216275595384466986555657666217215212250370075320265953740470354004552187019245378*i+1880200315684846095927861021958886438558581424297148294243218567222471852451213214901665390265817884330186200547727943403008099207)*x + (20587714640258011245858934235092891012969627408098940258959347170001054340520140606536629907160745585394203959910336823516154035231*i+9039770388808274818008875752614538390715852016184466430514901627018701487010089170113781859440991222436314111862617501856121718753) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9476265687324257764230425988871377925406213450698713331952628047237626209102669681369525064658005593716828742918996741280490377775*i+9772996802208025745387240626664671454330666079613730160137044485982485350834387610091586765872526471202610759349656511963243403364)*x + (12090012939598340454824265749083684895791867582337692380276395356818392768443008621071759255232077538910852296299088375748083970426*i+13902724845164844800538813342021338985968712688650525059635800576612749817348935867647674041232120478665139028980733298760846141218) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9476265687324257764230425988871377925406213450698713331952628047237626209102669681369525064658005593716828742918996741280490377775*i+9772996802208025745387240626664671454330666079613730160137044485982485350834387610091586765872526471202610759349656511963243403364)*x + (12090012939598340454824265749083684895791867582337692380276395356818392768443008621071759255232077538910852296299088375748083970426*i+13902724845164844800538813342021338985968712688650525059635800576612749817348935867647674041232120478665139028980733298760846141218) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7616127440377764086783395756486982828251682657295059436811406660012017153499126447767823947677578282316796838983295206087473925429*i+13047857131615063058874488323257966870274850033121026979698789229403323775840898755594215461732456379091660270356793787922326520227)*x + (23512047393097377007952889646534416135158992469102894148460022104485655079728497990692146835252264731965186134030977609879187222326*i+3544287603418603446623594662085816924801465470796815129496586107695361088846661113631792152976860142233761071575470575281561257308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7616127440377764086783395756486982828251682657295059436811406660012017153499126447767823947677578282316796838983295206087473925429*i+13047857131615063058874488323257966870274850033121026979698789229403323775840898755594215461732456379091660270356793787922326520227)*x + (23512047393097377007952889646534416135158992469102894148460022104485655079728497990692146835252264731965186134030977609879187222326*i+3544287603418603446623594662085816924801465470796815129496586107695361088846661113631792152976860142233761071575470575281561257308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6016192599447621723847367912718632648959516235109651346391316369121241614693031669701794600874701029400867695202906941595723408278*i+7847534922946289144949946883609348154908742155077174604600991726922790820723777116854208243316066130443980005555876902169394700916)*x + (10881916282982635052124260611446954044387189474096327567844212701891467222351214378387705827406429033299967794814819361749631459742*i+9110378813612031971962980993725575740006461033143207099993861848112028214787704727936958641284705405598447964979623861301492497767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6016192599447621723847367912718632648959516235109651346391316369121241614693031669701794600874701029400867695202906941595723408278*i+7847534922946289144949946883609348154908742155077174604600991726922790820723777116854208243316066130443980005555876902169394700916)*x + (10881916282982635052124260611446954044387189474096327567844212701891467222351214378387705827406429033299967794814819361749631459742*i+9110378813612031971962980993725575740006461033143207099993861848112028214787704727936958641284705405598447964979623861301492497767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3864190535176096741909454277354709539581358064679876166713165496153566993916759197107992469770325354555286605789709355662194730853*i+24182313037751778707991197930769732118152412782168352286798752520718687658317531108149070963974132768565922670530762461123696477800)*x + (4104844763004275195470005048381603191522789151511502611267594921628239582467748230699610408120995590677299206696133464307167216371*i+22691409128660910299564710248981580961328782305395774265089628544287312953055181433862041987941338767190186648941768524897322830378) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3864190535176096741909454277354709539581358064679876166713165496153566993916759197107992469770325354555286605789709355662194730853*i+24182313037751778707991197930769732118152412782168352286798752520718687658317531108149070963974132768565922670530762461123696477800)*x + (4104844763004275195470005048381603191522789151511502611267594921628239582467748230699610408120995590677299206696133464307167216371*i+22691409128660910299564710248981580961328782305395774265089628544287312953055181433862041987941338767190186648941768524897322830378) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12174820990675129549919303876808466151992029591136011169404914920281934346890975594764519060636273764567797836761408141648380023790*i+18763317608662937148665243234258972083918852793976178728513723592672910418935592560175844833926565518612167806765953779052240080890)*x + (2468657562052650777087124705055085746354905040719114967364300373445929348195079054633073616063158699149388437401676687433131063138*i+2566413103482069215272014959864296266051149752220070236225514444798217469930482226611663455136281050186825274719902556137215928135) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12174820990675129549919303876808466151992029591136011169404914920281934346890975594764519060636273764567797836761408141648380023790*i+18763317608662937148665243234258972083918852793976178728513723592672910418935592560175844833926565518612167806765953779052240080890)*x + (2468657562052650777087124705055085746354905040719114967364300373445929348195079054633073616063158699149388437401676687433131063138*i+2566413103482069215272014959864296266051149752220070236225514444798217469930482226611663455136281050186825274719902556137215928135) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14863605131912914995576617165755100215396302677283130522337814144754586355325180454330982499366081166161593368629067101681401460550*i+21860405699362866566835617189465200594858740208810360413723694340777223138073949551948060270742489764471675721483980953879822663507)*x + (22446835719311260690388003840928824741146619363016118519777817306876673007306465258152467502675767000298202898665033614269049547414*i+2533983733039378751722789581679977482173235108289624714069567128826740366828509778815182420416703320509349947993537412913974339814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14863605131912914995576617165755100215396302677283130522337814144754586355325180454330982499366081166161593368629067101681401460550*i+21860405699362866566835617189465200594858740208810360413723694340777223138073949551948060270742489764471675721483980953879822663507)*x + (22446835719311260690388003840928824741146619363016118519777817306876673007306465258152467502675767000298202898665033614269049547414*i+2533983733039378751722789581679977482173235108289624714069567128826740366828509778815182420416703320509349947993537412913974339814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22139617752817477085880349217541815226158312792256514392424709713711416498222296991671304063758934435581915685665445364937068046070*i+20534174007111042168443886604678237678717281969424021420792618916194984276910544575105978233276971974392497862418913125362003893570)*x + (13102804248238242005187770133791491529653763206769000702154782661080937737793982900552227087228251110656432367916045727377542061154*i+10706274542805736134695621635211343068803679186287781484969971586966472780451846023881667341479838707699870540518340285970510467093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22139617752817477085880349217541815226158312792256514392424709713711416498222296991671304063758934435581915685665445364937068046070*i+20534174007111042168443886604678237678717281969424021420792618916194984276910544575105978233276971974392497862418913125362003893570)*x + (13102804248238242005187770133791491529653763206769000702154782661080937737793982900552227087228251110656432367916045727377542061154*i+10706274542805736134695621635211343068803679186287781484969971586966472780451846023881667341479838707699870540518340285970510467093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8166742225338022765256565164508525325862850743290805966039051304742083311685531837182939653929630571316354458770022612425912095575*i+11331637866483712095102861935533012562614904169781978680401529113776104919961286585840862492975575433127949513745443704914673233939)*x + (5355650703174232790831204939643007340977331309047388450424875365542013393165795038776890222779620901548437461367932606204798452794*i+5565205016256535318982094558431051112985499394515392506666679688166150942250430378525482019347986272705602416828111276828930266407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8166742225338022765256565164508525325862850743290805966039051304742083311685531837182939653929630571316354458770022612425912095575*i+11331637866483712095102861935533012562614904169781978680401529113776104919961286585840862492975575433127949513745443704914673233939)*x + (5355650703174232790831204939643007340977331309047388450424875365542013393165795038776890222779620901548437461367932606204798452794*i+5565205016256535318982094558431051112985499394515392506666679688166150942250430378525482019347986272705602416828111276828930266407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15397857618044019598078296199625252396511563980802247105780973866668151841396900664460222274403487484826877940946816496837098370901*i+5386258779079248319470656305885137444191270483811914275152585497077608919267843771269830179544384982003826384530142111684667784956)*x + (17507654104021286974535135155336474757066223920650947583717022517812977840738176510885612830408980754440659145609024787471991619028*i+21008968798096399709926302086686684960621289830749047898129755438502285391801007444159370609387353062526479211103089931334458613475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15397857618044019598078296199625252396511563980802247105780973866668151841396900664460222274403487484826877940946816496837098370901*i+5386258779079248319470656305885137444191270483811914275152585497077608919267843771269830179544384982003826384530142111684667784956)*x + (17507654104021286974535135155336474757066223920650947583717022517812977840738176510885612830408980754440659145609024787471991619028*i+21008968798096399709926302086686684960621289830749047898129755438502285391801007444159370609387353062526479211103089931334458613475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3324886537257324548860987932404006029568729922018843875962303403295068095604421342162756193381270839200096406767259382988254365877*i+23989561573023833159317501915167817973832202932252911022384540130582348250433559155069441113466479742799658684018795497574598230279)*x + (17025416379904627469786414327759967548202542135404893217682585079162702037242474153355755879043284053672986770762119415968147061657*i+1202441688557927693640786287329119147148497766364423166172564176481235609303532218167387588520540267744735269018022526657035309278) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3324886537257324548860987932404006029568729922018843875962303403295068095604421342162756193381270839200096406767259382988254365877*i+23989561573023833159317501915167817973832202932252911022384540130582348250433559155069441113466479742799658684018795497574598230279)*x + (17025416379904627469786414327759967548202542135404893217682585079162702037242474153355755879043284053672986770762119415968147061657*i+1202441688557927693640786287329119147148497766364423166172564176481235609303532218167387588520540267744735269018022526657035309278) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15692769846696622311844593848760299945326897029026682090501226012343723445721740587570947803436062436604311938210498416343664832393*i+17647156916361513560601256151913683197356210625733578309387510298316125944034304947598365141401505191287341134575642416368624402439)*x + (12956743414071517389294283348859311231518512134461681976983058399420207870259316424584118667960277278173329824612779741554698050990*i+3830004516861407952563186686566974450778756257217132918539275677404699840260605095365431938804850791838639056075010521163828740170) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15692769846696622311844593848760299945326897029026682090501226012343723445721740587570947803436062436604311938210498416343664832393*i+17647156916361513560601256151913683197356210625733578309387510298316125944034304947598365141401505191287341134575642416368624402439)*x + (12956743414071517389294283348859311231518512134461681976983058399420207870259316424584118667960277278173329824612779741554698050990*i+3830004516861407952563186686566974450778756257217132918539275677404699840260605095365431938804850791838639056075010521163828740170) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23336286670495958229526084646881088546081457965537541941162992392809112359417612121793770501317061036842835508530722253659578689322*i+14528743378911881041612774334886384630005014185661476695020497262646045861563975671644842447045434974123260504476096699257978044857)*x + (24266648198953650499925432076548834274519222211425284765658735244199364998636662697726944033302456517482580792687138951059972917819*i+10005789430172359592603328479932212691757980550281303514970776678823144910239611053130273713966642114677531853279711630880420075396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23336286670495958229526084646881088546081457965537541941162992392809112359417612121793770501317061036842835508530722253659578689322*i+14528743378911881041612774334886384630005014185661476695020497262646045861563975671644842447045434974123260504476096699257978044857)*x + (24266648198953650499925432076548834274519222211425284765658735244199364998636662697726944033302456517482580792687138951059972917819*i+10005789430172359592603328479932212691757980550281303514970776678823144910239611053130273713966642114677531853279711630880420075396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11216121335525171103176725884660637502854701970045167120714683175493182758656449007589623462943383928024128511300941600813398077115*i+9428921740575723941279951025722533723643132222433874695515745073123773759775969016177339840101425215749215538563626620902443930310)*x + (147941599149989954364442983017638690630394394305638594309196961515310844663835939872117134611878054031454307115547761024557536744*i+4303519386158699172934190888291022631470519651510275809722647891936825331673647020471460693974045148984712680706934685560670946751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11216121335525171103176725884660637502854701970045167120714683175493182758656449007589623462943383928024128511300941600813398077115*i+9428921740575723941279951025722533723643132222433874695515745073123773759775969016177339840101425215749215538563626620902443930310)*x + (147941599149989954364442983017638690630394394305638594309196961515310844663835939872117134611878054031454307115547761024557536744*i+4303519386158699172934190888291022631470519651510275809722647891936825331673647020471460693974045148984712680706934685560670946751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21443010414079738879777027806339410053272647818021978517958618935083305295855218625849015988730907014594318857057166439890800274611*i+8030367005306316208390279591845095242607024968225751196198794803966872559906581589780120530293547195520052455209204651172900692917)*x + (9717225027132833141236707528690627829150534107082185917231285752735309096180820828978672005133412668170587607350855279927802465271*i+2536883181582690871949847574974569643313076231943688926833499573382853345763503808149338929508226679669173578956612533937889507974) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21443010414079738879777027806339410053272647818021978517958618935083305295855218625849015988730907014594318857057166439890800274611*i+8030367005306316208390279591845095242607024968225751196198794803966872559906581589780120530293547195520052455209204651172900692917)*x + (9717225027132833141236707528690627829150534107082185917231285752735309096180820828978672005133412668170587607350855279927802465271*i+2536883181582690871949847574974569643313076231943688926833499573382853345763503808149338929508226679669173578956612533937889507974) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15510738685495751166069589047924527543996813540932150523222766269069790900348263781038971502200157644270807308753908523192234454606*i+17341616085810353765342090465368568534763160806683644180855619293363307536403927444491480640827206090284014468410287440441797933828)*x + (20213412744279979668142360702437260524851337693347159599057319365895345871638831895521146096712434831116357016152786950369126941756*i+10664922924288710612001162966424308586939323709316351720077826982803998244283741883920268510351002272405967559548390624595469706189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15510738685495751166069589047924527543996813540932150523222766269069790900348263781038971502200157644270807308753908523192234454606*i+17341616085810353765342090465368568534763160806683644180855619293363307536403927444491480640827206090284014468410287440441797933828)*x + (20213412744279979668142360702437260524851337693347159599057319365895345871638831895521146096712434831116357016152786950369126941756*i+10664922924288710612001162966424308586939323709316351720077826982803998244283741883920268510351002272405967559548390624595469706189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10642393516027564749754668470681587156119976163142596997010672451349499614962153436849431482711047806865651075587310688353136655906*i+1935445145641848585838746934232197957513690271160539538677343304431492302910003432597749087638879663807991406990891182425030657946)*x + (24288753641324735270821351071940298019489807142556181931567367514038646841726586835088072048649379052122994068804617739533236377335*i+23442902189823033270245314467800640505345763235191468080548605006125504117219687570540513637036178377239793079440515715048435209116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10642393516027564749754668470681587156119976163142596997010672451349499614962153436849431482711047806865651075587310688353136655906*i+1935445145641848585838746934232197957513690271160539538677343304431492302910003432597749087638879663807991406990891182425030657946)*x + (24288753641324735270821351071940298019489807142556181931567367514038646841726586835088072048649379052122994068804617739533236377335*i+23442902189823033270245314467800640505345763235191468080548605006125504117219687570540513637036178377239793079440515715048435209116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1811743041666950849109430095428013994888384279796444527300973118646581873757314489944891345115231273343218600861882034688087027053*i+9774462355099313208353130908946882835568128828468153306730597782797736714471297663718280985448266190381668333604066342411934250232)*x + (23864525947081194163848890417282372031887377292945463838206435884524096457662292561079047797772897730493148283638403205352530696180*i+6924697580500630291366381368831163828873523754527004595863754848105671538423595442933806878470534829912272520806784261941576119174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1811743041666950849109430095428013994888384279796444527300973118646581873757314489944891345115231273343218600861882034688087027053*i+9774462355099313208353130908946882835568128828468153306730597782797736714471297663718280985448266190381668333604066342411934250232)*x + (23864525947081194163848890417282372031887377292945463838206435884524096457662292561079047797772897730493148283638403205352530696180*i+6924697580500630291366381368831163828873523754527004595863754848105671538423595442933806878470534829912272520806784261941576119174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7288943943244745043374199776269546118411538620461117337984692346684395470290763197871875903699492881436358394195058133346756801999*i+19254512151918839289208900913292546975153960174350955831820798569229431074354634760789970473201031361115728414526224080370198139830)*x + (9834240711654531520944438839556682828840362677664110585433395489691911522919433497977512786329628890648887778474896672490098881952*i+7663266685546565209656575515216040842542057286683479726726233498709810504365940093545970200471670805234030965754466167358364701066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7288943943244745043374199776269546118411538620461117337984692346684395470290763197871875903699492881436358394195058133346756801999*i+19254512151918839289208900913292546975153960174350955831820798569229431074354634760789970473201031361115728414526224080370198139830)*x + (9834240711654531520944438839556682828840362677664110585433395489691911522919433497977512786329628890648887778474896672490098881952*i+7663266685546565209656575515216040842542057286683479726726233498709810504365940093545970200471670805234030965754466167358364701066) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14840869755894876857921293540114151839046077631783273697786763926331365463303812454275437215938643270862767460127288249750216045757*i+6726068755034293916932766251315810646518275740239126937538873332683536799391356338391642794255692489369507388475384925272195898808)*x + (11890649819336305505502735920457903803142390745711662988428523800519770985876720520226838088213154523928392177779975829051892433109*i+1796110553881283651096992364434819118090016301764175589415762845499541801255598747811538100053973509438403854385608598292954696347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14840869755894876857921293540114151839046077631783273697786763926331365463303812454275437215938643270862767460127288249750216045757*i+6726068755034293916932766251315810646518275740239126937538873332683536799391356338391642794255692489369507388475384925272195898808)*x + (11890649819336305505502735920457903803142390745711662988428523800519770985876720520226838088213154523928392177779975829051892433109*i+1796110553881283651096992364434819118090016301764175589415762845499541801255598747811538100053973509438403854385608598292954696347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18567501874862670580103637991564508155896895004283259995712614163621720539798320484991063358141924524364887160794648025752152806021*i+13549499316232585681273680887452923211239122468163872890742498076326738615611105524535831338593240367052305127694621140076278152282)*x + (17407210118325679677495981427995629438670035865377367020161389953716618963173474465563927556322804121172249962414645064163639178*i+3230467491121351257530569423937693940414783461000746199815562666438989971991151081403009049680937875227096906366226352524250253777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18567501874862670580103637991564508155896895004283259995712614163621720539798320484991063358141924524364887160794648025752152806021*i+13549499316232585681273680887452923211239122468163872890742498076326738615611105524535831338593240367052305127694621140076278152282)*x + (17407210118325679677495981427995629438670035865377367020161389953716618963173474465563927556322804121172249962414645064163639178*i+3230467491121351257530569423937693940414783461000746199815562666438989971991151081403009049680937875227096906366226352524250253777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14806841847924935814165424070734901375416206769017869821009511470932152630133714156726137577723881202116612883076780359269394188859*i+9186195347226915283218211147543914606363673841421185617286608106302902339550065194075850379396091479789103632311867716101877576364)*x + (4758513487739940492219049318538542952795112921615427017813369044722440446478974613825869479868572099075860674668817169736381818461*i+4510789830076007235450712002598479258536071553550899474520936575055133039232910789405451986609098403869200198211408263940294560791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14806841847924935814165424070734901375416206769017869821009511470932152630133714156726137577723881202116612883076780359269394188859*i+9186195347226915283218211147543914606363673841421185617286608106302902339550065194075850379396091479789103632311867716101877576364)*x + (4758513487739940492219049318538542952795112921615427017813369044722440446478974613825869479868572099075860674668817169736381818461*i+4510789830076007235450712002598479258536071553550899474520936575055133039232910789405451986609098403869200198211408263940294560791) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2644212993049631299529157513934792608144595262165790289747021723734818489568565521037654944061788066516558710664075382623045260836*i+23122347696779425376569986509049307294704000765748654935240685371201861590365611698595216980133168167773518572513536450838906608607)*x + (18614298564773238522528697253211468262794701217244901935977825188518588015967751892008495176059703680317337684285280449848659431862*i+15843074703029892207130236949791511456208823390768819393598202663564572049816436826048862647105715889113621033318187490346909381778) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2644212993049631299529157513934792608144595262165790289747021723734818489568565521037654944061788066516558710664075382623045260836*i+23122347696779425376569986509049307294704000765748654935240685371201861590365611698595216980133168167773518572513536450838906608607)*x + (18614298564773238522528697253211468262794701217244901935977825188518588015967751892008495176059703680317337684285280449848659431862*i+15843074703029892207130236949791511456208823390768819393598202663564572049816436826048862647105715889113621033318187490346909381778) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16493419595357478690071129119074544234767629914265365475516463605761540049999075106117479383012969155321043043681231519008586878293*i+1205969403182159032038553795944665783278571733227779629350075716881379781283346422424767500614859996488214768316740832071840011043)*x + (13203367040552080328557617022614107803973512551589093959698980921599084514111219875745875689183683390425056934736201480493079121837*i+21268292177252668596520518851858606963000002554388100626908053789480077571905039000243129701255262788132202736829788802317185481574) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16493419595357478690071129119074544234767629914265365475516463605761540049999075106117479383012969155321043043681231519008586878293*i+1205969403182159032038553795944665783278571733227779629350075716881379781283346422424767500614859996488214768316740832071840011043)*x + (13203367040552080328557617022614107803973512551589093959698980921599084514111219875745875689183683390425056934736201480493079121837*i+21268292177252668596520518851858606963000002554388100626908053789480077571905039000243129701255262788132202736829788802317185481574) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21072432716837579381895687066128201386190198791726570739727879818589903555967679289731412468786089379915310022928083071411142117768*i+6253710875350799909040545852834101971138582299716287739677016922906213174989266659391977176938114947044056698117537970505936601311)*x + (10501105523244611757237459992069800347975788639913417879798069512663416573468506861510416535898660634148562964664476897631404651161*i+23248476674351452499953473896259296977878068269276613615092318960315006598930283684379985740555739355903512057159771853393361401758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21072432716837579381895687066128201386190198791726570739727879818589903555967679289731412468786089379915310022928083071411142117768*i+6253710875350799909040545852834101971138582299716287739677016922906213174989266659391977176938114947044056698117537970505936601311)*x + (10501105523244611757237459992069800347975788639913417879798069512663416573468506861510416535898660634148562964664476897631404651161*i+23248476674351452499953473896259296977878068269276613615092318960315006598930283684379985740555739355903512057159771853393361401758) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7228068154877436208949817267874574335581328662885606007111713106352744054648595542246051658610704747823373333825482055034968762192*i+22303472260712343469196949804011838170717973729526670115673889599854497380192034750801613250741767764508330932364739712512395406406)*x + (20253602971124016858095981702430205884335706912720710645332029297819400815594351897202747075162785862041486656445488824465920462944*i+20051115249011703218940315356640956948038799328583557921080688637175118904260061443620387034062470970098273897274544240902451617889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7228068154877436208949817267874574335581328662885606007111713106352744054648595542246051658610704747823373333825482055034968762192*i+22303472260712343469196949804011838170717973729526670115673889599854497380192034750801613250741767764508330932364739712512395406406)*x + (20253602971124016858095981702430205884335706912720710645332029297819400815594351897202747075162785862041486656445488824465920462944*i+20051115249011703218940315356640956948038799328583557921080688637175118904260061443620387034062470970098273897274544240902451617889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21976399651234544627993586530333920978449524726151621967760702347437972664065736608680788094142135283214491581320849032459173935571*i+5186154599306116150791521462271274806514582814006413031454524284781873020955352120561329737868141406916125674607078776921892630431)*x + (16960585170205459438441118107133907232192230887115567669204539314754818001683898471804880002805461839353311849653663112322250454518*i+23061680083763351437829215019460960646261727263737101888473448231503201139148294317653736711176581691538990675698324250625575933008) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21976399651234544627993586530333920978449524726151621967760702347437972664065736608680788094142135283214491581320849032459173935571*i+5186154599306116150791521462271274806514582814006413031454524284781873020955352120561329737868141406916125674607078776921892630431)*x + (16960585170205459438441118107133907232192230887115567669204539314754818001683898471804880002805461839353311849653663112322250454518*i+23061680083763351437829215019460960646261727263737101888473448231503201139148294317653736711176581691538990675698324250625575933008) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (139736003122086625681237620258261088998497799977810403280366036418890286914504135969330036360872882625620898754429463891656445321*i+2419638703029202780208025916658705149333932336907097506027259352242238582957702722822750777040398821369061774559787452003991794259)*x + (6612204457731307995511940555656487173904615179200948685647740949944448185662637615543063667939786981981092147143834473640830682496*i+2748744171701959121781477479807742930531532744846280015474478856290641674716924964792158568324196816751359573083578652827353933046) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (139736003122086625681237620258261088998497799977810403280366036418890286914504135969330036360872882625620898754429463891656445321*i+2419638703029202780208025916658705149333932336907097506027259352242238582957702722822750777040398821369061774559787452003991794259)*x + (6612204457731307995511940555656487173904615179200948685647740949944448185662637615543063667939786981981092147143834473640830682496*i+2748744171701959121781477479807742930531532744846280015474478856290641674716924964792158568324196816751359573083578652827353933046) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1173187011699715575176197536866006967736313325499664102095716226045988040338977792884760845391359243688469644227752054133227839931*i+902001159724144823264338683598560478459983340595728425883866240347565966953401493606587000963775730930294867522330600941269508700)*x + (24103366252452134205796775455941681860683894816326554565955277392751070156829259356570128743266003330643708956997185773587248768271*i+10711736263973618414705388479930127640111284268918890526136187027877473896532029133161737209641504393354664223904147165679199609644) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1173187011699715575176197536866006967736313325499664102095716226045988040338977792884760845391359243688469644227752054133227839931*i+902001159724144823264338683598560478459983340595728425883866240347565966953401493606587000963775730930294867522330600941269508700)*x + (24103366252452134205796775455941681860683894816326554565955277392751070156829259356570128743266003330643708956997185773587248768271*i+10711736263973618414705388479930127640111284268918890526136187027877473896532029133161737209641504393354664223904147165679199609644) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5615572109620462088423424773938585345681037529341608468888779562169349684134040521457707720614019889125143751321270216867776196389*i+24426414688095533964979597830324870205151523563503245054046684598598094130432129947826731376727803997085057898131011104952459979286)*x + (23122624794887419761508627992011068543226493961028617315611716724452159072828532437234905407869556502676502209608981005680845276533*i+15908221972853298393570170276967954983466953843945096240037842999413274319813873737800658456021049510584066338477334961284868477371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5615572109620462088423424773938585345681037529341608468888779562169349684134040521457707720614019889125143751321270216867776196389*i+24426414688095533964979597830324870205151523563503245054046684598598094130432129947826731376727803997085057898131011104952459979286)*x + (23122624794887419761508627992011068543226493961028617315611716724452159072828532437234905407869556502676502209608981005680845276533*i+15908221972853298393570170276967954983466953843945096240037842999413274319813873737800658456021049510584066338477334961284868477371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6186401035604697418500678020065696310760047028886228471761619309376631450320177146557860187449434584591789302744564814800842968067*i+14598679214635850619253027755569987214363560474756572143802907708170490403143142956345161171521091163882494810775538129854691535155)*x + (9847438454957903907044822028339349869582493066614814146302814546933876544602809730665382286029829382744374952173222108574919562325*i+7735189685772658346066004105393661653886746969990140926235845999878096195798160534295786968691407230300055589514816150277849968588) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6186401035604697418500678020065696310760047028886228471761619309376631450320177146557860187449434584591789302744564814800842968067*i+14598679214635850619253027755569987214363560474756572143802907708170490403143142956345161171521091163882494810775538129854691535155)*x + (9847438454957903907044822028339349869582493066614814146302814546933876544602809730665382286029829382744374952173222108574919562325*i+7735189685772658346066004105393661653886746969990140926235845999878096195798160534295786968691407230300055589514816150277849968588) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15243742206137562958560552512670218740949109493047640918601795221111978950512106643930245590927158880828004013342201751832421235778*i+16637592307062038962788732877190378841368631499977772904294289882312814456652433008047311542555751225943654394053739420275549451517)*x + (1854937484142179199509307407163512937847093359499053515122174780599295704245339481046572295736648248837397053806088202311862962114*i+15887833200000231887085215473774757814130150044021427849982814206664237319487653017730435230538577235888278225868860077344786427498) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15243742206137562958560552512670218740949109493047640918601795221111978950512106643930245590927158880828004013342201751832421235778*i+16637592307062038962788732877190378841368631499977772904294289882312814456652433008047311542555751225943654394053739420275549451517)*x + (1854937484142179199509307407163512937847093359499053515122174780599295704245339481046572295736648248837397053806088202311862962114*i+15887833200000231887085215473774757814130150044021427849982814206664237319487653017730435230538577235888278225868860077344786427498) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12032966407091730972108891235083497748056120170919153798113871222934784088146043043091820721675096872410965632370051636218268650340*i+196266420802935515119961029326202698518315931144879884447257496775783387342996122058796943866199489517103190931656117902042806429)*x + (15311759352762263182348769194613789881401994834734406269953255916570278845630651690720113810811980853571753947469971140960484440074*i+6812564432690719978054514419091695484917288218829334742813797936706790770109932264770125087524131702014225295818311558305562529546) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12032966407091730972108891235083497748056120170919153798113871222934784088146043043091820721675096872410965632370051636218268650340*i+196266420802935515119961029326202698518315931144879884447257496775783387342996122058796943866199489517103190931656117902042806429)*x + (15311759352762263182348769194613789881401994834734406269953255916570278845630651690720113810811980853571753947469971140960484440074*i+6812564432690719978054514419091695484917288218829334742813797936706790770109932264770125087524131702014225295818311558305562529546) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8057278864780368250509435844793509416426615697000457562847160351576506917121752038514034527592392586195549963957563879912025284937*i+10587751254382006793466614021492113089823832873990281660496499472368195225050603987377369191773802834712334131601328551312423686022)*x + (19219215931625994903396407721020963866129184259551798159426233531340598807676076767018759056356254357222675978735845029471257122416*i+18983777614386938905779610694338741893898348752837435125433567427434075100104958346548860680742845787527657444176726466146824967360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8057278864780368250509435844793509416426615697000457562847160351576506917121752038514034527592392586195549963957563879912025284937*i+10587751254382006793466614021492113089823832873990281660496499472368195225050603987377369191773802834712334131601328551312423686022)*x + (19219215931625994903396407721020963866129184259551798159426233531340598807676076767018759056356254357222675978735845029471257122416*i+18983777614386938905779610694338741893898348752837435125433567427434075100104958346548860680742845787527657444176726466146824967360) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10009064455346151923470936332146822810134837690281675701829725681184581304770092578850779970612947265845056790387816969566112148920*i+1241136560277041637686929091924745571715514332917286969950511221339207509184200699848054772894811692425420301746702569420382069860)*x + (7049344454217335159746176240117594140181417635497251651917522482459106175371654023030140939722274150798998767172918460653127900945*i+7421596995219474872290826108093789482716137748722207831692734621369544458934116457841404549465236253222768058130414766952092464142) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10009064455346151923470936332146822810134837690281675701829725681184581304770092578850779970612947265845056790387816969566112148920*i+1241136560277041637686929091924745571715514332917286969950511221339207509184200699848054772894811692425420301746702569420382069860)*x + (7049344454217335159746176240117594140181417635497251651917522482459106175371654023030140939722274150798998767172918460653127900945*i+7421596995219474872290826108093789482716137748722207831692734621369544458934116457841404549465236253222768058130414766952092464142) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20793874489808466123624252916229944034050085489525104169447893050501189547244959285245952683462079881910697597548868104629426838991*i+8582809858711581789698712967564965791787096064373836954009817207817976147420326708664478252081280182570288088735065806968517924949)*x + (17897509563220500796317960333352813556728252189890523455624004821643285206261196033643219901419023242624605416032180431737227756849*i+13332223015969809903471799442567093481038096724437186397126631755155965295317714454186531311483187675388090427119186768402371320879) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20793874489808466123624252916229944034050085489525104169447893050501189547244959285245952683462079881910697597548868104629426838991*i+8582809858711581789698712967564965791787096064373836954009817207817976147420326708664478252081280182570288088735065806968517924949)*x + (17897509563220500796317960333352813556728252189890523455624004821643285206261196033643219901419023242624605416032180431737227756849*i+13332223015969809903471799442567093481038096724437186397126631755155965295317714454186531311483187675388090427119186768402371320879) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7675037582121387600563472779813523714814256350835380768833168238389745249300259728642811527742109726189143320101638947093658939335*i+13320120355649189419815859090913274454917153690170162726159838019783081723720293076211638717249637367711287030872824023837669151212)*x + (1263507456447181679733045165401480113950695923689306301541219656445498011904898293743668780306740734870222908739000845430471076259*i+10472682090156612350253647097876001089397511031672724642336913125170604993438849629828461087337208691586215557152527178453398656693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7675037582121387600563472779813523714814256350835380768833168238389745249300259728642811527742109726189143320101638947093658939335*i+13320120355649189419815859090913274454917153690170162726159838019783081723720293076211638717249637367711287030872824023837669151212)*x + (1263507456447181679733045165401480113950695923689306301541219656445498011904898293743668780306740734870222908739000845430471076259*i+10472682090156612350253647097876001089397511031672724642336913125170604993438849629828461087337208691586215557152527178453398656693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5106517608340811938781196434911890736440572916022651895522822118993307181495950637147853188656338868514367508741504397468737287889*i+16761582117505970268201994691672969240023335854286729677278975472811055007882914015877231299946280046879769561874789685370940756282)*x + (10305534679930489659701959154474090570338137852641055391345781988529317266186459299158640762292869638399804639147108745304118114750*i+4285505458145993728335953163821076462901505970057019988962612853659600987614393805611192317540027979508594335980198383701784818057) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5106517608340811938781196434911890736440572916022651895522822118993307181495950637147853188656338868514367508741504397468737287889*i+16761582117505970268201994691672969240023335854286729677278975472811055007882914015877231299946280046879769561874789685370940756282)*x + (10305534679930489659701959154474090570338137852641055391345781988529317266186459299158640762292869638399804639147108745304118114750*i+4285505458145993728335953163821076462901505970057019988962612853659600987614393805611192317540027979508594335980198383701784818057) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5115394572134115568212054423727867487135910484073255971082971221007854304135059960629030948052859767310333353597283440273517457646*i+20288425429418066670411373790599914168362745596231130558003950338335256698671062952779500487862473751467098038588276256104236473934)*x + (22433067227402747515042933918398984414716053495020794668540008603805586356019193534614765775955566270878699798683184047839234410252*i+14662140240574512802151250883023349905654596260301226630290611174833325228409242674420697663270335978045891901436630418091368206143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5115394572134115568212054423727867487135910484073255971082971221007854304135059960629030948052859767310333353597283440273517457646*i+20288425429418066670411373790599914168362745596231130558003950338335256698671062952779500487862473751467098038588276256104236473934)*x + (22433067227402747515042933918398984414716053495020794668540008603805586356019193534614765775955566270878699798683184047839234410252*i+14662140240574512802151250883023349905654596260301226630290611174833325228409242674420697663270335978045891901436630418091368206143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23894961491813871970092635804754719193590930563812550890955749606906127750111853370124332309180786327746383593218185336847827836238*i+7716892393173415994888432017476327098631539713904712696560278057016262508778319358073788224617901845202330935764438538423214504662)*x + (9397491230548303482173717865879233147978138983146633787171496401117617832578189797796281672063986104045269981201971572587260165795*i+14053952938134806834539093702679934358114938415464318544009273813436219426726840009289775483100765740291455158287102686915659787565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23894961491813871970092635804754719193590930563812550890955749606906127750111853370124332309180786327746383593218185336847827836238*i+7716892393173415994888432017476327098631539713904712696560278057016262508778319358073788224617901845202330935764438538423214504662)*x + (9397491230548303482173717865879233147978138983146633787171496401117617832578189797796281672063986104045269981201971572587260165795*i+14053952938134806834539093702679934358114938415464318544009273813436219426726840009289775483100765740291455158287102686915659787565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5538111856704355334733414390042458441390171966345630697778967158593182718806690986516969325577711428658240444530458734869169043306*i+21449636725976362667802328942203292251358292517681624987267557420381572502338461382246203842055303967177233064232465298721016829328)*x + (16865140670129659208256808494746238636979982345588249049185208986919682485514353624383873453189385089898671407948739261963782299140*i+22151604385264328449567872912345000213730558167308351977397861048657354185904224888827525753785582643961742238585190247890796865796) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5538111856704355334733414390042458441390171966345630697778967158593182718806690986516969325577711428658240444530458734869169043306*i+21449636725976362667802328942203292251358292517681624987267557420381572502338461382246203842055303967177233064232465298721016829328)*x + (16865140670129659208256808494746238636979982345588249049185208986919682485514353624383873453189385089898671407948739261963782299140*i+22151604385264328449567872912345000213730558167308351977397861048657354185904224888827525753785582643961742238585190247890796865796) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4109033421702967577027935880249464260398781005310503169776655411031149494319351368393646263229178805955494810051617709621897338141*i+18437865031099751937243175197517468445421136402490266032884572301642925516341777942573258987201001367790013790455858922945941859722)*x + (947722713648548374949357616449692059099724262566331221574369543894851782976938383414631979939045215412250965095197952723997693171*i+4555020854711832470259078344043579838902498645942176978388227417732977331539383083401282378159817050482550954030667299419757876715) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4109033421702967577027935880249464260398781005310503169776655411031149494319351368393646263229178805955494810051617709621897338141*i+18437865031099751937243175197517468445421136402490266032884572301642925516341777942573258987201001367790013790455858922945941859722)*x + (947722713648548374949357616449692059099724262566331221574369543894851782976938383414631979939045215412250965095197952723997693171*i+4555020854711832470259078344043579838902498645942176978388227417732977331539383083401282378159817050482550954030667299419757876715) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2359960082408378834552906702341237637860422395063867889666374916880814467168040848553787491837377309190520668910869269890453159692*i+8919250887757497375397476236897155276990872583304403899581070493820948560087452750959003878480203506753237274771633719308611372421)*x + (11363805039457209806669135969221240781145436905822670210026953096936315949564684857110006470906763552985240808007755464936017379926*i+20532486187081686444623085746653904293110253289596080334149754694628096352829204533433434480522915136860955805951632837099997986829) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2359960082408378834552906702341237637860422395063867889666374916880814467168040848553787491837377309190520668910869269890453159692*i+8919250887757497375397476236897155276990872583304403899581070493820948560087452750959003878480203506753237274771633719308611372421)*x + (11363805039457209806669135969221240781145436905822670210026953096936315949564684857110006470906763552985240808007755464936017379926*i+20532486187081686444623085746653904293110253289596080334149754694628096352829204533433434480522915136860955805951632837099997986829) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13130206298239661073723951090073594299144596135259171573764970505430043620347309486916807737346187318636020364182634472793245731541*i+23978703780402812197248980345435338976772018947319478963553081573728512926878806561729174791755836591759620239716701963129156806825)*x + (442537429268416031297913318222102339896762416667417430144386444267262335849529544035053077480702612921048694265000777912665119713*i+9171952748828171350450979656567113774441692962954661354584153480391633043873396603944128940298530971253967674361130799052561402927) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13130206298239661073723951090073594299144596135259171573764970505430043620347309486916807737346187318636020364182634472793245731541*i+23978703780402812197248980345435338976772018947319478963553081573728512926878806561729174791755836591759620239716701963129156806825)*x + (442537429268416031297913318222102339896762416667417430144386444267262335849529544035053077480702612921048694265000777912665119713*i+9171952748828171350450979656567113774441692962954661354584153480391633043873396603944128940298530971253967674361130799052561402927) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10186573926206655891200490523742501495993660471320848311488488564653219082980923317187067500308768905805956312054941618109524855145*i+18488029757866792599105374744842067836591250636744473375702227107824847688582569239357086406288261763704950351711215127652198670776)*x + (5429889811450484573534991291075344004839268449330199546421805803227406024840193450776237742391487214612771554234625236882816598207*i+10215125389028434134187149473580470299296201006437990536484700477839603103652800564241397022712999688667948224645340950697437195504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10186573926206655891200490523742501495993660471320848311488488564653219082980923317187067500308768905805956312054941618109524855145*i+18488029757866792599105374744842067836591250636744473375702227107824847688582569239357086406288261763704950351711215127652198670776)*x + (5429889811450484573534991291075344004839268449330199546421805803227406024840193450776237742391487214612771554234625236882816598207*i+10215125389028434134187149473580470299296201006437990536484700477839603103652800564241397022712999688667948224645340950697437195504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22969744758316505515790331260800718908152545304291814620106417118320894812335594283302676819329577762876641111092072240466965908469*i+22939846295255205190745947416262444460138688980256373791711846871443121641982438476121613358318092596434723580313193448754107419376)*x + (7658874362324569632595006296383383390669978892047222898480022411060206803477177128698931820255223615411383619884618973272774065164*i+21567854017042155213248139312925118275507452338696335275015044776960900233491035307937348838469998110964782641447252420835766432271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22969744758316505515790331260800718908152545304291814620106417118320894812335594283302676819329577762876641111092072240466965908469*i+22939846295255205190745947416262444460138688980256373791711846871443121641982438476121613358318092596434723580313193448754107419376)*x + (7658874362324569632595006296383383390669978892047222898480022411060206803477177128698931820255223615411383619884618973272774065164*i+21567854017042155213248139312925118275507452338696335275015044776960900233491035307937348838469998110964782641447252420835766432271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8617729950452110216327254283349705194385893100230960113889506933112150065910117549116508232485556753338145877780519010628833867574*i+12218799419431911026674344013093706086341798578693918509193072066065260761680944043879546443787866021005788191120291248627150484414)*x + (881034662318978471155417318997666444609192886113130665364490988357153681967633568025834341141656456458007575395232200375195569026*i+10504617929066895487142601360061803496257194123477577352500903473519087184302477853889861039014146273531074058312975852953006115385) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8617729950452110216327254283349705194385893100230960113889506933112150065910117549116508232485556753338145877780519010628833867574*i+12218799419431911026674344013093706086341798578693918509193072066065260761680944043879546443787866021005788191120291248627150484414)*x + (881034662318978471155417318997666444609192886113130665364490988357153681967633568025834341141656456458007575395232200375195569026*i+10504617929066895487142601360061803496257194123477577352500903473519087184302477853889861039014146273531074058312975852953006115385) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12478719634148566937178765801303133736894350845370952481505942494962494442162406669566350101747642042472750837631019818073064142046*i+13898060727919880146513426582756745308602450049420748274558010223047147595446060138984321118354130154306491059624161655511100829521)*x + (6169127124787924969667949083721653050727163181321343734764077128630919258464487611826499328235558975048023532212791048333552351299*i+22832055222814994859435797943743247953232448771415848871818565723451292461240714961135348036586570161568423917537304361315296056365) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12478719634148566937178765801303133736894350845370952481505942494962494442162406669566350101747642042472750837631019818073064142046*i+13898060727919880146513426582756745308602450049420748274558010223047147595446060138984321118354130154306491059624161655511100829521)*x + (6169127124787924969667949083721653050727163181321343734764077128630919258464487611826499328235558975048023532212791048333552351299*i+22832055222814994859435797943743247953232448771415848871818565723451292461240714961135348036586570161568423917537304361315296056365) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17422213817396901965738866683530593763038102747527210030697837378194984379385978416317532412854283834407239185856624664175142420672*i+11192922237873816488110496564489686767120359718468902263567276478701175265193409167382757629607329814819070048964523780281788731977)*x + (4837913782782411747927046268328638016941329725133276602585194859113044494654335941042747901186648173908729726397551331001556498386*i+12106259686724899542472485867150963605860550540340080675503628660247358585480142872320677677936516262966823808381216973923807087985) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17422213817396901965738866683530593763038102747527210030697837378194984379385978416317532412854283834407239185856624664175142420672*i+11192922237873816488110496564489686767120359718468902263567276478701175265193409167382757629607329814819070048964523780281788731977)*x + (4837913782782411747927046268328638016941329725133276602585194859113044494654335941042747901186648173908729726397551331001556498386*i+12106259686724899542472485867150963605860550540340080675503628660247358585480142872320677677936516262966823808381216973923807087985) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9800129647567634176989104105199086402137088291861355861781801254486236987236283018744972286998343600146815477936734979226936752448*i+17407800619220857764572586389470924816167057262714200447993321199163587793005727542329449333624034048788598052009085199265748445451)*x + (2800518253848725897132924076981065397631101924937468128024721393870981182731688302732723763220012271564835411279981808486592324437*i+4892996970912217916314598040694631682280775822621503222842188136138364454079787850995608046816661901546707722269034343056724350350) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9800129647567634176989104105199086402137088291861355861781801254486236987236283018744972286998343600146815477936734979226936752448*i+17407800619220857764572586389470924816167057262714200447993321199163587793005727542329449333624034048788598052009085199265748445451)*x + (2800518253848725897132924076981065397631101924937468128024721393870981182731688302732723763220012271564835411279981808486592324437*i+4892996970912217916314598040694631682280775822621503222842188136138364454079787850995608046816661901546707722269034343056724350350) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3610183211860104513590093908965890339907968166626636383414394459346608446524692956126969689686305166249550471485142337924958023734*i+15770712082514791415047871739447953381131391133432467012654405388645418455417281296800200318133292154544260948349840116554243126885)*x + (21569712277456138075977268621741838311717029605307627218624110736910446142948138767652690245190722983318793089466983574131589620780*i+24015961035243622053852710977696988554529985049373990675723177329553232355653757996089180031425124312641507885271818267694459198505) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3610183211860104513590093908965890339907968166626636383414394459346608446524692956126969689686305166249550471485142337924958023734*i+15770712082514791415047871739447953381131391133432467012654405388645418455417281296800200318133292154544260948349840116554243126885)*x + (21569712277456138075977268621741838311717029605307627218624110736910446142948138767652690245190722983318793089466983574131589620780*i+24015961035243622053852710977696988554529985049373990675723177329553232355653757996089180031425124312641507885271818267694459198505) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23571933709540127028396055847592368858642786826313226743552873199532140410461988609841956206145691019990567519744203876876305825236*i+7135883017813799700733430087350885964508712390072268193378577262774884021535547702059898311640100393712441401054837417005216794496)*x + (3583929678879604373959693622113045538148780265941931408470262712043131323595149027467512283981080802013931351932177554449382342805*i+3012743289729665485626721569260104579549188830092905217101999626320271697906742535254599355759046599896155341006050199466293108102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23571933709540127028396055847592368858642786826313226743552873199532140410461988609841956206145691019990567519744203876876305825236*i+7135883017813799700733430087350885964508712390072268193378577262774884021535547702059898311640100393712441401054837417005216794496)*x + (3583929678879604373959693622113045538148780265941931408470262712043131323595149027467512283981080802013931351932177554449382342805*i+3012743289729665485626721569260104579549188830092905217101999626320271697906742535254599355759046599896155341006050199466293108102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7097524283302704722571217686068051530268182644277509731764619694993275125338411434616344180892954939476106879359809604719205379873*i+2863228318816893621674587352759439263123025197955514555861699114187953004356327742467140531564191521311614575230402630112448276955)*x + (9125967166558178589505828763818130295080179401758721867072098255662958139064977864783289599041954998237313304529070649439927835623*i+22596157031690811021452551058779282348172100351810188331765629953284325456579053851769250243978160663743104631360087641735225580528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7097524283302704722571217686068051530268182644277509731764619694993275125338411434616344180892954939476106879359809604719205379873*i+2863228318816893621674587352759439263123025197955514555861699114187953004356327742467140531564191521311614575230402630112448276955)*x + (9125967166558178589505828763818130295080179401758721867072098255662958139064977864783289599041954998237313304529070649439927835623*i+22596157031690811021452551058779282348172100351810188331765629953284325456579053851769250243978160663743104631360087641735225580528) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15006360161092054981324991822502395875493110856094745375647361698433715564683325852029493152054920637671224433429824519116456725079*i+4020321184718949966060420839238747310538520523138937663017369795960731531545963568267189942110987439443240663211678062591418729730)*x + (8330070268981154281188321642325179643047586555298762337712836585380342494279874236387268832022215960398000055744438604475608647490*i+2917906539044694539280123219501901626011036159086532864953837599507375126639383164247678818350441116741416185846080134513949378981) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15006360161092054981324991822502395875493110856094745375647361698433715564683325852029493152054920637671224433429824519116456725079*i+4020321184718949966060420839238747310538520523138937663017369795960731531545963568267189942110987439443240663211678062591418729730)*x + (8330070268981154281188321642325179643047586555298762337712836585380342494279874236387268832022215960398000055744438604475608647490*i+2917906539044694539280123219501901626011036159086532864953837599507375126639383164247678818350441116741416185846080134513949378981) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9210229742141463106769955147996301735322317318184953064857837546858705231241020299364664059414378270472409797694685976996850253420*i+3508181040829226243230462576206614749474344766546540516058846101271598017274987189511632007244516393925599171189743733165375706722)*x + (11150147678693453796259807235099211696028228395435829286744278052189433362224072905808604095985349718050338413316552201882526470728*i+1953616168092577451058748825492826007877544680381484760245336780812071787009392929914753047505665170593333104366579033933269582473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9210229742141463106769955147996301735322317318184953064857837546858705231241020299364664059414378270472409797694685976996850253420*i+3508181040829226243230462576206614749474344766546540516058846101271598017274987189511632007244516393925599171189743733165375706722)*x + (11150147678693453796259807235099211696028228395435829286744278052189433362224072905808604095985349718050338413316552201882526470728*i+1953616168092577451058748825492826007877544680381484760245336780812071787009392929914753047505665170593333104366579033933269582473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10844610152370958406914903592117193718032398780621794950090428012066554015384522330199511061494029351374623656818705612447601050849*i+2971949678681995614156176348550703407578260655711039676993831096386013154902614366318924077661377361968617581945695747717623516484)*x + (16142683092240283169540316654864047391015744451371956392213563192493916558719679602264095004069817305761761801607366352394309805963*i+6461976144048926200678355739020516686803149568598068969496374381160890167695070640376668953567704281569343307673381228520440810799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10844610152370958406914903592117193718032398780621794950090428012066554015384522330199511061494029351374623656818705612447601050849*i+2971949678681995614156176348550703407578260655711039676993831096386013154902614366318924077661377361968617581945695747717623516484)*x + (16142683092240283169540316654864047391015744451371956392213563192493916558719679602264095004069817305761761801607366352394309805963*i+6461976144048926200678355739020516686803149568598068969496374381160890167695070640376668953567704281569343307673381228520440810799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21951783204696303554599529890501614378300548542297494970979279324854068176115806086436238510771931787202001734766686904646289503999*i+3658425077093525403860054570585160952268961094741527374795073877183163289371384809765234683640116469150493663646266319558079736175)*x + (8180964002404115642427311357797225185923400158050153100787126243284799052948702968305320096967029366276119912408458604814612376847*i+23345741800304612393482698602561002912419883603624562758245858226972757456275337699071839071768014201760071246063205617122049287421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21951783204696303554599529890501614378300548542297494970979279324854068176115806086436238510771931787202001734766686904646289503999*i+3658425077093525403860054570585160952268961094741527374795073877183163289371384809765234683640116469150493663646266319558079736175)*x + (8180964002404115642427311357797225185923400158050153100787126243284799052948702968305320096967029366276119912408458604814612376847*i+23345741800304612393482698602561002912419883603624562758245858226972757456275337699071839071768014201760071246063205617122049287421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18752055443116342408188749324093302750513914269923996693854847104817865798454845413394270020017161514474939104441301563898242712854*i+16862339503089217174321207831679828692671614697467018215349133228976516410383554780343105004908549793149170964367110541826040599884)*x + (14703390611914535260561290887573672277540486272650255237938529748138159366171648202350543542342567743606467413567052041033556904653*i+10731186525429691988445420338907846634736357588585750150701056577627437771963697101837373609951825651105777116823896158983137889448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18752055443116342408188749324093302750513914269923996693854847104817865798454845413394270020017161514474939104441301563898242712854*i+16862339503089217174321207831679828692671614697467018215349133228976516410383554780343105004908549793149170964367110541826040599884)*x + (14703390611914535260561290887573672277540486272650255237938529748138159366171648202350543542342567743606467413567052041033556904653*i+10731186525429691988445420338907846634736357588585750150701056577627437771963697101837373609951825651105777116823896158983137889448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9590567449213526451206944306257410322168220240411086294539073108168613119396806922026259701168186466000227039472049700742995430973*i+14903159457949809058970706402393188404487508707079353978036539113810689205218951589833484256079008057109783390946784743201561665742)*x + (2639195415902517389857285740135174160840629236726786725642185806339386868103519367014507417661537928556044826854287073972671531656*i+2216334181127978796348475474195953123911106261016373439275284606452404369229005409893821723408500418691663407013237048442310677565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9590567449213526451206944306257410322168220240411086294539073108168613119396806922026259701168186466000227039472049700742995430973*i+14903159457949809058970706402393188404487508707079353978036539113810689205218951589833484256079008057109783390946784743201561665742)*x + (2639195415902517389857285740135174160840629236726786725642185806339386868103519367014507417661537928556044826854287073972671531656*i+2216334181127978796348475474195953123911106261016373439275284606452404369229005409893821723408500418691663407013237048442310677565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11759358864265375078600315814251891485830084939231097576951084627349120670868748028437155585984159408558420428129285629697860074075*i+947182769085715841886921972812853409931241883266952185436894102070517252940616637439374409763823647153485953202286609640994652209)*x + (18324152714699148509808503799487828800316751761290420574225632153167626602389573720679303873058893877506785112719813087601156607232*i+23959612182912760301992248019005280732871414697900905078968563066297764886168348691596840244793878038765734508474206865066657551372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11759358864265375078600315814251891485830084939231097576951084627349120670868748028437155585984159408558420428129285629697860074075*i+947182769085715841886921972812853409931241883266952185436894102070517252940616637439374409763823647153485953202286609640994652209)*x + (18324152714699148509808503799487828800316751761290420574225632153167626602389573720679303873058893877506785112719813087601156607232*i+23959612182912760301992248019005280732871414697900905078968563066297764886168348691596840244793878038765734508474206865066657551372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17794011992906335954196685432524852060478069643139035310674215858434405036730154191534394151955101850695227589334994006795977255755*i+716989819396442020897263076241819024480031728251635205984280552983228959738990647027529929570305829927682983732930692550940085208)*x + (20217394587940481454735371975903735651705389205031254363492821100755537009183155813804796328746253989960119407509416694212553588726*i+36459608421044470215011146693220842908655599395373884290761943192695323769090179582540023562568186162761352088893996982728139508) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17794011992906335954196685432524852060478069643139035310674215858434405036730154191534394151955101850695227589334994006795977255755*i+716989819396442020897263076241819024480031728251635205984280552983228959738990647027529929570305829927682983732930692550940085208)*x + (20217394587940481454735371975903735651705389205031254363492821100755537009183155813804796328746253989960119407509416694212553588726*i+36459608421044470215011146693220842908655599395373884290761943192695323769090179582540023562568186162761352088893996982728139508) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3260421130463880512611267952355897358556568419925114562509374724179652488587540394491210508795458226044595183629681986588409911446*i+14684003156995717926133059610320738574101448663434263791562776257141883881965656013295126911461240260166981218329552519445616300646)*x + (18564910111880791828450771315313105803165124632177254473925682965697972585767241096633868161668135731580197523837331461807663411596*i+12799650818463352243439666145189899600361938624654526180001353344037080279758550889793598354502634155634973559948748894202321513404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3260421130463880512611267952355897358556568419925114562509374724179652488587540394491210508795458226044595183629681986588409911446*i+14684003156995717926133059610320738574101448663434263791562776257141883881965656013295126911461240260166981218329552519445616300646)*x + (18564910111880791828450771315313105803165124632177254473925682965697972585767241096633868161668135731580197523837331461807663411596*i+12799650818463352243439666145189899600361938624654526180001353344037080279758550889793598354502634155634973559948748894202321513404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9137428715043048949331538539506276421987832806294370747682821105613252945089231771919073812506769912735709884003463840214717545281*i+12626772110690365672286600830491503420989804262759167140910859599260837870192048708181692209632414142206985197687610909427177230461)*x + (10052615301681678302679208550619503448685509516453329938683437950571560140491232995652287241781814980235299614751421106345595385452*i+4846643857255712438891746571112497474680948790645770615152764951562113988097520934977775634119084491775645953120199583356912220289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9137428715043048949331538539506276421987832806294370747682821105613252945089231771919073812506769912735709884003463840214717545281*i+12626772110690365672286600830491503420989804262759167140910859599260837870192048708181692209632414142206985197687610909427177230461)*x + (10052615301681678302679208550619503448685509516453329938683437950571560140491232995652287241781814980235299614751421106345595385452*i+4846643857255712438891746571112497474680948790645770615152764951562113988097520934977775634119084491775645953120199583356912220289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8322468335993290932615163466472540069136712360556200341508577039821817823188828512352934523113844861190140654846525430438869149804*i+5093415240990275734668181888613562707862925105940163186728331763042306679303387296500750256575170154775633404917617346375510952207)*x + (2930972525661585599859078400766594413845529836416432717342442843331160444503183340171198948054630522446390173743797365651451332983*i+22079486406607989904376159942901344333052106881750934852045330162040571882238748617449618824762998003844201224467235392550248080495) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8322468335993290932615163466472540069136712360556200341508577039821817823188828512352934523113844861190140654846525430438869149804*i+5093415240990275734668181888613562707862925105940163186728331763042306679303387296500750256575170154775633404917617346375510952207)*x + (2930972525661585599859078400766594413845529836416432717342442843331160444503183340171198948054630522446390173743797365651451332983*i+22079486406607989904376159942901344333052106881750934852045330162040571882238748617449618824762998003844201224467235392550248080495) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9611184680225140554401654763391380600661000808066529101146780775274711324984955165296564145183314765330514972748934952098775189906*i+502896599917222377752660401276559273841088959932150787079054338247482498895311252335581437744385170987492580697419777163563793804)*x + (3339033866124420279729641307431640563526404911246593670515714418086159254535221334026798888351134778153941515937912155469432428025*i+23884236444374023189626879255501889326677609127197849436350887624172917726789303423183214528683909167811515653881092224978769189193) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9611184680225140554401654763391380600661000808066529101146780775274711324984955165296564145183314765330514972748934952098775189906*i+502896599917222377752660401276559273841088959932150787079054338247482498895311252335581437744385170987492580697419777163563793804)*x + (3339033866124420279729641307431640563526404911246593670515714418086159254535221334026798888351134778153941515937912155469432428025*i+23884236444374023189626879255501889326677609127197849436350887624172917726789303423183214528683909167811515653881092224978769189193) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14877407088197401423688872459813956003181531151987098647800321805499883412390026661644506716204324587030289653174349067759308470647*i+3806144528267911564723479488036650906228773819611191542842394750468014540277225215887058877043325246980964354407965560868690355705)*x + (11733930850416654786239991626075235960155996060651045129903778416474634071329355175059584563022889276505732973395705535218497604185*i+22905164809569633951976319770451894207878307830440796150762818392073531738046492935961286864882880609347181004603940890899749028535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14877407088197401423688872459813956003181531151987098647800321805499883412390026661644506716204324587030289653174349067759308470647*i+3806144528267911564723479488036650906228773819611191542842394750468014540277225215887058877043325246980964354407965560868690355705)*x + (11733930850416654786239991626075235960155996060651045129903778416474634071329355175059584563022889276505732973395705535218497604185*i+22905164809569633951976319770451894207878307830440796150762818392073531738046492935961286864882880609347181004603940890899749028535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21625676282953072408602268515538366499642744519683104089874491078518579875758887190320021212432176817949828922285187877607463449471*i+8213434469653056840477642359030681353882055101059581315201068050149702571101351771086729753637760017146358405323653920571171819041)*x + (22736328943104277607380812641909055072477287541555617013081343796612344162002635681315059050666535663800197035267608566863092562088*i+7652128219480493915968814449247330175941797121872801312565610678014585324873954929093326243315152846220701089398744624305360665315) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21625676282953072408602268515538366499642744519683104089874491078518579875758887190320021212432176817949828922285187877607463449471*i+8213434469653056840477642359030681353882055101059581315201068050149702571101351771086729753637760017146358405323653920571171819041)*x + (22736328943104277607380812641909055072477287541555617013081343796612344162002635681315059050666535663800197035267608566863092562088*i+7652128219480493915968814449247330175941797121872801312565610678014585324873954929093326243315152846220701089398744624305360665315) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13292528978619855708201725797557565504617792946403811522039020602627648933721156965780709163149968470105753145504753820195808090774*i+10931626975984675104609307524141913096143561815567904797300488175634256579927544708918119483582322972762853831166459146632154597090)*x + (4144061809050190348492020517572609217839669592149432669694116668710829255652203541203515907684839045195315288074986476659542441420*i+15582305865543113985442879871613143667737826014467513242884953237466880280125535929866487107349374920436185941437840541703430156259) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13292528978619855708201725797557565504617792946403811522039020602627648933721156965780709163149968470105753145504753820195808090774*i+10931626975984675104609307524141913096143561815567904797300488175634256579927544708918119483582322972762853831166459146632154597090)*x + (4144061809050190348492020517572609217839669592149432669694116668710829255652203541203515907684839045195315288074986476659542441420*i+15582305865543113985442879871613143667737826014467513242884953237466880280125535929866487107349374920436185941437840541703430156259) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16608724119548436456976021063694395363186401460352348199258086932961348545710820457137040818416305636113733873319262616104494346213*i+18271014465232784417271625127845997347693300267443149629498119007993598329166350383018071534045222097645263215921873947594026595988)*x + (19083189198057804375736260893031668389257095565854597918834547288060437460045195511740811847217523832598902175504274498658721454156*i+2837445129154279515861667900842145932771181530654083654639910543637048611844579123179333444116998540399809855852284854119908494011) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16608724119548436456976021063694395363186401460352348199258086932961348545710820457137040818416305636113733873319262616104494346213*i+18271014465232784417271625127845997347693300267443149629498119007993598329166350383018071534045222097645263215921873947594026595988)*x + (19083189198057804375736260893031668389257095565854597918834547288060437460045195511740811847217523832598902175504274498658721454156*i+2837445129154279515861667900842145932771181530654083654639910543637048611844579123179333444116998540399809855852284854119908494011) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19883964161267120696404228639408682061308093053782693445457336737470269474653939310379892812617255240492281717507028759337015374972*i+22600886897055936276531929313539663600801331166007636028212029959887186749393759794809159832545443554461729765287795206603073215261)*x + (23178462263052223209031666609284345343362375415661147090573905178614099672620318003560757907041790825901786772556641768047656602089*i+6013795843266725616728528110154351603560554453272730308718138243819361450946728102561565556112190045420920243112143288320599371675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19883964161267120696404228639408682061308093053782693445457336737470269474653939310379892812617255240492281717507028759337015374972*i+22600886897055936276531929313539663600801331166007636028212029959887186749393759794809159832545443554461729765287795206603073215261)*x + (23178462263052223209031666609284345343362375415661147090573905178614099672620318003560757907041790825901786772556641768047656602089*i+6013795843266725616728528110154351603560554453272730308718138243819361450946728102561565556112190045420920243112143288320599371675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23301611915346083991453965373971897507757541052234277572046157897389645174791922881710340963447126725612396300069200644836953635803*i+12677979433515281088526343792136627019012341727840525018807708933125640608720801764715492557921419208054911743201207638672799668572)*x + (9165162371073212280012608671288532117063818939645576059350672100926566359830048770394954232761288596601699835081549557110268703809*i+9067777590827210815217277845681873418436607759549075839749659428846568050315928136963205318520931443169694327254959718341967587533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23301611915346083991453965373971897507757541052234277572046157897389645174791922881710340963447126725612396300069200644836953635803*i+12677979433515281088526343792136627019012341727840525018807708933125640608720801764715492557921419208054911743201207638672799668572)*x + (9165162371073212280012608671288532117063818939645576059350672100926566359830048770394954232761288596601699835081549557110268703809*i+9067777590827210815217277845681873418436607759549075839749659428846568050315928136963205318520931443169694327254959718341967587533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11540781399584162128187984597910829927312877913719790773952440673329899307508072248227202362742670148462300104413615461586835980144*i+479403227035456310513730988605783311052150348187003128429901913175058721630857081690223924585019054379807726753020347125661521410)*x + (5625796240599670856582219896379498998470323205742964963537498874478943815634387024405439235196602803072484381981179862145620043598*i+1174860316390733958563669513392631476921944046553633082686608396156748319166802633993599555327514805677376182619656118180643186523) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11540781399584162128187984597910829927312877913719790773952440673329899307508072248227202362742670148462300104413615461586835980144*i+479403227035456310513730988605783311052150348187003128429901913175058721630857081690223924585019054379807726753020347125661521410)*x + (5625796240599670856582219896379498998470323205742964963537498874478943815634387024405439235196602803072484381981179862145620043598*i+1174860316390733958563669513392631476921944046553633082686608396156748319166802633993599555327514805677376182619656118180643186523) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (698372328281131741590855498360541855879463335592084664234763844235086425008290124443052396122366010989627738331138340403358763444*i+19667306846108220182298496474398620015968291780713013076360242187686184211819144908703387072549440657102947596357389159889877079930)*x + (16241531544713301501634054051001154589523871305395825123407891216356880109557700983594320293412836440926509494597260194837540794226*i+4458474439438634288270083762638491349785881745712199232661639458950151955972724782558442868114752805686930896285742713825494201411) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (698372328281131741590855498360541855879463335592084664234763844235086425008290124443052396122366010989627738331138340403358763444*i+19667306846108220182298496474398620015968291780713013076360242187686184211819144908703387072549440657102947596357389159889877079930)*x + (16241531544713301501634054051001154589523871305395825123407891216356880109557700983594320293412836440926509494597260194837540794226*i+4458474439438634288270083762638491349785881745712199232661639458950151955972724782558442868114752805686930896285742713825494201411) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2314253062579843249428298637986486511873884008588904036343069718753417017227006117916312382709498007683952044042108626567263831524*i+13985265254274490272887981708855761929685548142730855790861497207766328203630366498605652747448352980603312702817578172003009351821)*x + (13098201514073411928083256861641581387586214112400754963870134914415307005027818139644917764024345370339452322133101916876842689559*i+10405713778401533626432286772755415976249718097884226078045375706958233873742310929858936265340198708239755420794270647411002659733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2314253062579843249428298637986486511873884008588904036343069718753417017227006117916312382709498007683952044042108626567263831524*i+13985265254274490272887981708855761929685548142730855790861497207766328203630366498605652747448352980603312702817578172003009351821)*x + (13098201514073411928083256861641581387586214112400754963870134914415307005027818139644917764024345370339452322133101916876842689559*i+10405713778401533626432286772755415976249718097884226078045375706958233873742310929858936265340198708239755420794270647411002659733) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16402258107309651629032011225616462571652250215335669400730415389396284983402193700515717768679916454814128803610128366565109347126*i+20410873578092672117679406504556666379903060371245487164451950639558854695673151061795628187190554147177137628100584782979424202742)*x + (21205185260827421535458773629981025439696419336308782355863084532555368611525752816759263981769813994991289479316793835605157485484*i+21898509527530461700540492022005028335146377905613933648671130330052939753541172078785402062759078645744375030416970989850447644959) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16402258107309651629032011225616462571652250215335669400730415389396284983402193700515717768679916454814128803610128366565109347126*i+20410873578092672117679406504556666379903060371245487164451950639558854695673151061795628187190554147177137628100584782979424202742)*x + (21205185260827421535458773629981025439696419336308782355863084532555368611525752816759263981769813994991289479316793835605157485484*i+21898509527530461700540492022005028335146377905613933648671130330052939753541172078785402062759078645744375030416970989850447644959) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18932346683034803559993429192773723396973667743812911357250561248640576234397186043192297072102028744460524823565019989101745972193*i+5362114605599088931514794236767525968675812818878112290795674552517526868560450571106362010076432550196626789931469375300618273201)*x + (2502035719247144248148780573297877135819813549689205175620444504146567908958943175102933750686729947369712015786557193657465245872*i+21243519981665852881350770910145239846006321966703360159255503418521447139896324319829288620969631009332799223211312450166582128417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18932346683034803559993429192773723396973667743812911357250561248640576234397186043192297072102028744460524823565019989101745972193*i+5362114605599088931514794236767525968675812818878112290795674552517526868560450571106362010076432550196626789931469375300618273201)*x + (2502035719247144248148780573297877135819813549689205175620444504146567908958943175102933750686729947369712015786557193657465245872*i+21243519981665852881350770910145239846006321966703360159255503418521447139896324319829288620969631009332799223211312450166582128417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5277073100363910665976025120461328442423197437893012038002620957554386984995226038666162292676904321953186803779078226707294834548*i+8813651574538972834586922692914082374095502907912199065064861680708689630705262659400582324562256611332984399779267849488923068799)*x + (21176314041252183257584899502875590342325902427458963006225127901946370666488254093190739412235834400278452316831043026074711972939*i+4259563053813417445713683187557553820004457617315819899800298823727697561599794833074894169878241398412461702512501838193528384964) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5277073100363910665976025120461328442423197437893012038002620957554386984995226038666162292676904321953186803779078226707294834548*i+8813651574538972834586922692914082374095502907912199065064861680708689630705262659400582324562256611332984399779267849488923068799)*x + (21176314041252183257584899502875590342325902427458963006225127901946370666488254093190739412235834400278452316831043026074711972939*i+4259563053813417445713683187557553820004457617315819899800298823727697561599794833074894169878241398412461702512501838193528384964) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4996109996451153798170913348522920477565938892769999067544866236976173510591513111516231151568974465419648583058391014624730998362*i+7342945053418270888415080476940499131753706714933959233905727205489727971855422325938173527992144609662418450829563469561953802725)*x + (13357242233223837329899863600055132318131637491167072715693712959317425914365595483307446043115470504140358500454282591556590995880*i+22644611522906889000866020942955878937671201648232492747765110110254829764510190655097691858207654216033863654561394843433949961723) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4996109996451153798170913348522920477565938892769999067544866236976173510591513111516231151568974465419648583058391014624730998362*i+7342945053418270888415080476940499131753706714933959233905727205489727971855422325938173527992144609662418450829563469561953802725)*x + (13357242233223837329899863600055132318131637491167072715693712959317425914365595483307446043115470504140358500454282591556590995880*i+22644611522906889000866020942955878937671201648232492747765110110254829764510190655097691858207654216033863654561394843433949961723) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18154202394627993911716276714466505137612051636885183294787366661226870922802599120799896094578825196230120198712804216001088189566*i+23812447148107543059067861656904744217569691342878998829797767578096401781134193380759937560195592314928157297687318238849664887208)*x + (3903323624152109464381321864652226021066546054742118384390740485584223575422622656256358771408418778350045995631786370482861206582*i+11131079151500253637431255253939863049434373189525629300438029548438210685755926539459340634322563409543001897806505667272268770555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18154202394627993911716276714466505137612051636885183294787366661226870922802599120799896094578825196230120198712804216001088189566*i+23812447148107543059067861656904744217569691342878998829797767578096401781134193380759937560195592314928157297687318238849664887208)*x + (3903323624152109464381321864652226021066546054742118384390740485584223575422622656256358771408418778350045995631786370482861206582*i+11131079151500253637431255253939863049434373189525629300438029548438210685755926539459340634322563409543001897806505667272268770555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5299179518308411880005960439879236195051153421691205678892549046540257978862973653592099965276581682727367087100994130879004453467*i+17796143391480099052666679406521398679107830198009635115013172031876586317905299735079740685822873461088027502404730076268821941192)*x + (20459474257343054496573446608530715142512034820908492575133102267134165747275730400987811478902114160602600779954506974782284350728*i+19249821537979264216966309921771082216479416919565708861435022978386493751288969944313976624049682301179310870149505586950671881290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5299179518308411880005960439879236195051153421691205678892549046540257978862973653592099965276581682727367087100994130879004453467*i+17796143391480099052666679406521398679107830198009635115013172031876586317905299735079740685822873461088027502404730076268821941192)*x + (20459474257343054496573446608530715142512034820908492575133102267134165747275730400987811478902114160602600779954506974782284350728*i+19249821537979264216966309921771082216479416919565708861435022978386493751288969944313976624049682301179310870149505586950671881290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2278373345357463947935536379880032680806235370811861807613894666016218825756121762634715410983764055959422892073069708720477995180*i+19598715240742839931215544771668515843520701612014375954076558204784067371356768477500832886741559921549394261291519453493906734726)*x + (15408014599085353219452301824508525895822807675541813823784362007892481203012053879765102110992466966161805487288220514834224486556*i+23682217537617739676039057492667254111065586065829118476244013397727113118254054267430076036500496429215803552584016684170353005015) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2278373345357463947935536379880032680806235370811861807613894666016218825756121762634715410983764055959422892073069708720477995180*i+19598715240742839931215544771668515843520701612014375954076558204784067371356768477500832886741559921549394261291519453493906734726)*x + (15408014599085353219452301824508525895822807675541813823784362007892481203012053879765102110992466966161805487288220514834224486556*i+23682217537617739676039057492667254111065586065829118476244013397727113118254054267430076036500496429215803552584016684170353005015) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19218748415346983463843308019154417114112315513396455227113667482041845365519892317437613061815927001201200031950243975069351921623*i+12675801962069002703240033643349831422801291541581566851377447458855499735003153414650695149237341415273501345532297426150429971224)*x + (22002073632025980760994440109416403107853738287958290733518732026085299372265186517351727772470768074095687404611260993518721025116*i+11116259843406827855442976365407145640649641449669304134351391328703013000399058924077328647710850919372632544542781565176692266199) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19218748415346983463843308019154417114112315513396455227113667482041845365519892317437613061815927001201200031950243975069351921623*i+12675801962069002703240033643349831422801291541581566851377447458855499735003153414650695149237341415273501345532297426150429971224)*x + (22002073632025980760994440109416403107853738287958290733518732026085299372265186517351727772470768074095687404611260993518721025116*i+11116259843406827855442976365407145640649641449669304134351391328703013000399058924077328647710850919372632544542781565176692266199) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13979186890693741388675702434602350807213570438045324804326114402126742138219791761028121353207675889778472485729870354536784500813*i+13024364176996345632109164023542408172373908571123194246574948281010413871187891853496055492185516414059426762913012912411338794557)*x + (9275961525274264163290553826558531992963236196471387631090079967820377449922542543270250673707758381399068047678900220397116544195*i+1175394518495159279106915342035034761045716108250475217727594868764195613610857395184891038702534676260428049839707056657994338622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13979186890693741388675702434602350807213570438045324804326114402126742138219791761028121353207675889778472485729870354536784500813*i+13024364176996345632109164023542408172373908571123194246574948281010413871187891853496055492185516414059426762913012912411338794557)*x + (9275961525274264163290553826558531992963236196471387631090079967820377449922542543270250673707758381399068047678900220397116544195*i+1175394518495159279106915342035034761045716108250475217727594868764195613610857395184891038702534676260428049839707056657994338622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24389579814010268771916946973683859501820522804050225687404006836231454286272959629424127364507514269478261253421075910274818051763*i+2395498898830999394066119906850951476574580783967018650812616507318721177653248609615155597987555364520844490006250961223685137513)*x + (23269578426435588352404649668678083263230965706594941527877874917126159080633815588819973724037503894289847983616733545009824240441*i+2189555441913085437967906457427799763113506247891402909200637919359475937956647214611034214671950831377434017349019008210858337351) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24389579814010268771916946973683859501820522804050225687404006836231454286272959629424127364507514269478261253421075910274818051763*i+2395498898830999394066119906850951476574580783967018650812616507318721177653248609615155597987555364520844490006250961223685137513)*x + (23269578426435588352404649668678083263230965706594941527877874917126159080633815588819973724037503894289847983616733545009824240441*i+2189555441913085437967906457427799763113506247891402909200637919359475937956647214611034214671950831377434017349019008210858337351) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6524223379088045951379535587442247420075814027979253647508453817302465375654936385125216134045304387744775925849574806006593508526*i+6095790772064848980508917551844011103720280151118771124436968696710575140943053905184540975675092704715635593611341343141390600953)*x + (7314594687236061425144294325163520071937975489342382147113652468228931631780310909008755086468421647835028631165061219383774413790*i+18924417759454671808886295082667936047480636311886331074557069136997583903320346122509467064186063577187863087310375967151301917334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6524223379088045951379535587442247420075814027979253647508453817302465375654936385125216134045304387744775925849574806006593508526*i+6095790772064848980508917551844011103720280151118771124436968696710575140943053905184540975675092704715635593611341343141390600953)*x + (7314594687236061425144294325163520071937975489342382147113652468228931631780310909008755086468421647835028631165061219383774413790*i+18924417759454671808886295082667936047480636311886331074557069136997583903320346122509467064186063577187863087310375967151301917334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23038990172309502028980330144399700270811744950157745447041828730705419660762693992393575152444977878824436909885832400968175549977*i+21732626970183538592972694212871979779984863386042586038703392033075876062097228155414786698260199402227492200582799835927864426944)*x + (7926386838580661476052564038728638734318130756198951875839582197414244382520287142722668351761967157690818105049663152711514867542*i+12426355213458774317667954668096216911740854589504374016449794134042856668248695572159422348848772940333487354621883603007873139117) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23038990172309502028980330144399700270811744950157745447041828730705419660762693992393575152444977878824436909885832400968175549977*i+21732626970183538592972694212871979779984863386042586038703392033075876062097228155414786698260199402227492200582799835927864426944)*x + (7926386838580661476052564038728638734318130756198951875839582197414244382520287142722668351761967157690818105049663152711514867542*i+12426355213458774317667954668096216911740854589504374016449794134042856668248695572159422348848772940333487354621883603007873139117) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24127927506768188020198261759895142212397022952184668425935044533766858159184481129097418543727665293235662760071530834697609760959*i+4142406031059685406486774975090790826648358889938708076004130156902875250992631608145470161007022576423799780186933295726727874980)*x + (23948590013271039780526856365357122461922970787895660812964558860179945085887367390441433875988161565830552212526961521463907920486*i+15727379248741139033830405980032959254006794121222431931219022064939455877468375920709561843306567805306863297581154959046733711338) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24127927506768188020198261759895142212397022952184668425935044533766858159184481129097418543727665293235662760071530834697609760959*i+4142406031059685406486774975090790826648358889938708076004130156902875250992631608145470161007022576423799780186933295726727874980)*x + (23948590013271039780526856365357122461922970787895660812964558860179945085887367390441433875988161565830552212526961521463907920486*i+15727379248741139033830405980032959254006794121222431931219022064939455877468375920709561843306567805306863297581154959046733711338) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9363352579473798259841177992974328942357231182840508831994737327092349205717112801513340807561891403433634962928562077549799323381*i+18116427973969921905595783491024509275659898575635775278748564289577911701957600776690031326783142975205767974799713394116879974453)*x + (18781444127574977732538051042230743450069018030621714272701631803647063963747879068665165032223294865713673320052764088523375480681*i+12991963164798302657803971582428003242147715407341467150115066624775924636343122618309250522235960884206840532334657693069415950923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9363352579473798259841177992974328942357231182840508831994737327092349205717112801513340807561891403433634962928562077549799323381*i+18116427973969921905595783491024509275659898575635775278748564289577911701957600776690031326783142975205767974799713394116879974453)*x + (18781444127574977732538051042230743450069018030621714272701631803647063963747879068665165032223294865713673320052764088523375480681*i+12991963164798302657803971582428003242147715407341467150115066624775924636343122618309250522235960884206840532334657693069415950923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8388581180181412701199099109230043297748675074121431746177239772181633750027861662932690813837060014259135770695120362799260068724*i+14072280534702399811400206435080822344321568296194199455694690832127830415091493556915415046469804505039508037889430879811837456898)*x + (11188537990624168592402879059388409028691674579379511006365007827321870623538932579205071259434297597933204591873235575552998041962*i+4968537134502730843643041058187027908707107333211341066701490403137773630341342549467557055972808744862016245627350923525340168247) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8388581180181412701199099109230043297748675074121431746177239772181633750027861662932690813837060014259135770695120362799260068724*i+14072280534702399811400206435080822344321568296194199455694690832127830415091493556915415046469804505039508037889430879811837456898)*x + (11188537990624168592402879059388409028691674579379511006365007827321870623538932579205071259434297597933204591873235575552998041962*i+4968537134502730843643041058187027908707107333211341066701490403137773630341342549467557055972808744862016245627350923525340168247) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21735996195471625543210415808456883901260679010474014525534503672124874322241649470113114366774877329026046218160653667726287475727*i+24029283638992126296623855481931499166334242708614951833025984308281374697366949556559891714065446808847947931040805303147425389099)*x + (23388823454322296456508885693141753567582674041518479634392626642889884252541069237432887849231498521487184974487927077496514500401*i+8790972642972008563101525973471732908472006837578059295014287392873407878576888241222132174912144891527737975030439489121648138076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21735996195471625543210415808456883901260679010474014525534503672124874322241649470113114366774877329026046218160653667726287475727*i+24029283638992126296623855481931499166334242708614951833025984308281374697366949556559891714065446808847947931040805303147425389099)*x + (23388823454322296456508885693141753567582674041518479634392626642889884252541069237432887849231498521487184974487927077496514500401*i+8790972642972008563101525973471732908472006837578059295014287392873407878576888241222132174912144891527737975030439489121648138076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4819131206869251240534849641966011718382022852619894335691605949561586137609767353786168115472703487415267271104245352787174896848*i+22310775518194624724453819537043717332439869069558250507125275640152158267048579366850764252777232611205916618780565932497483169120)*x + (7407370436988499184722684643364974006951852628644175505357907230824933208176041132606891876758461675315985401367950683877604420183*i+9756567430744560122494818947387408294298713860459130587749715364804793087734136717077583360635331958036973382568522710518258797322) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4819131206869251240534849641966011718382022852619894335691605949561586137609767353786168115472703487415267271104245352787174896848*i+22310775518194624724453819537043717332439869069558250507125275640152158267048579366850764252777232611205916618780565932497483169120)*x + (7407370436988499184722684643364974006951852628644175505357907230824933208176041132606891876758461675315985401367950683877604420183*i+9756567430744560122494818947387408294298713860459130587749715364804793087734136717077583360635331958036973382568522710518258797322) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16519943190993810529958657139441611994182527368560124109621875486885493740865262835701512032575694695967512852046515489219003275501*i+9798042440462804899302272962541011013888249249745057308620452835212663769937331888946844557908694028609630803812050872744589170523)*x + (19421414239403403123263430608548955612381670555239735657951719680579884614110003115293140943246325845337838595586502998529892135786*i+15558691076904312821267240696109592150384736815402030408189072577332854457900377472468842848077869832068457413464757867696343707961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16519943190993810529958657139441611994182527368560124109621875486885493740865262835701512032575694695967512852046515489219003275501*i+9798042440462804899302272962541011013888249249745057308620452835212663769937331888946844557908694028609630803812050872744589170523)*x + (19421414239403403123263430608548955612381670555239735657951719680579884614110003115293140943246325845337838595586502998529892135786*i+15558691076904312821267240696109592150384736815402030408189072577332854457900377472468842848077869832068457413464757867696343707961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19324981617025402478949004693048175887328072343761027485403269522134518991070380807928197481543570686295065719149845447477928375592*i+10871162274139442693584936165904845139736204987533743694973890441170264467328173022084000285609794592419912521412345951107776410475)*x + (8682212819677949227551499657495261342318233528807182609692678036779474439995708595861462410861756250457883971576007254673068997917*i+9470954579737063234254778298830218477632991840297858331916210117174276713363565912438301305388850301855762400759234843477982179369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19324981617025402478949004693048175887328072343761027485403269522134518991070380807928197481543570686295065719149845447477928375592*i+10871162274139442693584936165904845139736204987533743694973890441170264467328173022084000285609794592419912521412345951107776410475)*x + (8682212819677949227551499657495261342318233528807182609692678036779474439995708595861462410861756250457883971576007254673068997917*i+9470954579737063234254778298830218477632991840297858331916210117174276713363565912438301305388850301855762400759234843477982179369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7877031142950866367168896809240831462579303227295647387651455514806242835712372840990147423036146659210477096945501261582435900353*i+14289273609743751140173656110598321544094492520626579789018128492125121164800086629198586521673273015661350367253624582365846523911)*x + (12323786413031641000394498209744910891662612950619976287056325516066191951502255947035034869931314235346944475744758438586874720435*i+12501385306615212924413104348862905046587081674233709108089767974683633429866014416658361449164429436523087658675140272159655145694) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7877031142950866367168896809240831462579303227295647387651455514806242835712372840990147423036146659210477096945501261582435900353*i+14289273609743751140173656110598321544094492520626579789018128492125121164800086629198586521673273015661350367253624582365846523911)*x + (12323786413031641000394498209744910891662612950619976287056325516066191951502255947035034869931314235346944475744758438586874720435*i+12501385306615212924413104348862905046587081674233709108089767974683633429866014416658361449164429436523087658675140272159655145694) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15859432508767990081514096698534584976702652642178969482599781548541481082835848399573563884093490720847257213183048327185606264689*i+13819393372228385133533436880745743035293500103252135571016460306279724887340782840359249941589526707782552966061699106433235396181)*x + (15786057473021781310054592706479207836382911837994755882740995551380856679796929913371902691836423685869811785782654852032221578377*i+7374215082269192258861912005469629172366000424192005743134982539345246091752542187099470392302547360608542124772578641195479339264) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15859432508767990081514096698534584976702652642178969482599781548541481082835848399573563884093490720847257213183048327185606264689*i+13819393372228385133533436880745743035293500103252135571016460306279724887340782840359249941589526707782552966061699106433235396181)*x + (15786057473021781310054592706479207836382911837994755882740995551380856679796929913371902691836423685869811785782654852032221578377*i+7374215082269192258861912005469629172366000424192005743134982539345246091752542187099470392302547360608542124772578641195479339264) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9037771101311151205406297405605188066830297433315196294338555187733399954294896131375613924392321271547510232901160845518089948049*i+13900519773300275358326739184080847901885222986380490665552755460040189918771054994509148088282006546244864772676788120948149164661)*x + (23941272497869942259425543115242313904602262090752225412589363231310991005084051077579256949794541580722873957518579665169163977246*i+19584657267124585931430678480822070388320306717270677175704077690708960927902242132936560418965063591476542399694030214142293509601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9037771101311151205406297405605188066830297433315196294338555187733399954294896131375613924392321271547510232901160845518089948049*i+13900519773300275358326739184080847901885222986380490665552755460040189918771054994509148088282006546244864772676788120948149164661)*x + (23941272497869942259425543115242313904602262090752225412589363231310991005084051077579256949794541580722873957518579665169163977246*i+19584657267124585931430678480822070388320306717270677175704077690708960927902242132936560418965063591476542399694030214142293509601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13077205112471453077048354956640013760005282599106180247581236705271614756248943282187965140681463808273804448967474357941158638880*i+9979274283884195798712730814449142595396729076028541891591967071768297807173230062343371014722581082891733212215800556145854598617)*x + (11279383688003046264690276399988054017228611352696990443868323238690571118111377341287937436616920658092784817111534349912686791428*i+44853315850341262425564366561753803089407993227375336646044627956254027619231401778873380280815291072343576737017278543544480055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13077205112471453077048354956640013760005282599106180247581236705271614756248943282187965140681463808273804448967474357941158638880*i+9979274283884195798712730814449142595396729076028541891591967071768297807173230062343371014722581082891733212215800556145854598617)*x + (11279383688003046264690276399988054017228611352696990443868323238690571118111377341287937436616920658092784817111534349912686791428*i+44853315850341262425564366561753803089407993227375336646044627956254027619231401778873380280815291072343576737017278543544480055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21224617936721341031755049287398021552342439266917110939147614136894683216584970654185150047220003525883540905118093165413002096929*i+19911001163206589989375152167646461606105903202467834863075322124161031040606581362572918420126172528029582813103954130981780480607)*x + (12427301023404509916959032126806515429547863086559476351539188149174310172145559837457580336590333904778407777362043548315043733084*i+15633082206929926681020411250828049144677981699390350590645682053568416157723370163839424066204067862480055936959516965743383619430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21224617936721341031755049287398021552342439266917110939147614136894683216584970654185150047220003525883540905118093165413002096929*i+19911001163206589989375152167646461606105903202467834863075322124161031040606581362572918420126172528029582813103954130981780480607)*x + (12427301023404509916959032126806515429547863086559476351539188149174310172145559837457580336590333904778407777362043548315043733084*i+15633082206929926681020411250828049144677981699390350590645682053568416157723370163839424066204067862480055936959516965743383619430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11522297078060079202796789436626692973865213720929124301260111335329553940304854825427857035607942893944025565309145205660306207119*i+21675841753895561655916647061497474992552945662041867672509792854225802508084690860967625968729880698583711391161306382477956545258)*x + (16389140354524731704694647311305038166716350871396252352944797353544125987766691091932472225202932276671896963702450282895381526093*i+9572972585150999869892248830793242087787941863021180348084759783221609664245483437839584186647659613375185225432945958239656427205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11522297078060079202796789436626692973865213720929124301260111335329553940304854825427857035607942893944025565309145205660306207119*i+21675841753895561655916647061497474992552945662041867672509792854225802508084690860967625968729880698583711391161306382477956545258)*x + (16389140354524731704694647311305038166716350871396252352944797353544125987766691091932472225202932276671896963702450282895381526093*i+9572972585150999869892248830793242087787941863021180348084759783221609664245483437839584186647659613375185225432945958239656427205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2726943464392909922781306155439993622229239856419591083517023888305309991835281874565594951384279576907780538570107028880078271328*i+15680590664944913090342703409116155249782344598279360296681140522500265494366770711304918028029041853122980073812195868664075420058)*x + (22617170822169952601537167970424717842379346759835513547474506025748326663250332928448765186144432747419642419772343192935887008327*i+10798364857001705070390932741306490439613792082504085894341604579340242724611232819026404237804304137807141947828789766085480650685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2726943464392909922781306155439993622229239856419591083517023888305309991835281874565594951384279576907780538570107028880078271328*i+15680590664944913090342703409116155249782344598279360296681140522500265494366770711304918028029041853122980073812195868664075420058)*x + (22617170822169952601537167970424717842379346759835513547474506025748326663250332928448765186144432747419642419772343192935887008327*i+10798364857001705070390932741306490439613792082504085894341604579340242724611232819026404237804304137807141947828789766085480650685) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5344630518881223353605488259099280209524243302658406838420087837319035039049633344514132561227303232479179015344515354622695111645*i+7555324764970936174769017708622918581998598907281295295287764536223083144785892346650773708914676716329982698884742161018637810943)*x + (20568467138099879455813235611540885551933117736082783335379755709400458042317974777493648094778287877669297702123145237781456284183*i+13163351615710266771282808357417221428253198985731466419285517693569432198904719306117038937838387230307599096849540002196324095252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5344630518881223353605488259099280209524243302658406838420087837319035039049633344514132561227303232479179015344515354622695111645*i+7555324764970936174769017708622918581998598907281295295287764536223083144785892346650773708914676716329982698884742161018637810943)*x + (20568467138099879455813235611540885551933117736082783335379755709400458042317974777493648094778287877669297702123145237781456284183*i+13163351615710266771282808357417221428253198985731466419285517693569432198904719306117038937838387230307599096849540002196324095252) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (966026860778364200114650834345888589157071279039351966098622892780237250273433768923030531157579973734429041090900279284153260027*i+11496814194749364179528189422244746069177667155388456016584898323246384659304312624839632467174353185855901446792309530406476686532)*x + (17326660095719957772441137644015106009637402114049584319791005656639479917442180401697289105785617964987477207321324557365306281869*i+3519813208161800613990052136155284989023114682584668668425869395439247946824544504627436764636688127961852196585563664225792627298) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (966026860778364200114650834345888589157071279039351966098622892780237250273433768923030531157579973734429041090900279284153260027*i+11496814194749364179528189422244746069177667155388456016584898323246384659304312624839632467174353185855901446792309530406476686532)*x + (17326660095719957772441137644015106009637402114049584319791005656639479917442180401697289105785617964987477207321324557365306281869*i+3519813208161800613990052136155284989023114682584668668425869395439247946824544504627436764636688127961852196585563664225792627298) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21362112677532111988514270569761771677428694261611348145397126478620838370564986074794695587015739674734334906894185878107547666069*i+20348825797051550083933315297594641432688111966161267685293770450445406725492460207786005011273538931086239284892714954180034721909)*x + (17193536761235016456089546012037430548732619864364940239737250704756547885632158576911219923479083567587064683232585516430111424671*i+22350645687065040553772113133408256779802158564801607058847559721051195304824085936574998710703081405046719323478287068855835248440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21362112677532111988514270569761771677428694261611348145397126478620838370564986074794695587015739674734334906894185878107547666069*i+20348825797051550083933315297594641432688111966161267685293770450445406725492460207786005011273538931086239284892714954180034721909)*x + (17193536761235016456089546012037430548732619864364940239737250704756547885632158576911219923479083567587064683232585516430111424671*i+22350645687065040553772113133408256779802158564801607058847559721051195304824085936574998710703081405046719323478287068855835248440) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10276659800279056913161792120384452735813283850299461755307850084546468761979696142901298499806871803330302553081318187560819774388*i+23007076332195911249850970229201054983406841920259052577558670837666561060927934344554964916395479219283165650030327882768808471880)*x + (1332920955416917365096949679462614546274281089664251276581224072343622883448659253679345972349137297159226616227952422508878055457*i+17621095638950663850932808097483470744947833818488982175715759652206589396198599241924385225832271677780546225508902354531634988611) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10276659800279056913161792120384452735813283850299461755307850084546468761979696142901298499806871803330302553081318187560819774388*i+23007076332195911249850970229201054983406841920259052577558670837666561060927934344554964916395479219283165650030327882768808471880)*x + (1332920955416917365096949679462614546274281089664251276581224072343622883448659253679345972349137297159226616227952422508878055457*i+17621095638950663850932808097483470744947833818488982175715759652206589396198599241924385225832271677780546225508902354531634988611) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14742010941615906887260956243929173745061953568847628220750600788651729822367904955212595721723956835548141632637920888088866965229*i+7668270921064984444052933475600543153133057742708370096679404081404716308112782931764480206766731690120628294134484674998510109291)*x + (17224558620778882547017800286223694543032866269305675102103099351203635541786605423441893322559423520110983781265502973377777513846*i+20539184195610715357472426987401602565429145643039056765910201950488519146303385534830361817886252400768511608298537553050656983421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14742010941615906887260956243929173745061953568847628220750600788651729822367904955212595721723956835548141632637920888088866965229*i+7668270921064984444052933475600543153133057742708370096679404081404716308112782931764480206766731690120628294134484674998510109291)*x + (17224558620778882547017800286223694543032866269305675102103099351203635541786605423441893322559423520110983781265502973377777513846*i+20539184195610715357472426987401602565429145643039056765910201950488519146303385534830361817886252400768511608298537553050656983421) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24284602302176669975631396252370656796140278086347589656837738399581100445227319563990824119807282161216097209383198849074889085041*i+14094981326784415811067607022593783900947040362227945319212430394731526103474422698879030778959630651884805291198149882259785121042)*x + (15647017399311329777852311324271486610184644980224649624131724333412521466265403229061387413270293994214450076393753883427804008086*i+12494468396386164940822813598645008900524915895906909018772031280139485733608109367477747021358160001727766366525225725056873156047) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24284602302176669975631396252370656796140278086347589656837738399581100445227319563990824119807282161216097209383198849074889085041*i+14094981326784415811067607022593783900947040362227945319212430394731526103474422698879030778959630651884805291198149882259785121042)*x + (15647017399311329777852311324271486610184644980224649624131724333412521466265403229061387413270293994214450076393753883427804008086*i+12494468396386164940822813598645008900524915895906909018772031280139485733608109367477747021358160001727766366525225725056873156047) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (797390042789427366139713240649351930859176709882605479288242587910943753483514276847034710451782564202086012019946112337802379919*i+1286877392722618170034522333759173467591039222667260576942979282900606539634977154845286611274895071957804637208110039986958891871)*x + (10675396138148961658784325557925313691470589779052820325913492738075240457932109906550181309399412195928141414896456951910291328132*i+4632365660637462659063602457129995146094735500682444062919890647376363550898908456383261678694327560327181142588597307170861665391) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (797390042789427366139713240649351930859176709882605479288242587910943753483514276847034710451782564202086012019946112337802379919*i+1286877392722618170034522333759173467591039222667260576942979282900606539634977154845286611274895071957804637208110039986958891871)*x + (10675396138148961658784325557925313691470589779052820325913492738075240457932109906550181309399412195928141414896456951910291328132*i+4632365660637462659063602457129995146094735500682444062919890647376363550898908456383261678694327560327181142588597307170861665391) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10076373015553495595842291412465467136996701819920711257978982564528496671777757562608264592789291343550776293800696477287273662884*i+9585039571630857195344398837174792844765271908774736734156921228627012167512602373387713893562240133121468303227431702502907630773)*x + (11704959567597082433112676297274808773323964199024993227010108964097721057571978472880575649406984458221870709549321166472438271351*i+16510274083469119404701181376123743661112080167631708666685244866533931979611288076530326345832245380797901273873898066028998768889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10076373015553495595842291412465467136996701819920711257978982564528496671777757562608264592789291343550776293800696477287273662884*i+9585039571630857195344398837174792844765271908774736734156921228627012167512602373387713893562240133121468303227431702502907630773)*x + (11704959567597082433112676297274808773323964199024993227010108964097721057571978472880575649406984458221870709549321166472438271351*i+16510274083469119404701181376123743661112080167631708666685244866533931979611288076530326345832245380797901273873898066028998768889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22472381961310275196025694702705394228637807123295169451503365751611503646275598796986244732151018431327675507470275986934271015621*i+16591628053013956281827909013931660510897310248075099708319077318338371480220309307397448932218796428934876738826735755569685080308)*x + (16557608191150843368757832625834642326502773570077368974490235840491231703852573195876404578440283939306610666925743836536416091558*i+1057025721486821487900877211401917648532597250128472860760481072297860258218193444619238127831012704660271240284015926321290410856) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22472381961310275196025694702705394228637807123295169451503365751611503646275598796986244732151018431327675507470275986934271015621*i+16591628053013956281827909013931660510897310248075099708319077318338371480220309307397448932218796428934876738826735755569685080308)*x + (16557608191150843368757832625834642326502773570077368974490235840491231703852573195876404578440283939306610666925743836536416091558*i+1057025721486821487900877211401917648532597250128472860760481072297860258218193444619238127831012704660271240284015926321290410856) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5630485820841715076585791737461122890162712232493640978340738635276677910952359952543292668506417853006579380908995073346015031148*i+6888742539893935045307903355776232308828494674747746184141509459183370979133361444538641740718844265014726163890703219860767582751)*x + (12586334291402538508429552581308623198803115082214663004611582777445123842340346547378576215578292074754098208059930134270733474601*i+911424914765337315622432993884193319938875876657968996445476992172556404183731557412383173519131695335073774891770942438808883158) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5630485820841715076585791737461122890162712232493640978340738635276677910952359952543292668506417853006579380908995073346015031148*i+6888742539893935045307903355776232308828494674747746184141509459183370979133361444538641740718844265014726163890703219860767582751)*x + (12586334291402538508429552581308623198803115082214663004611582777445123842340346547378576215578292074754098208059930134270733474601*i+911424914765337315622432993884193319938875876657968996445476992172556404183731557412383173519131695335073774891770942438808883158) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (640589238355173414534156873504557208075811702880469299710231428058326420286767449156293536828847157553988322596545982278076838827*i+14960838910964875159074777822544595246048167079830209533598338303115023064797747254838617182570766453337228327291870654936861062263)*x + (9541314882161107457084282045011881630404501272657304918113562598012653228819821901021120853818160600886784004299041164468582663006*i+2340914134496413523812026459014666906045018037272133529456031663292421382591191651244279065036216215869469161123465410967825143326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (640589238355173414534156873504557208075811702880469299710231428058326420286767449156293536828847157553988322596545982278076838827*i+14960838910964875159074777822544595246048167079830209533598338303115023064797747254838617182570766453337228327291870654936861062263)*x + (9541314882161107457084282045011881630404501272657304918113562598012653228819821901021120853818160600886784004299041164468582663006*i+2340914134496413523812026459014666906045018037272133529456031663292421382591191651244279065036216215869469161123465410967825143326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (732575549707671753999571390363761588012397630991460670066728950283765618963261078323460074846032206943341244181787458583355327338*i+13702527689696679599457216306059214683990345805865896837898104082573764089249032498273190912820067497335425296510658462710151320548)*x + (23767120764381031682749383098504905459051546733414715591185888398863856938871008497948250069784966944157072175284932690707275021446*i+4231869902863730660357005748429811657402175462003654040139864308279366417166197493340052890284902401691505886157083848208479697417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (732575549707671753999571390363761588012397630991460670066728950283765618963261078323460074846032206943341244181787458583355327338*i+13702527689696679599457216306059214683990345805865896837898104082573764089249032498273190912820067497335425296510658462710151320548)*x + (23767120764381031682749383098504905459051546733414715591185888398863856938871008497948250069784966944157072175284932690707275021446*i+4231869902863730660357005748429811657402175462003654040139864308279366417166197493340052890284902401691505886157083848208479697417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24315773763158354906204227560282434964826994982979412085622296833747885374019126212856678839658657551305319187558389079348818016216*i+3716093274148532101095935879841893842502875672255047733892893859559182773609672845043996908322756930060938751896440989033529603409)*x + (10317026218448643204956119303838388198812561526449350551243775985810948364504315048499106722117860892613421618000467579041638539218*i+23525506837198608408815480598311543288578124807643289476726467949784675252523499274311359217013926062917900815970908546130056922898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24315773763158354906204227560282434964826994982979412085622296833747885374019126212856678839658657551305319187558389079348818016216*i+3716093274148532101095935879841893842502875672255047733892893859559182773609672845043996908322756930060938751896440989033529603409)*x + (10317026218448643204956119303838388198812561526449350551243775985810948364504315048499106722117860892613421618000467579041638539218*i+23525506837198608408815480598311543288578124807643289476726467949784675252523499274311359217013926062917900815970908546130056922898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1715293362268970209138434676869418578475837145434314242036842702117353213104370580754657121760437066574867961811351757963681308813*i+16196381414650270728902207345951970155057780135450545347780092160012234608789478841066943450131528931346313785038288004304859498390)*x + (21859025476062251426286505638634971474115027206031430224579432714373961740152728780051814258554597181864993001319935961358553173083*i+17123149638601628037057234143390504882199411798603715692519032018981238904342466321703714386066562528546312420583761761036740639687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1715293362268970209138434676869418578475837145434314242036842702117353213104370580754657121760437066574867961811351757963681308813*i+16196381414650270728902207345951970155057780135450545347780092160012234608789478841066943450131528931346313785038288004304859498390)*x + (21859025476062251426286505638634971474115027206031430224579432714373961740152728780051814258554597181864993001319935961358553173083*i+17123149638601628037057234143390504882199411798603715692519032018981238904342466321703714386066562528546312420583761761036740639687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5902916953358181401533671757234091042636456579838982435278929246917016090258329653018115781121321056921965201975408157732415903132*i+5565941693354454933217798442933597367100313243569968675389784020697705492877101715996170903525777609626086993723909001048967474945)*x + (22314470032792030657105660654885472413934533049887233562390609851588862489036793908505600756701546393629742471171258948303402002366*i+15690407427442304970051562391520127726277137573948230296884553579951453128803336973582009441448438391029265160462687124535563685617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5902916953358181401533671757234091042636456579838982435278929246917016090258329653018115781121321056921965201975408157732415903132*i+5565941693354454933217798442933597367100313243569968675389784020697705492877101715996170903525777609626086993723909001048967474945)*x + (22314470032792030657105660654885472413934533049887233562390609851588862489036793908505600756701546393629742471171258948303402002366*i+15690407427442304970051562391520127726277137573948230296884553579951453128803336973582009441448438391029265160462687124535563685617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7303875427448758218524323242211740750033346500103945019886138272405838613328113117685985965698575344529487302451385360214739957781*i+22730895609808759688337588979025291453906240713440726625000664240186672687085871376358937224081269645147207662413986880590139356109)*x + (20755629931515003182518560185982895576817105763362949844387202011721767862922221780789763530377680713883836682323643160393438507726*i+23545293907166019292326497531900072108175404363241335603773569775638803206244190241668564163436036958638438109271600012312923755423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7303875427448758218524323242211740750033346500103945019886138272405838613328113117685985965698575344529487302451385360214739957781*i+22730895609808759688337588979025291453906240713440726625000664240186672687085871376358937224081269645147207662413986880590139356109)*x + (20755629931515003182518560185982895576817105763362949844387202011721767862922221780789763530377680713883836682323643160393438507726*i+23545293907166019292326497531900072108175404363241335603773569775638803206244190241668564163436036958638438109271600012312923755423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19667949082433657560996684940548538524993198228781569819615503112392736091227544241328702936981030412094841101184986527339266405210*i+4887480209800614547482755173613861173572662108536498318808854963310591012702632908247133663502933568561805066544871405166577587627)*x + (430687617713036925099114958805601741686937271855996905281610498580723192909697634343598385711110579756725001837238420739928887552*i+21550218218072734418765462235151655778444572696482419636516851948694013146870651561291013120577640828057952054649582804330265347969) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19667949082433657560996684940548538524993198228781569819615503112392736091227544241328702936981030412094841101184986527339266405210*i+4887480209800614547482755173613861173572662108536498318808854963310591012702632908247133663502933568561805066544871405166577587627)*x + (430687617713036925099114958805601741686937271855996905281610498580723192909697634343598385711110579756725001837238420739928887552*i+21550218218072734418765462235151655778444572696482419636516851948694013146870651561291013120577640828057952054649582804330265347969) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14766033812772877864473893800429028658348280211924163706577099406690404764612740879503128728611699234793424607565237603658144548488*i+6736200944909641734895211705873566718586506681893969252756490340963316099893494586665239630289933203479457318532768468810988340226)*x + (19161339186802881999244402891210870347533486450130116345944479034834225317011144578880670596994837400646643256054842198294226104806*i+3351555681798787553738645676659334061894868884741735662204622112195909789552963953265145718171810953588074005136023695738068963486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14766033812772877864473893800429028658348280211924163706577099406690404764612740879503128728611699234793424607565237603658144548488*i+6736200944909641734895211705873566718586506681893969252756490340963316099893494586665239630289933203479457318532768468810988340226)*x + (19161339186802881999244402891210870347533486450130116345944479034834225317011144578880670596994837400646643256054842198294226104806*i+3351555681798787553738645676659334061894868884741735662204622112195909789552963953265145718171810953588074005136023695738068963486) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17277196088223298231812419983468118435393443186285902609965440484950580603361885586585418907214129762360186340377310234797723156837*i+14709025940629401056842669541874254573064836349599411452152178046983175636439824909352512582978785822776711394218460295382840860803)*x + (20020215219506407785148266953799513881613076912861945758578953706901416000681309056484453121873920624452505222831385641369640038774*i+4426917994568027339909276842896800279987178115217907391752383891381027333397603121108591612824588468296949710687383139573244227686) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17277196088223298231812419983468118435393443186285902609965440484950580603361885586585418907214129762360186340377310234797723156837*i+14709025940629401056842669541874254573064836349599411452152178046983175636439824909352512582978785822776711394218460295382840860803)*x + (20020215219506407785148266953799513881613076912861945758578953706901416000681309056484453121873920624452505222831385641369640038774*i+4426917994568027339909276842896800279987178115217907391752383891381027333397603121108591612824588468296949710687383139573244227686) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10114172286155243722229589510480218438668257680812362434632486859244039356117039570568637841003787095193817561258731612735229064250*i+12952492431857911001377547747549824971331481278088227045001693558330149797934507978295272444001428933026573469505043966031817828005)*x + (11478355423411327647635493637445134664410083426688548721609887941040587842930038729311495578377383868560644080809961236690228433501*i+24136420773614668835924337373076053754609393711513525025360637880418418022220672770172779264664884281867639745262041620806815399327) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10114172286155243722229589510480218438668257680812362434632486859244039356117039570568637841003787095193817561258731612735229064250*i+12952492431857911001377547747549824971331481278088227045001693558330149797934507978295272444001428933026573469505043966031817828005)*x + (11478355423411327647635493637445134664410083426688548721609887941040587842930038729311495578377383868560644080809961236690228433501*i+24136420773614668835924337373076053754609393711513525025360637880418418022220672770172779264664884281867639745262041620806815399327) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22609141711447737847609645701894820021788250350653023353291548758802009214005424992950438502533349544910631349421977722630373024804*i+6195723229716839433490208151726946301506913478297920995847390460733902313452459169280728345707648325485041099547829469771305030175)*x + (4640061895975541609080860092373718913310452418029261477502809329599435319896830443140636881651704235757882451358173565198792710215*i+4745734019238551365662038720373991500576809742120014817240462148557968949768615631247960392459021066149098478408914839425057333769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22609141711447737847609645701894820021788250350653023353291548758802009214005424992950438502533349544910631349421977722630373024804*i+6195723229716839433490208151726946301506913478297920995847390460733902313452459169280728345707648325485041099547829469771305030175)*x + (4640061895975541609080860092373718913310452418029261477502809329599435319896830443140636881651704235757882451358173565198792710215*i+4745734019238551365662038720373991500576809742120014817240462148557968949768615631247960392459021066149098478408914839425057333769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13342462454882051760807165362039085612195842669084102619342132406778861334418521106386395789426233635010144628039457366028984930119*i+11323018935945402627781877718728306431785364356259207450250209580484637050792964913520086416998069108736145011015092080931626822099)*x + (17492495843155440709352559694959247982651659150820579202745281091507937923632387641481947965558293412334029663737106509678029629386*i+24189321083900542291617258489005837643668790522867943284620252312846882816963497249213287158957539052251889922374405000839991162553) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13342462454882051760807165362039085612195842669084102619342132406778861334418521106386395789426233635010144628039457366028984930119*i+11323018935945402627781877718728306431785364356259207450250209580484637050792964913520086416998069108736145011015092080931626822099)*x + (17492495843155440709352559694959247982651659150820579202745281091507937923632387641481947965558293412334029663737106509678029629386*i+24189321083900542291617258489005837643668790522867943284620252312846882816963497249213287158957539052251889922374405000839991162553) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18361723391900786519085480485259627534658837486013982274681195057456955695521455552384583927440536550892934393053217434684586794490*i+17396602497368892752418725329030528939435142724880907953037597906078088826672597806963985172327208857248871117523115260153658716865)*x + (16663402864217548420473848918383270624971218339950792290021956349581110183052603158999838725604660388164012291452409088913940939746*i+14371955035207152323179416002283372140998173703937586496301507706071137749359629321383919005209536118837024130758795937684245798348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18361723391900786519085480485259627534658837486013982274681195057456955695521455552384583927440536550892934393053217434684586794490*i+17396602497368892752418725329030528939435142724880907953037597906078088826672597806963985172327208857248871117523115260153658716865)*x + (16663402864217548420473848918383270624971218339950792290021956349581110183052603158999838725604660388164012291452409088913940939746*i+14371955035207152323179416002283372140998173703937586496301507706071137749359629321383919005209536118837024130758795937684245798348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21741011318305732469164171194638413790733237598476888431296795492363165962394557331061281485451713980312081502388425015834264304022*i+6523461393495657068930703980389556555077727920912032014106205541813079643041509785410661235767031825857470970748182056351115230505)*x + (23588233824090262497405010792214318456282748009250689480300561146783785375020257807753647045566100868410733380662326249608117635001*i+5097771950829430079068279051756726285038232848958579704711899958249353319177633797069125469492030769647995211278412016736575986319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21741011318305732469164171194638413790733237598476888431296795492363165962394557331061281485451713980312081502388425015834264304022*i+6523461393495657068930703980389556555077727920912032014106205541813079643041509785410661235767031825857470970748182056351115230505)*x + (23588233824090262497405010792214318456282748009250689480300561146783785375020257807753647045566100868410733380662326249608117635001*i+5097771950829430079068279051756726285038232848958579704711899958249353319177633797069125469492030769647995211278412016736575986319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (879596061984716302648522654810903688009945086222712940114508963021764247456766373383555633794766245509531873321832458987625641154*i+9575699862052830419121537861306653355432662765486346941434439826938825487888777439146644518862968194303376303278263973891355878155)*x + (3396784954326853075110591976748970072773693981941356646185687603573725486942954549960242699918776883156140455029540304337566560280*i+10966583388096554814990447427420022236028540260618188273548378157386269255631594210244798515729920135796597965849247517943819337475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (879596061984716302648522654810903688009945086222712940114508963021764247456766373383555633794766245509531873321832458987625641154*i+9575699862052830419121537861306653355432662765486346941434439826938825487888777439146644518862968194303376303278263973891355878155)*x + (3396784954326853075110591976748970072773693981941356646185687603573725486942954549960242699918776883156140455029540304337566560280*i+10966583388096554814990447427420022236028540260618188273548378157386269255631594210244798515729920135796597965849247517943819337475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11760002266409959378811983430196253231749874550120125544458895648537983982196040854586290826490523170207020755312588385532632527403*i+24061004487417077987233382107367876406030683722556140439953558732372960383990410701749723476373386869967176541280145303714911906164)*x + (1861615833804437824584883796852028444428365030411632368141251143297678230165174922802473922073674598510248305970522891772857252860*i+21700504998734968514548896756575857463338033093701670730475798080233760531891198734066648476034955635203734956884604914370207861271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11760002266409959378811983430196253231749874550120125544458895648537983982196040854586290826490523170207020755312588385532632527403*i+24061004487417077987233382107367876406030683722556140439953558732372960383990410701749723476373386869967176541280145303714911906164)*x + (1861615833804437824584883796852028444428365030411632368141251143297678230165174922802473922073674598510248305970522891772857252860*i+21700504998734968514548896756575857463338033093701670730475798080233760531891198734066648476034955635203734956884604914370207861271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10907058466372069379749022249486138552272118130127574515295009463548977108469618427815565034970635094357379631504919784640908552924*i+75270598488133527193717423633208124343298536801925744301232337214191214706673434176243112986304984585433517284893998269847413178)*x + (3137686721126447427282374919159792980302647323630502778596419724195595071057842543410183885558991245778633077465989172108384438948*i+22663600246653666671502890542120722615604666470152529398695425797910067353522358625477662091236380495419602974716461276331128528937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10907058466372069379749022249486138552272118130127574515295009463548977108469618427815565034970635094357379631504919784640908552924*i+75270598488133527193717423633208124343298536801925744301232337214191214706673434176243112986304984585433517284893998269847413178)*x + (3137686721126447427282374919159792980302647323630502778596419724195595071057842543410183885558991245778633077465989172108384438948*i+22663600246653666671502890542120722615604666470152529398695425797910067353522358625477662091236380495419602974716461276331128528937) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6603050534539077799152670931598973373385848409246901816639423621869454831138387310934866110896182635645160731923884336502291068691*i+9836467617002883762289770088526802546613921048255195760780568234397611460340677772686703504071140423107985919209122474093456778068)*x + (5577143499602019555308812552415382957600670017872845951047600646870942881309118597099115978508483279872796221848793649360757393849*i+19227312388280342001525569785602469906588621357560371727307094373911002208348840089013097652002104241503831169393659658616567612799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6603050534539077799152670931598973373385848409246901816639423621869454831138387310934866110896182635645160731923884336502291068691*i+9836467617002883762289770088526802546613921048255195760780568234397611460340677772686703504071140423107985919209122474093456778068)*x + (5577143499602019555308812552415382957600670017872845951047600646870942881309118597099115978508483279872796221848793649360757393849*i+19227312388280342001525569785602469906588621357560371727307094373911002208348840089013097652002104241503831169393659658616567612799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20325100151464256093617569980041890631414161937665403093174434373192163185221398350204809581995349596950975880899520373421174016121*i+18438460602166159320187527674049668205987809568165419559307850131577068432836408862433685878099107814410695057282640248755391611934)*x + (5576616975738312535310259760182906814006194564644475660105478747081196901032018771366666702761686782160822176555615663020281932278*i+7705930667860025015857482742706662856026733760635047967105108465076370218119450029413705418285989234263923153344337499352074420893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20325100151464256093617569980041890631414161937665403093174434373192163185221398350204809581995349596950975880899520373421174016121*i+18438460602166159320187527674049668205987809568165419559307850131577068432836408862433685878099107814410695057282640248755391611934)*x + (5576616975738312535310259760182906814006194564644475660105478747081196901032018771366666702761686782160822176555615663020281932278*i+7705930667860025015857482742706662856026733760635047967105108465076370218119450029413705418285989234263923153344337499352074420893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6619020521611831162799527135311857248430662684213715811150910847666236219965345082756943908823075495840283875938762843511100473400*i+4295009511255595261038596914777964192554633442391408446651945455923737184604259939447240110405445357671378689138453796803409241398)*x + (17805090375186883036676972311002876363091782470311653847746266325336736711937335986169689308280272104841622039301130532659511539479*i+10056838797671055921862577216497180684731007786486925143525818132139329981913640098833628759374505160741393377082375622107972572784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6619020521611831162799527135311857248430662684213715811150910847666236219965345082756943908823075495840283875938762843511100473400*i+4295009511255595261038596914777964192554633442391408446651945455923737184604259939447240110405445357671378689138453796803409241398)*x + (17805090375186883036676972311002876363091782470311653847746266325336736711937335986169689308280272104841622039301130532659511539479*i+10056838797671055921862577216497180684731007786486925143525818132139329981913640098833628759374505160741393377082375622107972572784) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20600362943368931471998740417091831525653523707352284025415823071861033964034258683480416329559526622767268997527526303208126630667*i+11187746611709514281290803046310691546697772546213081341978940046565110983127524524080628786525532763363132863264789645447889294547)*x + (22318994820749443769615182007403222078651122505774280506728362462869470662741115868508001164920123373991603894441829976595796664270*i+20080060314349343543466969038032634224294320293810048444214770771610911107384876111244388943451527164705114753135976597213641675068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20600362943368931471998740417091831525653523707352284025415823071861033964034258683480416329559526622767268997527526303208126630667*i+11187746611709514281290803046310691546697772546213081341978940046565110983127524524080628786525532763363132863264789645447889294547)*x + (22318994820749443769615182007403222078651122505774280506728362462869470662741115868508001164920123373991603894441829976595796664270*i+20080060314349343543466969038032634224294320293810048444214770771610911107384876111244388943451527164705114753135976597213641675068) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9729732438708765592079130973781380443782713152692847391070712620106449746081902061460374873916523936321083850743249695449854040854*i+6854888367012570962577297682099862618200871097387208519753210040695210356009098868433955136615897758612563475748228113472260758700)*x + (13380894721153976836670145453954702105194385878202519893123056827084592851205213601565709488058749429397199141886317160285122692856*i+2222373840641543183455379468587130857158878666872916471880518304938993643786282218184502469088247761214715352515430131800739672826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9729732438708765592079130973781380443782713152692847391070712620106449746081902061460374873916523936321083850743249695449854040854*i+6854888367012570962577297682099862618200871097387208519753210040695210356009098868433955136615897758612563475748228113472260758700)*x + (13380894721153976836670145453954702105194385878202519893123056827084592851205213601565709488058749429397199141886317160285122692856*i+2222373840641543183455379468587130857158878666872916471880518304938993643786282218184502469088247761214715352515430131800739672826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20106921861600713992039310927465993781016173464134270735976193292833437531440853700102468178695855296866275091750968673845964678766*i+23646304324355965784809297403264620095641297367111283850930906422965386893387005131202132481714613219179657695246350569015604960060)*x + (20760179586395122380187189717690546483956824656719603198808243896053980143076746450559387760712411553415449141607659384002506072588*i+8611405015532052384524977932010726482918727295875860887379667761337023295446048382400883726034342989360578468629893363265190922055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20106921861600713992039310927465993781016173464134270735976193292833437531440853700102468178695855296866275091750968673845964678766*i+23646304324355965784809297403264620095641297367111283850930906422965386893387005131202132481714613219179657695246350569015604960060)*x + (20760179586395122380187189717690546483956824656719603198808243896053980143076746450559387760712411553415449141607659384002506072588*i+8611405015532052384524977932010726482918727295875860887379667761337023295446048382400883726034342989360578468629893363265190922055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4201725576670157286666157391351499031856263895239951697753040758930814216392322306378100228234142940087341165177434871449500699214*i+3758459267675378501199473461861503147735572341752336541077449510451362732420537281965931017735661498488022689239651649427426094226)*x + (1177772538723826693629747054750002399209868877687042107361521203780253629330442693289866305228218273551004095105608365487959332078*i+19462941580812376336368485666982404543765121362124368848668549716750573961352011620130078363307702306189331981160218033790468928854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4201725576670157286666157391351499031856263895239951697753040758930814216392322306378100228234142940087341165177434871449500699214*i+3758459267675378501199473461861503147735572341752336541077449510451362732420537281965931017735661498488022689239651649427426094226)*x + (1177772538723826693629747054750002399209868877687042107361521203780253629330442693289866305228218273551004095105608365487959332078*i+19462941580812376336368485666982404543765121362124368848668549716750573961352011620130078363307702306189331981160218033790468928854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23465457016690369822297524381495862427071048843289850020279263633897006222430425006628600600993810630370617693378201735684137947417*i+19074950745992598096722153230037286651327336178045216831003699602556940215585787024783481288530629722116551067205888031325449378744)*x + (12847359148212000664378203153248239078668623067845637830048212201182107765827751737708552297380845241022177354713677318602484732069*i+9768426419069139493507984078121842938108575964117498303492089491740089332372955227412504852079214816571184394598434285629994784317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23465457016690369822297524381495862427071048843289850020279263633897006222430425006628600600993810630370617693378201735684137947417*i+19074950745992598096722153230037286651327336178045216831003699602556940215585787024783481288530629722116551067205888031325449378744)*x + (12847359148212000664378203153248239078668623067845637830048212201182107765827751737708552297380845241022177354713677318602484732069*i+9768426419069139493507984078121842938108575964117498303492089491740089332372955227412504852079214816571184394598434285629994784317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10710068356214914978100613330029530701547370631701403920866992075634089996689189458369945217984581306670391643082827223421611704488*i+8566085402963577977576829784789144864558383759157723995064316760913393769752441985673387416917123685976887337679354782902742830497)*x + (6962611957585776537260767757041825564339628890141080400438260969515662677090143676894812468664814311960662151484908950433300698617*i+16516308043985447502892397333362999630752404604463863583687126683028343221557617097097595184372716700096244976081717607089523040483) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10710068356214914978100613330029530701547370631701403920866992075634089996689189458369945217984581306670391643082827223421611704488*i+8566085402963577977576829784789144864558383759157723995064316760913393769752441985673387416917123685976887337679354782902742830497)*x + (6962611957585776537260767757041825564339628890141080400438260969515662677090143676894812468664814311960662151484908950433300698617*i+16516308043985447502892397333362999630752404604463863583687126683028343221557617097097595184372716700096244976081717607089523040483) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9630900846236558262444156984464983947252876416595494960198136271803952765807410255739454168979206961963382952262198693149346089976*i+14830875242277842965450037223224431555194095538032713364757312036966491200343630263015855346569476759468327104698256774005451193874)*x + (4767927976516960507550284688507278023001392509167813689802815975237804253595941599814836950951928500198796286475722981764742529935*i+15114324799833136488147563187105886609095443085529600686117226434070809730047764656687400891636881851948586948273582702192041383225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9630900846236558262444156984464983947252876416595494960198136271803952765807410255739454168979206961963382952262198693149346089976*i+14830875242277842965450037223224431555194095538032713364757312036966491200343630263015855346569476759468327104698256774005451193874)*x + (4767927976516960507550284688507278023001392509167813689802815975237804253595941599814836950951928500198796286475722981764742529935*i+15114324799833136488147563187105886609095443085529600686117226434070809730047764656687400891636881851948586948273582702192041383225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (685044285847872761902281801874057367264849304120254161704861642203828833459672780915392296051115370243415220944209435437356542379*i+16917171024841769548120377055478354930741780183579261749213949151981322774844429407421009051606230111507679230876120473880122180902)*x + (16037926887150111339518682651098770169059065518226889616318694742300610375418723087808903744144518540671218178226081781732729921738*i+10910096894876769282087320507000584970449631621240880662963135274989041063486314958301179604592473652835543956623553559402461247665) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (685044285847872761902281801874057367264849304120254161704861642203828833459672780915392296051115370243415220944209435437356542379*i+16917171024841769548120377055478354930741780183579261749213949151981322774844429407421009051606230111507679230876120473880122180902)*x + (16037926887150111339518682651098770169059065518226889616318694742300610375418723087808903744144518540671218178226081781732729921738*i+10910096894876769282087320507000584970449631621240880662963135274989041063486314958301179604592473652835543956623553559402461247665) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (38543414246818650964502976684868694430900754885469979903238552665909398250256604982184166663011579592617919305484437389746133977*i+16777438227709572003537693636285217589991083587076588702839873268850262745671566037021083545398389834390415261574368397525170342422)*x + (17053358901862124420981890268053913320550631835355193310095287558212821793935970606875182286151915187738460928178214092654306491412*i+19106106259141769119864080186086149062884596224913493447597609266729235121157008919414821605106918705021537399297069685406889117643) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (38543414246818650964502976684868694430900754885469979903238552665909398250256604982184166663011579592617919305484437389746133977*i+16777438227709572003537693636285217589991083587076588702839873268850262745671566037021083545398389834390415261574368397525170342422)*x + (17053358901862124420981890268053913320550631835355193310095287558212821793935970606875182286151915187738460928178214092654306491412*i+19106106259141769119864080186086149062884596224913493447597609266729235121157008919414821605106918705021537399297069685406889117643) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23719495788341972520086584201142068772941169621801040606060113669362421148172751304892977978670587837391938902462459780760734377115*i+3526129747752841034885782167009632155361522417996090168760860383480813509996982789382147474600423332407545865563784055528806838786)*x + (3041459341163747082487021178200201485268260231769420379236111762971607279308770093646198652957916874981274787383869792709692271753*i+3039468125026641605555692690432511965910879319747411605840545645071549665005591248682414780893994405521112639793925288839589703780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23719495788341972520086584201142068772941169621801040606060113669362421148172751304892977978670587837391938902462459780760734377115*i+3526129747752841034885782167009632155361522417996090168760860383480813509996982789382147474600423332407545865563784055528806838786)*x + (3041459341163747082487021178200201485268260231769420379236111762971607279308770093646198652957916874981274787383869792709692271753*i+3039468125026641605555692690432511965910879319747411605840545645071549665005591248682414780893994405521112639793925288839589703780) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16392915664067601348766804715203990093576063458442823586097696669097170588967899160109889182330491718747915098724747986243565117926*i+1114282565396691761190512126985465828833910580244611165598149865137151669595805395282626667132291492891302055633610058674199571074)*x + (22077107100181354049218590160627605298586287532114121548689390162654889023595124266377919986313421753455446766964220591248827147674*i+15137976608760014151595654237944397336350063038711846051745469423488721660144263746458943659676702105523987219939270082918445902876) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16392915664067601348766804715203990093576063458442823586097696669097170588967899160109889182330491718747915098724747986243565117926*i+1114282565396691761190512126985465828833910580244611165598149865137151669595805395282626667132291492891302055633610058674199571074)*x + (22077107100181354049218590160627605298586287532114121548689390162654889023595124266377919986313421753455446766964220591248827147674*i+15137976608760014151595654237944397336350063038711846051745469423488721660144263746458943659676702105523987219939270082918445902876) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17123585089330162944479501769291547905694267042388497533858774754463949194470810523480487377122998779511209923852641542328017462759*i+8204162615706801272828688295957952888477889125984239840921495726170935696452330640448592311959028625279636644137232856258724276639)*x + (12451720161489541910100032455334370238414622833392455523568215790853510546011675926706261028528457378664485948086170270118684571728*i+11746178265163785514407323580802114498891178358816655013186203850126337073375098667929473665034599649204678867815190854084752474453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17123585089330162944479501769291547905694267042388497533858774754463949194470810523480487377122998779511209923852641542328017462759*i+8204162615706801272828688295957952888477889125984239840921495726170935696452330640448592311959028625279636644137232856258724276639)*x + (12451720161489541910100032455334370238414622833392455523568215790853510546011675926706261028528457378664485948086170270118684571728*i+11746178265163785514407323580802114498891178358816655013186203850126337073375098667929473665034599649204678867815190854084752474453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3240819194148235234008677376249998372872525771917116612604409052957622306482748804146120373351316336501692036529292368383407931069*i+20478905717381650389752269942246771718025202374838444706066181908518541052504151984137917027882641908613826688901883482337739227696)*x + (4604802820190027496726084309573359893008048352652701190581367084956095255519032015203452295275367762908404615619754994287283608529*i+12369887947198588693069741635417604725083545422244534559569309279731634821289374054222254746493257344819201311515293870968624367183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3240819194148235234008677376249998372872525771917116612604409052957622306482748804146120373351316336501692036529292368383407931069*i+20478905717381650389752269942246771718025202374838444706066181908518541052504151984137917027882641908613826688901883482337739227696)*x + (4604802820190027496726084309573359893008048352652701190581367084956095255519032015203452295275367762908404615619754994287283608529*i+12369887947198588693069741635417604725083545422244534559569309279731634821289374054222254746493257344819201311515293870968624367183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1351818866322131065193229070627235186928932555051055346699580367309296692163559463455981106556383884840270806871984305748588957475*i+2278276577056808237873806674439110834680500682650257861616380846339246890501748864548333327947695197337486480871626811500825229050)*x + (20565070234941994836921695101564930658236996589038172928206840925457624028222750331132684904136600164364343707324303469040333987176*i+9196573343492286211585494163569768402394281657160510021366879258934296863018063171190870430998374693585659230354314624539454435617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1351818866322131065193229070627235186928932555051055346699580367309296692163559463455981106556383884840270806871984305748588957475*i+2278276577056808237873806674439110834680500682650257861616380846339246890501748864548333327947695197337486480871626811500825229050)*x + (20565070234941994836921695101564930658236996589038172928206840925457624028222750331132684904136600164364343707324303469040333987176*i+9196573343492286211585494163569768402394281657160510021366879258934296863018063171190870430998374693585659230354314624539454435617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23955998846602392676809115191432677240031460215585971979071258023258795176879294707537941615830727579995435339580206491210589648126*i+5513810216014103022600534446188599082436289909210673674277492190817133835995071031835119687464322063669282748931111749586223154302)*x + (18537441378021643661397210501552435823281205693971441033137855782593018356179487805762271597118007896852728621712420741745007187050*i+23113440584885417181295334308928969294925726502689921111586495329152405473027189306686410728600494845091472415521212118060125480547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23955998846602392676809115191432677240031460215585971979071258023258795176879294707537941615830727579995435339580206491210589648126*i+5513810216014103022600534446188599082436289909210673674277492190817133835995071031835119687464322063669282748931111749586223154302)*x + (18537441378021643661397210501552435823281205693971441033137855782593018356179487805762271597118007896852728621712420741745007187050*i+23113440584885417181295334308928969294925726502689921111586495329152405473027189306686410728600494845091472415521212118060125480547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8998776391432308220393856323184447331356379625129428554805224257507318165615962189731603958713530437369212257910561076447367066410*i+16985036682570473712735034704745089228411455928527515887611846970780904375375397827365241565035674195136908366106333768450936981771)*x + (17287571294396627114226904856028806788783683069888167379779864177166099162181253503113265657488367766974573094596563681699941669314*i+5108784151886799524389710865180455949657330136485039553956161777346912869441188919054955301998555569562111326149838684725191244595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8998776391432308220393856323184447331356379625129428554805224257507318165615962189731603958713530437369212257910561076447367066410*i+16985036682570473712735034704745089228411455928527515887611846970780904375375397827365241565035674195136908366106333768450936981771)*x + (17287571294396627114226904856028806788783683069888167379779864177166099162181253503113265657488367766974573094596563681699941669314*i+5108784151886799524389710865180455949657330136485039553956161777346912869441188919054955301998555569562111326149838684725191244595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9707292120260678839855754955790985375684290900316722771240738959455563081541949327823543479056993586150650490855226801853793196025*i+9810241875864664246010092492173190758026069299004697955510806383829018819583610833144143210714529747224531834245535940373330399016)*x + (6176343494088883762647818958440730089836951168551789990716466092145204729892185670848272198739845320347843154513635928180899017386*i+11484358516990614305855367381583180002950897949124284592776033604268487265718938136887560637145032450112771845677183928905912945749) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9707292120260678839855754955790985375684290900316722771240738959455563081541949327823543479056993586150650490855226801853793196025*i+9810241875864664246010092492173190758026069299004697955510806383829018819583610833144143210714529747224531834245535940373330399016)*x + (6176343494088883762647818958440730089836951168551789990716466092145204729892185670848272198739845320347843154513635928180899017386*i+11484358516990614305855367381583180002950897949124284592776033604268487265718938136887560637145032450112771845677183928905912945749) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13117953302064268358723252645748569024897785137980134278273700977074528245232423183874676072045234006506295549899946809096105473325*i+19790212821875775439004697862600013056116519698204887727482357155763140379430650150872484633183817762137256077300299456308431541572)*x + (16833380004724748104997431283237243945934489235984540666902821453644214844366595949747482324620150902732688003097452334251025031527*i+24148962061514902773386486134837395594891493895916529165930048955236642330418197773311026610901912120127449859658858766431501681013) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13117953302064268358723252645748569024897785137980134278273700977074528245232423183874676072045234006506295549899946809096105473325*i+19790212821875775439004697862600013056116519698204887727482357155763140379430650150872484633183817762137256077300299456308431541572)*x + (16833380004724748104997431283237243945934489235984540666902821453644214844366595949747482324620150902732688003097452334251025031527*i+24148962061514902773386486134837395594891493895916529165930048955236642330418197773311026610901912120127449859658858766431501681013) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2521516794597955113859126295590058258180819162711604414894253160487567358639196239135867996255794139297928054180177197986116221216*i+20062957949867688749167977369892591722285736275018849164869820000992973898633123086428728960717406456106513975466417311758673281612)*x + (20343058089898176442113865883825526045809826428854105683511879573872163473017616254922509735288952447764967261365406780697023684632*i+12116157862431745913506005689000550965823662347059761810397708345266681126340221825693857407163151948998672500207311256537613091942) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2521516794597955113859126295590058258180819162711604414894253160487567358639196239135867996255794139297928054180177197986116221216*i+20062957949867688749167977369892591722285736275018849164869820000992973898633123086428728960717406456106513975466417311758673281612)*x + (20343058089898176442113865883825526045809826428854105683511879573872163473017616254922509735288952447764967261365406780697023684632*i+12116157862431745913506005689000550965823662347059761810397708345266681126340221825693857407163151948998672500207311256537613091942) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23409679464478648654030475888833013457049195406145634253808058891957608604777151648871517891022269607904464419672054682328126757887*i+2775708091971270292677737907019005033219725824192437459266986939835058312111082570087208646747941113401051030468412365654839060507)*x + (18427856807788893293996798521723699605580139202114094198808557560629617945272239375756656697410265214513675616328736284981462634612*i+10830773624833143383824786063710865454103086198924663967334933196259942164631824885096866828617462628028490778158253424643566211029) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23409679464478648654030475888833013457049195406145634253808058891957608604777151648871517891022269607904464419672054682328126757887*i+2775708091971270292677737907019005033219725824192437459266986939835058312111082570087208646747941113401051030468412365654839060507)*x + (18427856807788893293996798521723699605580139202114094198808557560629617945272239375756656697410265214513675616328736284981462634612*i+10830773624833143383824786063710865454103086198924663967334933196259942164631824885096866828617462628028490778158253424643566211029) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6522710351125507743652864178853791877468768812751660460841313656809259871041114593550010135230989436761155134212632763799626829912*i+20958829689452978719319510259855146313089470055984118556596712594248336164589789873357134818242338557738100635383830675644119631549)*x + (154865202084816093453366615885652930037423180111121317980657412424900625404681756827937276308209019950085097930580852363628886997*i+18140937863981212706939842110977612687417843683237448531337954283242991943537060266194881642586656424051695059204015918674636030257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6522710351125507743652864178853791877468768812751660460841313656809259871041114593550010135230989436761155134212632763799626829912*i+20958829689452978719319510259855146313089470055984118556596712594248336164589789873357134818242338557738100635383830675644119631549)*x + (154865202084816093453366615885652930037423180111121317980657412424900625404681756827937276308209019950085097930580852363628886997*i+18140937863981212706939842110977612687417843683237448531337954283242991943537060266194881642586656424051695059204015918674636030257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (934734535710336091428360361877617164596726950131571243713245437366530738385776322802700823234877572959474588257243832325997122740*i+4249626709381397747300464729646322864244365052871263487468612351470946454779545230276217555724177671358483719879600794203701910467)*x + (13396317555307124952452819983601966777412387063211178970802316439421929002885605485062059724940433398271130373367156512285802618804*i+7699515165172546835704391735549927594410161192937916174992056636637064052194263519537702120413824586566354167417873987529337259796) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (934734535710336091428360361877617164596726950131571243713245437366530738385776322802700823234877572959474588257243832325997122740*i+4249626709381397747300464729646322864244365052871263487468612351470946454779545230276217555724177671358483719879600794203701910467)*x + (13396317555307124952452819983601966777412387063211178970802316439421929002885605485062059724940433398271130373367156512285802618804*i+7699515165172546835704391735549927594410161192937916174992056636637064052194263519537702120413824586566354167417873987529337259796) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11232308521443441911211830180954823352548264200427721239829933315915744943842386330975434572969264630766052094157788948903120595230*i+21636212669797665567936885378723043262879711059495037056892357358606205860585411193558945977283122615244267683199024144146409854886)*x + (7946980801638912458162973293442029395039829738348810672930005821634841792091584155530917880707472852218864390272106937297142720734*i+1230841297024266303728835957943207406476193056347413561636824636611452187160053999319325656797498663280832459331468820595926407120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11232308521443441911211830180954823352548264200427721239829933315915744943842386330975434572969264630766052094157788948903120595230*i+21636212669797665567936885378723043262879711059495037056892357358606205860585411193558945977283122615244267683199024144146409854886)*x + (7946980801638912458162973293442029395039829738348810672930005821634841792091584155530917880707472852218864390272106937297142720734*i+1230841297024266303728835957943207406476193056347413561636824636611452187160053999319325656797498663280832459331468820595926407120) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22532647353643550421120387290700098669376456726663981570842359015964274636060225708151662059333557165629651902766170253215707618009*i+1390850898434843876976670098734721005237828666071053301035124424053683307280722896525184522671071250399296980805387602044543604031)*x + (2874204898657408884820618140933010862792387697086896905457343901288478724162524970011639092723967317784211640818427562954505059487*i+17319588887118164611915329939177883794991959113688858122399038430891115674910741210757780783789529857201113127028317351254936641899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22532647353643550421120387290700098669376456726663981570842359015964274636060225708151662059333557165629651902766170253215707618009*i+1390850898434843876976670098734721005237828666071053301035124424053683307280722896525184522671071250399296980805387602044543604031)*x + (2874204898657408884820618140933010862792387697086896905457343901288478724162524970011639092723967317784211640818427562954505059487*i+17319588887118164611915329939177883794991959113688858122399038430891115674910741210757780783789529857201113127028317351254936641899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21431632475862621872148309889784472801954494518739534636795813941796147709564663120240612339989384331840182088326400126104101346243*i+19202223366814814959308960209581417733063775941603080641927829131992767469042127105521043836640186520453412088552296262333269905503)*x + (17917940566279600886550867834021242679581216773274974458389243623525630456502049808550124762328073171571682377860476963953437602966*i+14786096219846166638469106057043583993919301632941636035564207393302928601055003136953239021584852789703819475128321950985791411202) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21431632475862621872148309889784472801954494518739534636795813941796147709564663120240612339989384331840182088326400126104101346243*i+19202223366814814959308960209581417733063775941603080641927829131992767469042127105521043836640186520453412088552296262333269905503)*x + (17917940566279600886550867834021242679581216773274974458389243623525630456502049808550124762328073171571682377860476963953437602966*i+14786096219846166638469106057043583993919301632941636035564207393302928601055003136953239021584852789703819475128321950985791411202) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13227488449997529415517494044490096288413703476739201226411334289582675176392844939464073806199535924953446935457030419982390147261*i+18603608348793239022683371788630123969882271662312078248867580380556232746703264496822944284420451099429867648021292966342747188396)*x + (7314571500225130478368676431300632802992333955849397281978861929244922715839156432914313997359441092636763069700759249356524414099*i+438543652793378238333289533913689978776439617154984553030907223980098791021505793180610683100173972643260257131100048987977377839) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13227488449997529415517494044490096288413703476739201226411334289582675176392844939464073806199535924953446935457030419982390147261*i+18603608348793239022683371788630123969882271662312078248867580380556232746703264496822944284420451099429867648021292966342747188396)*x + (7314571500225130478368676431300632802992333955849397281978861929244922715839156432914313997359441092636763069700759249356524414099*i+438543652793378238333289533913689978776439617154984553030907223980098791021505793180610683100173972643260257131100048987977377839) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9555491715833411030640139572997532483488991346266076541440968367664212980456141477035082816154915662633821800285454766702748697408*i+4396908265501776316065494954496798731277595225135439962047569685791831873756236108876501074579141109458184153165461602916706965173)*x + (9655941941692046471869736420069745028215027668000257829842150535391891861849368445043577960038917206780218569558476610657694624171*i+16759560707361140151020521162574137617711436782025582705067741291289051298408572346201781291504444303421872490220757023318612801347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9555491715833411030640139572997532483488991346266076541440968367664212980456141477035082816154915662633821800285454766702748697408*i+4396908265501776316065494954496798731277595225135439962047569685791831873756236108876501074579141109458184153165461602916706965173)*x + (9655941941692046471869736420069745028215027668000257829842150535391891861849368445043577960038917206780218569558476610657694624171*i+16759560707361140151020521162574137617711436782025582705067741291289051298408572346201781291504444303421872490220757023318612801347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5885285181517525029300660749181651498776596780491990148990934928788480601209025781756952973578468134050286653133352631635664640790*i+10710933248238442273871338756211856515681036664093637609368665108626184802589987381757455012405247114298424529614449114065920682985)*x + (1390342116080125521801332390229833837938812034882164010540091442538895927179036425038619034903529552647284582801996200019831375477*i+22935306147895127153339345495893161406802197141160510159233054656154146104718544370953943948116700359054432838127213454615944711679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5885285181517525029300660749181651498776596780491990148990934928788480601209025781756952973578468134050286653133352631635664640790*i+10710933248238442273871338756211856515681036664093637609368665108626184802589987381757455012405247114298424529614449114065920682985)*x + (1390342116080125521801332390229833837938812034882164010540091442538895927179036425038619034903529552647284582801996200019831375477*i+22935306147895127153339345495893161406802197141160510159233054656154146104718544370953943948116700359054432838127213454615944711679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19967667752840959302171902587268173253983601103146547882535566033698216920326755850657670340332446564787834456911905542273652404586*i+15409923202681206257979317376285995458643203317881443652925908843658368686514665320056428604560471585375766788271460594182728815295)*x + (4893780242503583601842325082058314327941115148320153580608191792309169097690130373487289660277502875053609438296858094647160887898*i+23072764130419999962227595181133750096890772172432347716729731472195093356665979282961817676720723920561793541886081913013398393975) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19967667752840959302171902587268173253983601103146547882535566033698216920326755850657670340332446564787834456911905542273652404586*i+15409923202681206257979317376285995458643203317881443652925908843658368686514665320056428604560471585375766788271460594182728815295)*x + (4893780242503583601842325082058314327941115148320153580608191792309169097690130373487289660277502875053609438296858094647160887898*i+23072764130419999962227595181133750096890772172432347716729731472195093356665979282961817676720723920561793541886081913013398393975) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4955180487894279499876394855937932245829215277845876220152275701459948464053159137705694570083847576965790190537916626529879890923*i+1162992285868298268258932592715671718747465500415060199117117718917799977988858033392147368871388895970206180820518461652054446019)*x + (9433778609443373996265922299592376053273744731123905990685629188424469400928921180719840818604628591565739940480170813525027732509*i+14646831793176561075944924587502695786137536945671870178112033979783730253678153241113666459525622220515800892619493213203035522552) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4955180487894279499876394855937932245829215277845876220152275701459948464053159137705694570083847576965790190537916626529879890923*i+1162992285868298268258932592715671718747465500415060199117117718917799977988858033392147368871388895970206180820518461652054446019)*x + (9433778609443373996265922299592376053273744731123905990685629188424469400928921180719840818604628591565739940480170813525027732509*i+14646831793176561075944924587502695786137536945671870178112033979783730253678153241113666459525622220515800892619493213203035522552) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10495511629656212256672935452910210297934865053343633373089747860848206500840412699833973396305539896032808345718307943515831958245*i+18918742303285263490976840893560804208304452797810674685097062989784221268112998645083309083635991118030271864914815778031149798608)*x + (2624312696924866909105333149092575603075219547088586525488651057095218185181744361225692393598475496881575747691840884096011939020*i+18352074098454652336230615322037511975780859769565347858428809580957671124638140621216676190868126723527217934675800484132009864755) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10495511629656212256672935452910210297934865053343633373089747860848206500840412699833973396305539896032808345718307943515831958245*i+18918742303285263490976840893560804208304452797810674685097062989784221268112998645083309083635991118030271864914815778031149798608)*x + (2624312696924866909105333149092575603075219547088586525488651057095218185181744361225692393598475496881575747691840884096011939020*i+18352074098454652336230615322037511975780859769565347858428809580957671124638140621216676190868126723527217934675800484132009864755) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6623272853160327172171164691250114704279980730696073961270198693814009546869168615904309282863412044261966442635596489249732660372*i+11235940970960224412587398245951754760397083380939085904830589190206752250995520914593490491019521473304249138664774404815282089159)*x + (23890590852824818232446961311359101045031783034611289958446077711004189030230855351428136357057413024441622688468225301134559462731*i+20382767443128622119904333326178541514094413005795682381260952883440848351180683168182448325472361246114060513117382269148080884492) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6623272853160327172171164691250114704279980730696073961270198693814009546869168615904309282863412044261966442635596489249732660372*i+11235940970960224412587398245951754760397083380939085904830589190206752250995520914593490491019521473304249138664774404815282089159)*x + (23890590852824818232446961311359101045031783034611289958446077711004189030230855351428136357057413024441622688468225301134559462731*i+20382767443128622119904333326178541514094413005795682381260952883440848351180683168182448325472361246114060513117382269148080884492) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21782787039483316897817445777139250807627623482479341977653151330452580507749027545172536964731962946951282105691399113296471335675*i+9959197867284645145647488615277578678685852366042760216978629579292243931236912911265065070516006473614156026791911181246399178946)*x + (9574622777983501548494737198793820289877190911544208670006302541431383118103512696507825502562454832595590562477262948953029490763*i+7133051332748566982662857304640913250978609548376655971945077263565230674233844149584769007058892314857073550540457575059999707984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21782787039483316897817445777139250807627623482479341977653151330452580507749027545172536964731962946951282105691399113296471335675*i+9959197867284645145647488615277578678685852366042760216978629579292243931236912911265065070516006473614156026791911181246399178946)*x + (9574622777983501548494737198793820289877190911544208670006302541431383118103512696507825502562454832595590562477262948953029490763*i+7133051332748566982662857304640913250978609548376655971945077263565230674233844149584769007058892314857073550540457575059999707984) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20562702577063903022222109246806541093338965087671239435699184199955639195754695790580404992984802988126109750049998118114904547377*i+21090935415796578945124886191797627252415034076216118778657440563560724399493631785308114888135772207196980158708323269876477583524)*x + (23609554439246939122988225636576044856482429154199662101666476089124946216495283150131063879430779169479719933098695271172328101987*i+1923099720820485089401464549903222296162519200754727556286107078544538958932522514353324610960828134779427752566866634347079856760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20562702577063903022222109246806541093338965087671239435699184199955639195754695790580404992984802988126109750049998118114904547377*i+21090935415796578945124886191797627252415034076216118778657440563560724399493631785308114888135772207196980158708323269876477583524)*x + (23609554439246939122988225636576044856482429154199662101666476089124946216495283150131063879430779169479719933098695271172328101987*i+1923099720820485089401464549903222296162519200754727556286107078544538958932522514353324610960828134779427752566866634347079856760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8138022594703325842367117153412458928786972478378938244166690382971587265118402434831122068851155718751370654632377747587543951751*i+4940775716525911711503054561150023609472172031130328369079266993596274718120316212481443331273800216864777723085477551713637140098)*x + (16610852515607570853087116780970127731306131379545269909827933535399104461417946139880088540831714041477250492868717840027020602752*i+15238372435713506104704305775261890562438573457235128546261333153241550537996459474712942327497939687267490153744291623557073398031) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8138022594703325842367117153412458928786972478378938244166690382971587265118402434831122068851155718751370654632377747587543951751*i+4940775716525911711503054561150023609472172031130328369079266993596274718120316212481443331273800216864777723085477551713637140098)*x + (16610852515607570853087116780970127731306131379545269909827933535399104461417946139880088540831714041477250492868717840027020602752*i+15238372435713506104704305775261890562438573457235128546261333153241550537996459474712942327497939687267490153744291623557073398031) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5993069540291679356078168000111008154297992888136022115764556193338881962782649296790114255437790664199569804381390229245359955630*i+8274311097838796101876576598455468679018003022534392188670537433148108856277420649343545249508088086403224495262190435411169774652)*x + (14461093953415039285945810279655263179892813955278187741081123065993022858158929513793488957678496654389337906410367803185046585983*i+14761449151705583410537129143752659196366276830584274824323221367339976025834262189120754158845227228045937342516056815310692007493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5993069540291679356078168000111008154297992888136022115764556193338881962782649296790114255437790664199569804381390229245359955630*i+8274311097838796101876576598455468679018003022534392188670537433148108856277420649343545249508088086403224495262190435411169774652)*x + (14461093953415039285945810279655263179892813955278187741081123065993022858158929513793488957678496654389337906410367803185046585983*i+14761449151705583410537129143752659196366276830584274824323221367339976025834262189120754158845227228045937342516056815310692007493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2618104934253693502510467794888861746767635826059477991382678396483139229805670240652418546906322287733504503964006381035642532771*i+20825347173267718337255533515701900664338381309573698286962973442519716834334401987171538336371605904200147638959643207011924632876)*x + (6993778314541945558036379276968423128225374380913581823293473680850611558450319450059954589338608387250736283591203359816064622103*i+15091244632310422000368546178248808776221216625644190712805626507438637409083268802967285658651109440225434434469306845654519941494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2618104934253693502510467794888861746767635826059477991382678396483139229805670240652418546906322287733504503964006381035642532771*i+20825347173267718337255533515701900664338381309573698286962973442519716834334401987171538336371605904200147638959643207011924632876)*x + (6993778314541945558036379276968423128225374380913581823293473680850611558450319450059954589338608387250736283591203359816064622103*i+15091244632310422000368546178248808776221216625644190712805626507438637409083268802967285658651109440225434434469306845654519941494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9348104969291187056667513050925145365017310934203618972370368859616674119230379724732892187641520056227416189717732665478119118176*i+18274557410057128823323951998371015228647941933343028604436687229076583807107535888505859605335525159184870519221782177660670619430)*x + (15558918882695061319944654540090367272353088631765689020448279126848467131144785314523814401857748198190318731017690102036503881607*i+3694483747071839974750027903563669722282103310261263168457106974284833308894900613665796102240467116744419217039120766153527155475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9348104969291187056667513050925145365017310934203618972370368859616674119230379724732892187641520056227416189717732665478119118176*i+18274557410057128823323951998371015228647941933343028604436687229076583807107535888505859605335525159184870519221782177660670619430)*x + (15558918882695061319944654540090367272353088631765689020448279126848467131144785314523814401857748198190318731017690102036503881607*i+3694483747071839974750027903563669722282103310261263168457106974284833308894900613665796102240467116744419217039120766153527155475) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14963062267444004353730527340514077694330483546348172152958596215763712095168948949624974921320792407595868331741182846604912433702*i+15045593637804802489505845600553883661014702741540031069287502473455867249424426142022674421102006855165381912783343241469482477154)*x + (21125733490922389598198294033275843443069351364835930591852850247684293462793695882661593277997921811684704417416208265466545948487*i+23904339155577399124573508363537990375139201602357352624524057529237062067638314173332071190005886936446595587417587041621720575810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14963062267444004353730527340514077694330483546348172152958596215763712095168948949624974921320792407595868331741182846604912433702*i+15045593637804802489505845600553883661014702741540031069287502473455867249424426142022674421102006855165381912783343241469482477154)*x + (21125733490922389598198294033275843443069351364835930591852850247684293462793695882661593277997921811684704417416208265466545948487*i+23904339155577399124573508363537990375139201602357352624524057529237062067638314173332071190005886936446595587417587041621720575810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16866805659829188663449903542266521055385280028009297397168849912284950491340457827928040695425290860589963556702824832594527915451*i+12364701058628354923556262688241285616930942036248036247024457148037388431785897249644702424952151874583884850315206232671851439169)*x + (8705762995741957481205097097323790374478048021606404442312998344065815330709550456243630557996616312619839827624807801128609067238*i+13083656000657844742430392499823745117756471978212954503059573443973021704253225718047736140448027926513603785516034177842524863383) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16866805659829188663449903542266521055385280028009297397168849912284950491340457827928040695425290860589963556702824832594527915451*i+12364701058628354923556262688241285616930942036248036247024457148037388431785897249644702424952151874583884850315206232671851439169)*x + (8705762995741957481205097097323790374478048021606404442312998344065815330709550456243630557996616312619839827624807801128609067238*i+13083656000657844742430392499823745117756471978212954503059573443973021704253225718047736140448027926513603785516034177842524863383) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20029647093212937070664048319010628296193581862484249351918095714069421490103879776242892282248085682097936437210800139213955883168*i+19789598811044797847114944141643931374810436139257523183794573982827761825424893184937245546115890024365071126858503526096965635118)*x + (11826836270480727649896575411911614410851932573355108250523230686876162330943000512848505331390893021890010227910020276536226039565*i+15303382565044033152933698936871519795271433183744551300448434932770563987547975609041657276009429470141697701403417426250660842927) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20029647093212937070664048319010628296193581862484249351918095714069421490103879776242892282248085682097936437210800139213955883168*i+19789598811044797847114944141643931374810436139257523183794573982827761825424893184937245546115890024365071126858503526096965635118)*x + (11826836270480727649896575411911614410851932573355108250523230686876162330943000512848505331390893021890010227910020276536226039565*i+15303382565044033152933698936871519795271433183744551300448434932770563987547975609041657276009429470141697701403417426250660842927) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10270412222120165466388995362420132061196895380528284728045747229509866390347133348712275261643126244345526102237112048472088924494*i+668074117916266343802850476472997011592021963016042228508451261512133954732903462223657851275050364161452446853277666649103843361)*x + (4113840086523102670144223508023256666904652354705274751163102186879022392760615930644628877750236228809795645897909861208718278294*i+20355809097938547547269517906131182323681340043459006144073621917767895122040059026238407668904022752348902310968548231532343446206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10270412222120165466388995362420132061196895380528284728045747229509866390347133348712275261643126244345526102237112048472088924494*i+668074117916266343802850476472997011592021963016042228508451261512133954732903462223657851275050364161452446853277666649103843361)*x + (4113840086523102670144223508023256666904652354705274751163102186879022392760615930644628877750236228809795645897909861208718278294*i+20355809097938547547269517906131182323681340043459006144073621917767895122040059026238407668904022752348902310968548231532343446206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9055536126244666415469576322718646891887134343376022349043420352300071713899747937231461532088324506714610023084406017276735665664*i+7952332498377600814404197331793346461471162537187877066062059171438856925796882849784570921857771071770736107782524332746347067760)*x + (1283214172119986059086080163129292191794854864139563840203498809805811737612678298694896991550645381021687112902417351088330271540*i+7438100221237621965585927712485435173523721602903062526232767239053482135100000787296594060866506423585613763215608970582226735364) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9055536126244666415469576322718646891887134343376022349043420352300071713899747937231461532088324506714610023084406017276735665664*i+7952332498377600814404197331793346461471162537187877066062059171438856925796882849784570921857771071770736107782524332746347067760)*x + (1283214172119986059086080163129292191794854864139563840203498809805811737612678298694896991550645381021687112902417351088330271540*i+7438100221237621965585927712485435173523721602903062526232767239053482135100000787296594060866506423585613763215608970582226735364) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16570663996113633284904802948291822683613872154754993001497095489054805142841410746024938506269873871615735531549570587588705885248*i+8158759820069524189052691844555960703416050311053078101334033597978041374843281315067641603102591547617349825352377886133388018495)*x + (13704393191631346497783478340218357946335233258100754449011773025075962191589998810481316433433025818186312383665624442816948833669*i+9268783794851815699434614454157607176868416333681479292564195264530680126049199807462201755006579008005543210209470737901992122085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16570663996113633284904802948291822683613872154754993001497095489054805142841410746024938506269873871615735531549570587588705885248*i+8158759820069524189052691844555960703416050311053078101334033597978041374843281315067641603102591547617349825352377886133388018495)*x + (13704393191631346497783478340218357946335233258100754449011773025075962191589998810481316433433025818186312383665624442816948833669*i+9268783794851815699434614454157607176868416333681479292564195264530680126049199807462201755006579008005543210209470737901992122085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14047725930257250110853090407925848111845585991571465485506841765065104263569735621234610992896904104371656968986014120916192505589*i+2854032259160453788492251237095848330380730062511087037884618998894351490137965520763166601858228918616785953662872029158902172980)*x + (22368716752904722460231405158956649093952820161747634741585364965198362186776906899468963286441838189200341598084794789899199645968*i+10760445910641306309459365490112203142659014083185364005488361796746143058306636301499429025179431885736974435290821533046161282539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14047725930257250110853090407925848111845585991571465485506841765065104263569735621234610992896904104371656968986014120916192505589*i+2854032259160453788492251237095848330380730062511087037884618998894351490137965520763166601858228918616785953662872029158902172980)*x + (22368716752904722460231405158956649093952820161747634741585364965198362186776906899468963286441838189200341598084794789899199645968*i+10760445910641306309459365490112203142659014083185364005488361796746143058306636301499429025179431885736974435290821533046161282539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17895561070465205656711032839050474310819725703504250167611877205222372026898032058310517651388204699261882250428354791607467900685*i+17543943054677037679453547533931737885971741383532935423699375807688434700853222281041081594486903926600725708816258124253090915500)*x + (10946662346613421509896685404962277565098740922501801264567692527410057105209128019663051868760754699158568841258788266987413588340*i+9635299821105372909114342411617555722038042953973947583245931733673614868454354807775390660081156812383932715389522377095741969703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17895561070465205656711032839050474310819725703504250167611877205222372026898032058310517651388204699261882250428354791607467900685*i+17543943054677037679453547533931737885971741383532935423699375807688434700853222281041081594486903926600725708816258124253090915500)*x + (10946662346613421509896685404962277565098740922501801264567692527410057105209128019663051868760754699158568841258788266987413588340*i+9635299821105372909114342411617555722038042953973947583245931733673614868454354807775390660081156812383932715389522377095741969703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [112]:
E2 = Phi2.codomain()
E1 = Phi1.codomain()
E1, E2
Out[112]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2)
In [113]:
Phi1_P0, Phi1_Q0  = Phi1(P0), Phi1(Q0)
Phi1_P0, Phi1_Q0
Out[113]:
((3010679423689974698893725607905690797943574736078100160644422199970908651535369643206599529856856549833371854903189907586595277724*i + 6203985056567332532412795685807905058807994789860446290099453203354052552403441545404911926765825159679367271448507234450289284923 : 16331683977739703871568954250086204622962004859321417648721311069268499502921671466370007788280103669302150314033884120694314652688*i + 2927087317866075113980113166542624114318629437497335293066290623760915349319801198779077397008407866287011028530450857658035716738 : 1),
 (24348441415438809888086715937012599518168312305909944784991845878114360186779507427159889832995054871526335289320335787318423870597*i + 7527021406353940194951104600385173752800546994682740831693218264441841745576472856393116754316268279454130786936814198711449778412 : 7106309029689882395706023200232183522126108510110130989656837712272431289655271337415339517474928847360888407726269425723917675058*i + 552063790130489106323286861239219869628306116951148531534811668879942573403189470655538176754007396948467702230878125337516688062 : 1))
In [114]:
Phi2_P1, Phi2_Q1  = Phi2(P1), Phi2(Q1)
Phi2_P1, Phi2_Q1
Out[114]:
((15334543484029617038711358655498200328027189185410750379756821036800957933616984824093802237622605286569170711127786405939561224433*i + 10612440580904129066862872208465432959106773653995244223504238143683507197071046634734112569125418359915673070194176187247482798510 : 1824449915420398810821021414396039095931127391851756547899102021843411955082564302860579613864706394558712941804438475552319768542*i + 15456889867762356571158896294003965303222370501728579850218839220858695133839494415998952200051533112207125615615610703450378921149 : 1),
 (12423780613074075092143093153628298459743221651661768622659395737234851373496336231536559463221600105078998949485012085872508802842*i + 6519006466041919722839764593327798055815033753856008482378949978623454109092805389436453698717468549001995598489130877577426991689 : 11149184637976865091561172575071992709751145186964600962360823534792703230071270898636992147329466097816080487264274517715099331172*i + 20200669398981497249215790401341522965630377585906139797366169575611805244759749197836726446897522240307826543091144405531603395579 : 1))
In [115]:
Phi12 = isogeny_walk(E2, Phi2_P1 + Integer(S1) * Phi2_Q1, l_B,n_B)
Phi12
Out[115]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10349246899361045351282122081935076977539107810621160710598078929503672253551815282111926370236889659589825615725765727441545341885*i+7324486127045203018200870900170683013256573347634630754473704860592660865361398705927629743741687063503296543352068807541366473356)*x + (6518820120989784633212203977679259704593859451878874672620344146072276354446447747741544137080409511171657569647413027926296506172*i+18234803410416270566355061049518103918501196846060904710464437159719517793284464841107160490733376804166879287614303367696583931713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20983026871152496215472933685181762729592139700659162184107525503597397535196553245389752510536227418820566847510693861313916801836*i+926970725924391845092453506399736954875148910594148881873108295873214838024862558292942717520555893857783921490600892843997846045)*x + (1691285155478838754858773718825814283106202918158753718380754417646216297059780007007433551333281789041048076826290225243184665296*i+14467326487681641021680693030107411782006270671288806125452089356087239045952346671329296339140180147928667440253605145216381367586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8097247191983845503035374620206758405673205084566360147936450696165189901923044205617083209244210653358274216284370195619080117542*i+10801271260739326310376438921163133268203589347695505460470581983104341112347897762877646508507943827910403134303570661205367264001)*x + (4340390594035551338777999947639541906431071192383927930866314632863230295525969299340132507989178334847916676838251927587499476363*i+17151354342622132273529505819089033683771202608870400670231756330309696215550640924340457992423753634289018105431153794094284121881) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8097247191983845503035374620206758405673205084566360147936450696165189901923044205617083209244210653358274216284370195619080117542*i+10801271260739326310376438921163133268203589347695505460470581983104341112347897762877646508507943827910403134303570661205367264001)*x + (4340390594035551338777999947639541906431071192383927930866314632863230295525969299340132507989178334847916676838251927587499476363*i+17151354342622132273529505819089033683771202608870400670231756330309696215550640924340457992423753634289018105431153794094284121881) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14358727061353767919980492246349772027308626419142946629214032099198913057871262583813030917749679464508621965277052386445398467698*i+3784098309248054003977982818116789767577492234656213719273959440979471554082586553131462039972670126005037202801999286612625349636)*x + (10428160020771253823065420353541153711628865865215417247991039164520809394860716321474585159668831384136554096864465891345160657631*i+3801474648667842596562302171920390349436057941189711498818211973540451375095616816312873852962553841009298197997532481748953029213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14358727061353767919980492246349772027308626419142946629214032099198913057871262583813030917749679464508621965277052386445398467698*i+3784098309248054003977982818116789767577492234656213719273959440979471554082586553131462039972670126005037202801999286612625349636)*x + (10428160020771253823065420353541153711628865865215417247991039164520809394860716321474585159668831384136554096864465891345160657631*i+3801474648667842596562302171920390349436057941189711498818211973540451375095616816312873852962553841009298197997532481748953029213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3010653117316595075663971257182781982608706560607151004674519171573764924580218569406671267433163966350826107024219762673412203541*i+21915885285111996286812609987685286903409104098227967722981852053944989015840374664742751479057322426754229856765221256427488478916)*x + (22868485457092806840266107455028058796004879708066608401266006462928163096192111118853340214138428126126657696197705425022418855681*i+9519247848145096319435761396960411079116244056347885864967714690909325984890580974357953951262440465259434440119784156439884498618) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3010653117316595075663971257182781982608706560607151004674519171573764924580218569406671267433163966350826107024219762673412203541*i+21915885285111996286812609987685286903409104098227967722981852053944989015840374664742751479057322426754229856765221256427488478916)*x + (22868485457092806840266107455028058796004879708066608401266006462928163096192111118853340214138428126126657696197705425022418855681*i+9519247848145096319435761396960411079116244056347885864967714690909325984890580974357953951262440465259434440119784156439884498618) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (803223463009486407697139718749321872759583367710223952695335378057296749812948048206506621226019915739123279341230466352883130697*i+20813378576080937984483968719556883782256033148137630777944261771000641741804812486396547260492770412148159501652715518940831118659)*x + (23387810796199733682864965335549160647844102505305579283312911059822307060012853412798108529692999758056916103441672625684202877288*i+13350946145085444030867791904455631130396474024608538557095992242113844449523219587996816996083102980451220055959501610478111829995) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (803223463009486407697139718749321872759583367710223952695335378057296749812948048206506621226019915739123279341230466352883130697*i+20813378576080937984483968719556883782256033148137630777944261771000641741804812486396547260492770412148159501652715518940831118659)*x + (23387810796199733682864965335549160647844102505305579283312911059822307060012853412798108529692999758056916103441672625684202877288*i+13350946145085444030867791904455631130396474024608538557095992242113844449523219587996816996083102980451220055959501610478111829995) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15199417177268019512027249444088180722078633923146350633988596645267803679956840970405922987612375252698496999203022269169570937406*i+18084020604340005485679963421612092096211072005161779035190659436179447365996787146479541663603840818735151120656891360044999784456)*x + (12925006025688447325464304092267328589448984326995479100927228405904170299021420108808694578005069701402802501292880487732799514707*i+7784905043045470590752155330321928044199040668053149063562450782518669833709263308635393162508230842681689857872602040510474383298) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15199417177268019512027249444088180722078633923146350633988596645267803679956840970405922987612375252698496999203022269169570937406*i+18084020604340005485679963421612092096211072005161779035190659436179447365996787146479541663603840818735151120656891360044999784456)*x + (12925006025688447325464304092267328589448984326995479100927228405904170299021420108808694578005069701402802501292880487732799514707*i+7784905043045470590752155330321928044199040668053149063562450782518669833709263308635393162508230842681689857872602040510474383298) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12005584457003579977349057893340605963648829736668671176797020899452936833190027367270539681180615736394088718616959927303963959174*i+9889369692109810478801942461833293527552241738215796254677406351271977559677145303832359078332204747675505612592897609381529587580)*x + (8903453493400036131842826225509413829441368926647007819957752442821168246184658305925387438227579047239123649380392033570167489003*i+20105807415591591552057277458415827162807255250032934269655686351412075667405342900300858757141821995652435413740740784348453034287) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12005584457003579977349057893340605963648829736668671176797020899452936833190027367270539681180615736394088718616959927303963959174*i+9889369692109810478801942461833293527552241738215796254677406351271977559677145303832359078332204747675505612592897609381529587580)*x + (8903453493400036131842826225509413829441368926647007819957752442821168246184658305925387438227579047239123649380392033570167489003*i+20105807415591591552057277458415827162807255250032934269655686351412075667405342900300858757141821995652435413740740784348453034287) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6914536797252500042101202142408475167034143154143193159319948201878700662829127798555599420617534642565434045293443725334717599405*i+20941097311598790110377014171691095015861760390316468360184395966175091046443643850861591614521512247650785779433503469435382116228)*x + (22771139298337268548693604742169666694299345221744402956456461163521756394677658686250030869842407659425684682033307654704233034718*i+16051105427328941496046607354235320047770358643582053322785771627634386164931852122603326996205192413208245764931107274955403720273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6914536797252500042101202142408475167034143154143193159319948201878700662829127798555599420617534642565434045293443725334717599405*i+20941097311598790110377014171691095015861760390316468360184395966175091046443643850861591614521512247650785779433503469435382116228)*x + (22771139298337268548693604742169666694299345221744402956456461163521756394677658686250030869842407659425684682033307654704233034718*i+16051105427328941496046607354235320047770358643582053322785771627634386164931852122603326996205192413208245764931107274955403720273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9022219894877369510326922900375711406289678856904979405447133010786927313596224592310942146835931725160849597629371856586696170391*i+730252888733466889682914801069183138878036859431762592514765232062123820148326995156019027846235596458336044711448739470431844940)*x + (35162332584624785284065673128318308276278742694156391931537756697620340894552373360223985576760795683651538259259773681961779628*i+8804050860954120002931694073054492356030897929102853996072891076737010960641563597171971276386130008119232921277490263412184412940) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9022219894877369510326922900375711406289678856904979405447133010786927313596224592310942146835931725160849597629371856586696170391*i+730252888733466889682914801069183138878036859431762592514765232062123820148326995156019027846235596458336044711448739470431844940)*x + (35162332584624785284065673128318308276278742694156391931537756697620340894552373360223985576760795683651538259259773681961779628*i+8804050860954120002931694073054492356030897929102853996072891076737010960641563597171971276386130008119232921277490263412184412940) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20548127373187230490228791700539306311930219308742997207595632701118310810869683388332838020111085226946047210136529115484954619969*i+298675971931232104949212345744067706213401327647337879926521148152102149847037483038663849653039129090528622543352033672366009713)*x + (8659895148489504344939033973300357179756846970966289809439665293106846243051679439698172658522109815553468860370555434178384317818*i+11693253177201659862161554373819963602946184228305959641902262603071117393971617124617333769480778733418310665662592371961596944929) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20548127373187230490228791700539306311930219308742997207595632701118310810869683388332838020111085226946047210136529115484954619969*i+298675971931232104949212345744067706213401327647337879926521148152102149847037483038663849653039129090528622543352033672366009713)*x + (8659895148489504344939033973300357179756846970966289809439665293106846243051679439698172658522109815553468860370555434178384317818*i+11693253177201659862161554373819963602946184228305959641902262603071117393971617124617333769480778733418310665662592371961596944929) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9125397775526853882118939540096744210214085653607064007099837087409643817151601784781950402421310188881153682513667366869274226973*i+11946768473299805769046361606141593015911005235245563443385830620387342086901642176008854168249060459015755849455502951710496120077)*x + (1942265031661153683424567894172196134680935950869438135181440048090876174711568439929535051946095930684302154225069519847899817172*i+6290967173751914117458527032829623347875874415892261933514399727028546352924402602795138699466164341341012680881781152468606243677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9125397775526853882118939540096744210214085653607064007099837087409643817151601784781950402421310188881153682513667366869274226973*i+11946768473299805769046361606141593015911005235245563443385830620387342086901642176008854168249060459015755849455502951710496120077)*x + (1942265031661153683424567894172196134680935950869438135181440048090876174711568439929535051946095930684302154225069519847899817172*i+6290967173751914117458527032829623347875874415892261933514399727028546352924402602795138699466164341341012680881781152468606243677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10089866064560299729789462536263339005353394569471961186002519245210093876085063962025662571670884477347404543501526734707671870057*i+23029659268049840546111054242506055448844632181052434921627435651964572587809854577249372096353725571947876989276122412645893567547)*x + (16476788314537870631872118550682421686028314703222737141601862310512727903756279635292077179591250524157412060654448218751375508181*i+3507076399300297543206348845774023370274368348579898553307323980817503315096128924278169317902838600824232014205275891672897116925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10089866064560299729789462536263339005353394569471961186002519245210093876085063962025662571670884477347404543501526734707671870057*i+23029659268049840546111054242506055448844632181052434921627435651964572587809854577249372096353725571947876989276122412645893567547)*x + (16476788314537870631872118550682421686028314703222737141601862310512727903756279635292077179591250524157412060654448218751375508181*i+3507076399300297543206348845774023370274368348579898553307323980817503315096128924278169317902838600824232014205275891672897116925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2837265930118800157476773706697933827639899944476348085172973551272082922782092850153777579086787502220506235516882683049674500723*i+15495649102882026464699728513128181491024770124069869147010395421123428471115127888283281657541358997873633529909181632992955860446)*x + (19124115734515410395339748989116425498300916014482562811664492717509540321084525981328801980350866015830764108704230816062782114013*i+18790373358531855351885547374755718409722804107460163995341034233050080419074299242021926014615854615187776483233886725732582313177) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2837265930118800157476773706697933827639899944476348085172973551272082922782092850153777579086787502220506235516882683049674500723*i+15495649102882026464699728513128181491024770124069869147010395421123428471115127888283281657541358997873633529909181632992955860446)*x + (19124115734515410395339748989116425498300916014482562811664492717509540321084525981328801980350866015830764108704230816062782114013*i+18790373358531855351885547374755718409722804107460163995341034233050080419074299242021926014615854615187776483233886725732582313177) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23113027983286322197125513738984407493755298910777257258609521302643515630640360166790707541013258775908274590768291903093131018776*i+4009730196466727963155474820183280024441283764582984069062333598904624988849802506408022967703162234342696756653741464850238223023)*x + (19152000193899935096300707798010515943871366215240884952793286883663782581163111652193433745158500328606499742094910693429505355220*i+20299337771022926979792481802985139777680581843433726070821386847075889184424215376529695865711972246708585113409539163528808999473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23113027983286322197125513738984407493755298910777257258609521302643515630640360166790707541013258775908274590768291903093131018776*i+4009730196466727963155474820183280024441283764582984069062333598904624988849802506408022967703162234342696756653741464850238223023)*x + (19152000193899935096300707798010515943871366215240884952793286883663782581163111652193433745158500328606499742094910693429505355220*i+20299337771022926979792481802985139777680581843433726070821386847075889184424215376529695865711972246708585113409539163528808999473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3379809354828048536741163490365337118792810293298835747253472075848463551154296737622852690773103147403039135245640115914608719280*i+16954830189987070966171566940749057441206667861752911761082139057912642113219437114338816407921387790526185406537679538470296069074)*x + (10750391883340134139092342272695737938378845692377389104032392425067373147028824644597539354163648693525214493640996506055654213110*i+15556495156271805579804136975514684159931160873982138229212331456529833850428267861595967601883956166555291823835097994019458396228) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3379809354828048536741163490365337118792810293298835747253472075848463551154296737622852690773103147403039135245640115914608719280*i+16954830189987070966171566940749057441206667861752911761082139057912642113219437114338816407921387790526185406537679538470296069074)*x + (10750391883340134139092342272695737938378845692377389104032392425067373147028824644597539354163648693525214493640996506055654213110*i+15556495156271805579804136975514684159931160873982138229212331456529833850428267861595967601883956166555291823835097994019458396228) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13910811642069846960628080895452467429913836729737592678610080142019053489632660555914637500223534954776357686833374694139119272316*i+10443034906749837692873141402766238593620737945536717118901918597037505623701822547782052578926892119635943531061775428337448031226)*x + (5012095413896336246367843104584839880799291354915604730687417950356005340088359408296618412359817497299729011146373792879004652849*i+11964427721042038622704906569235773917945008927960031660007628390194867218419999118222895754666982235742306795711915311337526729149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13910811642069846960628080895452467429913836729737592678610080142019053489632660555914637500223534954776357686833374694139119272316*i+10443034906749837692873141402766238593620737945536717118901918597037505623701822547782052578926892119635943531061775428337448031226)*x + (5012095413896336246367843104584839880799291354915604730687417950356005340088359408296618412359817497299729011146373792879004652849*i+11964427721042038622704906569235773917945008927960031660007628390194867218419999118222895754666982235742306795711915311337526729149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21510602809382120941118221982676851559690780013046714247976543924857691277248753795744295617914578377207101519163844976628447402749*i+18313616773178303423284953940667676106178158469803574435436394583137450669249700546856620918445355027947866794525807285664953016819)*x + (19735027065331093698149085494591294357453361323284680510524476340575603493221583351972554425939631433782865652146066913425729142985*i+10901878819108436878239723855428055340278454562398380756072340252830244741961690185695098400297085073737915971997977844814991002707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21510602809382120941118221982676851559690780013046714247976543924857691277248753795744295617914578377207101519163844976628447402749*i+18313616773178303423284953940667676106178158469803574435436394583137450669249700546856620918445355027947866794525807285664953016819)*x + (19735027065331093698149085494591294357453361323284680510524476340575603493221583351972554425939631433782865652146066913425729142985*i+10901878819108436878239723855428055340278454562398380756072340252830244741961690185695098400297085073737915971997977844814991002707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2621312566769882186523575112200652087428395127216611472456343560039741996890057746504117558345704785104528416104226271484789387006*i+7376544826424712247488521912711459084557115866355304994684800984356186839245798849357828324724087120205152287854565773323718427086)*x + (14956424459746252742034090140702862262198369828568141743775767373111907345566210033715759533186659702017635690081144804203344058125*i+2012403359630204962409122670215836449336618750983014539825876813538755071074037968083827737178682238562530574932288499095210709668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2621312566769882186523575112200652087428395127216611472456343560039741996890057746504117558345704785104528416104226271484789387006*i+7376544826424712247488521912711459084557115866355304994684800984356186839245798849357828324724087120205152287854565773323718427086)*x + (14956424459746252742034090140702862262198369828568141743775767373111907345566210033715759533186659702017635690081144804203344058125*i+2012403359630204962409122670215836449336618750983014539825876813538755071074037968083827737178682238562530574932288499095210709668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11242827190211931280623011219566370251355622861279614444959160814484570467541848290440629076099275357951453920063577478749976093968*i+4279396179560211130380414195150843563042417556950174081084018613253721401925384332717048037320225953877776269954247028776670384180)*x + (21078723890060613793069643974334439052863329579805505850798973590930769560795500499367598930930822347767660965341357538296974975490*i+7887030069552519593553313942221775482915738475137796642926121955206816950439085888887164443203221935162410527745362689782869806113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11242827190211931280623011219566370251355622861279614444959160814484570467541848290440629076099275357951453920063577478749976093968*i+4279396179560211130380414195150843563042417556950174081084018613253721401925384332717048037320225953877776269954247028776670384180)*x + (21078723890060613793069643974334439052863329579805505850798973590930769560795500499367598930930822347767660965341357538296974975490*i+7887030069552519593553313942221775482915738475137796642926121955206816950439085888887164443203221935162410527745362689782869806113) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4491378078185736982329281688359734871146845684942773643049905291459080498466319728310992583356714540662156281445047715316405247616*i+1204155043376244029873906428744661919321733407208622860577315202612246976604642080256610633443532862070494455871322443359772590164)*x + (24125191496464907876751894177479433572045107677542533904020828648411474503744248354933018820899324686237541247765775696640021323851*i+22487822473456829158651311070302585248196864847523768520334246538143875461731449352480112479527916307818205960462441932847460337145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4491378078185736982329281688359734871146845684942773643049905291459080498466319728310992583356714540662156281445047715316405247616*i+1204155043376244029873906428744661919321733407208622860577315202612246976604642080256610633443532862070494455871322443359772590164)*x + (24125191496464907876751894177479433572045107677542533904020828648411474503744248354933018820899324686237541247765775696640021323851*i+22487822473456829158651311070302585248196864847523768520334246538143875461731449352480112479527916307818205960462441932847460337145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13649947504271343359525231845560882157211494180324038500526321861720968853526931783287795243771007207587251471076944105508220313489*i+596959120528547291831604072978478207445235748878601696011575153642964819011607996227711356421545325743903414879656366933372751167)*x + (9626710399272124023490428998946108112019411311647696270725108216103507836716322482737726959419289650283832745545420546991750371028*i+8417260773994052826735922370126881728422524304491130692254282346791615513251636300631223960616482832316057246706623209301853037715) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13649947504271343359525231845560882157211494180324038500526321861720968853526931783287795243771007207587251471076944105508220313489*i+596959120528547291831604072978478207445235748878601696011575153642964819011607996227711356421545325743903414879656366933372751167)*x + (9626710399272124023490428998946108112019411311647696270725108216103507836716322482737726959419289650283832745545420546991750371028*i+8417260773994052826735922370126881728422524304491130692254282346791615513251636300631223960616482832316057246706623209301853037715) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4522254035906900487001157627381266560570606327218837826416976680460702102742781252667934111421003485079112694798198132457520874751*i+2460619449776067957132791960413616668871471717064167168937997708692489667280824024876968397047518412526271677328265457451139545969)*x + (11145571847924377063567857791190605387526706014118100737474121728478366823184036943820359270266015260106750765611448966992748888177*i+8462075298575987027206676850796150278041929493865361714464773595317847378126607299819688808914895460422979418437730922050412840587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4522254035906900487001157627381266560570606327218837826416976680460702102742781252667934111421003485079112694798198132457520874751*i+2460619449776067957132791960413616668871471717064167168937997708692489667280824024876968397047518412526271677328265457451139545969)*x + (11145571847924377063567857791190605387526706014118100737474121728478366823184036943820359270266015260106750765611448966992748888177*i+8462075298575987027206676850796150278041929493865361714464773595317847378126607299819688808914895460422979418437730922050412840587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20016262238014595564699686631291977645840032371396593916376021999592701990962203085080076778307991218126718238417941229364080352703*i+2277925236510546182158611666735874160126761052328237730915351729465189348442118095262759309014802859851777731268009926105280994534)*x + (12322868306960978284698099220197360117226779121562182653992456347737973166228636217446065391279524964316853652132056687658869398552*i+4537767964866588861614673919729501091585493835600225458150701851571015082598872396447807636142231311998694789937569812672426767460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20016262238014595564699686631291977645840032371396593916376021999592701990962203085080076778307991218126718238417941229364080352703*i+2277925236510546182158611666735874160126761052328237730915351729465189348442118095262759309014802859851777731268009926105280994534)*x + (12322868306960978284698099220197360117226779121562182653992456347737973166228636217446065391279524964316853652132056687658869398552*i+4537767964866588861614673919729501091585493835600225458150701851571015082598872396447807636142231311998694789937569812672426767460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22279158427368789142295017525773337919802007184418662822687759894762784762080538246998526018445886530464702956000469963531987158790*i+22127284164176034766438571272356818633847782843390468081069532124827594137014860873221698010373370478300776503383392995253434352467)*x + (6631265206250203790219105863727191444377965211600605749452441600452099187882566921002598249289661115013874631265879610234740092457*i+21924607533201803998453257407925105484952383772985433720505847666546288832426980993885031674366357955816537000754136336449994170535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22279158427368789142295017525773337919802007184418662822687759894762784762080538246998526018445886530464702956000469963531987158790*i+22127284164176034766438571272356818633847782843390468081069532124827594137014860873221698010373370478300776503383392995253434352467)*x + (6631265206250203790219105863727191444377965211600605749452441600452099187882566921002598249289661115013874631265879610234740092457*i+21924607533201803998453257407925105484952383772985433720505847666546288832426980993885031674366357955816537000754136336449994170535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5557786940855863361557951938244450397100564121804009602563561217546032917378567251755016703048616483124454333478925294950922263800*i+17142426403794024710855470813833262341218045871390251419646300302150271623270442488268152407967396423897477613815749565632893062338)*x + (6799374936090183571126957044558938447007082126291469949932465145259029700671171318476607293432921096636708187783864379292253444419*i+10779402659342850052559463179877699434507906744155515232881960607092469821457965645815502703785876405225348556123545102006916484958) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5557786940855863361557951938244450397100564121804009602563561217546032917378567251755016703048616483124454333478925294950922263800*i+17142426403794024710855470813833262341218045871390251419646300302150271623270442488268152407967396423897477613815749565632893062338)*x + (6799374936090183571126957044558938447007082126291469949932465145259029700671171318476607293432921096636708187783864379292253444419*i+10779402659342850052559463179877699434507906744155515232881960607092469821457965645815502703785876405225348556123545102006916484958) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10524762392570415573194193057173068292510945043251983726211589915583282732287684022872578831780009021605719602793044297923221655696*i+18290876954622206724562349917374316948068186832137247537919310431636812087454448353789254709207666620167204485131437409732932771128)*x + (13457373899037229187440624109303472666263850679772295542827495670179616219541671939311692940642770620565094502168048729813586337506*i+19480294016159133919961902398265116895509616746317982055193692971856067449626114115699162128741553635939256397578658249193602520986) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10524762392570415573194193057173068292510945043251983726211589915583282732287684022872578831780009021605719602793044297923221655696*i+18290876954622206724562349917374316948068186832137247537919310431636812087454448353789254709207666620167204485131437409732932771128)*x + (13457373899037229187440624109303472666263850679772295542827495670179616219541671939311692940642770620565094502168048729813586337506*i+19480294016159133919961902398265116895509616746317982055193692971856067449626114115699162128741553635939256397578658249193602520986) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5497043370029980480956837848898131002076335906838307705674716125866527553127058870087699804559412571733765323265295469404088957412*i+9787941569155093149957791877494384212691554466145679869222050835173913113350765471631138668756014120871346496583088405163524080945)*x + (7895491369385717309700548137054602049447651558018606328603223014430070171891331531913642812640667929324950351557247645574205276186*i+6408809347832660132203440205094720848812903333879022574442752847820162223636610372685041764711257967546156775903551439688002290414) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5497043370029980480956837848898131002076335906838307705674716125866527553127058870087699804559412571733765323265295469404088957412*i+9787941569155093149957791877494384212691554466145679869222050835173913113350765471631138668756014120871346496583088405163524080945)*x + (7895491369385717309700548137054602049447651558018606328603223014430070171891331531913642812640667929324950351557247645574205276186*i+6408809347832660132203440205094720848812903333879022574442752847820162223636610372685041764711257967546156775903551439688002290414) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2786369786850076051398822734654498856097712878369297239850781904738864668220412435685886913639913770961711001601438838838444501065*i+12822205660904185672562315909527137202158411241838340020199563004469615310746921280026807553431798477602499548817233100953268420706)*x + (19586634727171336988639569023563149769531266584770078250847443088944316772415178262223208849772538301205153026379630208283980937822*i+14873235927595333689918864735263352312737752030747528639945129365037430800301110526873539443869871495777360808645238280953959929220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2786369786850076051398822734654498856097712878369297239850781904738864668220412435685886913639913770961711001601438838838444501065*i+12822205660904185672562315909527137202158411241838340020199563004469615310746921280026807553431798477602499548817233100953268420706)*x + (19586634727171336988639569023563149769531266584770078250847443088944316772415178262223208849772538301205153026379630208283980937822*i+14873235927595333689918864735263352312737752030747528639945129365037430800301110526873539443869871495777360808645238280953959929220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1858349506740237044536061991925857147709166176217986434213148748303474854488410224952210354716166633807213914014690067809674969736*i+10433496607808567768989923302070938982562680762625413047095993908383775238091921363820365120369735933155963885602054457538889804515)*x + (9866031285486133376955754207497133849169031296917328396361894168481307821106879896540225261390683050798841918831499456726646903763*i+16166701172278952921231641684733032333881569723901024948245533745235767796651142551668418282148101658301077543680038868241504017250) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1858349506740237044536061991925857147709166176217986434213148748303474854488410224952210354716166633807213914014690067809674969736*i+10433496607808567768989923302070938982562680762625413047095993908383775238091921363820365120369735933155963885602054457538889804515)*x + (9866031285486133376955754207497133849169031296917328396361894168481307821106879896540225261390683050798841918831499456726646903763*i+16166701172278952921231641684733032333881569723901024948245533745235767796651142551668418282148101658301077543680038868241504017250) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24121782197095248917374458316776520907936379912231349305866704564135409722172163511822282781849445383992139497783070999161381759398*i+23625070392065576385602820485068716038359118981061585941762454710881977940440440394579230913432338444106567940432699234444288874071)*x + (4778091119236025035762790408719166054724361179027847570286239111640325090427339724358582952011754426211775343339546454268343207051*i+21350682699394065929651752945099760293994646573024260790166519643726324293686175141038904655086936444106463321469381617040055167482) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24121782197095248917374458316776520907936379912231349305866704564135409722172163511822282781849445383992139497783070999161381759398*i+23625070392065576385602820485068716038359118981061585941762454710881977940440440394579230913432338444106567940432699234444288874071)*x + (4778091119236025035762790408719166054724361179027847570286239111640325090427339724358582952011754426211775343339546454268343207051*i+21350682699394065929651752945099760293994646573024260790166519643726324293686175141038904655086936444106463321469381617040055167482) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11482222886008131039605930559780802487770494878040981296860117916988949130343391818713749433283341624522242918889550215187410867081*i+7591124775116940140918617409050929492747250970319917905812262822926613884482320726933686453869210129006037343473257082711418010548)*x + (4998264082885795569499624568790160607411078667719883528653488003480804935891978967022274184994453817107956668315826176515182419254*i+19789606904975617961964684050038227687108063923983010985321860271888489793478594071211168658886982134499584935015541198009739177308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11482222886008131039605930559780802487770494878040981296860117916988949130343391818713749433283341624522242918889550215187410867081*i+7591124775116940140918617409050929492747250970319917905812262822926613884482320726933686453869210129006037343473257082711418010548)*x + (4998264082885795569499624568790160607411078667719883528653488003480804935891978967022274184994453817107956668315826176515182419254*i+19789606904975617961964684050038227687108063923983010985321860271888489793478594071211168658886982134499584935015541198009739177308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16736475133267753017110256999668063973257742970462575490455104740037237501846036279469095593164914897651113303051881949932063391318*i+3143731925050480424757770688851192453117831224359022785534960652214531549362329999792873499998795047846465169105494676467036843030)*x + (1362450634375887658056068141287683034290408728235367183261605239049622655654652182208605071769493542368398102398022665671008052670*i+21678356051574983012508277671203634206700087252153264060085322589871745109866853005426038751982484515249885222949421011022864661059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16736475133267753017110256999668063973257742970462575490455104740037237501846036279469095593164914897651113303051881949932063391318*i+3143731925050480424757770688851192453117831224359022785534960652214531549362329999792873499998795047846465169105494676467036843030)*x + (1362450634375887658056068141287683034290408728235367183261605239049622655654652182208605071769493542368398102398022665671008052670*i+21678356051574983012508277671203634206700087252153264060085322589871745109866853005426038751982484515249885222949421011022864661059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16939221142307846583309992654017775757451091755911603802956990300550857508755769215569819063086641941107691419549271496517097456009*i+21383140337920234258324636063942879838987596972988886058101839624944249506250202480703733175503443215144731191156572606415195390223)*x + (22841750251261653680396456127727757030763422987858053284423879801126213749372679727007001490125154631406657300466437433089207794226*i+4343489362942986662421832151103092814635281928344473013903646705127430009796858870408764269570416659529910190651045726261819239489) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16939221142307846583309992654017775757451091755911603802956990300550857508755769215569819063086641941107691419549271496517097456009*i+21383140337920234258324636063942879838987596972988886058101839624944249506250202480703733175503443215144731191156572606415195390223)*x + (22841750251261653680396456127727757030763422987858053284423879801126213749372679727007001490125154631406657300466437433089207794226*i+4343489362942986662421832151103092814635281928344473013903646705127430009796858870408764269570416659529910190651045726261819239489) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15033877220298304850371083228103503531341208051914914573182280112037858923371937944477567049519097410691593784142597502830484427551*i+19798211675038041523973889281765121397967937912609568491726241192465093557862023374813545458419013733694600175375304451142223162281)*x + (15350587631354260023384871139085191798435217375457134794464214780406354606079785960116505361746885806370607606874852151119336295982*i+4420808113813881385025065841250655659884305894101891554608243973293696800056156389825684636805524831526868295862069885023832620959) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15033877220298304850371083228103503531341208051914914573182280112037858923371937944477567049519097410691593784142597502830484427551*i+19798211675038041523973889281765121397967937912609568491726241192465093557862023374813545458419013733694600175375304451142223162281)*x + (15350587631354260023384871139085191798435217375457134794464214780406354606079785960116505361746885806370607606874852151119336295982*i+4420808113813881385025065841250655659884305894101891554608243973293696800056156389825684636805524831526868295862069885023832620959) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8730230859482820822199610977183286312631042948729965651084894796760301957002611687148237329483228123949616312697799913127939400235*i+11074981362101628829570651186191517709275843830866433442599562715143450134741302993770713353529688797388936630638411598176872726189)*x + (6754250597989368299183614440048457451060666653051430160997510002468042414663539426674057087411116859412269643134479675224984482802*i+2075097068297808812526966663358155979000748967329754282015952472852031409294107367162837106767350253220457797819515920373092828689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8730230859482820822199610977183286312631042948729965651084894796760301957002611687148237329483228123949616312697799913127939400235*i+11074981362101628829570651186191517709275843830866433442599562715143450134741302993770713353529688797388936630638411598176872726189)*x + (6754250597989368299183614440048457451060666653051430160997510002468042414663539426674057087411116859412269643134479675224984482802*i+2075097068297808812526966663358155979000748967329754282015952472852031409294107367162837106767350253220457797819515920373092828689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7748451808245944417865755964707810344858325610839469455723082752018615868712701205482510712492221198368749041166259259434560232287*i+11762310482139213956379571573736453940867423009399487592148960225743432363546259118593921619112721395190907403016072356175783875793)*x + (15144717076560074694954497391753089093075070275707451365562817985788351237079841689502399662339859579482015022989421688338636793549*i+15889803321899998761631493316204551168990749582466668075480617365080309198414252143848342177320378896304682261481468213017707424884) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7748451808245944417865755964707810344858325610839469455723082752018615868712701205482510712492221198368749041166259259434560232287*i+11762310482139213956379571573736453940867423009399487592148960225743432363546259118593921619112721395190907403016072356175783875793)*x + (15144717076560074694954497391753089093075070275707451365562817985788351237079841689502399662339859579482015022989421688338636793549*i+15889803321899998761631493316204551168990749582466668075480617365080309198414252143848342177320378896304682261481468213017707424884) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (791775659112217837735942980978934359084496000341266494977430754550648133179497107576941262126257351991647244102017322154296895503*i+2609301179095794332837567620602009733298430791483609969213572035144616487512141161920890953815234309536671527589400534568921661826)*x + (8622125665806973580355353003668727208168771336575613595150456274592395332350398144039546516803650087586906433155429182280982474039*i+19646520473049857182718943199078630711116327224331245050895769453705383689657175622033440790977281439375731808230243526324787963128) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (791775659112217837735942980978934359084496000341266494977430754550648133179497107576941262126257351991647244102017322154296895503*i+2609301179095794332837567620602009733298430791483609969213572035144616487512141161920890953815234309536671527589400534568921661826)*x + (8622125665806973580355353003668727208168771336575613595150456274592395332350398144039546516803650087586906433155429182280982474039*i+19646520473049857182718943199078630711116327224331245050895769453705383689657175622033440790977281439375731808230243526324787963128) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2819323619267877968793120235948550565402079357161417353893261611331689763214774457437952090211646906571295276562474954139861902188*i+15615138197424664669997726886578842502658472148292036015856678186764320329098713564891009107834634353749248582699728067389690646112)*x + (24124162871465099449427291757099530358856827499548466130919366470144837623101252270235432080114585016667694422934625990862884703185*i+9873945105062454016094603650586616368942076954640115515956040607328583314335358678128872099289726741761922695690540362774885481083) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2819323619267877968793120235948550565402079357161417353893261611331689763214774457437952090211646906571295276562474954139861902188*i+15615138197424664669997726886578842502658472148292036015856678186764320329098713564891009107834634353749248582699728067389690646112)*x + (24124162871465099449427291757099530358856827499548466130919366470144837623101252270235432080114585016667694422934625990862884703185*i+9873945105062454016094603650586616368942076954640115515956040607328583314335358678128872099289726741761922695690540362774885481083) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15338346109059641388421252775645900773552239109835545588176691475454352700089382496715751969056224510049694606341573974174995127533*i+3194139603908224844714884292321851016355231705988521342429569744789508083425534763328401891213364817303633047067762756728590149557)*x + (17688925961077436588146897802070588250827311400311086138746662793231827439634362942909711203095859906806144917818597637478119455254*i+2543140808683169152540487741340248605862869927279786878599394123135700917163798693428945572859155769726489502099262402129521496596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15338346109059641388421252775645900773552239109835545588176691475454352700089382496715751969056224510049694606341573974174995127533*i+3194139603908224844714884292321851016355231705988521342429569744789508083425534763328401891213364817303633047067762756728590149557)*x + (17688925961077436588146897802070588250827311400311086138746662793231827439634362942909711203095859906806144917818597637478119455254*i+2543140808683169152540487741340248605862869927279786878599394123135700917163798693428945572859155769726489502099262402129521496596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3598883327802049504934776972499742461850623621991617773088061892699726067437975364284874437943511027048277989445389697910520482775*i+3919290544309619800577354845193205538818462229629271305129833790242499814270309020976495718567800203357308330765961090143721009998)*x + (3817733624362603769396311695513154259793043946154951278023124403543840319922257173755519994338337389408259961207543822409918705121*i+6066004995876884544009681906117869532119346850935460656528152813166708281547123288430589402662926777694824551436136431091922072518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3598883327802049504934776972499742461850623621991617773088061892699726067437975364284874437943511027048277989445389697910520482775*i+3919290544309619800577354845193205538818462229629271305129833790242499814270309020976495718567800203357308330765961090143721009998)*x + (3817733624362603769396311695513154259793043946154951278023124403543840319922257173755519994338337389408259961207543822409918705121*i+6066004995876884544009681906117869532119346850935460656528152813166708281547123288430589402662926777694824551436136431091922072518) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9072087446508697704030180425324550022099876514277386941515474207792131143275307585816889972048454078222184818946185571052473047084*i+1842183755009115049402278457269032804376333171131910183387347710317091020238701887600581479543681488109257218066643550746577641273)*x + (13732141187907857922461937320478100425368982172260721399348196158391542544738925223162231524039060576453298975050479211489378674644*i+19554155431676175765347888896421362949771552858516129297777628137869336446182545438091484989676269142027621019389447396964845808837) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9072087446508697704030180425324550022099876514277386941515474207792131143275307585816889972048454078222184818946185571052473047084*i+1842183755009115049402278457269032804376333171131910183387347710317091020238701887600581479543681488109257218066643550746577641273)*x + (13732141187907857922461937320478100425368982172260721399348196158391542544738925223162231524039060576453298975050479211489378674644*i+19554155431676175765347888896421362949771552858516129297777628137869336446182545438091484989676269142027621019389447396964845808837) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (282092848385568088893622852931338927830956517721234721769034467282929897174568553959906156442718773697286681889244506821028301681*i+11188758853810228999210588352624511911203253685004465316612035656260322809469383038275296832724210278871626195168935929357689271673)*x + (15090177771053839656456747824585625198393693875897389455356366691514083246152383663803757976830923231544386521854873599605631070346*i+21020981452850158978184959720875357282172414180243093280608782990690818587622021615411794951393341933018140607796575567679322913559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (282092848385568088893622852931338927830956517721234721769034467282929897174568553959906156442718773697286681889244506821028301681*i+11188758853810228999210588352624511911203253685004465316612035656260322809469383038275296832724210278871626195168935929357689271673)*x + (15090177771053839656456747824585625198393693875897389455356366691514083246152383663803757976830923231544386521854873599605631070346*i+21020981452850158978184959720875357282172414180243093280608782990690818587622021615411794951393341933018140607796575567679322913559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6204938524274682007851632677062136884425704713502880418776496799176953859919721031539017943046857235132168380702206906863456972075*i+19579722793360601331518068804834797897866234322112425816594851168519354960803394376734899874599713415731096542071363642575105755816)*x + (17175233385697571140186844456994207887869135075003953097988145642783642287067193733303784926050174230582271320084626053077254145384*i+6454141765460628108844117030952953925844017488158635451815271743221816104234289992493299763194864991873540038476124259222091064076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6204938524274682007851632677062136884425704713502880418776496799176953859919721031539017943046857235132168380702206906863456972075*i+19579722793360601331518068804834797897866234322112425816594851168519354960803394376734899874599713415731096542071363642575105755816)*x + (17175233385697571140186844456994207887869135075003953097988145642783642287067193733303784926050174230582271320084626053077254145384*i+6454141765460628108844117030952953925844017488158635451815271743221816104234289992493299763194864991873540038476124259222091064076) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6354534747926595256706251026593654425178872960852716599162058072322342726751594864509983532455708079606683816780076548177540630310*i+18523026640264683761798005719739587165521859503141061116124682538333757461749706684050891558381802232111279494036488440206776374331)*x + (16553819293292152208994851486637686458860829474483752927033746956539699448032173487511487437838921847696324820186182241397447373164*i+18134893244165451529334687415121251889110182091123295825839573579229632282074747149424049909577103613390945792416640084868806556636) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6354534747926595256706251026593654425178872960852716599162058072322342726751594864509983532455708079606683816780076548177540630310*i+18523026640264683761798005719739587165521859503141061116124682538333757461749706684050891558381802232111279494036488440206776374331)*x + (16553819293292152208994851486637686458860829474483752927033746956539699448032173487511487437838921847696324820186182241397447373164*i+18134893244165451529334687415121251889110182091123295825839573579229632282074747149424049909577103613390945792416640084868806556636) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4736475271444456609298983901387765564501202577964631702098213385298093526279522478111189957755000676137905633479901960958359676813*i+17165557991476482957465730803725775483304926392081567110311253824532986602277876620072031937220186636347406005958725463079206499518)*x + (18712680742038788331171760911524864728227416949509747794794011382233695462957975405441804726469089499457764974776677131689301651267*i+1854164175519733165151403045885903222869931116926416168748434394438179970849919570725995166085993191570701295200597214925751174625) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4736475271444456609298983901387765564501202577964631702098213385298093526279522478111189957755000676137905633479901960958359676813*i+17165557991476482957465730803725775483304926392081567110311253824532986602277876620072031937220186636347406005958725463079206499518)*x + (18712680742038788331171760911524864728227416949509747794794011382233695462957975405441804726469089499457764974776677131689301651267*i+1854164175519733165151403045885903222869931116926416168748434394438179970849919570725995166085993191570701295200597214925751174625) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21777669978440605943220827803073829404424362069469208365738613821484402567169874395722496332506212129183520750699461987234796328658*i+11326663017761169280694240782874297121840646999711376460719940615645871568423889371359195674662881003927393886885401039462004556436)*x + (10688859342107976627445066281863939713246483016412761545567795167521742673597963385658889770267130843563051338518935011849188861072*i+14724144331035579552110795308962568138060982993623486456145154708676858634077803595755271105897448242807402960905586796142026329145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21777669978440605943220827803073829404424362069469208365738613821484402567169874395722496332506212129183520750699461987234796328658*i+11326663017761169280694240782874297121840646999711376460719940615645871568423889371359195674662881003927393886885401039462004556436)*x + (10688859342107976627445066281863939713246483016412761545567795167521742673597963385658889770267130843563051338518935011849188861072*i+14724144331035579552110795308962568138060982993623486456145154708676858634077803595755271105897448242807402960905586796142026329145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16840038686206474095385615750513178920710058590356607040508105213625289423585534840232392880674702640324440496451316490171242764792*i+21627469395461034764306941513618427275761340612797281594816214473350894198226707291735392330097414904220407052810342616279037705365)*x + (22394217925996199766519365697830817413661043303763923091144786687947313822189362449170740378178142920402676554301065268730222780030*i+14298895818749680423954114670936691685068038077506875214217914464727750573197172120244728483682653000056646934646188451715401351055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16840038686206474095385615750513178920710058590356607040508105213625289423585534840232392880674702640324440496451316490171242764792*i+21627469395461034764306941513618427275761340612797281594816214473350894198226707291735392330097414904220407052810342616279037705365)*x + (22394217925996199766519365697830817413661043303763923091144786687947313822189362449170740378178142920402676554301065268730222780030*i+14298895818749680423954114670936691685068038077506875214217914464727750573197172120244728483682653000056646934646188451715401351055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3735985915053267693629717239901383265064967998235808429056242090615682002488228771722180458599829061549577134459148629136897325761*i+4984820089321940627229471891187513209239762229664788960793704566321696588981108798614566193325965069024890130371492476763991881430)*x + (21522660671892491240070552332953264927451478902194562211459961466684582385000875461676914994085014407205278695275710212514247209309*i+15696452808667548171585910684270174478230488544402474244085937312290941700367912316450447632987202551595911661454550689815671350749) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3735985915053267693629717239901383265064967998235808429056242090615682002488228771722180458599829061549577134459148629136897325761*i+4984820089321940627229471891187513209239762229664788960793704566321696588981108798614566193325965069024890130371492476763991881430)*x + (21522660671892491240070552332953264927451478902194562211459961466684582385000875461676914994085014407205278695275710212514247209309*i+15696452808667548171585910684270174478230488544402474244085937312290941700367912316450447632987202551595911661454550689815671350749) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (536192247802013055260853813229092560711443282874664697996131305241623264816889469402867691388333682699905966593569036628975154858*i+8275133514854529254259507216251025367964496629836143401374540391140225695523107090270304666991209227094759139779577975626198957902)*x + (3890853423958103972612421217756237344495733975149861662084690391843826484782868516461299422426969883981130262049488655328081477669*i+4366385858093144106752199931714634956534062170835696674541799313572836994111760459762446051270454706014494355157088852978919429149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (536192247802013055260853813229092560711443282874664697996131305241623264816889469402867691388333682699905966593569036628975154858*i+8275133514854529254259507216251025367964496629836143401374540391140225695523107090270304666991209227094759139779577975626198957902)*x + (3890853423958103972612421217756237344495733975149861662084690391843826484782868516461299422426969883981130262049488655328081477669*i+4366385858093144106752199931714634956534062170835696674541799313572836994111760459762446051270454706014494355157088852978919429149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17516191702631135875560302978371202846807271456618652509107134452081928167365621595231621967378172475790294425553509183488458785445*i+4457295036685699784539615846811193767054751820582431062837393555816521996856852292973894372670063368943764039134757237048100192891)*x + (14162057208688332155933385969653526891517972752643088410530924557739753748486298299760755527581253373324068625958654274892587510302*i+8842741437898974417909653953543242026731126699595118311374216047685270658866466476660438752855916067760537551815831713393639302908) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17516191702631135875560302978371202846807271456618652509107134452081928167365621595231621967378172475790294425553509183488458785445*i+4457295036685699784539615846811193767054751820582431062837393555816521996856852292973894372670063368943764039134757237048100192891)*x + (14162057208688332155933385969653526891517972752643088410530924557739753748486298299760755527581253373324068625958654274892587510302*i+8842741437898974417909653953543242026731126699595118311374216047685270658866466476660438752855916067760537551815831713393639302908) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3435880481861505068724995833693188339275659026077885258474311688279017148901357285188243942558156094036931515264648303065344251942*i+8789185711801961862578736664111078975392779622191016163485181588688790866772594273937858747400745703971885063466567945764556497212)*x + (21370106229758727918498430312369291344506793194777343042154032586568705900165735436429331640260484245019717028715959143055755916714*i+18855114430174812796412952847859209459640925881959533573082595363861065122108521572785484273443633284325359190199350001513319020769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3435880481861505068724995833693188339275659026077885258474311688279017148901357285188243942558156094036931515264648303065344251942*i+8789185711801961862578736664111078975392779622191016163485181588688790866772594273937858747400745703971885063466567945764556497212)*x + (21370106229758727918498430312369291344506793194777343042154032586568705900165735436429331640260484245019717028715959143055755916714*i+18855114430174812796412952847859209459640925881959533573082595363861065122108521572785484273443633284325359190199350001513319020769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11564059044536850749011560451271511973411280501360012664616320275915378265938709495831261725842701708748601854870147348563735478137*i+11154078288254654127363279883634467836551851549663841722916306453062521809721278059676858579737320795816997305409686406032062131476)*x + (22179001406742314422868833295538668013585356925225784752622984227488024882777119211316679002798812972472818921645114653028940734225*i+3350575620578673985957006616065396550295652357312271694457256117315748860841923559444540720172869073997458849510784120056245448053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11564059044536850749011560451271511973411280501360012664616320275915378265938709495831261725842701708748601854870147348563735478137*i+11154078288254654127363279883634467836551851549663841722916306453062521809721278059676858579737320795816997305409686406032062131476)*x + (22179001406742314422868833295538668013585356925225784752622984227488024882777119211316679002798812972472818921645114653028940734225*i+3350575620578673985957006616065396550295652357312271694457256117315748860841923559444540720172869073997458849510784120056245448053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21757150267547731060687445059642031601315342981014337837591540279402808464828374197187129955991297960698435959396829735663868222122*i+8273637859207219967130313121179480977939618232265144332083781394640291097857389252858959221123397911557953423893659904691195845165)*x + (7494728123862502979983213718071385592302281738088012542651034851429900346934416486623122801843507954968490171934181679659447107449*i+15243717207467398883347305080175475566247017949221545063128061734488376279835351439753952072610661448342454004913798828704956753840) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21757150267547731060687445059642031601315342981014337837591540279402808464828374197187129955991297960698435959396829735663868222122*i+8273637859207219967130313121179480977939618232265144332083781394640291097857389252858959221123397911557953423893659904691195845165)*x + (7494728123862502979983213718071385592302281738088012542651034851429900346934416486623122801843507954968490171934181679659447107449*i+15243717207467398883347305080175475566247017949221545063128061734488376279835351439753952072610661448342454004913798828704956753840) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23091650305584658851839799755308098905738790098910929055133522710854292989383955944548513345859703598606990064714760980306252934243*i+8127671581921252220222838759617603619638929919781219190871462565013601076621203935868987463832112657592265459652097948681153832156)*x + (10680986344308414165243282746172207734452239206076820625315092336002631749890398692039656893414255443832086793261990072157995813858*i+10098636649187423914645849733639264783413398165313582154353869372592150528569458166746268399526169609897644514302811467304091360251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23091650305584658851839799755308098905738790098910929055133522710854292989383955944548513345859703598606990064714760980306252934243*i+8127671581921252220222838759617603619638929919781219190871462565013601076621203935868987463832112657592265459652097948681153832156)*x + (10680986344308414165243282746172207734452239206076820625315092336002631749890398692039656893414255443832086793261990072157995813858*i+10098636649187423914645849733639264783413398165313582154353869372592150528569458166746268399526169609897644514302811467304091360251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19527077687015526831021674133540055654171341571881214836477694769487611394895667061859432093940033963688579875997665284379652037577*i+7743732733521899878819897802304200137768032322096536090293027166011302376731909861206997438034031129259516682164261388927707083385)*x + (16771470932659470053605451029455656484974620374456842257906638555352367495926950144883683131971411215164033704287475443914465654211*i+20996119045816890801483747810228740752032850009875828049148002496654698240017790440429826073612887969978510564764601544308294856792) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19527077687015526831021674133540055654171341571881214836477694769487611394895667061859432093940033963688579875997665284379652037577*i+7743732733521899878819897802304200137768032322096536090293027166011302376731909861206997438034031129259516682164261388927707083385)*x + (16771470932659470053605451029455656484974620374456842257906638555352367495926950144883683131971411215164033704287475443914465654211*i+20996119045816890801483747810228740752032850009875828049148002496654698240017790440429826073612887969978510564764601544308294856792) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19480737788141459634909186886120743439676101978744100879982350344260877065791512141473335725091523701999555747936461796011119680564*i+14480103505496832498354345085495380746655123803699851971699296555329558562247023827798673215205917335713104387419340093436683145714)*x + (11337228980793674189895157790296505888082017973357348548851365241236900056738191089828528842494670985622166514019465590895745171765*i+13358019366543209862798877689956780338635732399221321191439332418460171880089690942534594003133138789887975227243401148688147489720) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19480737788141459634909186886120743439676101978744100879982350344260877065791512141473335725091523701999555747936461796011119680564*i+14480103505496832498354345085495380746655123803699851971699296555329558562247023827798673215205917335713104387419340093436683145714)*x + (11337228980793674189895157790296505888082017973357348548851365241236900056738191089828528842494670985622166514019465590895745171765*i+13358019366543209862798877689956780338635732399221321191439332418460171880089690942534594003133138789887975227243401148688147489720) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1893385410024442666741447757839962169721564398232355938936420028253617977599429838615538841807630666244974711134923017306623241794*i+11918902250635320799776668931781289550919351226346374035156756749442030633575599223632840683658007463976858839457045984329033789091)*x + (1256982602940203274233461055682106691685699506319587266727414539694731075206139501286846418030369627690440185151573615174764328270*i+23115050383773956600956162892026852547506602828058255931896301140496236655673293153708534156171923571820439951617379389197530547963) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1893385410024442666741447757839962169721564398232355938936420028253617977599429838615538841807630666244974711134923017306623241794*i+11918902250635320799776668931781289550919351226346374035156756749442030633575599223632840683658007463976858839457045984329033789091)*x + (1256982602940203274233461055682106691685699506319587266727414539694731075206139501286846418030369627690440185151573615174764328270*i+23115050383773956600956162892026852547506602828058255931896301140496236655673293153708534156171923571820439951617379389197530547963) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17594924342976270423739896055528866817343574651812694546023236691547020127139010210281918567607094616468686092447631228542346742176*i+12076003010063418362602508051600837634440169736019969371487042285309114398293223720948336489782612375662569561897265976912307622587)*x + (17983863608657755496858439936186276431864929814252536627947201153811106822833564426571402666849425340624224080599686082370514142953*i+12976867689521856357174070002454874206999220266400533051985490854867934302831048184549254871396985078341703267821566713846945955480) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17594924342976270423739896055528866817343574651812694546023236691547020127139010210281918567607094616468686092447631228542346742176*i+12076003010063418362602508051600837634440169736019969371487042285309114398293223720948336489782612375662569561897265976912307622587)*x + (17983863608657755496858439936186276431864929814252536627947201153811106822833564426571402666849425340624224080599686082370514142953*i+12976867689521856357174070002454874206999220266400533051985490854867934302831048184549254871396985078341703267821566713846945955480) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14703700840746569674138786965473673805786968107045323994280663399207792470671583493404588821088533459101535343711741352965153594206*i+17444416520106057903190650873564561172876121739921783153489420045478581474763826424401018715504399397043685610936219090806231718580)*x + (20619242767436042261816497976886490554900540545293873092936750784314760623983781504523149066419864511749467010471965296278192080453*i+6879398022052719735897944263113133098023049199081649480565143626633723103007858826766239308104500333359812601651269734919063395275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14703700840746569674138786965473673805786968107045323994280663399207792470671583493404588821088533459101535343711741352965153594206*i+17444416520106057903190650873564561172876121739921783153489420045478581474763826424401018715504399397043685610936219090806231718580)*x + (20619242767436042261816497976886490554900540545293873092936750784314760623983781504523149066419864511749467010471965296278192080453*i+6879398022052719735897944263113133098023049199081649480565143626633723103007858826766239308104500333359812601651269734919063395275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8276365369636603854209287295946893811656378174852260318305764789089260563101789416919067739140312275493439109013454649961484915713*i+21782921040209674647702121565643380336414882011656878275390707505179979218091362211863108857181881189577352506445888124092334821500)*x + (16099658381655025931531042247297308678602499579628534740291742367244537995386850138744253675500264381545815455024932347553667435874*i+9771410891715912824873311920588602705026925472619950484930854752278527977276403874094900658634619368766313429431519089946176260191) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8276365369636603854209287295946893811656378174852260318305764789089260563101789416919067739140312275493439109013454649961484915713*i+21782921040209674647702121565643380336414882011656878275390707505179979218091362211863108857181881189577352506445888124092334821500)*x + (16099658381655025931531042247297308678602499579628534740291742367244537995386850138744253675500264381545815455024932347553667435874*i+9771410891715912824873311920588602705026925472619950484930854752278527977276403874094900658634619368766313429431519089946176260191) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1373314167890730189898909746039007801663983042502042695728718510292018803021594591566403069144304574404780619910847673308547177123*i+8045917151080879668770689677128238004679425641314642586794084351152713838131602964822634093023882929884055098508555061422981987178)*x + (17031642131905806845466425440257644217664272814679892971642958665206955164864180027478871909103571634805588275555564145788340257801*i+14389475557018903493344037003773213572813177107472790645387889419511604818126049522885081427162367803725344362556242694055546027445) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1373314167890730189898909746039007801663983042502042695728718510292018803021594591566403069144304574404780619910847673308547177123*i+8045917151080879668770689677128238004679425641314642586794084351152713838131602964822634093023882929884055098508555061422981987178)*x + (17031642131905806845466425440257644217664272814679892971642958665206955164864180027478871909103571634805588275555564145788340257801*i+14389475557018903493344037003773213572813177107472790645387889419511604818126049522885081427162367803725344362556242694055546027445) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1298422716932030691486231909026789528830549282003800697373088189135785153664547733577346676398096848347961854540064230764160548531*i+8654403838647198961038307593133465519649093500940574952529120347928271574234352533886008966287661684394312111540894825760975183898)*x + (14031748625658203432616334282314289802248070197225881252738563158431628446207122001501914066669121033273994338448735575558839980289*i+14248107656470318756923711650182154684169014053533369373935987782770152309645514610096731010418654901448747924626783208819597621469) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1298422716932030691486231909026789528830549282003800697373088189135785153664547733577346676398096848347961854540064230764160548531*i+8654403838647198961038307593133465519649093500940574952529120347928271574234352533886008966287661684394312111540894825760975183898)*x + (14031748625658203432616334282314289802248070197225881252738563158431628446207122001501914066669121033273994338448735575558839980289*i+14248107656470318756923711650182154684169014053533369373935987782770152309645514610096731010418654901448747924626783208819597621469) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8831395545695956282197693356118610413056743493808976181549975437708477993223775973557703146382872613028231068773687651173792010322*i+23880312435952421063135272372308486763773746748520621755947358744281381105722973501074012964207854213701451431768498244158050336760)*x + (9404954994657107840342975443471654387208651358255457804300015716573611840803475583340470962913927466350026403238471217488755859549*i+17435201896802744268386493923057253485487186450515564364026479915174395012216173066629745036636710622980911012496939768672551168122) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8831395545695956282197693356118610413056743493808976181549975437708477993223775973557703146382872613028231068773687651173792010322*i+23880312435952421063135272372308486763773746748520621755947358744281381105722973501074012964207854213701451431768498244158050336760)*x + (9404954994657107840342975443471654387208651358255457804300015716573611840803475583340470962913927466350026403238471217488755859549*i+17435201896802744268386493923057253485487186450515564364026479915174395012216173066629745036636710622980911012496939768672551168122) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22930539760231439427079862556894393518582326658361360070974262564223920643950336155551815319822111451043970449104612556098259401325*i+6645900894862475883154419894647673312783063095357361368240486617164766127681440205759777935165743420179157616186656344037388167466)*x + (3975143147551617368987018905600907670878567892958465643170565519628758621133233941179967349467996212305857633100167943524493692710*i+22842862340269515099744778435218815078632479675590523050203501865809169194461189194970162161089268275353005018822775232425495015189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22930539760231439427079862556894393518582326658361360070974262564223920643950336155551815319822111451043970449104612556098259401325*i+6645900894862475883154419894647673312783063095357361368240486617164766127681440205759777935165743420179157616186656344037388167466)*x + (3975143147551617368987018905600907670878567892958465643170565519628758621133233941179967349467996212305857633100167943524493692710*i+22842862340269515099744778435218815078632479675590523050203501865809169194461189194970162161089268275353005018822775232425495015189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14035720470530053897138075554543427388967909486638816667945001908844037123084345846465520624156641991100892142071991882222643524889*i+13531635251396780880760775600903097164309755239056972563112742362490592774364711859569317670117014035089978856601147250533445761229)*x + (1525834270579004237643565336972370917338102269453565480298546120870899132566916195277789030166738415283101378099198823366249520811*i+18825060414392958039073365306734624977083678927984857559107867346214380590581225374766351712737552418281192533777699131536621682205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14035720470530053897138075554543427388967909486638816667945001908844037123084345846465520624156641991100892142071991882222643524889*i+13531635251396780880760775600903097164309755239056972563112742362490592774364711859569317670117014035089978856601147250533445761229)*x + (1525834270579004237643565336972370917338102269453565480298546120870899132566916195277789030166738415283101378099198823366249520811*i+18825060414392958039073365306734624977083678927984857559107867346214380590581225374766351712737552418281192533777699131536621682205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16218847778518311263869652028337533000946816732239444053656058259066952788011421349515443417236850447322727810916426414296625234499*i+23642748078085592506142411475083242453214337682283671105455672199857906489018818666271346678575384981539495735141191065239967180106)*x + (18533110229304564230557524887159933756681969305646529629998654286078419750191348130034316945776154427127195808608175754423023825956*i+14579055385986379299660759203745225309262778469327021254211944876807496932891618300677326169462085481179753203741267385423241871571) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16218847778518311263869652028337533000946816732239444053656058259066952788011421349515443417236850447322727810916426414296625234499*i+23642748078085592506142411475083242453214337682283671105455672199857906489018818666271346678575384981539495735141191065239967180106)*x + (18533110229304564230557524887159933756681969305646529629998654286078419750191348130034316945776154427127195808608175754423023825956*i+14579055385986379299660759203745225309262778469327021254211944876807496932891618300677326169462085481179753203741267385423241871571) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12414311415113700810684837172602687827142818133278750045817644929714871927144035540999900821129162926256618894644370122742683065474*i+23871170479397266250941966809521683432434389549118014327096065917649934922549152405983323700086685437922241012235276149500061440443)*x + (13296140971513384355510912165494108740853827717210376835396925183553636356642149435040586322655999033869255198969064544136814619786*i+11888880316458829327318213329320064875150317695658224545820687286569561923652856067227395837574780642702865081535027441134601298629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12414311415113700810684837172602687827142818133278750045817644929714871927144035540999900821129162926256618894644370122742683065474*i+23871170479397266250941966809521683432434389549118014327096065917649934922549152405983323700086685437922241012235276149500061440443)*x + (13296140971513384355510912165494108740853827717210376835396925183553636356642149435040586322655999033869255198969064544136814619786*i+11888880316458829327318213329320064875150317695658224545820687286569561923652856067227395837574780642702865081535027441134601298629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17853979166234527139432969587662643912501313370343259302338761145383028089532579495697370235671703276489990836989135001563632619899*i+15621271399142554523283039528857736543099274910236594110251646731533035655455009488791895024442735954086667938280836013301496502099)*x + (19655408873634366854540175386496475118191425413237839206903121291252193389618238092719505136326559684118920893546471225948379512282*i+17149914930881564625521586028295431096431777590269140821671550496299827155613604000770093029848762730954147583916118712572724652862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17853979166234527139432969587662643912501313370343259302338761145383028089532579495697370235671703276489990836989135001563632619899*i+15621271399142554523283039528857736543099274910236594110251646731533035655455009488791895024442735954086667938280836013301496502099)*x + (19655408873634366854540175386496475118191425413237839206903121291252193389618238092719505136326559684118920893546471225948379512282*i+17149914930881564625521586028295431096431777590269140821671550496299827155613604000770093029848762730954147583916118712572724652862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1515519781150745183832168915055833769536387776573598210671112008685963345897594596178587394684101520267275565241763232350813057225*i+17420318253118971538089180896385610859623734903460698258502066366887263580562007544489292889408402568605661302186396168813156501473)*x + (6359218679846266715048780780886029373268966041798185998741462439945785222967924370475583250676507420544285036350941379576296669455*i+23388455699361108048716496591928739566972483762305920580007223255277631087638141506734505825234910777177668757808855373845999818900) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1515519781150745183832168915055833769536387776573598210671112008685963345897594596178587394684101520267275565241763232350813057225*i+17420318253118971538089180896385610859623734903460698258502066366887263580562007544489292889408402568605661302186396168813156501473)*x + (6359218679846266715048780780886029373268966041798185998741462439945785222967924370475583250676507420544285036350941379576296669455*i+23388455699361108048716496591928739566972483762305920580007223255277631087638141506734505825234910777177668757808855373845999818900) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19466380356158771315213073158600168695126699445501250222966997280008766909051047226939113773425333973360016316292521712612584051440*i+22706718556004359793156128787926915543729729643535546566768319284747110725195325961088665319922027706132987711493547151362771153037)*x + (7832846144708437269436311255792991047751415244216061426701315280069913313382674700939086179676725896173966183593150438579073512648*i+5413455875186851526398420128609547455289803648742967319007063743053440304793761123502234962671282404532414864162112995398087516087) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19466380356158771315213073158600168695126699445501250222966997280008766909051047226939113773425333973360016316292521712612584051440*i+22706718556004359793156128787926915543729729643535546566768319284747110725195325961088665319922027706132987711493547151362771153037)*x + (7832846144708437269436311255792991047751415244216061426701315280069913313382674700939086179676725896173966183593150438579073512648*i+5413455875186851526398420128609547455289803648742967319007063743053440304793761123502234962671282404532414864162112995398087516087) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9229337510186848267957522828288448579234067313612485997848213361367987459034898505316714383395125842450161899321512267406249932096*i+11441730137096730359308078568919795730156217270627425657975242026098506739617685205687178870911021555816658742145358421999533269865)*x + (4642560671965007053607475737561007124648846432499082542928559362347346276580871692565715606135958592044044587760242208932587557716*i+22940663633966164590791518681203703170289029005052422922734669849354301134663701904989543098529351163913580136604640389361904816717) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9229337510186848267957522828288448579234067313612485997848213361367987459034898505316714383395125842450161899321512267406249932096*i+11441730137096730359308078568919795730156217270627425657975242026098506739617685205687178870911021555816658742145358421999533269865)*x + (4642560671965007053607475737561007124648846432499082542928559362347346276580871692565715606135958592044044587760242208932587557716*i+22940663633966164590791518681203703170289029005052422922734669849354301134663701904989543098529351163913580136604640389361904816717) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21001810640598194766185160124024251753696093990318389782189576328855687815240995084332527516800769955101018811786113768256358816300*i+4870925338562073244601750992174024710762314596566754464925998643737440768215234833592448419484811085925877163595038022174961605235)*x + (17736001520262760210525112202216983111710992987692765260610476496543687661624629825514142699685985367758148231561670422345918718158*i+10779605620065390742478806616395825297556611210846686286184314109604670681102828699892797090646754944030058050285355409039989639721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21001810640598194766185160124024251753696093990318389782189576328855687815240995084332527516800769955101018811786113768256358816300*i+4870925338562073244601750992174024710762314596566754464925998643737440768215234833592448419484811085925877163595038022174961605235)*x + (17736001520262760210525112202216983111710992987692765260610476496543687661624629825514142699685985367758148231561670422345918718158*i+10779605620065390742478806616395825297556611210846686286184314109604670681102828699892797090646754944030058050285355409039989639721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19248610695151733056885487118768478197203118290960254029253592500730586053131527451387711516233285811784871679221107053455905067754*i+3243106224497714974885014407298442508653011626861419625758825961390217420725450309494194627377147481301797499274387204674840769012)*x + (16905601273514776485842080231822383146706928150291461699640442085061312905990681395116216902119582895716751709195686348214834099164*i+16571046097488954794126615050215448126601804596377056698310101073940870337602677845657466456803835253722014281991634124481806137446) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19248610695151733056885487118768478197203118290960254029253592500730586053131527451387711516233285811784871679221107053455905067754*i+3243106224497714974885014407298442508653011626861419625758825961390217420725450309494194627377147481301797499274387204674840769012)*x + (16905601273514776485842080231822383146706928150291461699640442085061312905990681395116216902119582895716751709195686348214834099164*i+16571046097488954794126615050215448126601804596377056698310101073940870337602677845657466456803835253722014281991634124481806137446) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7446376457294039869072516017892171125486678919271557526535220666063215803966062309735304970410878127901318687550493687033734111846*i+15071485346870367050195750208698663305250994630565016421852950540329154968447582929281267255935109186689621915943218264631501119017)*x + (5065357774157504146288562973487608586581219721508239421312341679742692593260193448378899318929607696398653196251925569909525130174*i+18529197186347140930644329448842814174203903681521917374560298207276329043672505589515483979165956354747658835870630883302287764430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7446376457294039869072516017892171125486678919271557526535220666063215803966062309735304970410878127901318687550493687033734111846*i+15071485346870367050195750208698663305250994630565016421852950540329154968447582929281267255935109186689621915943218264631501119017)*x + (5065357774157504146288562973487608586581219721508239421312341679742692593260193448378899318929607696398653196251925569909525130174*i+18529197186347140930644329448842814174203903681521917374560298207276329043672505589515483979165956354747658835870630883302287764430) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5636039141845790177599903306873655250764955854371103468486872314884333665871129635409047058885610272040365583206468359507263943956*i+21609831736460454713653353768071097975277012873115612955534708393445460606404267440931453302516879410527444426094028186422927914506)*x + (12058645949265882900245704081126209917696651366284102518252541534297322161804631882766268926069546102114293638183842332979838383433*i+22983283245504854592112621722300123663813173595499218985266034482576641534675388752275746843553816105286022176432408069937342910230) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5636039141845790177599903306873655250764955854371103468486872314884333665871129635409047058885610272040365583206468359507263943956*i+21609831736460454713653353768071097975277012873115612955534708393445460606404267440931453302516879410527444426094028186422927914506)*x + (12058645949265882900245704081126209917696651366284102518252541534297322161804631882766268926069546102114293638183842332979838383433*i+22983283245504854592112621722300123663813173595499218985266034482576641534675388752275746843553816105286022176432408069937342910230) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16804199173691167227707401431823279522412661759513032492788496041575985152485569673891252837172983267870386974081137756856417135262*i+8915476326717814650059642642852967682835623674406251350072261811711998057642082273369187034942279293335555820288216117245633638741)*x + (12504953489457385965924331682022929020912826237509684812441418919897596409049264812891882829785856106909162346657052227318011304378*i+4445856851323786045802708174569989124131714222098613443146151472380053168181526423053649093442556259234786851848954823110632220416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16804199173691167227707401431823279522412661759513032492788496041575985152485569673891252837172983267870386974081137756856417135262*i+8915476326717814650059642642852967682835623674406251350072261811711998057642082273369187034942279293335555820288216117245633638741)*x + (12504953489457385965924331682022929020912826237509684812441418919897596409049264812891882829785856106909162346657052227318011304378*i+4445856851323786045802708174569989124131714222098613443146151472380053168181526423053649093442556259234786851848954823110632220416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11933924140151654604077393800575209039797744128975411369639213462556164754674175413965925760983702473193092798362921063135099185715*i+4178883163267121431965385273872084547875106291086510666806637444408705536886207006655620132158535240549759120768005734834421378456)*x + (20046512762662702704033762630781851700350989819051220270126216647100145552134922631205277368285869321067761217158776530255181614032*i+6163681190231695170613955466248728172680122481895906376671858215464588745306598363207742950565118612809394183743176936160346343812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11933924140151654604077393800575209039797744128975411369639213462556164754674175413965925760983702473193092798362921063135099185715*i+4178883163267121431965385273872084547875106291086510666806637444408705536886207006655620132158535240549759120768005734834421378456)*x + (20046512762662702704033762630781851700350989819051220270126216647100145552134922631205277368285869321067761217158776530255181614032*i+6163681190231695170613955466248728172680122481895906376671858215464588745306598363207742950565118612809394183743176936160346343812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12598715326184873478167307014363619239425449656301631168645481128561179705927761314540841854131796252596265391111758529229728315224*i+6461300906138929147885163143245112350949998074553668951448243657444618460606610480194671588242142595123870905376561028661971871418)*x + (4500220321103823879306990464639471215541185292436210365794101093408780196671202566830795643898811717214701001016946335537822504504*i+23094695522225643802409487604970790378241716416361001112096777313516540165640245698664474012167772596355692526084050572701161964689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12598715326184873478167307014363619239425449656301631168645481128561179705927761314540841854131796252596265391111758529229728315224*i+6461300906138929147885163143245112350949998074553668951448243657444618460606610480194671588242142595123870905376561028661971871418)*x + (4500220321103823879306990464639471215541185292436210365794101093408780196671202566830795643898811717214701001016946335537822504504*i+23094695522225643802409487604970790378241716416361001112096777313516540165640245698664474012167772596355692526084050572701161964689) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17291744807765990201989354627446134621701291649514331282412614635747519035509639413866221130533952444389743758243460198386918009150*i+21796195498082716323555050138961537088452563733712409837754996113681469759124396457442939855747175367184476724262028913339925990160)*x + (19293959633088696542711263566622823499588923422039789324619551819029349235404928254391585843756145533123815439807426856447278218224*i+6298138707946665630152653559535046527194767742353413449568235046075211424627489736516295287576915080408926394199689079426325620084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17291744807765990201989354627446134621701291649514331282412614635747519035509639413866221130533952444389743758243460198386918009150*i+21796195498082716323555050138961537088452563733712409837754996113681469759124396457442939855747175367184476724262028913339925990160)*x + (19293959633088696542711263566622823499588923422039789324619551819029349235404928254391585843756145533123815439807426856447278218224*i+6298138707946665630152653559535046527194767742353413449568235046075211424627489736516295287576915080408926394199689079426325620084) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (942851805429537647051146275668194001865902077282021574299631744107303617687140404786811153175110887035352075034520556926508619929*i+22825948301758254118656843569130697617892147316873520482422287758261080234109372528425941501008123149413469167255538451755826894075)*x + (3315763398140539919529524095591056251912073434734885575890704955646759631610142917539393274406599878001098619468458415425409358065*i+18928363100441769406670091586678097974854602604946073695719941861452583730129462940794558157687139601218090432567395763520498836719) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (942851805429537647051146275668194001865902077282021574299631744107303617687140404786811153175110887035352075034520556926508619929*i+22825948301758254118656843569130697617892147316873520482422287758261080234109372528425941501008123149413469167255538451755826894075)*x + (3315763398140539919529524095591056251912073434734885575890704955646759631610142917539393274406599878001098619468458415425409358065*i+18928363100441769406670091586678097974854602604946073695719941861452583730129462940794558157687139601218090432567395763520498836719) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19148714417933792281205911039176136037623491091107124544664581520212632334113541913744160153634609581043949755131811909179808107599*i+23237933171866792063584429320195211489348601598843481342096945505223009109072165375731787141057037738178794461111273472843946683565)*x + (728553000162507684680934827135838019227610773888304873686330563750298511448653583547487768040124054283435361494915935485895295493*i+11915044488221576529651651738583072002043794459079688106607794693832603114746811737170000247058878051625970077452437214134049711351) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19148714417933792281205911039176136037623491091107124544664581520212632334113541913744160153634609581043949755131811909179808107599*i+23237933171866792063584429320195211489348601598843481342096945505223009109072165375731787141057037738178794461111273472843946683565)*x + (728553000162507684680934827135838019227610773888304873686330563750298511448653583547487768040124054283435361494915935485895295493*i+11915044488221576529651651738583072002043794459079688106607794693832603114746811737170000247058878051625970077452437214134049711351) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13808202754833854090463331795802249288306012016297159483596443188746329584114789857028354756021890722135414544776561758435907017621*i+5995062704981981519836369962761266921971655108069664853044339645823728432709342074744535460770793575235325597130258529871478702840)*x + (10472004013201052021067105092954536856485562691511401593268871363148614084743928951882262365945688105127278319195660050011206939530*i+9566017422611630356958199155619045076730336704970953682534708548806079013669020174589941126020047196217179266792685770808600866142) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13808202754833854090463331795802249288306012016297159483596443188746329584114789857028354756021890722135414544776561758435907017621*i+5995062704981981519836369962761266921971655108069664853044339645823728432709342074744535460770793575235325597130258529871478702840)*x + (10472004013201052021067105092954536856485562691511401593268871363148614084743928951882262365945688105127278319195660050011206939530*i+9566017422611630356958199155619045076730336704970953682534708548806079013669020174589941126020047196217179266792685770808600866142) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23456015705930453479204647639795263815534297388924669303836085736623948745589997191449212145919802254965881861600546431904543030051*i+7372654548013084393912967717032042814778246413369768276262988962711399365379054385125775371392790438218907199283691623537148630850)*x + (17596954858063067143582056462187583884477002521837102379471206507495541996156144516759817539149225228627823941897556878753499078883*i+3605477500132616598685562860389528964545725752485797585944157861371369140734850429170037852143991414137006731268420590291931442273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23456015705930453479204647639795263815534297388924669303836085736623948745589997191449212145919802254965881861600546431904543030051*i+7372654548013084393912967717032042814778246413369768276262988962711399365379054385125775371392790438218907199283691623537148630850)*x + (17596954858063067143582056462187583884477002521837102379471206507495541996156144516759817539149225228627823941897556878753499078883*i+3605477500132616598685562860389528964545725752485797585944157861371369140734850429170037852143991414137006731268420590291931442273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18396878985951272768186186302205991816161818094353964906424089896338074349633699457163795623610140830135391080171966179237372908442*i+25124488495442441629805717736630435359542316937752705432952724266181595234707920654356913740987887694932310532011513495359302039)*x + (1074813954498252088107617839536686623509251347039989516447586852117626146707428787619126763393102443718472826913311003761846759997*i+9015792008799857448309931931545658385206350271213551776465151869921102336536090222523219168748144866976575794943858150842580526799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18396878985951272768186186302205991816161818094353964906424089896338074349633699457163795623610140830135391080171966179237372908442*i+25124488495442441629805717736630435359542316937752705432952724266181595234707920654356913740987887694932310532011513495359302039)*x + (1074813954498252088107617839536686623509251347039989516447586852117626146707428787619126763393102443718472826913311003761846759997*i+9015792008799857448309931931545658385206350271213551776465151869921102336536090222523219168748144866976575794943858150842580526799) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20466341173507890329145582347924404086026276467723889502750446401613717105634857903798890457911577860858301281961359268170535560067*i+14428289362859840474643009335095681898425298014403935580588231049327307999625692671292637761597929779144459011770652658084386798713)*x + (584488788008379202236461485490453030622778926620294362968365938916667217156661909003075239037387963846773853668143774655695861399*i+5380783135179511755308879209497203733791968187130077155552254519875902218022987309305792151695087087525191582280845245033051307836) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20466341173507890329145582347924404086026276467723889502750446401613717105634857903798890457911577860858301281961359268170535560067*i+14428289362859840474643009335095681898425298014403935580588231049327307999625692671292637761597929779144459011770652658084386798713)*x + (584488788008379202236461485490453030622778926620294362968365938916667217156661909003075239037387963846773853668143774655695861399*i+5380783135179511755308879209497203733791968187130077155552254519875902218022987309305792151695087087525191582280845245033051307836) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15400264018786158323818509852665873333073911129923857074054779488591019422688339751006321826940776903030424125641726100421854201159*i+12414103096388713262915870057419638631063359420343835189344114668545805544597401560032378091427281119421603382202844277569034154883)*x + (22436270618485685470070788337115759694323745019430017792607864731399652271331035551090357153811317062333964644773678670894251694117*i+7565929299171134458633270505576347901258335489339897225426651558528412656550182050729202134341439662917604913477506921880751547268) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15400264018786158323818509852665873333073911129923857074054779488591019422688339751006321826940776903030424125641726100421854201159*i+12414103096388713262915870057419638631063359420343835189344114668545805544597401560032378091427281119421603382202844277569034154883)*x + (22436270618485685470070788337115759694323745019430017792607864731399652271331035551090357153811317062333964644773678670894251694117*i+7565929299171134458633270505576347901258335489339897225426651558528412656550182050729202134341439662917604913477506921880751547268) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23481091538454956243687356149410204503797158635772441642892815586889195800577075087002740179546394039310823882143795495477788522266*i+4897539970327993919612712306658666659505513614400238818148258697669847186067306227508884661072913076095641059878019666142879467919)*x + (2486266927198958678649177102683787741551537976963705429832547085146120741513328556064488822083991488956804553762966132983427581413*i+334312816699348568948308618830906828878288073095617955237255621240082989316209170503027181519639288979982401538053768411386768549) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23481091538454956243687356149410204503797158635772441642892815586889195800577075087002740179546394039310823882143795495477788522266*i+4897539970327993919612712306658666659505513614400238818148258697669847186067306227508884661072913076095641059878019666142879467919)*x + (2486266927198958678649177102683787741551537976963705429832547085146120741513328556064488822083991488956804553762966132983427581413*i+334312816699348568948308618830906828878288073095617955237255621240082989316209170503027181519639288979982401538053768411386768549) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23084748018458437857458263581188654248180471716477239394579071486444374882485547021273051593785842105040250140939114167162325851132*i+5218249175222297696630270457785454798798336015656840929433465492299251787555698159843237715948208901681221225076443696090369308014)*x + (19357984566382225844173673756467252356543878711140855681852337527966095705305240258934130510291162209619021632509870201934362637564*i+3308417569354639303386008638299139146603330149462042528177133430604156138987828511327454262204664990012801134001096122586692794008) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23084748018458437857458263581188654248180471716477239394579071486444374882485547021273051593785842105040250140939114167162325851132*i+5218249175222297696630270457785454798798336015656840929433465492299251787555698159843237715948208901681221225076443696090369308014)*x + (19357984566382225844173673756467252356543878711140855681852337527966095705305240258934130510291162209619021632509870201934362637564*i+3308417569354639303386008638299139146603330149462042528177133430604156138987828511327454262204664990012801134001096122586692794008) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9404429047448899916876640144637651644556707150961970686597632232789404146265640794511302268106241152652996657046213783062480948571*i+16540678488043178540840512618299419099174770106332928665528073692048716822455740807493610216416779165951083632856552669473760974236)*x + (12344466700032354605686363056644523813830494011460806651870695445782322563880918921690379250780311895557585877698546015093574552989*i+1337499532688291943328156088975722219179421217629143824502526102544809893972262741590279699755703163302332325972982488284972445895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9404429047448899916876640144637651644556707150961970686597632232789404146265640794511302268106241152652996657046213783062480948571*i+16540678488043178540840512618299419099174770106332928665528073692048716822455740807493610216416779165951083632856552669473760974236)*x + (12344466700032354605686363056644523813830494011460806651870695445782322563880918921690379250780311895557585877698546015093574552989*i+1337499532688291943328156088975722219179421217629143824502526102544809893972262741590279699755703163302332325972982488284972445895) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5359721984348656246433552336391870819442337122521294170172264114297764537888260156230030341651227571117623601609852801347211573275*i+24130034641702961699714514653467535982006513305665028285160704706010243124724939655857179702006672645998907216636759259143750618480)*x + (10236443613155152401745171340236917692644970347185243136553984306476369252875904757204202772390341316476104225289887310623813242520*i+3726561433208398114694406169730892771103336811234398305621273509996649020584497692126723242885365186882644948840995463999472025118) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5359721984348656246433552336391870819442337122521294170172264114297764537888260156230030341651227571117623601609852801347211573275*i+24130034641702961699714514653467535982006513305665028285160704706010243124724939655857179702006672645998907216636759259143750618480)*x + (10236443613155152401745171340236917692644970347185243136553984306476369252875904757204202772390341316476104225289887310623813242520*i+3726561433208398114694406169730892771103336811234398305621273509996649020584497692126723242885365186882644948840995463999472025118) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12294375761021736291314203996876748674606073109149971504763186578200693086060149465570221358931118007663405896046006244437609466358*i+10043051023491239316192452056902118052710559905431345101007555581344942856025971399497406312017470706192238243630176804553044326422)*x + (5954910200821233269666627390069924943693683501600004594467028959688347101221757801877216102678774603040022107547729790139272531864*i+14786632262734808546589603928239040399842921525696585996674017084040325683692793891204371741979323981854933905927330532934202626178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12294375761021736291314203996876748674606073109149971504763186578200693086060149465570221358931118007663405896046006244437609466358*i+10043051023491239316192452056902118052710559905431345101007555581344942856025971399497406312017470706192238243630176804553044326422)*x + (5954910200821233269666627390069924943693683501600004594467028959688347101221757801877216102678774603040022107547729790139272531864*i+14786632262734808546589603928239040399842921525696585996674017084040325683692793891204371741979323981854933905927330532934202626178) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12756080056634331521729772718375329735531970106202016889685291153237498900942079884014100205720518781409128422015952957796669335430*i+2389934106401727181110297149713570302566290412268557769842117525554240152764614021146255416233044345358174725039577890564730582069)*x + (19855936865688564950912365875226308813788691570119099636391078638171123327439390658717422459763497323185916990350402989277734859869*i+19291454314171541219917743363543707579012345624088555454610132237695390600390817143755864644338818326556972890862549795717278415850) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12756080056634331521729772718375329735531970106202016889685291153237498900942079884014100205720518781409128422015952957796669335430*i+2389934106401727181110297149713570302566290412268557769842117525554240152764614021146255416233044345358174725039577890564730582069)*x + (19855936865688564950912365875226308813788691570119099636391078638171123327439390658717422459763497323185916990350402989277734859869*i+19291454314171541219917743363543707579012345624088555454610132237695390600390817143755864644338818326556972890862549795717278415850) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10458259044403712420389809810742310893576613035389931411770400837395238591289159663249440308399250407212915249290848362426933136398*i+8723623415739709971853560107822584983733428818318545236034494891601163789780021560281657690166967905751702914578994043067889937920)*x + (5808281080495967758651834899430639852352451632658520329918807348807062672217973216322873413485611286850470746060591163515347483381*i+22027565851510187398162949010470485129968564422399666214328100714909641724197257609180023878850186413198051754044522196569540266692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10458259044403712420389809810742310893576613035389931411770400837395238591289159663249440308399250407212915249290848362426933136398*i+8723623415739709971853560107822584983733428818318545236034494891601163789780021560281657690166967905751702914578994043067889937920)*x + (5808281080495967758651834899430639852352451632658520329918807348807062672217973216322873413485611286850470746060591163515347483381*i+22027565851510187398162949010470485129968564422399666214328100714909641724197257609180023878850186413198051754044522196569540266692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12454721171402420433325008117578093879217920919352263987620713223252216462084924449194431393387687405057738751172484524985481265929*i+12983393162588837904686832616711311787682288351495542491241158495714788772207849538844404465482355787804568331232714508777281860710)*x + (16237251596920814963036016484032040413390900128427923020180421657779742149425149564325528808361188305985297379922298909036248283427*i+10372509149469828378403149807674148439211032966790704841577093932286444131325290204330680932013155977712514022691305845626262903752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12454721171402420433325008117578093879217920919352263987620713223252216462084924449194431393387687405057738751172484524985481265929*i+12983393162588837904686832616711311787682288351495542491241158495714788772207849538844404465482355787804568331232714508777281860710)*x + (16237251596920814963036016484032040413390900128427923020180421657779742149425149564325528808361188305985297379922298909036248283427*i+10372509149469828378403149807674148439211032966790704841577093932286444131325290204330680932013155977712514022691305845626262903752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1246073575954894042117472069115309109776334365583958074662623546554328525940632083067011309927457428998603285317774475495229089734*i+6725457372467831286614874709986826311114457675699979212912583672625435384326915026407469571680363550023551478067878988075682439722)*x + (18040273139770948786571907357317500012461035136708203404883222864662239355186238596320522701275621695983428323700970131070667212756*i+14431799365586334343560465705755518753567060288251900478761613196054667774520689317956546792208707730247716625059185640136065407923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1246073575954894042117472069115309109776334365583958074662623546554328525940632083067011309927457428998603285317774475495229089734*i+6725457372467831286614874709986826311114457675699979212912583672625435384326915026407469571680363550023551478067878988075682439722)*x + (18040273139770948786571907357317500012461035136708203404883222864662239355186238596320522701275621695983428323700970131070667212756*i+14431799365586334343560465705755518753567060288251900478761613196054667774520689317956546792208707730247716625059185640136065407923) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3848453565494238669371663621472658053376071306252922498075460105588873731618119794018955293976852917922566338472763505851608530503*i+3615266306881334236518052724623016403099259153931168935327663869918253524837492449604918731790384837310081429569527489002424927449)*x + (6088448622177167188550433008030654033779139954175909483484616905255877563629490409858218297299252635909654556492488774432195543414*i+23080207588631488183997034696938180689594456979221725018065687752582745637993016684190093512854542688556104903949514896839680108995) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3848453565494238669371663621472658053376071306252922498075460105588873731618119794018955293976852917922566338472763505851608530503*i+3615266306881334236518052724623016403099259153931168935327663869918253524837492449604918731790384837310081429569527489002424927449)*x + (6088448622177167188550433008030654033779139954175909483484616905255877563629490409858218297299252635909654556492488774432195543414*i+23080207588631488183997034696938180689594456979221725018065687752582745637993016684190093512854542688556104903949514896839680108995) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19061842053986180858304037775927314914911566012778486854580149967737795223303110510111176604749817569630896888217732971529557324098*i+6452267854304144282352960438677449934746432423159771284573001709640920157386884785972143261031832931869865783442883068705369642780)*x + (6259279809354912485707097930534150070417978101210943604664594680880596086868372682254869800954304854880038016126108266090290556839*i+11157871965626571769720541579740762184383635906690556529139108802977469044418065236205002740083334418280442734270185034972151948520) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19061842053986180858304037775927314914911566012778486854580149967737795223303110510111176604749817569630896888217732971529557324098*i+6452267854304144282352960438677449934746432423159771284573001709640920157386884785972143261031832931869865783442883068705369642780)*x + (6259279809354912485707097930534150070417978101210943604664594680880596086868372682254869800954304854880038016126108266090290556839*i+11157871965626571769720541579740762184383635906690556529139108802977469044418065236205002740083334418280442734270185034972151948520) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10375906765156800390901928617034162845912151162377151052134219521263142414811519055427157219075538234900691750661829521620417767299*i+3491541847549723483995748267652195870761823630184734229893953030328858063458190482477002470305998402468154074982545714303268231113)*x + (21786259383374341027187875096060008686231612379316221026381879155698388177360585682602692642725183782000032469540385209242918511901*i+23443987399966254559224112808441990981636813192039172919666734809548239168668966070907238657260201996479576701483668848690850406020) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10375906765156800390901928617034162845912151162377151052134219521263142414811519055427157219075538234900691750661829521620417767299*i+3491541847549723483995748267652195870761823630184734229893953030328858063458190482477002470305998402468154074982545714303268231113)*x + (21786259383374341027187875096060008686231612379316221026381879155698388177360585682602692642725183782000032469540385209242918511901*i+23443987399966254559224112808441990981636813192039172919666734809548239168668966070907238657260201996479576701483668848690850406020) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12852062418947309590833028135578759906954738268691154271045382580728386669453830455930692222462663545606222739669272287308007274115*i+446596184664948908318050031595341061584868415327661611591533794389755983996766040765986895724775083567126242785641214753717057715)*x + (1137369156534673453443537455968347928073701943625798611366701286037534760482966179653006969039820023908922005074639955305218664510*i+13519891286758954310099323149292052802966250813969033501917858515844778552605339461823752522764500843280365370488837239116938937427) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12852062418947309590833028135578759906954738268691154271045382580728386669453830455930692222462663545606222739669272287308007274115*i+446596184664948908318050031595341061584868415327661611591533794389755983996766040765986895724775083567126242785641214753717057715)*x + (1137369156534673453443537455968347928073701943625798611366701286037534760482966179653006969039820023908922005074639955305218664510*i+13519891286758954310099323149292052802966250813969033501917858515844778552605339461823752522764500843280365370488837239116938937427) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15976906070446168102419558027980897847909686535464080979333664392204723680787979920924941005638363626463823979016609218115879732933*i+8183737239170242964520574100410232959149873242706013965773222020987004195478523175258139429624633619674241019900206057541078328142)*x + (5660414397674892946685886541439993153348615075620136729664465972575137407593614690066842592746560016141399031171887359949094787540*i+12204174575240244474415295891146456949858344417390429871146857139726488599089990719215610919258691483631863149975351439338011920601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15976906070446168102419558027980897847909686535464080979333664392204723680787979920924941005638363626463823979016609218115879732933*i+8183737239170242964520574100410232959149873242706013965773222020987004195478523175258139429624633619674241019900206057541078328142)*x + (5660414397674892946685886541439993153348615075620136729664465972575137407593614690066842592746560016141399031171887359949094787540*i+12204174575240244474415295891146456949858344417390429871146857139726488599089990719215610919258691483631863149975351439338011920601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2372659087716855768881345512821379495328599936467676806525208411509585238683801448702849180233677348122906219109588125504811486704*i+5314070225923090401995552707760082362978265038807215650689521450001437536112484793943709183701841759662711360383684903121437911572)*x + (9523676137556197631320491138643844720231543483671213173719496321521291494493843923531564488468411573262637596543443719553440283500*i+3479490745851958850667631185121059230856314498333806858989141865775871624317012133842928230577848600652335646996375299975988424428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2372659087716855768881345512821379495328599936467676806525208411509585238683801448702849180233677348122906219109588125504811486704*i+5314070225923090401995552707760082362978265038807215650689521450001437536112484793943709183701841759662711360383684903121437911572)*x + (9523676137556197631320491138643844720231543483671213173719496321521291494493843923531564488468411573262637596543443719553440283500*i+3479490745851958850667631185121059230856314498333806858989141865775871624317012133842928230577848600652335646996375299975988424428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3175829193480878260744309015486082481544068163414504610797295545583514195262373101575653051954008137249183272645994370226304005390*i+13609027723625256354402477306105746638377929987182898827411897577830255300791299915689430467931228447355728798036801819629936798328)*x + (15236510544684430444475880276369110640111946368118020548627814827014022111384158226340021466506843984252870829219340675815693046831*i+12105937925341782840358321759281483198167821616302100492605822495857164666287491430282581486389033684617341892079925772673397819150) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3175829193480878260744309015486082481544068163414504610797295545583514195262373101575653051954008137249183272645994370226304005390*i+13609027723625256354402477306105746638377929987182898827411897577830255300791299915689430467931228447355728798036801819629936798328)*x + (15236510544684430444475880276369110640111946368118020548627814827014022111384158226340021466506843984252870829219340675815693046831*i+12105937925341782840358321759281483198167821616302100492605822495857164666287491430282581486389033684617341892079925772673397819150) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2395644372895542507494379186954373062099458154710756743681897232621380625381321065838490059688878567842419702840620464376785602368*i+14921838102058057226161617889180224241514988230491365481157343664191326953710092259997690059505824592902760377153778401285945484272)*x + (4877269381362247266516114700705847343144013990916266587918997015017433357205117694782924292863598213283929058066179961773925846872*i+1693811300466698669260358118561441042875688783970815200904783312992229354393901252596481285313880146321795948781306763942987590374) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2395644372895542507494379186954373062099458154710756743681897232621380625381321065838490059688878567842419702840620464376785602368*i+14921838102058057226161617889180224241514988230491365481157343664191326953710092259997690059505824592902760377153778401285945484272)*x + (4877269381362247266516114700705847343144013990916266587918997015017433357205117694782924292863598213283929058066179961773925846872*i+1693811300466698669260358118561441042875688783970815200904783312992229354393901252596481285313880146321795948781306763942987590374) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8754426709616882910205825170481941221884535899308849402537162457809112910670242068539570747567196511820249826219384039721094241275*i+354069256119561254291140739651164997145304440922493865086568232568319869660744782111466964748304108857005509931448712470476678242)*x + (1772397707511589871761236359614288110473141788936655887309229349572065461473549793904661008690787150456151855494138770588502250290*i+9467127640511573879416127112224638710110406562962504119788650691016075535760649798733823367330877572204427141216094473027385340327) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8754426709616882910205825170481941221884535899308849402537162457809112910670242068539570747567196511820249826219384039721094241275*i+354069256119561254291140739651164997145304440922493865086568232568319869660744782111466964748304108857005509931448712470476678242)*x + (1772397707511589871761236359614288110473141788936655887309229349572065461473549793904661008690787150456151855494138770588502250290*i+9467127640511573879416127112224638710110406562962504119788650691016075535760649798733823367330877572204427141216094473027385340327) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21839654568666835437324177850894271900839566202109305085755867269588687967336895333360710490684878617329458059800190775631125252246*i+22347936816955889990777500242099518447094989145544887739451751967407107628003853986902487960261732622571057080196390969941511989129)*x + (17952664177596644746095408703724577184059252944691365432636613223218307609956244976721394228337558076081881046077635732740574540029*i+23974292003395002693281955797962446244239805702612714682581777006991677001094582779519505865648822634380732539453012814657997969992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21839654568666835437324177850894271900839566202109305085755867269588687967336895333360710490684878617329458059800190775631125252246*i+22347936816955889990777500242099518447094989145544887739451751967407107628003853986902487960261732622571057080196390969941511989129)*x + (17952664177596644746095408703724577184059252944691365432636613223218307609956244976721394228337558076081881046077635732740574540029*i+23974292003395002693281955797962446244239805702612714682581777006991677001094582779519505865648822634380732539453012814657997969992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2204284123702615213306299458189744344892910388859726457502768486746570056962749642268464428651457532544041286323276758189979623712*i+7010531478924616513056900281771840536336734636871741306945725081996274623629347437853146406764735195195596645329144040259999346446)*x + (19817344418851279803100535192186624636281557744812225133169373580508498858465504053689690226008028009336022727461345859143951847403*i+504446198218053666889128614730161959380484187442866604556700914680387025573814659324351799425585282755361243674416985551191114579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2204284123702615213306299458189744344892910388859726457502768486746570056962749642268464428651457532544041286323276758189979623712*i+7010531478924616513056900281771840536336734636871741306945725081996274623629347437853146406764735195195596645329144040259999346446)*x + (19817344418851279803100535192186624636281557744812225133169373580508498858465504053689690226008028009336022727461345859143951847403*i+504446198218053666889128614730161959380484187442866604556700914680387025573814659324351799425585282755361243674416985551191114579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16582158545586136190467584360393485345655510360541440691323229035432732349613091375212863739801045695221539803894421970669412969526*i+1560339002393260538801000013583878374122680227902880240823845254115257455415071119594011369246181395792524438782680245595851134989)*x + (12438928996017407760877745355256875418060002568753418487163407283570832767677974902389604545483106414402313284650325138035640285579*i+23883742227139628575246024618272099014820106224230415894382080261273763975469225838803985098494383033017732997762654964992407075852) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16582158545586136190467584360393485345655510360541440691323229035432732349613091375212863739801045695221539803894421970669412969526*i+1560339002393260538801000013583878374122680227902880240823845254115257455415071119594011369246181395792524438782680245595851134989)*x + (12438928996017407760877745355256875418060002568753418487163407283570832767677974902389604545483106414402313284650325138035640285579*i+23883742227139628575246024618272099014820106224230415894382080261273763975469225838803985098494383033017732997762654964992407075852) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13492972162671857047894935219819084184928372222363408088530015699881278164122644695052859314262948753553957148677422244966391246606*i+12226126808330661169086753800337234966509431263163342154417753036895782816063126363648685112663957381491664733100021276240710359673)*x + (21828610658751136127895829671937091469482246677982778803580083739537880710226210878920119734752876353856933126953824991632652152696*i+4116391974809444853068058126672329756862322261647560963197036820927197132177379595376368101885518734639705716884804171344672559254) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13492972162671857047894935219819084184928372222363408088530015699881278164122644695052859314262948753553957148677422244966391246606*i+12226126808330661169086753800337234966509431263163342154417753036895782816063126363648685112663957381491664733100021276240710359673)*x + (21828610658751136127895829671937091469482246677982778803580083739537880710226210878920119734752876353856933126953824991632652152696*i+4116391974809444853068058126672329756862322261647560963197036820927197132177379595376368101885518734639705716884804171344672559254) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20050092338583366680094000546107573215795763829184555234593801449454719950768759740416700178720380819514957070224672613763369255099*i+14685880235791441321953891808214630601178686808099083430590062046146865949233624199562348513464327549994550975493496671987600519340)*x + (12950997326273470349373425550611160856722760586513461693071105467463969857293767188720372692154992853774212718625514426695246902415*i+14999987183467305143153479507411419220275487712180308677236935146966785320399603815172780241008562584685841741286945813722024002304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20050092338583366680094000546107573215795763829184555234593801449454719950768759740416700178720380819514957070224672613763369255099*i+14685880235791441321953891808214630601178686808099083430590062046146865949233624199562348513464327549994550975493496671987600519340)*x + (12950997326273470349373425550611160856722760586513461693071105467463969857293767188720372692154992853774212718625514426695246902415*i+14999987183467305143153479507411419220275487712180308677236935146966785320399603815172780241008562584685841741286945813722024002304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14398376313353963897379992454322820348519568024461712325986617475853961000610257458318652288897184698727851895570579350355555110896*i+12150032050713343663225607920429654739730893847245042081906499776380244032467430417844616669394288259582722911966393467095574499965)*x + (6189594780720908652742500196920520554349160834694700784820855325526445600484832962023249361839925838910487561699570843139166767424*i+5967262044255970176956627555822164659099023456534548955355904314846093265722940059188754430903764025778503944460849644319918814595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14398376313353963897379992454322820348519568024461712325986617475853961000610257458318652288897184698727851895570579350355555110896*i+12150032050713343663225607920429654739730893847245042081906499776380244032467430417844616669394288259582722911966393467095574499965)*x + (6189594780720908652742500196920520554349160834694700784820855325526445600484832962023249361839925838910487561699570843139166767424*i+5967262044255970176956627555822164659099023456534548955355904314846093265722940059188754430903764025778503944460849644319918814595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13474501426196196136819782573817193834026200197898534202786869476818326290871696882097896897028171483098597780025134070794100048948*i+21982508014586872841181562565766054291760154947180163118743150101839824114721733854460675206037030416611546767945632927488362949118)*x + (2954136215409512374174604386952018312414245809269385269190996691331280903874395577444279710595785275157676721625024473056262366840*i+23636800340734593824448575760633438712916238635431045599395196168520942703379403110447755968013145467675386425637602626853815339070) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13474501426196196136819782573817193834026200197898534202786869476818326290871696882097896897028171483098597780025134070794100048948*i+21982508014586872841181562565766054291760154947180163118743150101839824114721733854460675206037030416611546767945632927488362949118)*x + (2954136215409512374174604386952018312414245809269385269190996691331280903874395577444279710595785275157676721625024473056262366840*i+23636800340734593824448575760633438712916238635431045599395196168520942703379403110447755968013145467675386425637602626853815339070) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17561243387179677033620700355745601223492945697579890822240832383467926967736512056137704581786775372426650138164464990218097139807*i+3365772436043894718182062202991561210404233197828587548022686691074254196597803150060661480872295058426064043051190208680110863621)*x + (23797049680739389410874474107307861583782105889190977139680789373816384833552560082045675418174808324582876788305338220732581311006*i+175986862672961332799652585376222844471828607073028656054869379815002560893505142455713625620587161707060466593309097411062531138) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17561243387179677033620700355745601223492945697579890822240832383467926967736512056137704581786775372426650138164464990218097139807*i+3365772436043894718182062202991561210404233197828587548022686691074254196597803150060661480872295058426064043051190208680110863621)*x + (23797049680739389410874474107307861583782105889190977139680789373816384833552560082045675418174808324582876788305338220732581311006*i+175986862672961332799652585376222844471828607073028656054869379815002560893505142455713625620587161707060466593309097411062531138) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11132530107107234508379706080683287734310396314260002426301789080661356474176319698229792906334111066529690601948787320593082297264*i+24435611986561084407222660502696327809069731243552362929552217296671308797991899026477753076464462450291580543455580961158271540592)*x + (14187624868710855357908836421840058822432159043229906258450071556482331497548993407596186565577219374484299819587974425920785781546*i+4576093254871244741561594661490077450498208031680200063678391144111064430753056053448031859716152461206799034147496945437426229281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11132530107107234508379706080683287734310396314260002426301789080661356474176319698229792906334111066529690601948787320593082297264*i+24435611986561084407222660502696327809069731243552362929552217296671308797991899026477753076464462450291580543455580961158271540592)*x + (14187624868710855357908836421840058822432159043229906258450071556482331497548993407596186565577219374484299819587974425920785781546*i+4576093254871244741561594661490077450498208031680200063678391144111064430753056053448031859716152461206799034147496945437426229281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16177745288505030040906726201117720677621990211627681743802961653653224512275268013405285979425917841376844381328686392731454248482*i+12709107825067632215421085567872425398965555745456360639961762693606735511843168524605466995128962303607146861157004857303079019295)*x + (15366610986430311281473504742739532803915868132915811875975936607690569659348343158031571291602739402922416105295643988002174197508*i+15856719425814904993121459290181496117524327959934256199929255556963541103106311551700530296439696124130065833677847104747528787979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16177745288505030040906726201117720677621990211627681743802961653653224512275268013405285979425917841376844381328686392731454248482*i+12709107825067632215421085567872425398965555745456360639961762693606735511843168524605466995128962303607146861157004857303079019295)*x + (15366610986430311281473504742739532803915868132915811875975936607690569659348343158031571291602739402922416105295643988002174197508*i+15856719425814904993121459290181496117524327959934256199929255556963541103106311551700530296439696124130065833677847104747528787979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (744728867038531909046812231330389854010933806440403168304654075835624181331613964072580620522268314802954911121002008165990428990*i+351779054138983429190218025639648484309460657368205852160331806646753406900975728695015583535567785216861874068958700023877662262)*x + (5964892043076110925968627339841940621285146491431223564529981055338100739425855094872855720151213231559503986527301606146294040905*i+13609232835488536799890754064239303374163207736393973576622676272124730195637822828145644238869629687259643021930933970659716777058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (744728867038531909046812231330389854010933806440403168304654075835624181331613964072580620522268314802954911121002008165990428990*i+351779054138983429190218025639648484309460657368205852160331806646753406900975728695015583535567785216861874068958700023877662262)*x + (5964892043076110925968627339841940621285146491431223564529981055338100739425855094872855720151213231559503986527301606146294040905*i+13609232835488536799890754064239303374163207736393973576622676272124730195637822828145644238869629687259643021930933970659716777058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24419053869470025053479968639960607328076340283431032678166730371025693709171525676554742891550186431317576882807905998852934740901*i+10451203054423395522537496673906848712305018237222946263282399237802095761361386631179435416204331270148969379400824815036953273605)*x + (11785108397593834528608940407983730748270757458825597910351074741759470629019592785360479513630291544903699690772551175733385779434*i+2830480544579965393386435092726278739636253991074554220454468643416886619660032757901268729126754922713618222736785916024689403551) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24419053869470025053479968639960607328076340283431032678166730371025693709171525676554742891550186431317576882807905998852934740901*i+10451203054423395522537496673906848712305018237222946263282399237802095761361386631179435416204331270148969379400824815036953273605)*x + (11785108397593834528608940407983730748270757458825597910351074741759470629019592785360479513630291544903699690772551175733385779434*i+2830480544579965393386435092726278739636253991074554220454468643416886619660032757901268729126754922713618222736785916024689403551) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10118435465484319386730936994504857172578634719299107003003419629207719261036975555309544133204880637389595451938648212090586376817*i+4992813425240277481570837587441774218601276659671456616190772946993934971522896724067500377297545311081629605318941495620497257112)*x + (4911180822623030800223956325894454071637275144689069321423635507067538058545514231379442179141854709438113814816705736865979917999*i+6385492699727864150897047763367197040129376357303285674244191642503279445013655455299110322873614895003332153849957393176774516356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10118435465484319386730936994504857172578634719299107003003419629207719261036975555309544133204880637389595451938648212090586376817*i+4992813425240277481570837587441774218601276659671456616190772946993934971522896724067500377297545311081629605318941495620497257112)*x + (4911180822623030800223956325894454071637275144689069321423635507067538058545514231379442179141854709438113814816705736865979917999*i+6385492699727864150897047763367197040129376357303285674244191642503279445013655455299110322873614895003332153849957393176774516356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11426065601497228575363263755430075883146923405147970969715834015632230337082154791029867673848082610228588278033262393694188031207*i+156526936098907367149504868588207729148521203857197448711000033760120738866768547454732442622135476506143701373182473876554809600)*x + (15499470985718495442032151785507313773325560325572582921436511361680263921760469730652492920767396112061953136918957887705202908030*i+19908014814339182789580449537969724480234620521486793353003113433370826317141174469396774927746752466606696182826106126342533071599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11426065601497228575363263755430075883146923405147970969715834015632230337082154791029867673848082610228588278033262393694188031207*i+156526936098907367149504868588207729148521203857197448711000033760120738866768547454732442622135476506143701373182473876554809600)*x + (15499470985718495442032151785507313773325560325572582921436511361680263921760469730652492920767396112061953136918957887705202908030*i+19908014814339182789580449537969724480234620521486793353003113433370826317141174469396774927746752466606696182826106126342533071599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9425826734901743881188000676257933833363000976519187794600284220030902628935416036694196830581445928459576349328367095430134202240*i+11700104329266287671385838823121202236254376820045873078685176518730567594202338383332049570166435048062594327415446795819614321997)*x + (23615458557821665864694916211094582504006195168843607114270624823162609286648448083562261516749377240983859767475700012363318501352*i+5107798275596316557866451441295497201214588151135003336304863156647757198485162180546303048217712869174745142697271898207215323200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9425826734901743881188000676257933833363000976519187794600284220030902628935416036694196830581445928459576349328367095430134202240*i+11700104329266287671385838823121202236254376820045873078685176518730567594202338383332049570166435048062594327415446795819614321997)*x + (23615458557821665864694916211094582504006195168843607114270624823162609286648448083562261516749377240983859767475700012363318501352*i+5107798275596316557866451441295497201214588151135003336304863156647757198485162180546303048217712869174745142697271898207215323200) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23598175868355289669724887508223373022078881258096658244586275746434116485595374857412810853218538725771792035443842096775075182852*i+16717589108562018617972867482095222022169030158263328603084453432972412765700879356609138224549042518864527986763636479855009050201)*x + (17978392874389813487535953961019467877848744505326834081318050233027254695341628645460537247652942002698434341925977229132418996993*i+18442323361605119973217853347416412597035839492227147482625970631528609382803731225632467405374080156400132575457022662850032833816) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23598175868355289669724887508223373022078881258096658244586275746434116485595374857412810853218538725771792035443842096775075182852*i+16717589108562018617972867482095222022169030158263328603084453432972412765700879356609138224549042518864527986763636479855009050201)*x + (17978392874389813487535953961019467877848744505326834081318050233027254695341628645460537247652942002698434341925977229132418996993*i+18442323361605119973217853347416412597035839492227147482625970631528609382803731225632467405374080156400132575457022662850032833816) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1964445788125662091876999302623964772443864494852305540327094121249342655239256035318164436897843967110861624035190711879310192605*i+14530494476524451809647954596191696352573862117956889051898953019713075926520495024988175243491924730603576424411856752346911118419)*x + (2237909953342929988962274299184634605304673465178268579434659166523652717819214128356139081719999265453691349144085726352563340256*i+5618435810738702314975081273453626395924478799211963649456977845874589063797080834455786115932605315848378637670003872211961092093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1964445788125662091876999302623964772443864494852305540327094121249342655239256035318164436897843967110861624035190711879310192605*i+14530494476524451809647954596191696352573862117956889051898953019713075926520495024988175243491924730603576424411856752346911118419)*x + (2237909953342929988962274299184634605304673465178268579434659166523652717819214128356139081719999265453691349144085726352563340256*i+5618435810738702314975081273453626395924478799211963649456977845874589063797080834455786115932605315848378637670003872211961092093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18781867704528000145168262509162803088198092675916847276432322769723513522378862327584221487301762750843018211154015091867810618747*i+22322494004864394463927140039352180202291066982206734556915605588022056818580176938718034459331377341263513055182169276071247943320)*x + (9330005134107613450190179402500491927590866401880591290686532418633100300166169861903349446721980642599074031156971579281712436190*i+2647011963610003958955597540693092941401879631076562668601703165881294657567730537039921436085246627628578985212588021878144624755) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18781867704528000145168262509162803088198092675916847276432322769723513522378862327584221487301762750843018211154015091867810618747*i+22322494004864394463927140039352180202291066982206734556915605588022056818580176938718034459331377341263513055182169276071247943320)*x + (9330005134107613450190179402500491927590866401880591290686532418633100300166169861903349446721980642599074031156971579281712436190*i+2647011963610003958955597540693092941401879631076562668601703165881294657567730537039921436085246627628578985212588021878144624755) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15267572469783090339533576015402440825212193826098486566739839855179947706062168784481506335036078504555629162410757953335172849300*i+2702228198579122589391040498453413390957960555427829980737338925517005098673299130837656038170164226848170368696867407774213827312)*x + (8574527553744503162463883112536321479855277969776270188250754921204845546795891175006880711279090376425252142956667383785782093578*i+12515822039410211453678785185547828470485756918471218220470426588304543951921458308499091859753819827030929692605212229426361714899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15267572469783090339533576015402440825212193826098486566739839855179947706062168784481506335036078504555629162410757953335172849300*i+2702228198579122589391040498453413390957960555427829980737338925517005098673299130837656038170164226848170368696867407774213827312)*x + (8574527553744503162463883112536321479855277969776270188250754921204845546795891175006880711279090376425252142956667383785782093578*i+12515822039410211453678785185547828470485756918471218220470426588304543951921458308499091859753819827030929692605212229426361714899) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24369062447700094018030121425811610288736393446748403735243244134960836178881330979750526663657255171537336823271902505984472733842*i+8492597232694075840870056217910093696090729229981109400993152770286599763757848517686683259436172874311179888368390105343215772547)*x + (14376790593434515965445046006207671964772816420474566056228288997982187832313394191188912074287099863562033089676111773046056919446*i+23074582497694060946043665363552020177412474027050634513459180548225312595900276615089668664389878770748893780251639963264619591511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24369062447700094018030121425811610288736393446748403735243244134960836178881330979750526663657255171537336823271902505984472733842*i+8492597232694075840870056217910093696090729229981109400993152770286599763757848517686683259436172874311179888368390105343215772547)*x + (14376790593434515965445046006207671964772816420474566056228288997982187832313394191188912074287099863562033089676111773046056919446*i+23074582497694060946043665363552020177412474027050634513459180548225312595900276615089668664389878770748893780251639963264619591511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3127081369302953273055198704596213937041609464581875761213478027223753472053451767109873006544460308271329468568489758541340318529*i+10096224864139740046358560294296339722432332465621007488579596557443030024926873466437667891237281618986315283885116596711729333347)*x + (23271939448204313687796369925208554900246438313566049286861585379751195174272160035094524205722448882391003583903816804359858482992*i+23174162322588907505574352228575880500271678553142644929929467959094840717829337057891948385828018664868701427290283535398139679254) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3127081369302953273055198704596213937041609464581875761213478027223753472053451767109873006544460308271329468568489758541340318529*i+10096224864139740046358560294296339722432332465621007488579596557443030024926873466437667891237281618986315283885116596711729333347)*x + (23271939448204313687796369925208554900246438313566049286861585379751195174272160035094524205722448882391003583903816804359858482992*i+23174162322588907505574352228575880500271678553142644929929467959094840717829337057891948385828018664868701427290283535398139679254) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23856116335524143134199193851552280698179981250853499616791238705177975193232892773314262882379514930268609628166875027034107655613*i+2713612267357759875834329073950640782558429749933279508380607624133961101887824163419840931373716378359913096172897738915536127106)*x + (5107074745548735325003976685633789484030147125711056219437880960548838416761609417749825125061381440326193861411480465067830850331*i+9497909335876548605848586090827720250353945559358883332748388497210603774397983963378124233605611189471700916202300328702074449798) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23856116335524143134199193851552280698179981250853499616791238705177975193232892773314262882379514930268609628166875027034107655613*i+2713612267357759875834329073950640782558429749933279508380607624133961101887824163419840931373716378359913096172897738915536127106)*x + (5107074745548735325003976685633789484030147125711056219437880960548838416761609417749825125061381440326193861411480465067830850331*i+9497909335876548605848586090827720250353945559358883332748388497210603774397983963378124233605611189471700916202300328702074449798) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6183924743804813421335394214606265944620350034681723914071971058213210811827354461953767448127844448527228089238612678888485859996*i+15048857075904557252738386126234193154319581741621290876860130594937047377615314870983209343949904667150553216845502369124978872962)*x + (22096327125580260119726580353078072033414362867209430523644896238251887553125358467904906776740455345194109888183981393637499846259*i+13858817023218581957816526729134036600978609724558459482924206455720158067012260678847625912461527357379472285959039661786275339992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6183924743804813421335394214606265944620350034681723914071971058213210811827354461953767448127844448527228089238612678888485859996*i+15048857075904557252738386126234193154319581741621290876860130594937047377615314870983209343949904667150553216845502369124978872962)*x + (22096327125580260119726580353078072033414362867209430523644896238251887553125358467904906776740455345194109888183981393637499846259*i+13858817023218581957816526729134036600978609724558459482924206455720158067012260678847625912461527357379472285959039661786275339992) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15457339069311667431791033663161899398014728868691349733846984657676938191683493576090330047997894138987425588042249929712136605545*i+14490904310395348481763567310952884241898898467048949657008540569819492880532958323241533842550417511008440112606645005908492066175)*x + (4156213445152337769415324534657871729311866821517040934207599675965241600946545023043568120263985940944664130971907248134465576340*i+2064687557324912308906380613886039292338975157001071160269501336990308032233739667530559792500586143000271481580029582382642393966) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15457339069311667431791033663161899398014728868691349733846984657676938191683493576090330047997894138987425588042249929712136605545*i+14490904310395348481763567310952884241898898467048949657008540569819492880532958323241533842550417511008440112606645005908492066175)*x + (4156213445152337769415324534657871729311866821517040934207599675965241600946545023043568120263985940944664130971907248134465576340*i+2064687557324912308906380613886039292338975157001071160269501336990308032233739667530559792500586143000271481580029582382642393966) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20032511246975330867770950655509441253922071710672706016382485087321324520560549042947538782296186646007454572908318112632349019838*i+20701624406668635683564329135173842903040139032129982639469517183667957423550761910820973614443956725513044845327818996371015880518)*x + (23905357167718139864949953753957396524587567902268958384238935199823970723484372546350669678723642688459709563564083125195950788194*i+1904720843493978105349594691268415931065657886349282712449146834584951639222367366810165016565466455160146970926959326219056548123) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20032511246975330867770950655509441253922071710672706016382485087321324520560549042947538782296186646007454572908318112632349019838*i+20701624406668635683564329135173842903040139032129982639469517183667957423550761910820973614443956725513044845327818996371015880518)*x + (23905357167718139864949953753957396524587567902268958384238935199823970723484372546350669678723642688459709563564083125195950788194*i+1904720843493978105349594691268415931065657886349282712449146834584951639222367366810165016565466455160146970926959326219056548123) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3345205678810583355904144045288959793494554789457389524843092592628454485889232744106461147909262889640729304686359682527719049994*i+22230284063435407052207764437723714433667622267597040895468975001004973885305940790693471523250491201378622551877954801200521887428)*x + (20464250694407362358413514719806387396519160975792866506057035850250021834204071570640401257130889253316267828492056435298222737771*i+13639632578775577624868850059122561088717175862506106986503031448215119740118159350286333319922841492812327950802258430998055834175) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3345205678810583355904144045288959793494554789457389524843092592628454485889232744106461147909262889640729304686359682527719049994*i+22230284063435407052207764437723714433667622267597040895468975001004973885305940790693471523250491201378622551877954801200521887428)*x + (20464250694407362358413514719806387396519160975792866506057035850250021834204071570640401257130889253316267828492056435298222737771*i+13639632578775577624868850059122561088717175862506106986503031448215119740118159350286333319922841492812327950802258430998055834175) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5679229282288250334696897902719666214636737227945266310621024689650380998999430930215850762995462620168735355590056994278723994178*i+4252878265093816097404670040084867849994868397093156748172967445779111932507848668318351131013584964824561930229070172728795712959)*x + (16976831307189897081592093003650460511502737817481513600267506739207101774085154125553942977034763172431660758979233109115485198785*i+3277289896111965744340150976108860587434202311272193588750810601555067756264223338597592403884166115509543691236301521835849033367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5679229282288250334696897902719666214636737227945266310621024689650380998999430930215850762995462620168735355590056994278723994178*i+4252878265093816097404670040084867849994868397093156748172967445779111932507848668318351131013584964824561930229070172728795712959)*x + (16976831307189897081592093003650460511502737817481513600267506739207101774085154125553942977034763172431660758979233109115485198785*i+3277289896111965744340150976108860587434202311272193588750810601555067756264223338597592403884166115509543691236301521835849033367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22222833550222364671230648228398874598996917671050352647644397360538415575050774868568965797818802937994971740761983352422791254391*i+13143546109229194830894421386566308422313294977279093239249924131166460674737222331406895246042373777253794898318437464078525181782)*x + (10879091124897311104174391171892644705444761256881748147232974806889792215711520841648305953924609602093200862800225571457286481115*i+11676087580876678972043551189595809471168358397207857190796413271778863256204445942078292871335243653607427885543331081728498160401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22222833550222364671230648228398874598996917671050352647644397360538415575050774868568965797818802937994971740761983352422791254391*i+13143546109229194830894421386566308422313294977279093239249924131166460674737222331406895246042373777253794898318437464078525181782)*x + (10879091124897311104174391171892644705444761256881748147232974806889792215711520841648305953924609602093200862800225571457286481115*i+11676087580876678972043551189595809471168358397207857190796413271778863256204445942078292871335243653607427885543331081728498160401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11651143688418652690353807816488862669957556585549844149290070995286810606184687430597808239976284762052008773483487444974135591010*i+9817180214987497528971226715805316998328501071139242109610987995864820202152099528163110922503486001940753713264168891975996632756)*x + (23920228844210261517091370774900982650322692333233848278555169664566179164899070848319309926618166294755819523108829087926672153950*i+19140084121419675032488461490918548189325036567930652864423120871578399781791517456902029706103713215176020384762772865137482942318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11651143688418652690353807816488862669957556585549844149290070995286810606184687430597808239976284762052008773483487444974135591010*i+9817180214987497528971226715805316998328501071139242109610987995864820202152099528163110922503486001940753713264168891975996632756)*x + (23920228844210261517091370774900982650322692333233848278555169664566179164899070848319309926618166294755819523108829087926672153950*i+19140084121419675032488461490918548189325036567930652864423120871578399781791517456902029706103713215176020384762772865137482942318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19829640368104381333374595336763926387290329748276476034940321232570340290819974115644197977062218585289025418559927871719066515523*i+16056047669411627548939971269831028138565182804867154433096988478899490037221222064554099096508505781098583852802182734792675705413)*x + (12366591675886171268641676739814549218321547242202512191386748260571180255382928898422963661856176932421989736438201092498499924828*i+19370758573467277667125495020993132880847651442611637658138127067973143811653442261262744606261000513159069605236807474734665073558) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19829640368104381333374595336763926387290329748276476034940321232570340290819974115644197977062218585289025418559927871719066515523*i+16056047669411627548939971269831028138565182804867154433096988478899490037221222064554099096508505781098583852802182734792675705413)*x + (12366591675886171268641676739814549218321547242202512191386748260571180255382928898422963661856176932421989736438201092498499924828*i+19370758573467277667125495020993132880847651442611637658138127067973143811653442261262744606261000513159069605236807474734665073558) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6820965173281373501585133030193957464219008127517044346209222100842653311858574927809856904174127355903732108855323303263629955240*i+11312348007908664045857374195531455838131751614716888749505663512059349288117678850901492497714481089433829318724612396387605364263)*x + (10641702646315668182156598858348212275741278293510298443200077890467615961152412824376021766423096443435738966801226956816281958902*i+16666057199153280697227172683554553081387447950785107538306350414980801833836536377377477411520417973429765278622457408133286840116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6820965173281373501585133030193957464219008127517044346209222100842653311858574927809856904174127355903732108855323303263629955240*i+11312348007908664045857374195531455838131751614716888749505663512059349288117678850901492497714481089433829318724612396387605364263)*x + (10641702646315668182156598858348212275741278293510298443200077890467615961152412824376021766423096443435738966801226956816281958902*i+16666057199153280697227172683554553081387447950785107538306350414980801833836536377377477411520417973429765278622457408133286840116) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2828110474042762909603729906236230809558248155411451444965293923113317897755862570771671751206653895487494527531228242097055256765*i+2204202863719308709915454757297610293880996369393524936672042628152061532977222105084977952650859507820232823871456604937957675534)*x + (15922324738423142904351055247168895283026422823854319400075756361383441692692446019794058478712003890145306739316695056478844923340*i+1445773022357438953492848024975440047164525033632361412549901429613917491445776198160982982456885537414775655689292779386820902091) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2828110474042762909603729906236230809558248155411451444965293923113317897755862570771671751206653895487494527531228242097055256765*i+2204202863719308709915454757297610293880996369393524936672042628152061532977222105084977952650859507820232823871456604937957675534)*x + (15922324738423142904351055247168895283026422823854319400075756361383441692692446019794058478712003890145306739316695056478844923340*i+1445773022357438953492848024975440047164525033632361412549901429613917491445776198160982982456885537414775655689292779386820902091) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12639038403245041123706838788815689796188892163237959436572845686505612122441060141774099521532853893276651688325005691272687369618*i+11379464311583135860682010231390837994658448826135559774730378303310457459908499591768658488430780444438213551420549509511789436230)*x + (23806283633776647765822350680129814294535873167905737898263397122640934169282708094960327122820313453838210287757866109535720677582*i+14579634833687028354808453208522598264637995137365833637257718482448463294741255465030901649148173356502110711364308656272195246227) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12639038403245041123706838788815689796188892163237959436572845686505612122441060141774099521532853893276651688325005691272687369618*i+11379464311583135860682010231390837994658448826135559774730378303310457459908499591768658488430780444438213551420549509511789436230)*x + (23806283633776647765822350680129814294535873167905737898263397122640934169282708094960327122820313453838210287757866109535720677582*i+14579634833687028354808453208522598264637995137365833637257718482448463294741255465030901649148173356502110711364308656272195246227) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10349246899361045351282122081935076977539107810621160710598078929503672253551815282111926370236889659589825615725765727441545341885*i+7324486127045203018200870900170683013256573347634630754473704860592660865361398705927629743741687063503296543352068807541366473356)*x + (6518820120989784633212203977679259704593859451878874672620344146072276354446447747741544137080409511171657569647413027926296506172*i+18234803410416270566355061049518103918501196846060904710464437159719517793284464841107160490733376804166879287614303367696583931713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [116]:
Phi21 = isogeny_walk(E1, Phi1_P0 + Integer(S2) * Phi1_Q0, l_A,n_A)
Phi21
Out[116]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10349246899361045351282122081935076977539107810621160710598078929503672253551815282111926370236889659589825615725765727441545341885*i+7324486127045203018200870900170683013256573347634630754473704860592660865361398705927629743741687063503296543352068807541366473356)*x + (6518820120989784633212203977679259704593859451878874672620344146072276354446447747741544137080409511171657569647413027926296506172*i+18234803410416270566355061049518103918501196846060904710464437159719517793284464841107160490733376804166879287614303367696583931713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18419276655693539206851036813059865943621877906326002941477063879974840421046639830950985709168995057449293362960507966025963402666*i+18738805928471423878808236665106604428726749832253124077274693422806551532599388114681344982286286207484382925990007109947503854861)*x + (6514834553750076393260920243762793701556831251212265255263509957144455060932421542484538823016969716887059221234322147751314600864*i+22817681886341003704141180577988582650171494917218551671200192555727364066005743091735774227243814320335275116122792877997993817111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8613688223513749716977573816794488511188139863236557200428008853856864837680743885034655247941484180792349357564957454829233168097*i+21770943005502087395718831081224306189654601499045507732342722188541552705900638736535024201783470996942326497766645189223401251862)*x + (16766817885161588296610520795264863088420255753499189564510971189873588892364187334026601507799737224145890370181594410692580665813*i+7279003706430464147302903430446952649765445443429780731094091771032073516559842889600559955582392591777438224209060932729147173803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8613688223513749716977573816794488511188139863236557200428008853856864837680743885034655247941484180792349357564957454829233168097*i+21770943005502087395718831081224306189654601499045507732342722188541552705900638736535024201783470996942326497766645189223401251862)*x + (16766817885161588296610520795264863088420255753499189564510971189873588892364187334026601507799737224145890370181594410692580665813*i+7279003706430464147302903430446952649765445443429780731094091771032073516559842889600559955582392591777438224209060932729147173803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15914924187561105678086049161466373242666598278168298112332769834516601192758086972879172819848323376520879903483067444604812272128*i+23298261613755191953092501756189242000759940748456330421582170118950214564370528001226951510497528494514291092621709603280202418327)*x + (7446836108173696309639533697749195681399928468054328579780383731255902849741678226802732374666095090880069466529099606594418106788*i+12064455508748258044522676356646249877403629343998226661858336427939146452045996186599410704158674909577879366015555760715970138206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15914924187561105678086049161466373242666598278168298112332769834516601192758086972879172819848323376520879903483067444604812272128*i+23298261613755191953092501756189242000759940748456330421582170118950214564370528001226951510497528494514291092621709603280202418327)*x + (7446836108173696309639533697749195681399928468054328579780383731255902849741678226802732374666095090880069466529099606594418106788*i+12064455508748258044522676356646249877403629343998226661858336427939146452045996186599410704158674909577879366015555760715970138206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18140064123087596207403141708343565014373611276784171507262718916925668416876938823798949181601134869914982655148682716388915230252*i+2051846179841082421775595362005477034971647901960840444844428454047963522118144581225666139702595227428395109254069973765085781350)*x + (3298379443057111638894257044838279875920268361932202879631146975230357491368172026709861702218566655100521287491539041296315673952*i+16670845517049974854497413720513128852474076631909019443274840254634290887933911296625164778632464354027747092249298560730674255048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18140064123087596207403141708343565014373611276784171507262718916925668416876938823798949181601134869914982655148682716388915230252*i+2051846179841082421775595362005477034971647901960840444844428454047963522118144581225666139702595227428395109254069973765085781350)*x + (3298379443057111638894257044838279875920268361932202879631146975230357491368172026709861702218566655100521287491539041296315673952*i+16670845517049974854497413720513128852474076631909019443274840254634290887933911296625164778632464354027747092249298560730674255048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15565453392417498741925536362355358642797902985429853668084088493063213220690729416825052742101863325392942989439863194261499200911*i+13108544197151387035505749041436144750926361049728794161380821851516585120338630928781787472849900026267062007379428216668253962253)*x + (6610326327750919027981911860983844449341607037838793954206784209588554715248413159869062486509268823734912351745965647439583207194*i+10512695715115635784620832052656343067551475078445589244635016187369091625034464591593569897434886989174923930934207017163549781442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15565453392417498741925536362355358642797902985429853668084088493063213220690729416825052742101863325392942989439863194261499200911*i+13108544197151387035505749041436144750926361049728794161380821851516585120338630928781787472849900026267062007379428216668253962253)*x + (6610326327750919027981911860983844449341607037838793954206784209588554715248413159869062486509268823734912351745965647439583207194*i+10512695715115635784620832052656343067551475078445589244635016187369091625034464591593569897434886989174923930934207017163549781442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20662337461798393384326459861658224630710632004328300227578094812441887352614340056059537249366990867775936760923033522508512202125*i+21974160721861599361310907655948558593020896050583104982044601927297178772201890873992918215367973945077102690445655033778421840631)*x + (14044164295582250576427474511132496362413821929528332601190350107028989990243619948189011310621049755579101723831898198629487546024*i+5216494014762458931349206237253583542984072813356729336735578596453034705490823169758067571316859311432221466931550942769267836642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20662337461798393384326459861658224630710632004328300227578094812441887352614340056059537249366990867775936760923033522508512202125*i+21974160721861599361310907655948558593020896050583104982044601927297178772201890873992918215367973945077102690445655033778421840631)*x + (14044164295582250576427474511132496362413821929528332601190350107028989990243619948189011310621049755579101723831898198629487546024*i+5216494014762458931349206237253583542984072813356729336735578596453034705490823169758067571316859311432221466931550942769267836642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19814020005729256005259659037756800704590715994552930492234918389148509684910595988936966334654332905291079101424276699587394791649*i+18723543238392673724416420345260791819865676937068757207492233249013435360174572871332322450603299450383953497241907118582768689668)*x + (1379216515398384444537779844674986329082544409249189647787881176185336799133156571187450687939770438808619539815063741657934503750*i+3346881530963827338405915137628778183733217710580408337376607240623295168121017158987163386598352061493953343529401405787657168098) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19814020005729256005259659037756800704590715994552930492234918389148509684910595988936966334654332905291079101424276699587394791649*i+18723543238392673724416420345260791819865676937068757207492233249013435360174572871332322450603299450383953497241907118582768689668)*x + (1379216515398384444537779844674986329082544409249189647787881176185336799133156571187450687939770438808619539815063741657934503750*i+3346881530963827338405915137628778183733217710580408337376607240623295168121017158987163386598352061493953343529401405787657168098) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23728396264673984501364738241456552809514607071201554610025403346786104811995870238284835009977435318039825847854791939132160463590*i+23769930028204846162067622415193947046801946540107064078290400452466692436805359321145420397286194899064566718596800459813539279446)*x + (3206626975923727105543875895157320446815206748227899363270041759727301530114422602354773000136795289128404272769543233756378144550*i+7704699636503626119686616920782712000968794969229399672528567047549642944412723188772658195075557901236868526340462538982809883353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23728396264673984501364738241456552809514607071201554610025403346786104811995870238284835009977435318039825847854791939132160463590*i+23769930028204846162067622415193947046801946540107064078290400452466692436805359321145420397286194899064566718596800459813539279446)*x + (3206626975923727105543875895157320446815206748227899363270041759727301530114422602354773000136795289128404272769543233756378144550*i+7704699636503626119686616920782712000968794969229399672528567047549642944412723188772658195075557901236868526340462538982809883353) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14291026316045478428384326105600673218890115132362734901183493741544299567118766787746501623384161309501620841747798494058212764926*i+1176718435304812076327300819916180064409198796758464230374831872710198203994152810847530633484080571947329202253018233203713423837)*x + (22103755915437427646100123399118788727031803939548719808500360746598839768181070028878321504441015687840526405417601656445066825806*i+20390633329923557819592934636159463024386940011703543237825975354949694335371351767091859427741711584539903018258167755151516341263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14291026316045478428384326105600673218890115132362734901183493741544299567118766787746501623384161309501620841747798494058212764926*i+1176718435304812076327300819916180064409198796758464230374831872710198203994152810847530633484080571947329202253018233203713423837)*x + (22103755915437427646100123399118788727031803939548719808500360746598839768181070028878321504441015687840526405417601656445066825806*i+20390633329923557819592934636159463024386940011703543237825975354949694335371351767091859427741711584539903018258167755151516341263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16719896861780778675985745876833953912863932252118462182754002671838019207337245594628206646336088724619412361270313045874130773251*i+8822411078525411304524367547286557770463537457529326217909270993574172892181434407226760492367179616391557537470480506988103985653)*x + (15310576270503668885080084834241680275350774627060100291878078357212628201000776384529697905232195667505403096163091373310416857277*i+2225468495877611105750231170671399440808853121168233700800609056656900484262280440775536017932905861807353269999587521322035886916) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16719896861780778675985745876833953912863932252118462182754002671838019207337245594628206646336088724619412361270313045874130773251*i+8822411078525411304524367547286557770463537457529326217909270993574172892181434407226760492367179616391557537470480506988103985653)*x + (15310576270503668885080084834241680275350774627060100291878078357212628201000776384529697905232195667505403096163091373310416857277*i+2225468495877611105750231170671399440808853121168233700800609056656900484262280440775536017932905861807353269999587521322035886916) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21644680778025706602304767915126604318759867242456008899522949624916069718805821134784717711411115188926196690435280194707898252992*i+6976226937573867356180668779265831354186454977060450234390944819919276875697088528337073316565039650188437183007288999048722298335)*x + (1868105960844927287399122748930687476974840471794505895024821414890145768626205365048783799497714564208197583233495324622977731877*i+14982570927333255919481458959560177175669681868877484901415305905388731472308631904179838603755704565578800895120202034005020750483) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21644680778025706602304767915126604318759867242456008899522949624916069718805821134784717711411115188926196690435280194707898252992*i+6976226937573867356180668779265831354186454977060450234390944819919276875697088528337073316565039650188437183007288999048722298335)*x + (1868105960844927287399122748930687476974840471794505895024821414890145768626205365048783799497714564208197583233495324622977731877*i+14982570927333255919481458959560177175669681868877484901415305905388731472308631904179838603755704565578800895120202034005020750483) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13815617575510328599447788034798007225853625441193228268058564390170214280747182236118770020487231829860983658141681853604930963779*i+4558000445607635956375710262338154883040071204079071698371143619184233389099760433515798512215214881269559117354848932105799641773)*x + (17245845944807743238820677537789162022046169349905226757249422601370714104203488538647887316867468362275937628975101270049016518757*i+16537172042150696057234505513620229757852997396547294993463904897217761581903440721016478405416657436781582722619531844824571445280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13815617575510328599447788034798007225853625441193228268058564390170214280747182236118770020487231829860983658141681853604930963779*i+4558000445607635956375710262338154883040071204079071698371143619184233389099760433515798512215214881269559117354848932105799641773)*x + (17245845944807743238820677537789162022046169349905226757249422601370714104203488538647887316867468362275937628975101270049016518757*i+16537172042150696057234505513620229757852997396547294993463904897217761581903440721016478405416657436781582722619531844824571445280) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20779766724527018446115434902021099154357162977234077311270002846734397769154229998399755009865533696348241838600711520724365030361*i+16175278398644865969136269642377291531213419276301409587203146154662617653372520182281865244958602870809743095704105863386474163540)*x + (10147005196570392011566891539747205647233739093593883136104879907580096837526781037845355652373855531814095082709452694120481327240*i+3906223647523326264910869900724289206938979725113414650511746333704104873926259701656142606320721493397372899182900487294690773394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20779766724527018446115434902021099154357162977234077311270002846734397769154229998399755009865533696348241838600711520724365030361*i+16175278398644865969136269642377291531213419276301409587203146154662617653372520182281865244958602870809743095704105863386474163540)*x + (10147005196570392011566891539747205647233739093593883136104879907580096837526781037845355652373855531814095082709452694120481327240*i+3906223647523326264910869900724289206938979725113414650511746333704104873926259701656142606320721493397372899182900487294690773394) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17322242806163662805666220654938462233455979051814643738172792133999702968859403405444634586202443496628585703100351567294677006837*i+10221512996746974044934315662985880953816014312169531923261965663564389194817464078147819439922853815932848389840973629519716376146)*x + (1353618631347348683187455665722564476885329312422452776201118573380459397454204018320162674456389917840333431094316429656444475311*i+10914271936600408738712244893221072322129845569113256985711362086304946548791953028778988603225674700187259887293710019502992655368) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17322242806163662805666220654938462233455979051814643738172792133999702968859403405444634586202443496628585703100351567294677006837*i+10221512996746974044934315662985880953816014312169531923261965663564389194817464078147819439922853815932848389840973629519716376146)*x + (1353618631347348683187455665722564476885329312422452776201118573380459397454204018320162674456389917840333431094316429656444475311*i+10914271936600408738712244893221072322129845569113256985711362086304946548791953028778988603225674700187259887293710019502992655368) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20402497432923176146943130151376286878276827394535559991453609607293917681623304055710736015085513652371744275682778985734127819918*i+11061120099351145381585064792799575069823868700748590880173040596801130867364067967870875311119659714367753343125746438269811482443)*x + (12515885444814488067399290722293981766489202219897905767752797476381793082175210041178338038546931174428471655799143745490592296696*i+20264728895625686067583359153273222636270394162967190597341339256473900799501088508249655318962651762558822911116744708757790642622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20402497432923176146943130151376286878276827394535559991453609607293917681623304055710736015085513652371744275682778985734127819918*i+11061120099351145381585064792799575069823868700748590880173040596801130867364067967870875311119659714367753343125746438269811482443)*x + (12515885444814488067399290722293981766489202219897905767752797476381793082175210041178338038546931174428471655799143745490592296696*i+20264728895625686067583359153273222636270394162967190597341339256473900799501088508249655318962651762558822911116744708757790642622) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17150231890383070103639581782201225966118470102702069483710723823435539506053135422994464552427099872518796341305421863799994777209*i+19944668293571189100177240992562464258263101200797899429942924539678532169378040522192145617228148357011138031712955954024429000715)*x + (731173217785675457872610874489872843976721939611460883075128961866674456525411820279741090193819793409020639417915888080731642127*i+2607755554659486721198529159069868657154766260908517408641636143954000546062067370885828634059299601143358856131519554960062340681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17150231890383070103639581782201225966118470102702069483710723823435539506053135422994464552427099872518796341305421863799994777209*i+19944668293571189100177240992562464258263101200797899429942924539678532169378040522192145617228148357011138031712955954024429000715)*x + (731173217785675457872610874489872843976721939611460883075128961866674456525411820279741090193819793409020639417915888080731642127*i+2607755554659486721198529159069868657154766260908517408641636143954000546062067370885828634059299601143358856131519554960062340681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11183980440582840669720209795166757384227011322441350953643625424793707856468938045192932778647882817420547635947377651865981970728*i+18161338438101920205937036432337181269247027976710193851168656470764463126243907345608579028962662124929613611602229461758323364220)*x + (23500555255881849487881692332978517640951761090466675547656842101896519051889175340973833255004046813191056375002383528567595476293*i+18296963594039597053239489860605524983267255743489278479211867221772125543517855356756350047372125681752010401045032513936664264485) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11183980440582840669720209795166757384227011322441350953643625424793707856468938045192932778647882817420547635947377651865981970728*i+18161338438101920205937036432337181269247027976710193851168656470764463126243907345608579028962662124929613611602229461758323364220)*x + (23500555255881849487881692332978517640951761090466675547656842101896519051889175340973833255004046813191056375002383528567595476293*i+18296963594039597053239489860605524983267255743489278479211867221772125543517855356756350047372125681752010401045032513936664264485) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23115386600481800540787676799531797625999285825579353833380307983906499809320750052713146508812407715309279385281416816956246176093*i+12789149008721834270418756875180211097832264750115282555199909135939586869857191300427114083351060472146969934194402053750087977993)*x + (18633593014313969227212649912628782322345929185407436850593284568476568340016271304124776086220497671906103681637464221570360867355*i+20453262373492787541514462663918698797804665502493492529328089089756933403635241990004289730669110448925305474044473022872897342766) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23115386600481800540787676799531797625999285825579353833380307983906499809320750052713146508812407715309279385281416816956246176093*i+12789149008721834270418756875180211097832264750115282555199909135939586869857191300427114083351060472146969934194402053750087977993)*x + (18633593014313969227212649912628782322345929185407436850593284568476568340016271304124776086220497671906103681637464221570360867355*i+20453262373492787541514462663918698797804665502493492529328089089756933403635241990004289730669110448925305474044473022872897342766) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14686786683454058396901467339126397737838977778748141986913980954245399170761575620895696701090446500725026388748456624042810112466*i+6364910778007119973705631147716871835077945910789573116849058325652517064977640967864030999863792723962731236993304657162431213624)*x + (22888546797459941771283628888979235881769260868059927692710756820027491266558836071376731153779307434140391880098719370842234135640*i+17719454944075050715823939551397879622383362542121200952737076755029678307025393153984267591923880248739455145306174429696407884521) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14686786683454058396901467339126397737838977778748141986913980954245399170761575620895696701090446500725026388748456624042810112466*i+6364910778007119973705631147716871835077945910789573116849058325652517064977640967864030999863792723962731236993304657162431213624)*x + (22888546797459941771283628888979235881769260868059927692710756820027491266558836071376731153779307434140391880098719370842234135640*i+17719454944075050715823939551397879622383362542121200952737076755029678307025393153984267591923880248739455145306174429696407884521) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17647560646235937554824901369926624287857242970802778691130288433094612390352693071932437003576264769924073984999348141665412370413*i+3894057289044645314434380084323008008968040511267529084397583015726683904604714158674943127129287587812512442795212534114374908858)*x + (7676923892389318216193081054839943581174532391410760951169803344102100860516605350981534754117097144777028390008393056346669341250*i+11298063762722576229161058809313766249320557712161904896357889931867070798244695319717674836678479400065091677669480193283101770961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17647560646235937554824901369926624287857242970802778691130288433094612390352693071932437003576264769924073984999348141665412370413*i+3894057289044645314434380084323008008968040511267529084397583015726683904604714158674943127129287587812512442795212534114374908858)*x + (7676923892389318216193081054839943581174532391410760951169803344102100860516605350981534754117097144777028390008393056346669341250*i+11298063762722576229161058809313766249320557712161904896357889931867070798244695319717674836678479400065091677669480193283101770961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8002593174755369082550014257797292012287798396783363559816915006456190339637775165251302910948050059429460999744299181974542431493*i+22052121233192460727733338135697556967442149066204191164892865195924318773381221141144562141046566208279803327503594381545060467714)*x + (9574282883886018558400677561544761505989210134922571125821659848106033630599286156302530184169039590142425385736252321565700754096*i+4383756193874735682227631563783094337371420243151133217294028732924457928677124310110378369684656644130877728354765474365351690415) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8002593174755369082550014257797292012287798396783363559816915006456190339637775165251302910948050059429460999744299181974542431493*i+22052121233192460727733338135697556967442149066204191164892865195924318773381221141144562141046566208279803327503594381545060467714)*x + (9574282883886018558400677561544761505989210134922571125821659848106033630599286156302530184169039590142425385736252321565700754096*i+4383756193874735682227631563783094337371420243151133217294028732924457928677124310110378369684656644130877728354765474365351690415) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13603759794516365319202827261142197076632229911240909453967148816030260799405935819551489361522396566718906987213153786276043060900*i+22269578637579707238397507308028552772496052944112051678648077096037662538274621644052045335506711067838811386373112534512343387887)*x + (16236110788442514673730152344376663949471323322985928532484668574729197452921324206945478620477038385930178722148558206206330550346*i+24007217364925129283121566461083549198881108125131486697034344234821089577849741087503804295329728820998860173701871187970773508587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13603759794516365319202827261142197076632229911240909453967148816030260799405935819551489361522396566718906987213153786276043060900*i+22269578637579707238397507308028552772496052944112051678648077096037662538274621644052045335506711067838811386373112534512343387887)*x + (16236110788442514673730152344376663949471323322985928532484668574729197452921324206945478620477038385930178722148558206206330550346*i+24007217364925129283121566461083549198881108125131486697034344234821089577849741087503804295329728820998860173701871187970773508587) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3466688300769790898798913615224029809818766071666715727729630998628492940258200099204664468685845933930355386604013995645010763779*i+6247215204932122681759315355839948483761886968408945559724949242059955745388085674169572698119137662767089832067970236926476038395)*x + (4682963724322224108681200864979760841034366775386590297857335643145359533120723399908450252263015683984985014679211637861111380302*i+4553429485454406449027066766022507690601509624310051818587385592767971080359624247056874612863451534147147086956694274304849198763) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3466688300769790898798913615224029809818766071666715727729630998628492940258200099204664468685845933930355386604013995645010763779*i+6247215204932122681759315355839948483761886968408945559724949242059955745388085674169572698119137662767089832067970236926476038395)*x + (4682963724322224108681200864979760841034366775386590297857335643145359533120723399908450252263015683984985014679211637861111380302*i+4553429485454406449027066766022507690601509624310051818587385592767971080359624247056874612863451534147147086956694274304849198763) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11885310555823552759193780374225631013598229915868469612125725200745816405322553661279555462386485205323891952871668751135751918119*i+20665684822105074210154352164707091387115735812861775113405967664261273675958823367640868932819828040006507817701012685891757108258)*x + (19524749096827570950460220971532460721878356536003232453537005609233772449786964041917556342116274954787654908210905241744070405355*i+14605009254671635301390428905449439343648883081876741457842399736293591532987556954073964645894637429573151622228302817915039669812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11885310555823552759193780374225631013598229915868469612125725200745816405322553661279555462386485205323891952871668751135751918119*i+20665684822105074210154352164707091387115735812861775113405967664261273675958823367640868932819828040006507817701012685891757108258)*x + (19524749096827570950460220971532460721878356536003232453537005609233772449786964041917556342116274954787654908210905241744070405355*i+14605009254671635301390428905449439343648883081876741457842399736293591532987556954073964645894637429573151622228302817915039669812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12714220069206181007261058137887537741090613125007657886490424591542539320774326007193775880627880705332173600780017001650718208860*i+225941128921187802101075301698092147240689185855281602950148391683537254765947511915465369776310462049097626699264387820099195497)*x + (20988468824669811715102805254964284008962069726036095442401195185805709781037918325161405689319035212493910087097001369667023596057*i+23062654602070932431050672535059105211791002228276854515965700455523643855655525109292508749588953389289435548035540720305887133777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12714220069206181007261058137887537741090613125007657886490424591542539320774326007193775880627880705332173600780017001650718208860*i+225941128921187802101075301698092147240689185855281602950148391683537254765947511915465369776310462049097626699264387820099195497)*x + (20988468824669811715102805254964284008962069726036095442401195185805709781037918325161405689319035212493910087097001369667023596057*i+23062654602070932431050672535059105211791002228276854515965700455523643855655525109292508749588953389289435548035540720305887133777) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16229551365953924749103495619640040272357082841686254525083620791122939027088613861311141598971994595087978236509602182027191921069*i+4241851830507785167452483320833377361082549894376272869835804298928351105547254064313106177299004125523622264427413748415333763392)*x + (11524130678054612227453222738959724047254011262368197209414047812373633849856600874172102926046308020549638723018746137824885295105*i+6678033162341675032811791908670928092088370856760914079982633625748653215193662602762149422853774485554538452267935138525236594306) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16229551365953924749103495619640040272357082841686254525083620791122939027088613861311141598971994595087978236509602182027191921069*i+4241851830507785167452483320833377361082549894376272869835804298928351105547254064313106177299004125523622264427413748415333763392)*x + (11524130678054612227453222738959724047254011262368197209414047812373633849856600874172102926046308020549638723018746137824885295105*i+6678033162341675032811791908670928092088370856760914079982633625748653215193662602762149422853774485554538452267935138525236594306) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19660438326547374909625058854890271830252487390712940981468392414781425061924410493284460376636306430038361989526388115406600689771*i+5795597183668560579851099476069965556332825124708511557148529865715818911832013968045072755826664757005359950122840668069166153952)*x + (3308357873457112815763274259031821728898191306671274764113775365810594670244382255099009344996386970917059942755433935072345959840*i+11505311623783214171090398498427865984429684118584125956603360980644344239076927461539684431107427025690266345619317732161616656082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19660438326547374909625058854890271830252487390712940981468392414781425061924410493284460376636306430038361989526388115406600689771*i+5795597183668560579851099476069965556332825124708511557148529865715818911832013968045072755826664757005359950122840668069166153952)*x + (3308357873457112815763274259031821728898191306671274764113775365810594670244382255099009344996386970917059942755433935072345959840*i+11505311623783214171090398498427865984429684118584125956603360980644344239076927461539684431107427025690266345619317732161616656082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14619721556648438737088730397152693261870721957044366972255885035132466261868071402568784581525506747260395610126860754447918328011*i+18564936641682839443066016126159629785693458429605529465992808384817062213591555530542963140557094956478418811096818548549384532860)*x + (6503207152237894366246170894185387701133738117367308395721459691364508515305353637102222195681805835191621376361850343776603875226*i+6987455139780409460208269892861826662364691202769974726984798259205991718823811767225476090513522108349085268049604693639071177662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14619721556648438737088730397152693261870721957044366972255885035132466261868071402568784581525506747260395610126860754447918328011*i+18564936641682839443066016126159629785693458429605529465992808384817062213591555530542963140557094956478418811096818548549384532860)*x + (6503207152237894366246170894185387701133738117367308395721459691364508515305353637102222195681805835191621376361850343776603875226*i+6987455139780409460208269892861826662364691202769974726984798259205991718823811767225476090513522108349085268049604693639071177662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21626798289551485218784066921435541917687172018576896192446667669132618307337377997357713096655359281976375586275117055736457689527*i+1470459165153212152205511006697371406007084161754878783319147039252481684009024448786420673231893799660861747716776493206627043512)*x + (8420225344170311320424751243668578094206641435392704803553994617948319457894114647931022177723237375608238073057179916829226688533*i+8381139675474309914851629984943688282815596823992727352968351040698819532405793183902086528071849778084140087776468011979716378072) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21626798289551485218784066921435541917687172018576896192446667669132618307337377997357713096655359281976375586275117055736457689527*i+1470459165153212152205511006697371406007084161754878783319147039252481684009024448786420673231893799660861747716776493206627043512)*x + (8420225344170311320424751243668578094206641435392704803553994617948319457894114647931022177723237375608238073057179916829226688533*i+8381139675474309914851629984943688282815596823992727352968351040698819532405793183902086528071849778084140087776468011979716378072) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9695834503548740357633160075939684657357488940083461365212474700312658665288263798460025802279334595040067938829750073458959064640*i+23029805254504878396291602746023601590222181529673922393130113731986680859468674411345842090209825627243812918423559763438743670873)*x + (22888489135153250096860772627473665583051743612937045724051395228879950527330138194047482545652558008445941023984167479383597401364*i+7029830753184417291971987441211766001494754664725094250000889892158809639772308873776174395792924887733611668639819305817154299846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9695834503548740357633160075939684657357488940083461365212474700312658665288263798460025802279334595040067938829750073458959064640*i+23029805254504878396291602746023601590222181529673922393130113731986680859468674411345842090209825627243812918423559763438743670873)*x + (22888489135153250096860772627473665583051743612937045724051395228879950527330138194047482545652558008445941023984167479383597401364*i+7029830753184417291971987441211766001494754664725094250000889892158809639772308873776174395792924887733611668639819305817154299846) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8057023700354998258960844196010703715492483184729130827551570530230383088103183835588562189000448676529046302277385114870463405830*i+22967124327743909078368691438412578473176213082514314059028112013130047158035640667638083989417238396804492343281571469811102535866)*x + (17540452329086992480436545923969908474995486404279768573218858109860320191138859399113619177138047323832086384491149568431837638392*i+5824972817437458780352211586861057738709106331969848937792007195178928668906005808198229867058364947835869372519999886657932669133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8057023700354998258960844196010703715492483184729130827551570530230383088103183835588562189000448676529046302277385114870463405830*i+22967124327743909078368691438412578473176213082514314059028112013130047158035640667638083989417238396804492343281571469811102535866)*x + (17540452329086992480436545923969908474995486404279768573218858109860320191138859399113619177138047323832086384491149568431837638392*i+5824972817437458780352211586861057738709106331969848937792007195178928668906005808198229867058364947835869372519999886657932669133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8045847419761100830366672239261636408737402296036438054126912302801350911958952296699940847470884334008228583959554878439617571746*i+8517481248628249836189105372557518370732138065311374788561552538994424598400538045796912207285515130514819882615553317844813508174)*x + (365976383348662827394827924575631450092040616983565400165579203021724862560750744716158446768941694271692488307959399331057321244*i+17488886737335976919091891015163276182553150838997010469158315461313777465440892484580191484316397237765242996077987752570147137159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8045847419761100830366672239261636408737402296036438054126912302801350911958952296699940847470884334008228583959554878439617571746*i+8517481248628249836189105372557518370732138065311374788561552538994424598400538045796912207285515130514819882615553317844813508174)*x + (365976383348662827394827924575631450092040616983565400165579203021724862560750744716158446768941694271692488307959399331057321244*i+17488886737335976919091891015163276182553150838997010469158315461313777465440892484580191484316397237765242996077987752570147137159) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14576925250429090269249095764598349646718301257350106271213257045255180478615463766777524049415547707924449260719280547901862538729*i+14862914256033498358590125830823416933392472803555527180236909967080922494396235989376725265651468504778857904154709263481111430926)*x + (19358321491750690537543837723854757209943452161334125586963434983183229978475564846071229420082368153401334841527474310105073685084*i+12380844901051730266562464809369238771091385381248619007625976644636790163285531391023184120723830206346649181002063008618190659803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14576925250429090269249095764598349646718301257350106271213257045255180478615463766777524049415547707924449260719280547901862538729*i+14862914256033498358590125830823416933392472803555527180236909967080922494396235989376725265651468504778857904154709263481111430926)*x + (19358321491750690537543837723854757209943452161334125586963434983183229978475564846071229420082368153401334841527474310105073685084*i+12380844901051730266562464809369238771091385381248619007625976644636790163285531391023184120723830206346649181002063008618190659803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22891433663871480446046380943042874720934886260982288606871013433095820741929798069980917275666108136745475862717357672368474853736*i+16277527684733646479336512353417171256927770317318353821285367019616254799489201631628391446715153817127736353821252037929830160696)*x + (23288558631015256647965868751842429757457931721627052305754938953478227796375826872069529822789118249264181515839584338704458048107*i+1748014645808583030589019651576015704573396284076907452906951224543696919202411569438746284927149508510711679617015973274576422728) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22891433663871480446046380943042874720934886260982288606871013433095820741929798069980917275666108136745475862717357672368474853736*i+16277527684733646479336512353417171256927770317318353821285367019616254799489201631628391446715153817127736353821252037929830160696)*x + (23288558631015256647965868751842429757457931721627052305754938953478227796375826872069529822789118249264181515839584338704458048107*i+1748014645808583030589019651576015704573396284076907452906951224543696919202411569438746284927149508510711679617015973274576422728) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1541050932936720877616306204143653487731604569791713220280189910139323935467929626064020904103622682394478434044637812819957406894*i+12451824585117380666829678753055464507995822365456107658882896009584582634545860103845886396286794719310190165752462979936175402646)*x + (3116881428767368343149576427032113594997159941670987036825919761427077941241606734961696691654408918678877661478587612040560434938*i+12301117379545175285328682254402091087630314285599386962658225531690064952075569500147248490249330304362561088604917437611963453329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1541050932936720877616306204143653487731604569791713220280189910139323935467929626064020904103622682394478434044637812819957406894*i+12451824585117380666829678753055464507995822365456107658882896009584582634545860103845886396286794719310190165752462979936175402646)*x + (3116881428767368343149576427032113594997159941670987036825919761427077941241606734961696691654408918678877661478587612040560434938*i+12301117379545175285328682254402091087630314285599386962658225531690064952075569500147248490249330304362561088604917437611963453329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8615674441573042207224230296337120245534159943491649692993905460481605148190750619516624041960575860000117752467765340846737532252*i+5359637524912502151063745784877238735169392918022619409999171644625877436179910071451739138567358098548306888275962786100490339271)*x + (19828885995286589175871740643476654134340721943185754111538232659159245463683031816555128007823452967219064937806769421185025562292*i+14181628318972165265742314652099224463097428493335931439157749498759308859430855075044974056748829403197305523236855611153917030812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8615674441573042207224230296337120245534159943491649692993905460481605148190750619516624041960575860000117752467765340846737532252*i+5359637524912502151063745784877238735169392918022619409999171644625877436179910071451739138567358098548306888275962786100490339271)*x + (19828885995286589175871740643476654134340721943185754111538232659159245463683031816555128007823452967219064937806769421185025562292*i+14181628318972165265742314652099224463097428493335931439157749498759308859430855075044974056748829403197305523236855611153917030812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17658205083631806578099507716669534036297948384671747199719914897745976466167699483185175123679067223430403489130557939609526418233*i+12395912347238479862095134978083693832375961963454049394190802193514146904306319689947487793014517320775413024837234612786801972489)*x + (8159432636815243279836937714128581812995574021115296779683185755389682991344288355697532404838981702383920463413088056339570719176*i+1183461367742238483169846077378387890194599452861388783315600848744116272016688855370834065150485592283008047915575515421867225860) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17658205083631806578099507716669534036297948384671747199719914897745976466167699483185175123679067223430403489130557939609526418233*i+12395912347238479862095134978083693832375961963454049394190802193514146904306319689947487793014517320775413024837234612786801972489)*x + (8159432636815243279836937714128581812995574021115296779683185755389682991344288355697532404838981702383920463413088056339570719176*i+1183461367742238483169846077378387890194599452861388783315600848744116272016688855370834065150485592283008047915575515421867225860) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7585153691960333938521516697440352550109741940303384420223029025364351690597110455882479675859107548215021592217727326425332162475*i+10843215025597275184231998893098330093498355835974777740017105537028758929216612539845747921994671839114171242611098418299850948888)*x + (21617330571490937590500243651138030081251880526874587166127255414068579773740683402993596552990847458388586949945389559214926098522*i+17553230256623852228167780217068502879167275181529038476405996927494254065587382057704659001334206891413639811318090594332464532085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7585153691960333938521516697440352550109741940303384420223029025364351690597110455882479675859107548215021592217727326425332162475*i+10843215025597275184231998893098330093498355835974777740017105537028758929216612539845747921994671839114171242611098418299850948888)*x + (21617330571490937590500243651138030081251880526874587166127255414068579773740683402993596552990847458388586949945389559214926098522*i+17553230256623852228167780217068502879167275181529038476405996927494254065587382057704659001334206891413639811318090594332464532085) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13231637076551653169379700077238762160755960927237480048325865375406231083458309283958668493709080362202519341611159577799389479456*i+11114487570091275403171013208785690213321541055021997169105065287137848154584720996917654890065767631235369951042650409250834502570)*x + (19522690188343872325005342825446716978369071009473516166737111891008894110516221065222091025581689753889919736332617508897967166262*i+15715741017206852211756369783978582749587946659773173721640385330987790044334727278910393588313587974944259602119669603980405230411) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13231637076551653169379700077238762160755960927237480048325865375406231083458309283958668493709080362202519341611159577799389479456*i+11114487570091275403171013208785690213321541055021997169105065287137848154584720996917654890065767631235369951042650409250834502570)*x + (19522690188343872325005342825446716978369071009473516166737111891008894110516221065222091025581689753889919736332617508897967166262*i+15715741017206852211756369783978582749587946659773173721640385330987790044334727278910393588313587974944259602119669603980405230411) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11198580643505734452845067502170441848151245072230281970121953368349767078389929046089319318925940772732529007160959331094551442469*i+14008114284634139982656114984402960394719113002624408318990653579781689808902389203418856861007666361752127718095595139130751666994)*x + (20291944716677481042738953895912947425462316986771710370393975544608414640086557334424763260894670656267392445739699691499141608509*i+12475894705887458800817340159114132419197956836807610423739328657062427557602713567119996168867871783358322866765625706702429666632) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11198580643505734452845067502170441848151245072230281970121953368349767078389929046089319318925940772732529007160959331094551442469*i+14008114284634139982656114984402960394719113002624408318990653579781689808902389203418856861007666361752127718095595139130751666994)*x + (20291944716677481042738953895912947425462316986771710370393975544608414640086557334424763260894670656267392445739699691499141608509*i+12475894705887458800817340159114132419197956836807610423739328657062427557602713567119996168867871783358322866765625706702429666632) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11454573637810114507060702105658797213407842086973249968596594801161519115263441072488773806053952698376895317343715897097770988215*i+11853119571149543299343154200445721087910082731039649800620548250255779974181510749056017345285968747134307860474519508672145337430)*x + (8960192425774113724337091781439773976335916032664942247676059347989247932242802711412194170670054803865951979390635901971137469868*i+19604389504562329025666125506456009403340805634125491761326476422034584148510740369220780590091421116103110320359944264706808183388) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11454573637810114507060702105658797213407842086973249968596594801161519115263441072488773806053952698376895317343715897097770988215*i+11853119571149543299343154200445721087910082731039649800620548250255779974181510749056017345285968747134307860474519508672145337430)*x + (8960192425774113724337091781439773976335916032664942247676059347989247932242802711412194170670054803865951979390635901971137469868*i+19604389504562329025666125506456009403340805634125491761326476422034584148510740369220780590091421116103110320359944264706808183388) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17192454416077687713150011342075895847387190720408662396183971235613409403584871199416755838319590387714323554869643699572468121760*i+14943234133200422268392024092657152238561205564371064855428588400454687887255459544684845938580854956396521803475856433933548475699)*x + (19619089095339430064909239406119678951818691911932062932199006869011680929186229381645175131412558432087250503585437453265390540184*i+22641717501848038867797015217016755426637220307914889648535213039139505228052487151510532770332154689223634554921008193858076252392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17192454416077687713150011342075895847387190720408662396183971235613409403584871199416755838319590387714323554869643699572468121760*i+14943234133200422268392024092657152238561205564371064855428588400454687887255459544684845938580854956396521803475856433933548475699)*x + (19619089095339430064909239406119678951818691911932062932199006869011680929186229381645175131412558432087250503585437453265390540184*i+22641717501848038867797015217016755426637220307914889648535213039139505228052487151510532770332154689223634554921008193858076252392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8118699526918741781884627396159722570886553804696382972239905798887609273264317402921355436761778159831818493285789984657456085687*i+381747316062645694741685998129098253516693865474953486260811025612912615704987016389357084971775908983333652283387638444692539085)*x + (9654533085303547053394987863372452423168996553552990614669304260759443042974904093739864160360435279951045121545995320811248473810*i+20983982454017715720562405835079435032044851355969106372951016192227754342421906198998219214729398902423071740076500283734786531398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8118699526918741781884627396159722570886553804696382972239905798887609273264317402921355436761778159831818493285789984657456085687*i+381747316062645694741685998129098253516693865474953486260811025612912615704987016389357084971775908983333652283387638444692539085)*x + (9654533085303547053394987863372452423168996553552990614669304260759443042974904093739864160360435279951045121545995320811248473810*i+20983982454017715720562405835079435032044851355969106372951016192227754342421906198998219214729398902423071740076500283734786531398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7407091454553997718669190819633287986733169753368427807393202821022501727428892569822912900574905277364405227817450263436311470485*i+4531411343699844181732459229259975051397517127336135421152713026528545078025080912040964862818012445225404386551002954455986092812)*x + (19309821701772589708110911459554071102435694654565071793151789246016212146227771282475088487647524461696023374726853750602388974773*i+17661869132304984144423565944050141093836719804357339509454022331210983449900724084105078933756570329201953305919070681582883249642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7407091454553997718669190819633287986733169753368427807393202821022501727428892569822912900574905277364405227817450263436311470485*i+4531411343699844181732459229259975051397517127336135421152713026528545078025080912040964862818012445225404386551002954455986092812)*x + (19309821701772589708110911459554071102435694654565071793151789246016212146227771282475088487647524461696023374726853750602388974773*i+17661869132304984144423565944050141093836719804357339509454022331210983449900724084105078933756570329201953305919070681582883249642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19569250883683477445468974033720552453600879946876226209787470204845243555812905549194574206079924733892053837023556133523377195209*i+15926132598279944501029240406163303317754564515112935310181783055036903413008669367201082187403215166747673656154740113427043798062)*x + (20373508405372245987568690809636038008785836618705256740624189152704525657258195103156037295935155896971143604156305241038895169220*i+11064759194568474154466717902668257747648627429909613105467497027106579153496782117403144628069650704092947571195067209149512995999) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19569250883683477445468974033720552453600879946876226209787470204845243555812905549194574206079924733892053837023556133523377195209*i+15926132598279944501029240406163303317754564515112935310181783055036903413008669367201082187403215166747673656154740113427043798062)*x + (20373508405372245987568690809636038008785836618705256740624189152704525657258195103156037295935155896971143604156305241038895169220*i+11064759194568474154466717902668257747648627429909613105467497027106579153496782117403144628069650704092947571195067209149512995999) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20721210895430050502709603372233268386819632576817459433645380126800241504879057471460741726062472163496190908504963772481981013559*i+390885834182709575323141691938957647524629321100730892642299315048344741147174333987120659099137669279484954439586031088106347180)*x + (23195663452917733799943592068673676075399350204046561381988245527795962231462994195605717014083674410218595963349696798015811249187*i+23720891005491096156820525679017555195180170593339789765980387487779364340992298687053160100673838871577275377162201011190798620751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20721210895430050502709603372233268386819632576817459433645380126800241504879057471460741726062472163496190908504963772481981013559*i+390885834182709575323141691938957647524629321100730892642299315048344741147174333987120659099137669279484954439586031088106347180)*x + (23195663452917733799943592068673676075399350204046561381988245527795962231462994195605717014083674410218595963349696798015811249187*i+23720891005491096156820525679017555195180170593339789765980387487779364340992298687053160100673838871577275377162201011190798620751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20736943690464366730197159999606899196612966320290483640589136785879329816951528950280812055936255208275849979308567496463141472677*i+9482926006414984190764908847876251155105763745660197858895197233746359025854394112627204662336631271400013386228506756701611400466)*x + (18376278328741096488206756386266219065174699660628973308913886543084821035184748082335355715948199645730853635034864101419195528456*i+24305001144557319127813483217257651473708626206264890979556098371187281865180329160085311320984339187818615770166096965381619052021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20736943690464366730197159999606899196612966320290483640589136785879329816951528950280812055936255208275849979308567496463141472677*i+9482926006414984190764908847876251155105763745660197858895197233746359025854394112627204662336631271400013386228506756701611400466)*x + (18376278328741096488206756386266219065174699660628973308913886543084821035184748082335355715948199645730853635034864101419195528456*i+24305001144557319127813483217257651473708626206264890979556098371187281865180329160085311320984339187818615770166096965381619052021) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3770689789570784419060298764880947363370428164305976031660218997704134491960537931782742920163972434024357680891119428479456013797*i+6243085353088060859199825210241432982306520737278488451865578740937368946307174433453428427141884488212359011521605573950159468575)*x + (24293482665517100312386059292406975928941507243896077424993688669708752936996373496221053723152038275534445531583948644678997619432*i+20807956402297648973949336629189341917306573231659283176242399841047414557357481538827991575315577782396998645570927394720049237881) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3770689789570784419060298764880947363370428164305976031660218997704134491960537931782742920163972434024357680891119428479456013797*i+6243085353088060859199825210241432982306520737278488451865578740937368946307174433453428427141884488212359011521605573950159468575)*x + (24293482665517100312386059292406975928941507243896077424993688669708752936996373496221053723152038275534445531583948644678997619432*i+20807956402297648973949336629189341917306573231659283176242399841047414557357481538827991575315577782396998645570927394720049237881) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3214957398800288890569368277286471385348652159795057984176829150940504585697449231137258099307269772944301303689124903457243984210*i+6884615787938394052647301362003793851450760872880663388170232475990514344723357613998410175082030558168544207022140621833487112735)*x + (16631115304279296185424771850418123491718851464010887032779207800349263368544219822908972530400655211918295382465818883426585371581*i+17089824826532981686517147201183747705420196484891414350746672345787407074629178219384059398118175400628887533150238373968131747202) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3214957398800288890569368277286471385348652159795057984176829150940504585697449231137258099307269772944301303689124903457243984210*i+6884615787938394052647301362003793851450760872880663388170232475990514344723357613998410175082030558168544207022140621833487112735)*x + (16631115304279296185424771850418123491718851464010887032779207800349263368544219822908972530400655211918295382465818883426585371581*i+17089824826532981686517147201183747705420196484891414350746672345787407074629178219384059398118175400628887533150238373968131747202) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2576228300188896143043923595397438120079917468595970840423854018197384951928306478427208964793013279727047053547776568112109311960*i+12013936026043823651548497991985459840323856131956951861584940735403598439974755747468783668945481506711946477507835458833627870481)*x + (15086179969864460343536307673246335702954400737433908218937080495255285387828045018786703609690559521714455736753233904320326119811*i+11341855877515438734854486237969905862633868758973481647131040636145711646861510526927923332620156640366806370887795537096501265149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2576228300188896143043923595397438120079917468595970840423854018197384951928306478427208964793013279727047053547776568112109311960*i+12013936026043823651548497991985459840323856131956951861584940735403598439974755747468783668945481506711946477507835458833627870481)*x + (15086179969864460343536307673246335702954400737433908218937080495255285387828045018786703609690559521714455736753233904320326119811*i+11341855877515438734854486237969905862633868758973481647131040636145711646861510526927923332620156640366806370887795537096501265149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17958731985620775401690658265026004824580859822418539761651107975923598212595750641949112850154242250471496494040259259468897438734*i+3496263131324880630245393202556963977866338606851588978994060877721638686882588899218965416610644569973535102796401847030618421626)*x + (10935474998725982804393776596033426487759324011042839538396652275433008282201069136201816688851155028851010974874273969413366409653*i+11761459575844184515077095280903157279975360002235925454756801328775077546175099131018668721417677993221194826960095448579505698423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17958731985620775401690658265026004824580859822418539761651107975923598212595750641949112850154242250471496494040259259468897438734*i+3496263131324880630245393202556963977866338606851588978994060877721638686882588899218965416610644569973535102796401847030618421626)*x + (10935474998725982804393776596033426487759324011042839538396652275433008282201069136201816688851155028851010974874273969413366409653*i+11761459575844184515077095280903157279975360002235925454756801328775077546175099131018668721417677993221194826960095448579505698423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18336194147095908333877302884511227413991477255580181203640811288169458996437768339387469338371032428555539074632398974803426054375*i+23202814649015521584872092575440596826235870838550783458235325022936777233247000272514638700605485459278059221344754379597093524598)*x + (23117570405296754449737263523713097430972530954004374880803399259299222983295332060757744801480179154097728264948747829473277653086*i+3143976293855645304617775408640374460408423054587246862517991335649824009149123268220372885134884051008796347244616100115468261048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18336194147095908333877302884511227413991477255580181203640811288169458996437768339387469338371032428555539074632398974803426054375*i+23202814649015521584872092575440596826235870838550783458235325022936777233247000272514638700605485459278059221344754379597093524598)*x + (23117570405296754449737263523713097430972530954004374880803399259299222983295332060757744801480179154097728264948747829473277653086*i+3143976293855645304617775408640374460408423054587246862517991335649824009149123268220372885134884051008796347244616100115468261048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14373364267542389328205986082885136670479529448709000387172818602719486964894155994196522010476882944020927856739863633015747690825*i+17531360892068180145410896075314838979067721827088271003523972017168123522813918234625750467873684189509799068989505761308858095025)*x + (7306329169405902234356331949461644494282985520120310660615446728989881243019847729345829501869812697424560268412030358998021603980*i+3660509482430473547973279731165872613602280284665520386702092830573223124813310047270216220833349789396865537324720727228053691898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14373364267542389328205986082885136670479529448709000387172818602719486964894155994196522010476882944020927856739863633015747690825*i+17531360892068180145410896075314838979067721827088271003523972017168123522813918234625750467873684189509799068989505761308858095025)*x + (7306329169405902234356331949461644494282985520120310660615446728989881243019847729345829501869812697424560268412030358998021603980*i+3660509482430473547973279731165872613602280284665520386702092830573223124813310047270216220833349789396865537324720727228053691898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23403148278039761367107390157952938386887094985703966367170467892368490586876364449272953329511606586954603085473018399337254253185*i+18828142043002507277666173319651044181732850141682372394971349564192184702926363446646159419930074358177164680195285043901887957880)*x + (8409572562598021489937392962457996308570150941221837807505950708915382052819726817459488143184535995775650436338911686961340989898*i+20265069076278684968189101635526058582648200412089464346137232723032468634161302412913202365318950725164746206670562083078762012341) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23403148278039761367107390157952938386887094985703966367170467892368490586876364449272953329511606586954603085473018399337254253185*i+18828142043002507277666173319651044181732850141682372394971349564192184702926363446646159419930074358177164680195285043901887957880)*x + (8409572562598021489937392962457996308570150941221837807505950708915382052819726817459488143184535995775650436338911686961340989898*i+20265069076278684968189101635526058582648200412089464346137232723032468634161302412913202365318950725164746206670562083078762012341) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7417615838129231012336597381698767077283211735690012807170653045894879521539408280273955246048382247162599739580421970729263378822*i+9827973707814261735169093059205488055986041984546645862699670860452796397635205599839825450942279880087004505112349829054802274420)*x + (21418622754973098207254531008630461485128901374912602323290361813250221105175416721844814364622467392062007722305350768154129193341*i+5926988000000111804601800055849788468775179479212758647526247312855842339605742046004340845872556342011814162845548040478059466467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7417615838129231012336597381698767077283211735690012807170653045894879521539408280273955246048382247162599739580421970729263378822*i+9827973707814261735169093059205488055986041984546645862699670860452796397635205599839825450942279880087004505112349829054802274420)*x + (21418622754973098207254531008630461485128901374912602323290361813250221105175416721844814364622467392062007722305350768154129193341*i+5926988000000111804601800055849788468775179479212758647526247312855842339605742046004340845872556342011814162845548040478059466467) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12801070987834576428229755462207161281223662054398456359215664727113098407064927612267937197645718552489331255172511354114294101589*i+21917187637019655590640939851119818352928564882191674926798267443485976918239720793250489092065862483085105932631261575439085597743)*x + (16253277255349737005990067802936217473365297293719220130761983166876408767036227384181310979381658372260144784047241059550141954059*i+15855764145811278626389369162345542144403664677558026872332165227609244085452214989580806695100092216454724611647512615581948828547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12801070987834576428229755462207161281223662054398456359215664727113098407064927612267937197645718552489331255172511354114294101589*i+21917187637019655590640939851119818352928564882191674926798267443485976918239720793250489092065862483085105932631261575439085597743)*x + (16253277255349737005990067802936217473365297293719220130761983166876408767036227384181310979381658372260144784047241059550141954059*i+15855764145811278626389369162345542144403664677558026872332165227609244085452214989580806695100092216454724611647512615581948828547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20862377036729552883878279826576836488637593919935423911666345839920620184900215587017049278555874615324699463326546615192157543741*i+1607834573542111036120288503189260405074575331481245260505338870965597333879772096089015912342367048846669352792047846421919173581)*x + (2706963323673093046846185532706430439536968549678918335243533966445919093347348205017397757453469128778392738877847106203883491626*i+22800549313605890058286125198744427485334694212965285356516108967611226546276912539224079976163038909204570561773907296720526876007) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20862377036729552883878279826576836488637593919935423911666345839920620184900215587017049278555874615324699463326546615192157543741*i+1607834573542111036120288503189260405074575331481245260505338870965597333879772096089015912342367048846669352792047846421919173581)*x + (2706963323673093046846185532706430439536968549678918335243533966445919093347348205017397757453469128778392738877847106203883491626*i+22800549313605890058286125198744427485334694212965285356516108967611226546276912539224079976163038909204570561773907296720526876007) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18036490461835409902488349847863510663858770910093624826021797239260414518009800294736672548240968254876756582869077954649274791475*i+895598019462208577336996089094871136001383863481239751570490558553425000701455741516613831623462549565282615450794495380841907713)*x + (11754016612422832631073875673585963612336001195719715386576274312606676270071571259121905474519557794335377509012863584671095882694*i+8791726648821667462042168187730312793032398561867377104860249283448120145154387087988164877515112371829535582552037771659511025152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18036490461835409902488349847863510663858770910093624826021797239260414518009800294736672548240968254876756582869077954649274791475*i+895598019462208577336996089094871136001383863481239751570490558553425000701455741516613831623462549565282615450794495380841907713)*x + (11754016612422832631073875673585963612336001195719715386576274312606676270071571259121905474519557794335377509012863584671095882694*i+8791726648821667462042168187730312793032398561867377104860249283448120145154387087988164877515112371829535582552037771659511025152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9771945335453960647120285121331322594934588694029794140442002903084402250886997247085750486496387746291064908886166480283831009902*i+22040221041118478594090777082027584547485364218690762118252583140014511712105570014985899967600858246524361237707449328235616707745)*x + (5857291227212126670830356163823166495525471096598305682795223272941149951323509535023772744590531980750636955094850069076264223176*i+14819083957373786899903077234561540997248608866502504636423779542720810577469903158130557531335169077532739185423246139451027499785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9771945335453960647120285121331322594934588694029794140442002903084402250886997247085750486496387746291064908886166480283831009902*i+22040221041118478594090777082027584547485364218690762118252583140014511712105570014985899967600858246524361237707449328235616707745)*x + (5857291227212126670830356163823166495525471096598305682795223272941149951323509535023772744590531980750636955094850069076264223176*i+14819083957373786899903077234561540997248608866502504636423779542720810577469903158130557531335169077532739185423246139451027499785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18313262823605481093690183740648760345828657538638504470234235342370453426426007714458794961978167012767218727373081121488787608729*i+1798425071772418924686985095887074044955728527899761489082971615027990396887676616543478848731902649373968134876663553397046234693)*x + (15100785863146384913458191774295576975517394227232081544597768745695474501255536559553142521484961294425395582622104980290449987459*i+16336846407472019491023077091544967226519115090202418857806622105443033218191769978642289450794746389625854287957927499695918584447) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18313262823605481093690183740648760345828657538638504470234235342370453426426007714458794961978167012767218727373081121488787608729*i+1798425071772418924686985095887074044955728527899761489082971615027990396887676616543478848731902649373968134876663553397046234693)*x + (15100785863146384913458191774295576975517394227232081544597768745695474501255536559553142521484961294425395582622104980290449987459*i+16336846407472019491023077091544967226519115090202418857806622105443033218191769978642289450794746389625854287957927499695918584447) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14206888647619610840963590964130806456922371621601695537596277997797576491672366723707815533926311415380184513931085353707546434240*i+3472191320125626093043499863488698042962982720271142098147012116673677100077704168042439596059801027261817299143396433744734818110)*x + (17010382137674578444628297520157430200843316692446017662678904518074889827431337046876397649571658239843403969366039277878059729532*i+12906170092206193906723982307565976711813581494434145742791247026843785294637892822048365789275126726327207023137162498766474939238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14206888647619610840963590964130806456922371621601695537596277997797576491672366723707815533926311415380184513931085353707546434240*i+3472191320125626093043499863488698042962982720271142098147012116673677100077704168042439596059801027261817299143396433744734818110)*x + (17010382137674578444628297520157430200843316692446017662678904518074889827431337046876397649571658239843403969366039277878059729532*i+12906170092206193906723982307565976711813581494434145742791247026843785294637892822048365789275126726327207023137162498766474939238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7716318516152073090388002431507594411769103614287833018288401260524609930885493845194933865038410351718663044082895063486704926299*i+15654717116501743290005216206201069646730607383421314089700286170475476598617690842451615205488097951529079437857346157374679137535)*x + (14618818163005063369506538198050131886025274783755248099879878128632328091094290820950666729523467763587654396833846690869833762664*i+16716796433531895374892169467700991305104585846228125054989385026912372047422961297847769760899345246316967076656700367281532828857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7716318516152073090388002431507594411769103614287833018288401260524609930885493845194933865038410351718663044082895063486704926299*i+15654717116501743290005216206201069646730607383421314089700286170475476598617690842451615205488097951529079437857346157374679137535)*x + (14618818163005063369506538198050131886025274783755248099879878128632328091094290820950666729523467763587654396833846690869833762664*i+16716796433531895374892169467700991305104585846228125054989385026912372047422961297847769760899345246316967076656700367281532828857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12103621216051709287157653255137669202908408629484385308026403906700846916530011371548265280729765046926131399112030854183153402652*i+11574255230521556347495313857573168948733037901783268606619265030921774705855636682082451302863239255205872807914023062285380447380)*x + (7268077627121448322070566148764659981541723365592176124908497930562440940342388307083373119761544118115927324035846997077712454005*i+13144150520499070690820510252519467059630656431360643778389318374872126940266566887354198545272594084218695967254796663429641008448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12103621216051709287157653255137669202908408629484385308026403906700846916530011371548265280729765046926131399112030854183153402652*i+11574255230521556347495313857573168948733037901783268606619265030921774705855636682082451302863239255205872807914023062285380447380)*x + (7268077627121448322070566148764659981541723365592176124908497930562440940342388307083373119761544118115927324035846997077712454005*i+13144150520499070690820510252519467059630656431360643778389318374872126940266566887354198545272594084218695967254796663429641008448) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16873913731331558372424515137572619708830754654760654848177689567298549994924621826473554715434672676740336888479704054784825785800*i+12712953894910385175317216491529702432884351391350892912937650535539086051913259712756659385568920443503560760103124130209678794575)*x + (5559807891590741672498055450113332480282659732416014838595336313602192045703709072769843320191498548045106117686776803410339702275*i+10463357365694618524153365720740219335941637688882813288890316457806527103582773355292541407927722798786488141813343014565235169920) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16873913731331558372424515137572619708830754654760654848177689567298549994924621826473554715434672676740336888479704054784825785800*i+12712953894910385175317216491529702432884351391350892912937650535539086051913259712756659385568920443503560760103124130209678794575)*x + (5559807891590741672498055450113332480282659732416014838595336313602192045703709072769843320191498548045106117686776803410339702275*i+10463357365694618524153365720740219335941637688882813288890316457806527103582773355292541407927722798786488141813343014565235169920) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9621921878645548933640851122644737553028285780728002853904866581041934551944251727304243638382146836491268003938820383273538510567*i+16527412026301876842058952437234693469614265053874054620086156207855583098978898017000785581737608986631364236022134166235664247726)*x + (17303279805636551089382922990740660602089729433747353751482163387002965102556252125590137123905831133198992679111708287408978069701*i+12737179132076621153158954676331426838952703641285408007189821170041590854906596631581711015977238293863076730952934376782597471008) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9621921878645548933640851122644737553028285780728002853904866581041934551944251727304243638382146836491268003938820383273538510567*i+16527412026301876842058952437234693469614265053874054620086156207855583098978898017000785581737608986631364236022134166235664247726)*x + (17303279805636551089382922990740660602089729433747353751482163387002965102556252125590137123905831133198992679111708287408978069701*i+12737179132076621153158954676331426838952703641285408007189821170041590854906596631581711015977238293863076730952934376782597471008) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9539116304401572030255410602498101852678179112039763262773920536522694098826341188126156422099123433560454124139883548281791898526*i+8997504981206088215120894964120953910371757586678185637304856853856078809965682203548244467497344310231974778220348390183360099978)*x + (7913714103126800808392905008754676719419219763653941145839021422320260739092099356315314345913995272825665573464617501244996356907*i+14918137074290831590086086153629580262314238191051847337620201196124731187870448811500665408900548416801694059328389932848210434204) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9539116304401572030255410602498101852678179112039763262773920536522694098826341188126156422099123433560454124139883548281791898526*i+8997504981206088215120894964120953910371757586678185637304856853856078809965682203548244467497344310231974778220348390183360099978)*x + (7913714103126800808392905008754676719419219763653941145839021422320260739092099356315314345913995272825665573464617501244996356907*i+14918137074290831590086086153629580262314238191051847337620201196124731187870448811500665408900548416801694059328389932848210434204) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4521185873615902036187690088473477211312827297433579361199662905095654647934576471188323314699139726267408910062591217490154918659*i+19941953645457197089440671819268450229137870912920446336323034190910971955951205805711894476822899088016621628549342748581510706045)*x + (23440431373490863276852711438757753503799251021036192868162900460476890680128323210261837101954251759715956979899632399153663967114*i+13322582056476505043875034264183402490383566219272212553023143085434591723844815682252425804170266757620738606192654425582389015620) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4521185873615902036187690088473477211312827297433579361199662905095654647934576471188323314699139726267408910062591217490154918659*i+19941953645457197089440671819268450229137870912920446336323034190910971955951205805711894476822899088016621628549342748581510706045)*x + (23440431373490863276852711438757753503799251021036192868162900460476890680128323210261837101954251759715956979899632399153663967114*i+13322582056476505043875034264183402490383566219272212553023143085434591723844815682252425804170266757620738606192654425582389015620) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19780140460270921317970487014133088830493876435722838179142889114981353909680170352962422933224237406920682447838940354593026773460*i+13192922081068998499779156067154491709688644715501636075676273524547849200186577040156893732792984273228046352901955177869363458826)*x + (23508085965754720278076212255080914240078417903975027126600942190775847642441085648895563623620633791495588061993296138690188537854*i+1495834933904872925015148390648155552312597758760411986246252794624769098087082300742837086928636615116141267724640553832141915204) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19780140460270921317970487014133088830493876435722838179142889114981353909680170352962422933224237406920682447838940354593026773460*i+13192922081068998499779156067154491709688644715501636075676273524547849200186577040156893732792984273228046352901955177869363458826)*x + (23508085965754720278076212255080914240078417903975027126600942190775847642441085648895563623620633791495588061993296138690188537854*i+1495834933904872925015148390648155552312597758760411986246252794624769098087082300742837086928636615116141267724640553832141915204) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18511863528480565411579162109848260231970961572468389334866511084613911626632637439616750413990998920433802615124819395461291474126*i+13631393225971443245711883287860212662975096888567271129869068718120141401566162585195338195983173717539919808311954517160203211755)*x + (19417009133352594196661953241367531511238144284662367161376034415859127740567138694705382164789707700049359390301278915881428754999*i+8263833608032854623268700542405986520952500689036383187708022113777809446113620255640630573501099776726074012310034746439323181915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18511863528480565411579162109848260231970961572468389334866511084613911626632637439616750413990998920433802615124819395461291474126*i+13631393225971443245711883287860212662975096888567271129869068718120141401566162585195338195983173717539919808311954517160203211755)*x + (19417009133352594196661953241367531511238144284662367161376034415859127740567138694705382164789707700049359390301278915881428754999*i+8263833608032854623268700542405986520952500689036383187708022113777809446113620255640630573501099776726074012310034746439323181915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1195568896833509136147444816345406295518938105929665803010690524468060661947788695320580750187994108882097158200161731008567859886*i+23914984427292703973873469019280192022564066007285791144488604500831856089370833804426876101997277260244375182861321591721966360757)*x + (21262716095987597627702014950178450389003954563275967500589516063655178801628021862529010697962337986406037780928099641178780458175*i+17333789150578744122373016558764671909028225619802775674106618127891225865685684441569185950373385010678841199548091381613395485675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1195568896833509136147444816345406295518938105929665803010690524468060661947788695320580750187994108882097158200161731008567859886*i+23914984427292703973873469019280192022564066007285791144488604500831856089370833804426876101997277260244375182861321591721966360757)*x + (21262716095987597627702014950178450389003954563275967500589516063655178801628021862529010697962337986406037780928099641178780458175*i+17333789150578744122373016558764671909028225619802775674106618127891225865685684441569185950373385010678841199548091381613395485675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15836463924539296672583073775259907342962204309945860599572277931546205394861821600048845421311631064809233364772303522885616219689*i+15028014952606241687899786673235825399542582764644324977497748791838667000865318453812533306837417038385079336216628058024604725662)*x + (21759906552557293333823194938212143331854729629365336543096045243276050443943662197638432405422218039807270115511421359721899037630*i+9186009690996051799308998244223227526064389234460459311700126769716827748109720952826238923684871930883065527329086254034548970831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15836463924539296672583073775259907342962204309945860599572277931546205394861821600048845421311631064809233364772303522885616219689*i+15028014952606241687899786673235825399542582764644324977497748791838667000865318453812533306837417038385079336216628058024604725662)*x + (21759906552557293333823194938212143331854729629365336543096045243276050443943662197638432405422218039807270115511421359721899037630*i+9186009690996051799308998244223227526064389234460459311700126769716827748109720952826238923684871930883065527329086254034548970831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9147064938747855774789447249975048693400990058991896915219847779327626572669256183400784070776377204754233424161321401393484666628*i+23149297253485417416426139279694600060288062954050678406574825924116416769911855632273679147394544260927725918910613764901281233979)*x + (14901722247262940386819348829778536076535903549034052701268369022632320455838721942671695008080121732763070041617594769462120681925*i+18771415358546491500901772757125793227424096149743321590622019283335983570716811927266019537452228586408317177128636725979588996468) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9147064938747855774789447249975048693400990058991896915219847779327626572669256183400784070776377204754233424161321401393484666628*i+23149297253485417416426139279694600060288062954050678406574825924116416769911855632273679147394544260927725918910613764901281233979)*x + (14901722247262940386819348829778536076535903549034052701268369022632320455838721942671695008080121732763070041617594769462120681925*i+18771415358546491500901772757125793227424096149743321590622019283335983570716811927266019537452228586408317177128636725979588996468) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6710106833833593857444281975981540848940080990582904934265130605111332340923167026037711683886455329214756815528841045538449174024*i+5576019522163679844461921866873409160637446313562548676585641405722151076772183406323281679596244987602318178082349976720898329699)*x + (6376037853647215583541357991711280585876274101482296934928111716768474067758663251905201848134584811060145803621532915013253016292*i+18780214772979891381266278552900263507770725589506132470760105835279420052862127508254629000159473254626460080944723368288038346857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6710106833833593857444281975981540848940080990582904934265130605111332340923167026037711683886455329214756815528841045538449174024*i+5576019522163679844461921866873409160637446313562548676585641405722151076772183406323281679596244987602318178082349976720898329699)*x + (6376037853647215583541357991711280585876274101482296934928111716768474067758663251905201848134584811060145803621532915013253016292*i+18780214772979891381266278552900263507770725589506132470760105835279420052862127508254629000159473254626460080944723368288038346857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8143936519191371834003595645187657851954542027127986525714954505877519396132186867961932861698314298674318141389664906176658241494*i+21361508501050439987386002039684436970007439997309845040727915886067449607492556041705091787674908650437380374123147279231081205450)*x + (3582218816263583047057385378645354647616536189408649470899008031082790052870151328538691950646593920789577772309045856982726248241*i+9159431049552116507386152105999731811614157830525655512389630412792524810161933820416956077329042177287223452911062268388150545594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8143936519191371834003595645187657851954542027127986525714954505877519396132186867961932861698314298674318141389664906176658241494*i+21361508501050439987386002039684436970007439997309845040727915886067449607492556041705091787674908650437380374123147279231081205450)*x + (3582218816263583047057385378645354647616536189408649470899008031082790052870151328538691950646593920789577772309045856982726248241*i+9159431049552116507386152105999731811614157830525655512389630412792524810161933820416956077329042177287223452911062268388150545594) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7814883959383171147661621096222857280815112394697737730298852102008391482124892287673242576817406691884796192593147228652260483651*i+12520162027355423793709460316373282705266053774117795308103810250384537356484551030161117356418428235862654751172650396040949084415)*x + (24359885727017531709625558411250267979996545821827165011494856955788799475639239371912981661371158269611279861101320207502368782419*i+2212164145492301089350012022851723814104440014109607506978172377729407473794906461003230487670162058752230511367373644208811825281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7814883959383171147661621096222857280815112394697737730298852102008391482124892287673242576817406691884796192593147228652260483651*i+12520162027355423793709460316373282705266053774117795308103810250384537356484551030161117356418428235862654751172650396040949084415)*x + (24359885727017531709625558411250267979996545821827165011494856955788799475639239371912981661371158269611279861101320207502368782419*i+2212164145492301089350012022851723814104440014109607506978172377729407473794906461003230487670162058752230511367373644208811825281) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8594884099954562191546317760906329140318440227640223737096167322577059014580648527027893641117045530545991974134829907148169490689*i+5552441266056233844987300702768080714101229602166741216377692071543352556217029848904690760868861064778248601021533811281150275414)*x + (19755482297552250645072927004025734088803982401176095748634847614700977963834589962489847351117907171347637221310380643939588859563*i+20888617885098327715111269173779685373976297163746135878482813957769997419233105719723170918249007998422052152697172331649385673670) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8594884099954562191546317760906329140318440227640223737096167322577059014580648527027893641117045530545991974134829907148169490689*i+5552441266056233844987300702768080714101229602166741216377692071543352556217029848904690760868861064778248601021533811281150275414)*x + (19755482297552250645072927004025734088803982401176095748634847614700977963834589962489847351117907171347637221310380643939588859563*i+20888617885098327715111269173779685373976297163746135878482813957769997419233105719723170918249007998422052152697172331649385673670) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22751657817571186338306675002425604291818474570832011765249855008864185616445637794112211732501795858924025827565736443007091805060*i+2244127273169074909472950310697163559502899404611422658807572209617157104962802813703005741481569015835708494339736536655293278520)*x + (19624708701091354024911142060248576751453448355321328564142937223590017700576410113662999160261200886323978314847404637717579874778*i+6619371180031814081342298327738146924492160811135196101739595159330460000180105551209928921113877156984710631061723514473438413074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22751657817571186338306675002425604291818474570832011765249855008864185616445637794112211732501795858924025827565736443007091805060*i+2244127273169074909472950310697163559502899404611422658807572209617157104962802813703005741481569015835708494339736536655293278520)*x + (19624708701091354024911142060248576751453448355321328564142937223590017700576410113662999160261200886323978314847404637717579874778*i+6619371180031814081342298327738146924492160811135196101739595159330460000180105551209928921113877156984710631061723514473438413074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13697868752552082059991565052389952068580904428071184452271062032535152280048887751035333324195672255398227305205497972663595323635*i+15893625024841224185000741300513855931363449835810516179994890266686379414309963423802934661270686877057920932238467955127212447752)*x + (391603590481566759663130747984826784981921789605433325771280020939624833156408925066245855008470120611775467254999815833495566083*i+9909664742627795340716618342353432122389461878066032987436290671947278053866864179089679425345624433866695862626795074350513312092) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13697868752552082059991565052389952068580904428071184452271062032535152280048887751035333324195672255398227305205497972663595323635*i+15893625024841224185000741300513855931363449835810516179994890266686379414309963423802934661270686877057920932238467955127212447752)*x + (391603590481566759663130747984826784981921789605433325771280020939624833156408925066245855008470120611775467254999815833495566083*i+9909664742627795340716618342353432122389461878066032987436290671947278053866864179089679425345624433866695862626795074350513312092) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11711633965071617538385695652802224917511333118509403353111256448888272940839781475376933002532119268895233518080358555911646133148*i+13691854619131458667373057755862873335445267830384950446136749413479924194102684426677482561048364057704228710792963875103779238538)*x + (8531914979808684101836135147993373803485602852148705596238291525182113556375401631093793956106713996530444919575792238716403767470*i+12087253810435490491525002326033687301287581179170071868896734499128595379113073473666523118371205603787125042391510388876123576953) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11711633965071617538385695652802224917511333118509403353111256448888272940839781475376933002532119268895233518080358555911646133148*i+13691854619131458667373057755862873335445267830384950446136749413479924194102684426677482561048364057704228710792963875103779238538)*x + (8531914979808684101836135147993373803485602852148705596238291525182113556375401631093793956106713996530444919575792238716403767470*i+12087253810435490491525002326033687301287581179170071868896734499128595379113073473666523118371205603787125042391510388876123576953) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7130956842124827509198763239581358388393246563190339531726720183093333743389521003063258523717333607586786418611766929241768932523*i+21507584090971635419684902347346572412274124388846707286963612966876847005735146258348596316529794382456472106895760398394115112155)*x + (12079718572946887126186935179382245699611945585761703656294630719945637474332410054753946395460814503705245438783745628309354606554*i+1556963145296000701949757891454941521803831286686666843181293287694992533703195100593162062471855194969434996474730157415286266047) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7130956842124827509198763239581358388393246563190339531726720183093333743389521003063258523717333607586786418611766929241768932523*i+21507584090971635419684902347346572412274124388846707286963612966876847005735146258348596316529794382456472106895760398394115112155)*x + (12079718572946887126186935179382245699611945585761703656294630719945637474332410054753946395460814503705245438783745628309354606554*i+1556963145296000701949757891454941521803831286686666843181293287694992533703195100593162062471855194969434996474730157415286266047) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15649772245631597725277580826094127548231314641964941782935003312505408204144683529896576238619213405975857280770116385907608330504*i+7272712673369021220340020803477511513338411448719803653535548653628396468129407053344672932839769791616784625774963948801745650632)*x + (9644064379660340948987368371988930735909611403224141955660732722140217115006425446168594987183372310009742788566894329830318520723*i+16253203423136981791697479195156693659053417429139751618985516001972349655583425503703598863135439208279463930781317680126730744153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15649772245631597725277580826094127548231314641964941782935003312505408204144683529896576238619213405975857280770116385907608330504*i+7272712673369021220340020803477511513338411448719803653535548653628396468129407053344672932839769791616784625774963948801745650632)*x + (9644064379660340948987368371988930735909611403224141955660732722140217115006425446168594987183372310009742788566894329830318520723*i+16253203423136981791697479195156693659053417429139751618985516001972349655583425503703598863135439208279463930781317680126730744153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24323656287331610159801314260216397980647932957791029692862245007651176243162848158315534903570208878856653020601976416578644000896*i+8489185629194310270336305410490465375541497670542822048456991926523226559397226134110132128917028296387942934767627228819157672205)*x + (18116836955231823483029133679885495916131855890602271349364963067501346950623997563448920954155666269925200459153562910292664072395*i+15372598167415069067441071660220935228237893835026166813784981895105168789454767637380676452834883872197727445741681514287416956746) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24323656287331610159801314260216397980647932957791029692862245007651176243162848158315534903570208878856653020601976416578644000896*i+8489185629194310270336305410490465375541497670542822048456991926523226559397226134110132128917028296387942934767627228819157672205)*x + (18116836955231823483029133679885495916131855890602271349364963067501346950623997563448920954155666269925200459153562910292664072395*i+15372598167415069067441071660220935228237893835026166813784981895105168789454767637380676452834883872197727445741681514287416956746) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10022231946003021646482782617736431225102127100638444486824874855433522656240144661140205451150438203213147423850710204729902677475*i+22592058533010851422721573394914525737867958866163036672685393172409016941979985989467041844378813850170236121635780683613617453322)*x + (24204884049335949876982943645725236505714152023498681945600545478245666946991394244382330309461644245705940043192259126412951331664*i+18072553916379923031142222420102903329723602049403190254228593861947143602441368223952653481475555150650741594036811970533144626670) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10022231946003021646482782617736431225102127100638444486824874855433522656240144661140205451150438203213147423850710204729902677475*i+22592058533010851422721573394914525737867958866163036672685393172409016941979985989467041844378813850170236121635780683613617453322)*x + (24204884049335949876982943645725236505714152023498681945600545478245666946991394244382330309461644245705940043192259126412951331664*i+18072553916379923031142222420102903329723602049403190254228593861947143602441368223952653481475555150650741594036811970533144626670) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8479947106227759472755885205230877204534489193215803632942391466403890138618996163869530690476776941735489305410208770507248428486*i+5186271582300756855826817244039779351156206899053906412145314933934681678878150431783365276154812850748564005082607871675305991593)*x + (4633355900147245890113126099641742757040649983679656604670898089240183762587697465288453900449374963577251527224429903049957812119*i+5758280081401703240499028238998228236026524577925268397628446756602200120522180145107242845357489449093707271570202921380005900993) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8479947106227759472755885205230877204534489193215803632942391466403890138618996163869530690476776941735489305410208770507248428486*i+5186271582300756855826817244039779351156206899053906412145314933934681678878150431783365276154812850748564005082607871675305991593)*x + (4633355900147245890113126099641742757040649983679656604670898089240183762587697465288453900449374963577251527224429903049957812119*i+5758280081401703240499028238998228236026524577925268397628446756602200120522180145107242845357489449093707271570202921380005900993) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13896545441198245772025631268986923767937374864075423563870434609487279689530430180925957845577437379488172278333544828387999711277*i+15398674843078534246756976729468328803520728478656360674821800540316602757359147271929998101415586878013847510249906827112568655805)*x + (22547142149833972674676097388348383783139846944689110336954704253196206335291759086011994119254521639047757680623062527808652338854*i+7721260219799026971662564466278526628357662352055473389783926832785615605743440616886738582980100949082147670129065014329729677789) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13896545441198245772025631268986923767937374864075423563870434609487279689530430180925957845577437379488172278333544828387999711277*i+15398674843078534246756976729468328803520728478656360674821800540316602757359147271929998101415586878013847510249906827112568655805)*x + (22547142149833972674676097388348383783139846944689110336954704253196206335291759086011994119254521639047757680623062527808652338854*i+7721260219799026971662564466278526628357662352055473389783926832785615605743440616886738582980100949082147670129065014329729677789) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10993745639091501809671063044297462425002202821682866067304961024052405478469383598810107056644701717709281514493000433213063115305*i+5320816568659885732385866159121310720870359751867254866401062713959850631993564429708329316621264112358154886253514718007426048037)*x + (10961935243883459696101344514791738634517623518516728070971451270711698506859812499536769815977129008567507526216988830908587459686*i+6373703056149336921421810573531780888548196676962342191784647558419604998426325288236210147955522669968873502303460936708603422813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10993745639091501809671063044297462425002202821682866067304961024052405478469383598810107056644701717709281514493000433213063115305*i+5320816568659885732385866159121310720870359751867254866401062713959850631993564429708329316621264112358154886253514718007426048037)*x + (10961935243883459696101344514791738634517623518516728070971451270711698506859812499536769815977129008567507526216988830908587459686*i+6373703056149336921421810573531780888548196676962342191784647558419604998426325288236210147955522669968873502303460936708603422813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8898328335330964377115655561821279921933470483163633308903767845550009247439759702140940511564523116697445524460365688133267191214*i+7449144278811028869497351560361144190727673092225347692525965651031063980632869767060077158077297503793727056463479592120963725810)*x + (5213274477714350987857158210238597253918213883576505818335175836182895771220820209073535966264730763088347051011295893151262768363*i+4366442333831929610542304097494029382255190942075039444979027851323692985857935568915914402859251016255443615785551642235970674571) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8898328335330964377115655561821279921933470483163633308903767845550009247439759702140940511564523116697445524460365688133267191214*i+7449144278811028869497351560361144190727673092225347692525965651031063980632869767060077158077297503793727056463479592120963725810)*x + (5213274477714350987857158210238597253918213883576505818335175836182895771220820209073535966264730763088347051011295893151262768363*i+4366442333831929610542304097494029382255190942075039444979027851323692985857935568915914402859251016255443615785551642235970674571) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10817604010848545361979786308955607608792573504432138630405094256464910271645037461575908444595807082587530720490555345258342177334*i+12593805721255805135877201631224353776986064420504661242842946596980573525390789933258688441917826581197064633681735502670902374360)*x + (17447423356681040562019410095821502627884530542232307876771627153981483552593962246197567664108415497524536791228724116306209003585*i+10834017603990137872638246407610540566618374343867904485334416046239880718909782558404762004251191119048512401131681199839228637181) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10817604010848545361979786308955607608792573504432138630405094256464910271645037461575908444595807082587530720490555345258342177334*i+12593805721255805135877201631224353776986064420504661242842946596980573525390789933258688441917826581197064633681735502670902374360)*x + (17447423356681040562019410095821502627884530542232307876771627153981483552593962246197567664108415497524536791228724116306209003585*i+10834017603990137872638246407610540566618374343867904485334416046239880718909782558404762004251191119048512401131681199839228637181) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7111001309822453159442990568624797431854523715053882015102541162620112551133395316427978807600656015428774337226915484696532878521*i+10258154620680215746559751373525738311482556521354248119438814016587070117832300008884164403381843324266880202730334718790889124974)*x + (12789862801473038450084393962653303479358334847129884755492452790814388780321920170972959352188439994561772071136207228531057297422*i+1950233503175720671003907627815738254644911950443960070099375092613749289802840090004627825300454438969778271123790351314877531922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7111001309822453159442990568624797431854523715053882015102541162620112551133395316427978807600656015428774337226915484696532878521*i+10258154620680215746559751373525738311482556521354248119438814016587070117832300008884164403381843324266880202730334718790889124974)*x + (12789862801473038450084393962653303479358334847129884755492452790814388780321920170972959352188439994561772071136207228531057297422*i+1950233503175720671003907627815738254644911950443960070099375092613749289802840090004627825300454438969778271123790351314877531922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5708995016592082339343495646008627821377318228529127638523561090418754013796321571855076669939827569962014757718121623249282514710*i+24182211325279692898799397214367733847964141357833067431127219296528824547779258788467792123707997399874805867553384884727073360098)*x + (21156289376090167556612319544249189563144720504026096436827955124869278212706405288430524222775210210364812079516248560756395509401*i+21306871777098226976798229706062949102132906948417018827959213500321677211692658115450646953724745050617416352035019431695036200667) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5708995016592082339343495646008627821377318228529127638523561090418754013796321571855076669939827569962014757718121623249282514710*i+24182211325279692898799397214367733847964141357833067431127219296528824547779258788467792123707997399874805867553384884727073360098)*x + (21156289376090167556612319544249189563144720504026096436827955124869278212706405288430524222775210210364812079516248560756395509401*i+21306871777098226976798229706062949102132906948417018827959213500321677211692658115450646953724745050617416352035019431695036200667) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12947876621307977148412422942803549471051771069760068179665466979000877584650656406433874787305353637319844696067899006471391739316*i+4719104924415515480229668816340575543023980865268764893990218236365284800447781174454282576233645199346567940363876349085919691250)*x + (8821985756363098117468185894183446539899823425069948042598620144003344107078006136502651544742097056992236796947806223421750899657*i+18528098619710002930562068637348307706790953951426291980903396835986810239269683253221617914380840141012119177943966023342191419102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12947876621307977148412422942803549471051771069760068179665466979000877584650656406433874787305353637319844696067899006471391739316*i+4719104924415515480229668816340575543023980865268764893990218236365284800447781174454282576233645199346567940363876349085919691250)*x + (8821985756363098117468185894183446539899823425069948042598620144003344107078006136502651544742097056992236796947806223421750899657*i+18528098619710002930562068637348307706790953951426291980903396835986810239269683253221617914380840141012119177943966023342191419102) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10665118645679315876939050550245428719642564925540519946877788881929174589485617401209683520760841202140982152029893191366302196551*i+7372122159395750718738117998772245071029853650983536405627902500325995239338447475347334170089226807041291983237964615430196616713)*x + (14972412179756181510354524525545706666445857656384445084140700834176686408305175888779302115433305763420091521306867992122634915671*i+23361814211115834208080877476507940447612066257136974651381988159854577307430879690890494170793955340742776166158767376729634492036) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10665118645679315876939050550245428719642564925540519946877788881929174589485617401209683520760841202140982152029893191366302196551*i+7372122159395750718738117998772245071029853650983536405627902500325995239338447475347334170089226807041291983237964615430196616713)*x + (14972412179756181510354524525545706666445857656384445084140700834176686408305175888779302115433305763420091521306867992122634915671*i+23361814211115834208080877476507940447612066257136974651381988159854577307430879690890494170793955340742776166158767376729634492036) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18756133259982855960058369349442238115337378916847119247196706124953278915685804484771099778146035868180854801098591639433688188939*i+5607556395801156595877452308305788935686358762690536920171998438441199358434600454208970387439079383488554038755107048812928545765)*x + (177449375069254565338360138245767233967448630366629203614369359044542789437224988510473334398279046457306706605486575966863021672*i+16707664184683184821968282716008779003907595502985062692287154804163701070759289453833352915753916119159618085064965607473457836861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18756133259982855960058369349442238115337378916847119247196706124953278915685804484771099778146035868180854801098591639433688188939*i+5607556395801156595877452308305788935686358762690536920171998438441199358434600454208970387439079383488554038755107048812928545765)*x + (177449375069254565338360138245767233967448630366629203614369359044542789437224988510473334398279046457306706605486575966863021672*i+16707664184683184821968282716008779003907595502985062692287154804163701070759289453833352915753916119159618085064965607473457836861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15350032406736161981865092947851826379754970122299533014837980469157706781576248351011686894621313934518776162426673779062584413298*i+18493749465283511361242814381303629263763266291848819240746551621296295402360625344646522597425793435920098165683276855213847591728)*x + (651995461068922972231899883561590508208067146375432919254573657552415937317487198598247284734373685763424824932591179691167491488*i+9442372989325479799794595251099989496334762914394961952528135055920372596440120982989849006032319560102594329509832284284017650323) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15350032406736161981865092947851826379754970122299533014837980469157706781576248351011686894621313934518776162426673779062584413298*i+18493749465283511361242814381303629263763266291848819240746551621296295402360625344646522597425793435920098165683276855213847591728)*x + (651995461068922972231899883561590508208067146375432919254573657552415937317487198598247284734373685763424824932591179691167491488*i+9442372989325479799794595251099989496334762914394961952528135055920372596440120982989849006032319560102594329509832284284017650323) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9986207302293359098030231324749148014917460910582781711595390690143664502401773206574723097630196856747174412980789601028637598514*i+17709014503277386430727574204908780418654527601136786806318392548933240683651144303181549101559881275068563810766540926474593999518)*x + (20420543455903096156184294541902880101550958602758102192523271257513211659283044830835265975152378523869082542664411231517535998168*i+14740227062242057459091006268765129971260011998308190984132711333585221391559708957481516975959808606533034046841113160691535981797) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9986207302293359098030231324749148014917460910582781711595390690143664502401773206574723097630196856747174412980789601028637598514*i+17709014503277386430727574204908780418654527601136786806318392548933240683651144303181549101559881275068563810766540926474593999518)*x + (20420543455903096156184294541902880101550958602758102192523271257513211659283044830835265975152378523869082542664411231517535998168*i+14740227062242057459091006268765129971260011998308190984132711333585221391559708957481516975959808606533034046841113160691535981797) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12165530623037854982586018520743599248766539223093074952673678533187514168241861618429737331192291978911609958296315707682208328704*i+10075707381728440164848132722356324682549957899429920683496811382466652440536917716517480771541700708984519785998051705542445449412)*x + (4825720975926719504124438247943038574271037755371228929437834777861240111436115623463715078872013895570426494735582637228915643980*i+21438617119055110467199083366164450904707445166883478318444357861832723875418981670948288519810849340853766860702520568366486183980) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12165530623037854982586018520743599248766539223093074952673678533187514168241861618429737331192291978911609958296315707682208328704*i+10075707381728440164848132722356324682549957899429920683496811382466652440536917716517480771541700708984519785998051705542445449412)*x + (4825720975926719504124438247943038574271037755371228929437834777861240111436115623463715078872013895570426494735582637228915643980*i+21438617119055110467199083366164450904707445166883478318444357861832723875418981670948288519810849340853766860702520568366486183980) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2673106964977560976078836294329126855077853100859986568546409822630725464902285710666243473631315810462640556014609772101383479442*i+23501432406248688808780207626621431543575936720857682481658541650501656897617087372459281431360148732817622406567457142160217079539)*x + (7133432190250855546356950414058751404874843643962486024925402053091905279034449683024166144483489212533866864128748914616157694167*i+18393773245988013391287379300575075081923593121001178832535509802991992564877039659304247001013727403594327604768518876967477556321) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2673106964977560976078836294329126855077853100859986568546409822630725464902285710666243473631315810462640556014609772101383479442*i+23501432406248688808780207626621431543575936720857682481658541650501656897617087372459281431360148732817622406567457142160217079539)*x + (7133432190250855546356950414058751404874843643962486024925402053091905279034449683024166144483489212533866864128748914616157694167*i+18393773245988013391287379300575075081923593121001178832535509802991992564877039659304247001013727403594327604768518876967477556321) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12630253363074009537902063764322421810877022000830449703300122070297372923364863384667126899679387947232816980195747053422902676348*i+7839617827440392184115103335191739311278589098752843569484753390617105043168470077322267255886842076382807262995517943175426466338)*x + (8573991738538412804892300522043636478826577534089259439030803189470030009823717505006862033350139702272017758527297830187861652294*i+2382967812881266026197125309543120997715924472749861582858697124741213130631197878364278064905999417842833804804042023774202114766) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12630253363074009537902063764322421810877022000830449703300122070297372923364863384667126899679387947232816980195747053422902676348*i+7839617827440392184115103335191739311278589098752843569484753390617105043168470077322267255886842076382807262995517943175426466338)*x + (8573991738538412804892300522043636478826577534089259439030803189470030009823717505006862033350139702272017758527297830187861652294*i+2382967812881266026197125309543120997715924472749861582858697124741213130631197878364278064905999417842833804804042023774202114766) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5380932798659447996244674402058030001910565449632323734447264476417725934568113772681052699068399155298221770085337050820680260835*i+20573662476412964758758266663855042080234446536472905650198670332238191903447056141872047782395783309722856033822442227168716329026)*x + (6349946873840867832567219520541090098944063073968126349172209050634829896396778046055869802244818755772862709151692366441593622828*i+20742414888635472081225524346703423685927200514127146466888687392383115820095805170692712872345052279030593719430102714066134026426) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5380932798659447996244674402058030001910565449632323734447264476417725934568113772681052699068399155298221770085337050820680260835*i+20573662476412964758758266663855042080234446536472905650198670332238191903447056141872047782395783309722856033822442227168716329026)*x + (6349946873840867832567219520541090098944063073968126349172209050634829896396778046055869802244818755772862709151692366441593622828*i+20742414888635472081225524346703423685927200514127146466888687392383115820095805170692712872345052279030593719430102714066134026426) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5571138147852169938550211988086446646676939079430862411577370857077447022739022290233103684844186992714365824117877825639183178957*i+12040709652355450449068669754664793233721716001112745042285118566348001149151717916198622638818040551825249447198609990545231225808)*x + (22369592961470603744115899190628757844131831039135568330389461406042189912211312108156842506778192371548108398997963830807659627353*i+10709098350911742887899879628124665421402589974982254454940703013692791375311573816666454201754051802430516024588257244794593981082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5571138147852169938550211988086446646676939079430862411577370857077447022739022290233103684844186992714365824117877825639183178957*i+12040709652355450449068669754664793233721716001112745042285118566348001149151717916198622638818040551825249447198609990545231225808)*x + (22369592961470603744115899190628757844131831039135568330389461406042189912211312108156842506778192371548108398997963830807659627353*i+10709098350911742887899879628124665421402589974982254454940703013692791375311573816666454201754051802430516024588257244794593981082) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16882281122817117174493078335217584005351900519306851359818494071845652326247005175653748413468426354839427375857111650673006504744*i+18207081469677797479971124017548111603208282321377366137289486209972870735722466529902648315781698213122235540370774533331168871772)*x + (9583809322618502646017668938255694550418301597162540790609904257294676454686703285891614224830081487959838091365354966888276758701*i+5353319300676664650220419405713154699028417077741072001978738019950898068125585354692712892493550379769539294938166721442723754647) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16882281122817117174493078335217584005351900519306851359818494071845652326247005175653748413468426354839427375857111650673006504744*i+18207081469677797479971124017548111603208282321377366137289486209972870735722466529902648315781698213122235540370774533331168871772)*x + (9583809322618502646017668938255694550418301597162540790609904257294676454686703285891614224830081487959838091365354966888276758701*i+5353319300676664650220419405713154699028417077741072001978738019950898068125585354692712892493550379769539294938166721442723754647) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6191023908285600123889005131908649871180253071643082511287249132153771895915530803481604393658546910138802563317661654894548044689*i+16981193032327687092628395732413924406520317322560454340827353510023734654568835677390817977835684267476591078117013847723978866991)*x + (23269495216122561507757162986316985748973254691924035300516516245624415228938440248458220206051562333656754938325661021275668423524*i+16503124732999048089616719558779441708784413246405549342065305158688503943513323916795451238771800783194630100984512350736337392185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6191023908285600123889005131908649871180253071643082511287249132153771895915530803481604393658546910138802563317661654894548044689*i+16981193032327687092628395732413924406520317322560454340827353510023734654568835677390817977835684267476591078117013847723978866991)*x + (23269495216122561507757162986316985748973254691924035300516516245624415228938440248458220206051562333656754938325661021275668423524*i+16503124732999048089616719558779441708784413246405549342065305158688503943513323916795451238771800783194630100984512350736337392185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1509765311618900791793034197651443227004470402798644428823078585633879557269628366793406262147817732871910101400213752727223227563*i+10523501050172384083831323359794461573743207204681002173960601063813503840058172069911146698939546825949600649078075128156085970941)*x + (378626911744685824489389520228503985669926581261501301573931523718375804689849158645614162781040913295957801522535724000142928435*i+17694178029758645431862772390481721935542965523852751799456618802900142475172039136228831436705190147877873764597144406319438381016) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1509765311618900791793034197651443227004470402798644428823078585633879557269628366793406262147817732871910101400213752727223227563*i+10523501050172384083831323359794461573743207204681002173960601063813503840058172069911146698939546825949600649078075128156085970941)*x + (378626911744685824489389520228503985669926581261501301573931523718375804689849158645614162781040913295957801522535724000142928435*i+17694178029758645431862772390481721935542965523852751799456618802900142475172039136228831436705190147877873764597144406319438381016) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9379460461782239939195984081947816863818771290161261172874606976232228694917586673575564859937879765911936363541668461984251508210*i+13061653357969300311050295809779275479545877334479278123300649420601402186379529012312898411240204054128379348741989808091608326051)*x + (23741118140552764029923690270657296195546983489883085431705538526641613008269016545785522732266569430624756516503410185176878934102*i+14142732396910506015205696789649982512000239357918943561732981737564176341608162881386942832154098580806299095237326847927672708163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9379460461782239939195984081947816863818771290161261172874606976232228694917586673575564859937879765911936363541668461984251508210*i+13061653357969300311050295809779275479545877334479278123300649420601402186379529012312898411240204054128379348741989808091608326051)*x + (23741118140552764029923690270657296195546983489883085431705538526641613008269016545785522732266569430624756516503410185176878934102*i+14142732396910506015205696789649982512000239357918943561732981737564176341608162881386942832154098580806299095237326847927672708163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15484004384241522277447762840297650054109108730045118006062876981660285768835299274255897776888438060500350964238727753634112514837*i+23210520429425565191888711356925987316963370029891617846051978468262563791180878376228983641400767398785789277163044059100471294897)*x + (16197023311825849271900720921443149919258160464878583415883144785206533058439405446058862445348535823684077624358116524523795660816*i+15354915137775939929508274447546404938656475579249078433645459382917055743443496125456344396725206934455134016874532886976681497814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15484004384241522277447762840297650054109108730045118006062876981660285768835299274255897776888438060500350964238727753634112514837*i+23210520429425565191888711356925987316963370029891617846051978468262563791180878376228983641400767398785789277163044059100471294897)*x + (16197023311825849271900720921443149919258160464878583415883144785206533058439405446058862445348535823684077624358116524523795660816*i+15354915137775939929508274447546404938656475579249078433645459382917055743443496125456344396725206934455134016874532886976681497814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16843055199474123061345679522374101356558979171004847872256972156265627253388677525248904402506351163994042587688983786193803343102*i+22645740146128315170605894057904772095015038294760611832744016312371869742114458527098411088485212190480135697041330538024709174015)*x + (6866499514817841215085526680802952088347093454886550111120847752881936410049597507816473001555013830702176076560692709653401721838*i+12802744884361450722009749536404424968937176365473826623382618134295948606743223816658161195066187061040583126215658280481084274437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16843055199474123061345679522374101356558979171004847872256972156265627253388677525248904402506351163994042587688983786193803343102*i+22645740146128315170605894057904772095015038294760611832744016312371869742114458527098411088485212190480135697041330538024709174015)*x + (6866499514817841215085526680802952088347093454886550111120847752881936410049597507816473001555013830702176076560692709653401721838*i+12802744884361450722009749536404424968937176365473826623382618134295948606743223816658161195066187061040583126215658280481084274437) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2264494003602431038598865325825350668968310147368802153093460122891643757380485971997020633410793997900361327339918402293926180536*i+23693665086143209618912530228396928352940666487291161078257739162686425222210415311748228429759037893485472669627886408588536503307)*x + (21110400392405203200245731324653393201743705136836499817923933598482698503944109275826913614146206626876944512030099858431779354327*i+15962588612437138930627595566749280590499002826448293930242307911215133164102323148474876939108885031501816271716340005660580796599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2264494003602431038598865325825350668968310147368802153093460122891643757380485971997020633410793997900361327339918402293926180536*i+23693665086143209618912530228396928352940666487291161078257739162686425222210415311748228429759037893485472669627886408588536503307)*x + (21110400392405203200245731324653393201743705136836499817923933598482698503944109275826913614146206626876944512030099858431779354327*i+15962588612437138930627595566749280590499002826448293930242307911215133164102323148474876939108885031501816271716340005660580796599) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1427755478824136056421337129122241707074043863462347138589265923522713103136526925928036439850101723885825256528884883984485597418*i+18686671032139639990262704601450513803429327588463082533165011121653003941376298637829928459430322378199934238158697380020336249362)*x + (15112063533892545178890267805465635743934591797992223789551875746803450647597029322994727204162418851283051904477724499329776312725*i+13066461661973964690152930630964068705395708561282756201369237354067637929807852830370996747364875837576013772997914321347045195994) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1427755478824136056421337129122241707074043863462347138589265923522713103136526925928036439850101723885825256528884883984485597418*i+18686671032139639990262704601450513803429327588463082533165011121653003941376298637829928459430322378199934238158697380020336249362)*x + (15112063533892545178890267805465635743934591797992223789551875746803450647597029322994727204162418851283051904477724499329776312725*i+13066461661973964690152930630964068705395708561282756201369237354067637929807852830370996747364875837576013772997914321347045195994) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10673637331448210099859863007965851518289000045992967215027807243035635182297111752173249262244984232877473331234180789551872291758*i+12853361965700282858335967736324968898795656021824178363861347160076547005003988407286194297643490468787061206902143947923372336485)*x + (2356562289154362160313539262916447341667774092476354196698470025456508564601531445249653439819051411082941013035320940861002482994*i+7525564940177224142036685231957883891421241611333890718926928067248908280811518891570201090872424906265046250764977996427334015609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10673637331448210099859863007965851518289000045992967215027807243035635182297111752173249262244984232877473331234180789551872291758*i+12853361965700282858335967736324968898795656021824178363861347160076547005003988407286194297643490468787061206902143947923372336485)*x + (2356562289154362160313539262916447341667774092476354196698470025456508564601531445249653439819051411082941013035320940861002482994*i+7525564940177224142036685231957883891421241611333890718926928067248908280811518891570201090872424906265046250764977996427334015609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16990457822881313651184623523752265535450445833909582466570592894214871304917680965077083845847198573087188661775497546184293620856*i+6905089580044321883732892929299930513433285308351354600374118442342623595038260878503727124355269253123117420845290888954231786963)*x + (21818888774171226314114111811825573024822955184530915334917932007954244788554692031652646450887121300168794201540277952262543033470*i+6347009707995491026269500507264915747056884757134261585228026411296971530470351068608402218388671087287935332433889626427982589771) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16990457822881313651184623523752265535450445833909582466570592894214871304917680965077083845847198573087188661775497546184293620856*i+6905089580044321883732892929299930513433285308351354600374118442342623595038260878503727124355269253123117420845290888954231786963)*x + (21818888774171226314114111811825573024822955184530915334917932007954244788554692031652646450887121300168794201540277952262543033470*i+6347009707995491026269500507264915747056884757134261585228026411296971530470351068608402218388671087287935332433889626427982589771) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10775747518603814561763985505551399734481449392766253436101104879572557895616620960795477027763404883593719371613444172550491660078*i+19957797113151907797567878561534053553277888190332825371776147604461504750237699384677499731818714411651792882754646261888167165608)*x + (680138339899556338681705357859878371068341740394128557361262491728912691273537869586145716973718372275102363817130981514793836940*i+9394044373549579374038900792034220115542799854985439775716209347798616004887242698749231376379310614643193727929359787845055049864) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10775747518603814561763985505551399734481449392766253436101104879572557895616620960795477027763404883593719371613444172550491660078*i+19957797113151907797567878561534053553277888190332825371776147604461504750237699384677499731818714411651792882754646261888167165608)*x + (680138339899556338681705357859878371068341740394128557361262491728912691273537869586145716973718372275102363817130981514793836940*i+9394044373549579374038900792034220115542799854985439775716209347798616004887242698749231376379310614643193727929359787845055049864) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17869299187650523282633358727559472566128156880899055510005364986028729558014142661994617734372516054339078903216598248467908964100*i+23240412470559108140545601205362252595248044699235725731800003794939856602377900834814314220284818913404740821768876804797609333746)*x + (18788238629099563779723434865152059761183096151164601620629988256128555122843564953166704032305674436794818515435427537340851630989*i+12113624598114130384033431417653392659757337437133400841539478244613527263983310727326356609006303044056022988574937164071350159539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17869299187650523282633358727559472566128156880899055510005364986028729558014142661994617734372516054339078903216598248467908964100*i+23240412470559108140545601205362252595248044699235725731800003794939856602377900834814314220284818913404740821768876804797609333746)*x + (18788238629099563779723434865152059761183096151164601620629988256128555122843564953166704032305674436794818515435427537340851630989*i+12113624598114130384033431417653392659757337437133400841539478244613527263983310727326356609006303044056022988574937164071350159539) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4984918758615075979212707966618329494320458102078477403064503611313804692030658298880868870592070464316005313967278380753994020194*i+8134672279459711946434627291335193163751014377081309601398209020673768592472388408576276331923208587859543573156994017075045868802)*x + (15694875266196177361182002051737075891122013998041746859475265034116784066463322544356221237099932622957602590812120243854245392431*i+23883877524525488666444454640839341238745181966369485559454178672942030749971269417955261199592462535011949981035491849442119261398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4984918758615075979212707966618329494320458102078477403064503611313804692030658298880868870592070464316005313967278380753994020194*i+8134672279459711946434627291335193163751014377081309601398209020673768592472388408576276331923208587859543573156994017075045868802)*x + (15694875266196177361182002051737075891122013998041746859475265034116784066463322544356221237099932622957602590812120243854245392431*i+23883877524525488666444454640839341238745181966369485559454178672942030749971269417955261199592462535011949981035491849442119261398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21107369467008331977255368227854998195466262248717954438849531199658359873161175093754369433425071851878370007924308722375110315674*i+9370464314223644264470488870920673345668721832595835025103758154840319557557419903616341295637090303191207069920229684253655302674)*x + (7129329658152783024974333589864904178573907652328918013868756331765300005171046180947714322864718857343250775651761494711999812193*i+7121854491816849445242447280374020576218947085856485979027184993225253041144812016188476561297032360985562593465704763260533039550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21107369467008331977255368227854998195466262248717954438849531199658359873161175093754369433425071851878370007924308722375110315674*i+9370464314223644264470488870920673345668721832595835025103758154840319557557419903616341295637090303191207069920229684253655302674)*x + (7129329658152783024974333589864904178573907652328918013868756331765300005171046180947714322864718857343250775651761494711999812193*i+7121854491816849445242447280374020576218947085856485979027184993225253041144812016188476561297032360985562593465704763260533039550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18568285899885158196029312430953181514297568785749232859772643561685595906935071770530333431929960122093117457109701391598067518436*i+4136267497029293622132034252172409712851954292819659846940545791558360162431006478734310118094047773921242362511848839647642094019)*x + (7220184272776247544546789158675563812389037452059881939628885704279002942043967169804465820414941487487817052444264119959439010589*i+2480449467695173474130028838268259105816415708498985624666167795927797387104687864861993735299113495804529404036129917973292718800) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18568285899885158196029312430953181514297568785749232859772643561685595906935071770530333431929960122093117457109701391598067518436*i+4136267497029293622132034252172409712851954292819659846940545791558360162431006478734310118094047773921242362511848839647642094019)*x + (7220184272776247544546789158675563812389037452059881939628885704279002942043967169804465820414941487487817052444264119959439010589*i+2480449467695173474130028838268259105816415708498985624666167795927797387104687864861993735299113495804529404036129917973292718800) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7028407894411116867626197628624711038113656496346072765470287392796242633898357942891498056418854135207734035469541052373970907*i+1671160190645555030710433210118162293448139633222645101230827912422371993448050575332324773375847736300639197686198557249513439325)*x + (17652931340951159522306968658643481847965184683868985629633745345324875514733432989808380721225764977755180186692637871521398197676*i+5375817342724425008961182124691777945935762371157745757664153338003970199555832806676173078376360305879014498306907567437064012241) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7028407894411116867626197628624711038113656496346072765470287392796242633898357942891498056418854135207734035469541052373970907*i+1671160190645555030710433210118162293448139633222645101230827912422371993448050575332324773375847736300639197686198557249513439325)*x + (17652931340951159522306968658643481847965184683868985629633745345324875514733432989808380721225764977755180186692637871521398197676*i+5375817342724425008961182124691777945935762371157745757664153338003970199555832806676173078376360305879014498306907567437064012241) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1868263216468348229569303216338536687051393867389976493635585534185627857339732027593460555700225210990744961300932571968074222965*i+5218162164387413870901664704904055327855592420935026402751517861134340584557007238780060927679684503201614906661626561198918788221)*x + (6292573089575694463702125180959789622762649611011695909431102706839267831540523646075095516906337452635391012940934900569595275057*i+19597391850316369713979365394543769346974286582686916395888274251108456926276417376049293858606091910121223605733036431802318647434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1868263216468348229569303216338536687051393867389976493635585534185627857339732027593460555700225210990744961300932571968074222965*i+5218162164387413870901664704904055327855592420935026402751517861134340584557007238780060927679684503201614906661626561198918788221)*x + (6292573089575694463702125180959789622762649611011695909431102706839267831540523646075095516906337452635391012940934900569595275057*i+19597391850316369713979365394543769346974286582686916395888274251108456926276417376049293858606091910121223605733036431802318647434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22629903163260194929848120641608051782854814857694162963842836448411307474099774367303826175649135837217384128664229673838117471541*i+13249386683584834159039842244955224348304657997184270659150332615888668710855931919462456888917191075041147921267004763987971225101)*x + (21500982945816432626297886238451189620998220130609614514250734921354785372665808269314668895948780683551030732128326868903154811454*i+20545363234341820910828930517520744143420684956162536448689159057401198113599349940921185071250955486780924295971717321280760572234) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22629903163260194929848120641608051782854814857694162963842836448411307474099774367303826175649135837217384128664229673838117471541*i+13249386683584834159039842244955224348304657997184270659150332615888668710855931919462456888917191075041147921267004763987971225101)*x + (21500982945816432626297886238451189620998220130609614514250734921354785372665808269314668895948780683551030732128326868903154811454*i+20545363234341820910828930517520744143420684956162536448689159057401198113599349940921185071250955486780924295971717321280760572234) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12503144501340183265375521056300093617580826668609737854386493167671792981183415041331966950680072264708594780594523050605109545650*i+11700345756022081704774604242475223081497757480471284468810679529317027014093380591620641306417652639870394384738905834882208714591)*x + (20350811052243729315895516565044685865406088475631698032729834131487602896397730865644183327052087535048195453106116474019363736090*i+5265980060322821133203569632951044804640771524530488082524047790528452358709414905509318873673874772152251947181959945366670135739) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12503144501340183265375521056300093617580826668609737854386493167671792981183415041331966950680072264708594780594523050605109545650*i+11700345756022081704774604242475223081497757480471284468810679529317027014093380591620641306417652639870394384738905834882208714591)*x + (20350811052243729315895516565044685865406088475631698032729834131487602896397730865644183327052087535048195453106116474019363736090*i+5265980060322821133203569632951044804640771524530488082524047790528452358709414905509318873673874772152251947181959945366670135739) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16321544214278673729839483071760333473966806908946547227316623136651392820441759686687830969057856602070245700069132336531563907067*i+9490557645531401143915242832542752875704200427433113956174383529594546223251781782072713591234304086092364133977078323998314814061)*x + (3920179513422579996356852152328479823809137539430876126238994706048770372432732484012438237473043961088304247148306073757072214017*i+15589601628252153763662975699673482782568814339095877947505258081240500625508344576712384276332539571592651204934542928280804116462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16321544214278673729839483071760333473966806908946547227316623136651392820441759686687830969057856602070245700069132336531563907067*i+9490557645531401143915242832542752875704200427433113956174383529594546223251781782072713591234304086092364133977078323998314814061)*x + (3920179513422579996356852152328479823809137539430876126238994706048770372432732484012438237473043961088304247148306073757072214017*i+15589601628252153763662975699673482782568814339095877947505258081240500625508344576712384276332539571592651204934542928280804116462) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6728364130519226246259979617809169262352146483471150826454805214359059420096547601160373811372137042743120960246653051380802700573*i+11683889953329577768576665235862175704698586228819086000650893403255011242668631365272543979559559996010006035502046635167203311052)*x + (5132238862377474650267999311164593850785183022509530129442848936104220335162781295703261959407113143133451809980060428839361417890*i+19605755045300399162968070307270489170755873023178081210539970280133054227956317566477692578293457336144389531062498593941676873716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6728364130519226246259979617809169262352146483471150826454805214359059420096547601160373811372137042743120960246653051380802700573*i+11683889953329577768576665235862175704698586228819086000650893403255011242668631365272543979559559996010006035502046635167203311052)*x + (5132238862377474650267999311164593850785183022509530129442848936104220335162781295703261959407113143133451809980060428839361417890*i+19605755045300399162968070307270489170755873023178081210539970280133054227956317566477692578293457336144389531062498593941676873716) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3562503265210176120149620101144660324028851076441794342071288423910638600626731418247917557115374528109507387177559581238141246338*i+6595270641459023833357678314025393522918271920851889511910447444601394796314613873256266300219798502465587164946161238504214315207)*x + (8474800747221792208550393032825028332148347619374358804443890117784165134479171032516117265153292032644416110168586564229233458256*i+7427764802480785410644256686983198767733255400509550929030962455808871138776073587523930268759047910061758115253605938875105460431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3562503265210176120149620101144660324028851076441794342071288423910638600626731418247917557115374528109507387177559581238141246338*i+6595270641459023833357678314025393522918271920851889511910447444601394796314613873256266300219798502465587164946161238504214315207)*x + (8474800747221792208550393032825028332148347619374358804443890117784165134479171032516117265153292032644416110168586564229233458256*i+7427764802480785410644256686983198767733255400509550929030962455808871138776073587523930268759047910061758115253605938875105460431) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18392239493970508141155377887607777955386587342950130944607381785141535705580189445827945282119758733667825468091894702349150091039*i+17757395057560926618223545347601701661035602155697924886203753031767409781196987639588148613918596559717978089832332889819985418162)*x + (9197479562455633253466590419596050700301637947650159068139832875947483907882960741138721838922333698739055648581777847048497682272*i+7387084061483121166324993271148286195035181882081144396072875792095210577984505326891290839854847140508393853597066384745691893308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18392239493970508141155377887607777955386587342950130944607381785141535705580189445827945282119758733667825468091894702349150091039*i+17757395057560926618223545347601701661035602155697924886203753031767409781196987639588148613918596559717978089832332889819985418162)*x + (9197479562455633253466590419596050700301637947650159068139832875947483907882960741138721838922333698739055648581777847048497682272*i+7387084061483121166324993271148286195035181882081144396072875792095210577984505326891290839854847140508393853597066384745691893308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11557011671993054263045671195921714910088918162570845781876233600454850488357154206791982124006744572386798002151440510953279294154*i+8983986085750828601622353918851840593123127712648169378070714161948258097278198027625963427000837698387898824166300011316568171191)*x + (4920846118270990100713177928517966102915043443354764128347389457242302843563679169101403944542998529940652096275137152815630485672*i+7662957699706481886777001780501203290194388657249428461101158599374963098920361665419371787278044411082350556612757513275136737876) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11557011671993054263045671195921714910088918162570845781876233600454850488357154206791982124006744572386798002151440510953279294154*i+8983986085750828601622353918851840593123127712648169378070714161948258097278198027625963427000837698387898824166300011316568171191)*x + (4920846118270990100713177928517966102915043443354764128347389457242302843563679169101403944542998529940652096275137152815630485672*i+7662957699706481886777001780501203290194388657249428461101158599374963098920361665419371787278044411082350556612757513275136737876) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13434823801264344378225437903167153867163534803670076128444607615109085081567109395014595094834682987681438953223025586922645133656*i+9132664510650953962373056304429935078314810532679003662113787721649828234370017483260868269888305600032107505484632236303346829992)*x + (11605040867466983142512310959667314373504655678862787719919512690253151146505883257721323192213198445756448195284822131327979987717*i+4584778579238679117549149508661566451852230427098683102262005870637034974169337678563949721254489631233632588226092887986580513236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13434823801264344378225437903167153867163534803670076128444607615109085081567109395014595094834682987681438953223025586922645133656*i+9132664510650953962373056304429935078314810532679003662113787721649828234370017483260868269888305600032107505484632236303346829992)*x + (11605040867466983142512310959667314373504655678862787719919512690253151146505883257721323192213198445756448195284822131327979987717*i+4584778579238679117549149508661566451852230427098683102262005870637034974169337678563949721254489631233632588226092887986580513236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4209802423824761772695503694440070165979020150890545156127248376398519622425274413612820517787874356121102254867888041964458457467*i+7544585897957139911022921205271551094550403134239229243404690846503938774345010282695197981509122352316372072996029563998074908895)*x + (13134763724289981835712884664484982197465443004578143901383309649911506352453592753720420596830139096732503527403593917004132496398*i+17548254758924443887764245283726092584187034547840853551729633443620535336539111314364425870688323564233826123675331925104010896848) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4209802423824761772695503694440070165979020150890545156127248376398519622425274413612820517787874356121102254867888041964458457467*i+7544585897957139911022921205271551094550403134239229243404690846503938774345010282695197981509122352316372072996029563998074908895)*x + (13134763724289981835712884664484982197465443004578143901383309649911506352453592753720420596830139096732503527403593917004132496398*i+17548254758924443887764245283726092584187034547840853551729633443620535336539111314364425870688323564233826123675331925104010896848) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10969440345714088049566930341894255325795267821628487997882975080706150272936645381610900254111222139326044048203608930254444818759*i+15131651680812347487767702099482068935359798911889780973807807398609442094908196008126462056934902818191849177580454387098252208751)*x + (17891415672210144433073909799621056258862787178890772388475317445898336448551573425181972390901948198062668974696195396562131516956*i+13009963817584381562031829120338133432529037819564922342303616577717611324975278484952004153308365067715658071241464255514788855588) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10969440345714088049566930341894255325795267821628487997882975080706150272936645381610900254111222139326044048203608930254444818759*i+15131651680812347487767702099482068935359798911889780973807807398609442094908196008126462056934902818191849177580454387098252208751)*x + (17891415672210144433073909799621056258862787178890772388475317445898336448551573425181972390901948198062668974696195396562131516956*i+13009963817584381562031829120338133432529037819564922342303616577717611324975278484952004153308365067715658071241464255514788855588) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19452327908017279057228842123276695769934183169150241169082402514216169064643401543294219919831539688119132319705064909711316768190*i+14081752938987347240895932777204111716438128829005302007680655464983711935163343122384147319405973639808846304825066189138729086626)*x + (11444839192354621842709395000123331785464148009764618872432337479673836508512385282247877024136315224652039070124842667281757889347*i+10546405534915749468363938824852951500653532322603690162838233330983296341472079455938640292044014591933036335024830343727181513168) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19452327908017279057228842123276695769934183169150241169082402514216169064643401543294219919831539688119132319705064909711316768190*i+14081752938987347240895932777204111716438128829005302007680655464983711935163343122384147319405973639808846304825066189138729086626)*x + (11444839192354621842709395000123331785464148009764618872432337479673836508512385282247877024136315224652039070124842667281757889347*i+10546405534915749468363938824852951500653532322603690162838233330983296341472079455938640292044014591933036335024830343727181513168) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12208210050639987550890930864929654022770201534935801607207710315152432656204388498127743968132866143737496771857232802442761916202*i+5067598717713656295798885130374817176869209501874154151637922400504385987628077449008375745526305076191932292354703694741248605953)*x + (20318650324032568476241091617803100465001373686624887358228209794652848446887984676924795658741768023929219912227461225303055196739*i+24140423096274728097632102816571822368482956220506475618493507625441996759738880555641450028562547285130556294595830126791654741208) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12208210050639987550890930864929654022770201534935801607207710315152432656204388498127743968132866143737496771857232802442761916202*i+5067598717713656295798885130374817176869209501874154151637922400504385987628077449008375745526305076191932292354703694741248605953)*x + (20318650324032568476241091617803100465001373686624887358228209794652848446887984676924795658741768023929219912227461225303055196739*i+24140423096274728097632102816571822368482956220506475618493507625441996759738880555641450028562547285130556294595830126791654741208) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10444417660337255800255806236219763920105507217438607012353472353663405727122481048017969225299568192585929034032339129086276954014*i+1820094667481694730967358022198534188946650569867511218115275857725645962491572234832158508393501562690218399801766413401748323516)*x + (24170764945596442994377942344618702758840894370923225307245861211830457573845571955240133282515375623409408861419880465125413931469*i+16565757147715930897573551273912133404410916583112550838049066466277210969825476128278222679226333495702686342733532857650245900669) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10444417660337255800255806236219763920105507217438607012353472353663405727122481048017969225299568192585929034032339129086276954014*i+1820094667481694730967358022198534188946650569867511218115275857725645962491572234832158508393501562690218399801766413401748323516)*x + (24170764945596442994377942344618702758840894370923225307245861211830457573845571955240133282515375623409408861419880465125413931469*i+16565757147715930897573551273912133404410916583112550838049066466277210969825476128278222679226333495702686342733532857650245900669) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11761711302405277716218640479468650864177106153545203298020605271110794057024738860175969090378017313130465888596247852131103853740*i+4944506957148654503192383285184944376054047952518167645950009035930907629130039367868998350868189786356549289162623547410573556000)*x + (2376590405196493930784469323481427417657114884360085288012322286344455537109550515327529912023649184263341858568722381925435844111*i+21384988799852615672381036850446534389626990670061645526860944144042012669662574096175670643315793153070008705819495262418357701582) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11761711302405277716218640479468650864177106153545203298020605271110794057024738860175969090378017313130465888596247852131103853740*i+4944506957148654503192383285184944376054047952518167645950009035930907629130039367868998350868189786356549289162623547410573556000)*x + (2376590405196493930784469323481427417657114884360085288012322286344455537109550515327529912023649184263341858568722381925435844111*i+21384988799852615672381036850446534389626990670061645526860944144042012669662574096175670643315793153070008705819495262418357701582) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12705415609840990074704885910481971257617939282314306150262819095539261121594283303489188069091343886550827999234057290690058800643*i+162213734706054650290570989782256424230724407702810955047818461026321386184053375552762642850493131423923826631473189929665888174)*x + (7009221073630709675377848900163037906909881617524286560089777087318450176760976243373171146484593260204966769300275883073913341334*i+15774421343356611079738348277322990685240110074443266643556036494090378976221421620858361712393509613662134254829670130536185739345) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12705415609840990074704885910481971257617939282314306150262819095539261121594283303489188069091343886550827999234057290690058800643*i+162213734706054650290570989782256424230724407702810955047818461026321386184053375552762642850493131423923826631473189929665888174)*x + (7009221073630709675377848900163037906909881617524286560089777087318450176760976243373171146484593260204966769300275883073913341334*i+15774421343356611079738348277322990685240110074443266643556036494090378976221421620858361712393509613662134254829670130536185739345) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16248534551681176892343419350283091902386056428649903953982019694506939662855109116468270971032322773754601078380836062364401719035*i+7850390570616248381277716353949749279238158206926029396812346685426553943926220612484462242666161785490822002381876519377358963389)*x + (13133119703649978814049408208401944317131202887059913961153956700493439032438628874808420646758460866325663008749716767613209897091*i+14109361221370339918475932956673790527126500096434904448888556060375440599380258847039151018208366200336660042795617536659647152902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16248534551681176892343419350283091902386056428649903953982019694506939662855109116468270971032322773754601078380836062364401719035*i+7850390570616248381277716353949749279238158206926029396812346685426553943926220612484462242666161785490822002381876519377358963389)*x + (13133119703649978814049408208401944317131202887059913961153956700493439032438628874808420646758460866325663008749716767613209897091*i+14109361221370339918475932956673790527126500096434904448888556060375440599380258847039151018208366200336660042795617536659647152902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21992170656547968417457435709169050787296277968499543897894450611406286822996254509211091669168182088708338012678094353532648655118*i+20396848519457912886434435439509117943650574759088256821728711059105953913561850688165040567690370994958461695372353191666558332396)*x + (17163306052987551723818483514812311857291865227004264145497634850227302369154758747120642217431450024633273358310719860843394758350*i+21527957999855036401093748370859758557285397707741886125187681172686815612537339918737439496996795868630160265743180707949161023017) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21992170656547968417457435709169050787296277968499543897894450611406286822996254509211091669168182088708338012678094353532648655118*i+20396848519457912886434435439509117943650574759088256821728711059105953913561850688165040567690370994958461695372353191666558332396)*x + (17163306052987551723818483514812311857291865227004264145497634850227302369154758747120642217431450024633273358310719860843394758350*i+21527957999855036401093748370859758557285397707741886125187681172686815612537339918737439496996795868630160265743180707949161023017) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16429705640757500442424091873055433633490752428882553240433697362402422319237509287009128693656541349180912040482930832393376262486*i+7561512083405852883764176161429704153081371937531226390711807011296430983698809725203085621520850801019744052469187922470480969958)*x + (4167106010381066376649987982517275549477434326989889548935260859664460138828524230449091910296964826047061015571580542557057932522*i+9861806992685119067171635393616171504463548958686785637246196113549462894554511894537272584813397402457133194911489669690187962037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16429705640757500442424091873055433633490752428882553240433697362402422319237509287009128693656541349180912040482930832393376262486*i+7561512083405852883764176161429704153081371937531226390711807011296430983698809725203085621520850801019744052469187922470480969958)*x + (4167106010381066376649987982517275549477434326989889548935260859664460138828524230449091910296964826047061015571580542557057932522*i+9861806992685119067171635393616171504463548958686785637246196113549462894554511894537272584813397402457133194911489669690187962037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10024765845234777377918738148964443583173642009157102350744287807083467664482685147190441921016337067085872839942684928392226806335*i+23908769561570768622695728528755272399860508671072179375302694074418419603326109900156975592270701507153023128782221943955324724908)*x + (19788329999933903359359499356857968907447269154027427858770835806269300120973506326388878786447129480297699537036474229665612682976*i+16631158831925803186968549634450651356073798921084079344005954009535594286407413958685632387477118997547577891656911958285764686033) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10024765845234777377918738148964443583173642009157102350744287807083467664482685147190441921016337067085872839942684928392226806335*i+23908769561570768622695728528755272399860508671072179375302694074418419603326109900156975592270701507153023128782221943955324724908)*x + (19788329999933903359359499356857968907447269154027427858770835806269300120973506326388878786447129480297699537036474229665612682976*i+16631158831925803186968549634450651356073798921084079344005954009535594286407413958685632387477118997547577891656911958285764686033) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6664820813611215937917498260404962702010837735028398858045673932502024601015510796928597227727004315516299660381001090966657682188*i+5048550157716933761481270360393356201669284070219802888706163939283462230768226402162589229628939867868216840340102681967491527489)*x + (2442870142160172788124651044311585639029422490655428450369950310422278112135426271931644660001557636147195255383715368568803260873*i+18067463915694758809041159969117688798261946589315858419556477223296726708914982080590300273669450203512380639817719295952418889676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6664820813611215937917498260404962702010837735028398858045673932502024601015510796928597227727004315516299660381001090966657682188*i+5048550157716933761481270360393356201669284070219802888706163939283462230768226402162589229628939867868216840340102681967491527489)*x + (2442870142160172788124651044311585639029422490655428450369950310422278112135426271931644660001557636147195255383715368568803260873*i+18067463915694758809041159969117688798261946589315858419556477223296726708914982080590300273669450203512380639817719295952418889676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20101991536966247217112973848161341776255428473678303574747560712056411884454898214090229950327800063010277709795719448398605731746*i+19250982047818468970007319311990578479071392303155614914724113361541662023504765054141316385577852121880345783822157481299680154323)*x + (6959617939692249924410147752536249660444424355954779034456821541669330631826293092739200606417385584217205590655244166459218604113*i+3863558840596972209124383436313981502668137747334370904261621441027232909820893823069420665995257356192577706615166748734584647439) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20101991536966247217112973848161341776255428473678303574747560712056411884454898214090229950327800063010277709795719448398605731746*i+19250982047818468970007319311990578479071392303155614914724113361541662023504765054141316385577852121880345783822157481299680154323)*x + (6959617939692249924410147752536249660444424355954779034456821541669330631826293092739200606417385584217205590655244166459218604113*i+3863558840596972209124383436313981502668137747334370904261621441027232909820893823069420665995257356192577706615166748734584647439) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6432964593557745873489018329705879334963855033104164874571362656618744273869846894017780441115434556444791060449947097518001073005*i+23047167610242319286903794439851997711805153830189137628486989889049606212435036038030084436090345806712679976314397464555924096605)*x + (15305262358165382624620901151835877472935281868476766106918479927725570856553705796826486926923523783138986524161310338738927051960*i+14359248921380246946062267648279906815375308616323804616329819545819961294628942020067457986298588815672413285588891562487738920185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6432964593557745873489018329705879334963855033104164874571362656618744273869846894017780441115434556444791060449947097518001073005*i+23047167610242319286903794439851997711805153830189137628486989889049606212435036038030084436090345806712679976314397464555924096605)*x + (15305262358165382624620901151835877472935281868476766106918479927725570856553705796826486926923523783138986524161310338738927051960*i+14359248921380246946062267648279906815375308616323804616329819545819961294628942020067457986298588815672413285588891562487738920185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24044288241100445929156476153530665432184092175112939093524284582004251252668285866383662896312108251072808621657660048210042170974*i+16672780982127588162181052487386501710242666248158610055980694977399334333415836566507605264823952520000545289254427856000120719242)*x + (22574321840309775017288071139262907969627684333040756094338475479001153182929430386227932905687669577291398632435442190026873459980*i+4996120690273907853540040665326050503397498394737637482081184065285753141045832515772094437882546521603724635231690037860793178693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24044288241100445929156476153530665432184092175112939093524284582004251252668285866383662896312108251072808621657660048210042170974*i+16672780982127588162181052487386501710242666248158610055980694977399334333415836566507605264823952520000545289254427856000120719242)*x + (22574321840309775017288071139262907969627684333040756094338475479001153182929430386227932905687669577291398632435442190026873459980*i+4996120690273907853540040665326050503397498394737637482081184065285753141045832515772094437882546521603724635231690037860793178693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12677049412686113322564262665399385723839758169864053260835252574827035384943756116825628025879445987284600317578019144531156538962*i+22232167588181703472518917136398574486910728990566130952146557601917122987743037375918213080612084594008865189947773640799979959990)*x + (11415617021523893041878690715036540643071395003489220210625299877622725998794815312878547754824217747119621622234845187576607789656*i+11719289190331692041745797802307940156886967773226013684598799732302586499903647282221975285234801726525613852998379226620388498662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12677049412686113322564262665399385723839758169864053260835252574827035384943756116825628025879445987284600317578019144531156538962*i+22232167588181703472518917136398574486910728990566130952146557601917122987743037375918213080612084594008865189947773640799979959990)*x + (11415617021523893041878690715036540643071395003489220210625299877622725998794815312878547754824217747119621622234845187576607789656*i+11719289190331692041745797802307940156886967773226013684598799732302586499903647282221975285234801726525613852998379226620388498662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11770832223860821884126812621329921877238483925795645265198451205684707548286381083461236221761689005932350052769442754849208094455*i+18335176083053338766855720557519874692017195299847376276900943746541253486286017852747916618666455243574909377878734207460697672207)*x + (18899871113784517883200273170315795035088273775133650975466475145322960055686311260111649956104178137355444900834982360891022121544*i+20792528379821083486688667567472023544370894763451561587860946668271492310495502891284453589086673203542503123326037221309163013725) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11770832223860821884126812621329921877238483925795645265198451205684707548286381083461236221761689005932350052769442754849208094455*i+18335176083053338766855720557519874692017195299847376276900943746541253486286017852747916618666455243574909377878734207460697672207)*x + (18899871113784517883200273170315795035088273775133650975466475145322960055686311260111649956104178137355444900834982360891022121544*i+20792528379821083486688667567472023544370894763451561587860946668271492310495502891284453589086673203542503123326037221309163013725) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4491960049012577718600455592739186550424374383500694996519377774283033960475264254565793998291567646356218665279934531798161297865*i+20883325068027672207445922795540528052934754030024861227886147677389925139585354014874211556309519598316382068751266425055198312533)*x + (18702357542940737996110106840322898029322575254260461536356259301150027827893435628460131102476645453174456687651802384993359655933*i+13693331871882253473193113456669488313222869539616999272712480060421070711613572827237431618062330802575250883021154093215671172831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4491960049012577718600455592739186550424374383500694996519377774283033960475264254565793998291567646356218665279934531798161297865*i+20883325068027672207445922795540528052934754030024861227886147677389925139585354014874211556309519598316382068751266425055198312533)*x + (18702357542940737996110106840322898029322575254260461536356259301150027827893435628460131102476645453174456687651802384993359655933*i+13693331871882253473193113456669488313222869539616999272712480060421070711613572827237431618062330802575250883021154093215671172831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23475840202667763184169131224431152387100884100732284582104400672783033106143814437674459122567918922728569487481616166218989278941*i+9745951311975281051478188374884197406186204421062803630779521457256584517732054102591774535364094804814225820692199539216900255872)*x + (14027393223797045297590235818478093004502874570812121792784919000832742700508233000267637993693016855937426117591331196572111714791*i+15816223193163544454416023775034561632941628449169341494968834468855371162894524831439879373522159626587094779636736485355235774692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23475840202667763184169131224431152387100884100732284582104400672783033106143814437674459122567918922728569487481616166218989278941*i+9745951311975281051478188374884197406186204421062803630779521457256584517732054102591774535364094804814225820692199539216900255872)*x + (14027393223797045297590235818478093004502874570812121792784919000832742700508233000267637993693016855937426117591331196572111714791*i+15816223193163544454416023775034561632941628449169341494968834468855371162894524831439879373522159626587094779636736485355235774692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21353019892936132018859744284319790567479395574088904603758221825407536242210008078389065296784240596589119239602120488595880129028*i+17715096674012974728085133102684563065320044125247982508306844194330318980187150561571510429159073927494410135237138672919859109476)*x + (19823224877873975556789206038885332591295271157199333414686465499832064975197369544258946523240822331732553809119788707220907537337*i+4744070618508542497595279302759018565169448975683106611885370403832838615564642586197406071202425181304635523967614063051930052613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21353019892936132018859744284319790567479395574088904603758221825407536242210008078389065296784240596589119239602120488595880129028*i+17715096674012974728085133102684563065320044125247982508306844194330318980187150561571510429159073927494410135237138672919859109476)*x + (19823224877873975556789206038885332591295271157199333414686465499832064975197369544258946523240822331732553809119788707220907537337*i+4744070618508542497595279302759018565169448975683106611885370403832838615564642586197406071202425181304635523967614063051930052613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23644227196652746669197006268857440183491142308970396017439696103727383828088146942908298724198026918745155362394547666091047051212*i+5942186927220613623440911924108223931758526693215982890310252555762383045694679717834717438855775025892922559923887522305831296258)*x + (22753732189518134204995687503151757175141200239765300457956635606496339593662850533843034539163651898233459618850406161339719389696*i+3691720482153133161736575894123436665851986838580980858663125423905596266365074591946185332174878755480686764316701026809540161185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23644227196652746669197006268857440183491142308970396017439696103727383828088146942908298724198026918745155362394547666091047051212*i+5942186927220613623440911924108223931758526693215982890310252555762383045694679717834717438855775025892922559923887522305831296258)*x + (22753732189518134204995687503151757175141200239765300457956635606496339593662850533843034539163651898233459618850406161339719389696*i+3691720482153133161736575894123436665851986838580980858663125423905596266365074591946185332174878755480686764316701026809540161185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12119087130496625545156071145889807563013010704568710701186734761310827808326238485179337917442360893210172399991027336647870642282*i+15028997541403829231763673234712037822348772706362451609511490844486864051155126758439459248050655923082298717929956192620289865865)*x + (11528182312434210642912852608088637631355661073284973781923984112838954093185426349268567657444571932233743158544354733595350524073*i+23498209635458586735340011180170486762490866624724699960725014149312274515251285712860987239794439548155225737687672057334877514737) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12119087130496625545156071145889807563013010704568710701186734761310827808326238485179337917442360893210172399991027336647870642282*i+15028997541403829231763673234712037822348772706362451609511490844486864051155126758439459248050655923082298717929956192620289865865)*x + (11528182312434210642912852608088637631355661073284973781923984112838954093185426349268567657444571932233743158544354733595350524073*i+23498209635458586735340011180170486762490866624724699960725014149312274515251285712860987239794439548155225737687672057334877514737) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13806853749713506999751097494297073316753997929869282656290374606438889310491453655127601780275309168527390406552335660170062428652*i+20778115040231903623038611276605345985245558498309245546221095394961900809848394026007157686800458698012583241168318819432810150716)*x + (1247622222056130256762253177458123593048189742449240740507587427906622226231083137361941766785174864250233963473482148816124755886*i+15082193529802062523605885558038420034528147023468019247269404811763790832541890857902962751427235499873784931234127801680659440466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13806853749713506999751097494297073316753997929869282656290374606438889310491453655127601780275309168527390406552335660170062428652*i+20778115040231903623038611276605345985245558498309245546221095394961900809848394026007157686800458698012583241168318819432810150716)*x + (1247622222056130256762253177458123593048189742449240740507587427906622226231083137361941766785174864250233963473482148816124755886*i+15082193529802062523605885558038420034528147023468019247269404811763790832541890857902962751427235499873784931234127801680659440466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6022105204598924768022888015916466968830762902799408861456908429307784377453150329610300188795502351614518456397959583400248393293*i+11136276274012454203645923468315945438015719263349505430606860837372539855021884491268485637275944923853809507420448315182308622712)*x + (11072016716337264299550019400349950305574180389117776683807140962138243279263354772926599351549936640741957252267829078085932352798*i+12279290195605212912749314067210606585879222416362005773573475974034519261641995511743584595556255589424747693734805369775752266955) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6022105204598924768022888015916466968830762902799408861456908429307784377453150329610300188795502351614518456397959583400248393293*i+11136276274012454203645923468315945438015719263349505430606860837372539855021884491268485637275944923853809507420448315182308622712)*x + (11072016716337264299550019400349950305574180389117776683807140962138243279263354772926599351549936640741957252267829078085932352798*i+12279290195605212912749314067210606585879222416362005773573475974034519261641995511743584595556255589424747693734805369775752266955) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2717555839398492662855210930215925679786017950050729435780683708096754179923999178689049440048097057751624531654223393965869280292*i+22112155321958193376359374527913849755366836699713389607897561104800582740982588306449743386846356266440168684561965837364097632634)*x + (3909267076066772687900808931065726930471823366922627989228934886107265255493595351957273260273463569160554376829779847974888540649*i+4277332496096352212858747795812892565705802656734493869755796113237228301445015102969716384550536192560305761007484500281449515849) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2717555839398492662855210930215925679786017950050729435780683708096754179923999178689049440048097057751624531654223393965869280292*i+22112155321958193376359374527913849755366836699713389607897561104800582740982588306449743386846356266440168684561965837364097632634)*x + (3909267076066772687900808931065726930471823366922627989228934886107265255493595351957273260273463569160554376829779847974888540649*i+4277332496096352212858747795812892565705802656734493869755796113237228301445015102969716384550536192560305761007484500281449515849) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5843422866565488278267195260853272066997015181957062841557673439085935800421334702670257054832377126816628738050813804356121832013*i+21687521451012664287560696295177355942953221694429874464191161725532955513269504346952304798932989431290628885588103480560520441969)*x + (21315226825439285332465033486736875195709126363472049615579614398322221234921449928475984412183949888937673858406693964962708907376*i+1656194099914056498480826223823141180644545311077393239386837407097934076094293068727351967021727100439550047466461522744133787547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5843422866565488278267195260853272066997015181957062841557673439085935800421334702670257054832377126816628738050813804356121832013*i+21687521451012664287560696295177355942953221694429874464191161725532955513269504346952304798932989431290628885588103480560520441969)*x + (21315226825439285332465033486736875195709126363472049615579614398322221234921449928475984412183949888937673858406693964962708907376*i+1656194099914056498480826223823141180644545311077393239386837407097934076094293068727351967021727100439550047466461522744133787547) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7689342229545268646498722727134161534021849325123999113055583583168182553722832506980490681462612475584187619606680957649392880586*i+4531655688383320995830874684105946289131203027148900683553791511174724429263745114154265985246613362458283333456944723731544020664)*x + (17859102205755306604286066700613478647628535251094343009853462613625840976120927713789387441393245982969546001544791080243309802019*i+1661815489708069051442849950539376452560375556378856845511515170753333744528346105045024474132011346528314504702412681769713376274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7689342229545268646498722727134161534021849325123999113055583583168182553722832506980490681462612475584187619606680957649392880586*i+4531655688383320995830874684105946289131203027148900683553791511174724429263745114154265985246613362458283333456944723731544020664)*x + (17859102205755306604286066700613478647628535251094343009853462613625840976120927713789387441393245982969546001544791080243309802019*i+1661815489708069051442849950539376452560375556378856845511515170753333744528346105045024474132011346528314504702412681769713376274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21890102047483281424831631067595181080117397159437728465242991945829615933422473435918035258636804139028529916518835999273203096081*i+1189863617351651067262932230568665007657287198007933372571856097721830233023549044314618992150475828371188071252018205925908141230)*x + (9388969043740842742234351170643431569330383312671506839470605423393880181003082359233528748266603001838778687131848375189271567566*i+3274332941743710633444055990763429642226287717544320008538346249751879958417398070266241130643948674375039995963801795399502609001) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21890102047483281424831631067595181080117397159437728465242991945829615933422473435918035258636804139028529916518835999273203096081*i+1189863617351651067262932230568665007657287198007933372571856097721830233023549044314618992150475828371188071252018205925908141230)*x + (9388969043740842742234351170643431569330383312671506839470605423393880181003082359233528748266603001838778687131848375189271567566*i+3274332941743710633444055990763429642226287717544320008538346249751879958417398070266241130643948674375039995963801795399502609001) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19858402475688141923860985403477234620950451970199064741875755974300031893320439397391399374740003463597939114117083292019873463795*i+22589869547628288099562406973070768371583384432192563775547855243146572293760833232811068462998195942660417193467557943209182614343)*x + (4348480964135960291223343108957291441495927158810183135224224441240056472305401833040001589712351703118300974592878346735102335077*i+4404137736509533623330456267140603797337915805595939839279102695746130120737847882714482669682525538549885113304908334029845895051) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19858402475688141923860985403477234620950451970199064741875755974300031893320439397391399374740003463597939114117083292019873463795*i+22589869547628288099562406973070768371583384432192563775547855243146572293760833232811068462998195942660417193467557943209182614343)*x + (4348480964135960291223343108957291441495927158810183135224224441240056472305401833040001589712351703118300974592878346735102335077*i+4404137736509533623330456267140603797337915805595939839279102695746130120737847882714482669682525538549885113304908334029845895051) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1879731419033813621374211191266230125898192261366065133802623490321520955409141363829909088598020216941616477784946582427511556825*i+9538984544711707629637817136894205591726308247300621507295221818576833795061601608836804711396828134431096255516665937620879790249)*x + (6180921826390037361563344964243092767217164129021887266141343680010595737022990680896613655490032682151363325817695869697290568386*i+18591586984319290236601644086686821488160626208993314247237481485156262762479191252452598523437184071391566170530829357900532797255) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1879731419033813621374211191266230125898192261366065133802623490321520955409141363829909088598020216941616477784946582427511556825*i+9538984544711707629637817136894205591726308247300621507295221818576833795061601608836804711396828134431096255516665937620879790249)*x + (6180921826390037361563344964243092767217164129021887266141343680010595737022990680896613655490032682151363325817695869697290568386*i+18591586984319290236601644086686821488160626208993314247237481485156262762479191252452598523437184071391566170530829357900532797255) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11995516167790191844218666020703273254208190335969096346745217413711825433050971997687588777649620262239988758257514715451110328159*i+18842753047261156301520543886708500228476425125452380287302572494318658558491397751414440456153505163451956582753936880797748825792)*x + (24035119680741193311244711037140956638536398158828830528318037832827444873262566380848143026129614442822588716815083805454216867927*i+20146505895217599266933053291869892827619459317390867648843317350650574756483635117781053136712215193184748120558821701571412268014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11995516167790191844218666020703273254208190335969096346745217413711825433050971997687588777649620262239988758257514715451110328159*i+18842753047261156301520543886708500228476425125452380287302572494318658558491397751414440456153505163451956582753936880797748825792)*x + (24035119680741193311244711037140956638536398158828830528318037832827444873262566380848143026129614442822588716815083805454216867927*i+20146505895217599266933053291869892827619459317390867648843317350650574756483635117781053136712215193184748120558821701571412268014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1247406395291296273025840517233258917489052323647112213692536545576152016454063933580284686499966494667100201056904781492989766834*i+5670935052223696171802259929203668346738341444712954782942531939469935264151495806729492660048262758988028980073365788880111493269)*x + (8969259862552716821476844289284104372873013452761516449347909747573832763904360266268711076243851690063656263278951553737335559055*i+9544660475094414982794315410782920145011548652422132794280720351245971264772291074452679053321695080566401445756144855555540469624) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1247406395291296273025840517233258917489052323647112213692536545576152016454063933580284686499966494667100201056904781492989766834*i+5670935052223696171802259929203668346738341444712954782942531939469935264151495806729492660048262758988028980073365788880111493269)*x + (8969259862552716821476844289284104372873013452761516449347909747573832763904360266268711076243851690063656263278951553737335559055*i+9544660475094414982794315410782920145011548652422132794280720351245971264772291074452679053321695080566401445756144855555540469624) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5801710579908672029095646231815815685180686216416382191214823938436961105942983337870929108370587817708458312677594986436472184473*i+10091914531000653559013323073999233888346411258070133012409519172977048853596394819302770043160007632971935595075677251726601594601)*x + (6433836555304725941865520729468049624041157508394789779021904007044181777237212608114372442799357732484049500159443881094597580819*i+15210744514937025362460396035116706782717216906687740290653210912937542129293635700686901841850815194766538025611228883105545175557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5801710579908672029095646231815815685180686216416382191214823938436961105942983337870929108370587817708458312677594986436472184473*i+10091914531000653559013323073999233888346411258070133012409519172977048853596394819302770043160007632971935595075677251726601594601)*x + (6433836555304725941865520729468049624041157508394789779021904007044181777237212608114372442799357732484049500159443881094597580819*i+15210744514937025362460396035116706782717216906687740290653210912937542129293635700686901841850815194766538025611228883105545175557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22254731815307523068532173324454379629290018684191518509418055331869850676320839954028746677218345371332484461377614660660634997514*i+5632370808825938047749642793570907669396929141254177792956139145435811848461765906452600200299771379722467623404262672734495433135)*x + (19462562725468037038578248845304271748914022733867719115409830080696843600997261002199320989058075390342076652761173755534922566055*i+3146661035899676929903290564234735320263169431467937767125188547507262372576078120512788987012857668539897718724688648370083412910) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22254731815307523068532173324454379629290018684191518509418055331869850676320839954028746677218345371332484461377614660660634997514*i+5632370808825938047749642793570907669396929141254177792956139145435811848461765906452600200299771379722467623404262672734495433135)*x + (19462562725468037038578248845304271748914022733867719115409830080696843600997261002199320989058075390342076652761173755534922566055*i+3146661035899676929903290564234735320263169431467937767125188547507262372576078120512788987012857668539897718724688648370083412910) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17259850276454745914420279356840991925312303886270356369289351557101477277825464223660320926381756674566618018549928598669768615122*i+9640406365245866822772713393591112173889141713880680122427192449082582112241137131246894381643255059457005942733912596651614747552)*x + (17656857300171813475411442421181785767434466489284767298919634248343528735589203178422362825260003329052598558241587053348120940955*i+3819649002499200485322685716178146980324295497978348445265043673834042590148382829230271158584142336256401627258227172360894612328) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17259850276454745914420279356840991925312303886270356369289351557101477277825464223660320926381756674566618018549928598669768615122*i+9640406365245866822772713393591112173889141713880680122427192449082582112241137131246894381643255059457005942733912596651614747552)*x + (17656857300171813475411442421181785767434466489284767298919634248343528735589203178422362825260003329052598558241587053348120940955*i+3819649002499200485322685716178146980324295497978348445265043673834042590148382829230271158584142336256401627258227172360894612328) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21718324562871212560993088524793418903446616670519978415492686317456617944424066408038492641875963485183665802791878594342441358680*i+14963722992620217766789007058090960890274641890844415932046110634744354042173613764930436901498962769098135081358354262429969175721)*x + (9050456445635435136120164283703836761844613301584954056618410345315971799862415273404601719552349350218285785772989357611638608102*i+3789402546674277451519971475344801401733331745296568353161894977385571370295228860437376593800831526149278662965718960811369570586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21718324562871212560993088524793418903446616670519978415492686317456617944424066408038492641875963485183665802791878594342441358680*i+14963722992620217766789007058090960890274641890844415932046110634744354042173613764930436901498962769098135081358354262429969175721)*x + (9050456445635435136120164283703836761844613301584954056618410345315971799862415273404601719552349350218285785772989357611638608102*i+3789402546674277451519971475344801401733331745296568353161894977385571370295228860437376593800831526149278662965718960811369570586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9786844793599987152844470398877807564339252157522255324302702248115130289703021586171049181763108256769506377039609458423425789226*i+9323884393253848146740817748321264325826430554611963504899862565069645077225239020404248673684340808652712793410919521901198230438)*x + (5581828008411857652986481920571199536858308620476819064890769658469637849836123431660296663013540541285609601275308098627762688640*i+15927471484695280886931176126447247431728077848205094805125222824936869932715837834986793562191422705428053103120381338091499169241) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9786844793599987152844470398877807564339252157522255324302702248115130289703021586171049181763108256769506377039609458423425789226*i+9323884393253848146740817748321264325826430554611963504899862565069645077225239020404248673684340808652712793410919521901198230438)*x + (5581828008411857652986481920571199536858308620476819064890769658469637849836123431660296663013540541285609601275308098627762688640*i+15927471484695280886931176126447247431728077848205094805125222824936869932715837834986793562191422705428053103120381338091499169241) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7577544483077719599523429182914456049675149870172127414234610532393625402155186368651723706589834599950363664451678634007371291206*i+1896654600303953101448019412767072919226325076874449173109565838453128647782643420450450279830042668561465074632338257485544450091)*x + (1871573872071845199503107529552644276533770070130882228882953320734064007602577128063973158452254776006788619351410697886479242164*i+17396762792752970242644822333539631214255007846313836434077380111428399157702127330044919322109186189865553864750053054509697300468) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7577544483077719599523429182914456049675149870172127414234610532393625402155186368651723706589834599950363664451678634007371291206*i+1896654600303953101448019412767072919226325076874449173109565838453128647782643420450450279830042668561465074632338257485544450091)*x + (1871573872071845199503107529552644276533770070130882228882953320734064007602577128063973158452254776006788619351410697886479242164*i+17396762792752970242644822333539631214255007846313836434077380111428399157702127330044919322109186189865553864750053054509697300468) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (493247422915008866439761380045366768588987808170881833798118724640073947128203724698787981499305685082211373698208092545911037640*i+4711161300313136875760361679714022752034905712996065197176082185985072738309146477906280015850780716198507641890853776796891917865)*x + (20050642261004089570622556642212546429233124615226575704312377524883708009528039775449853779382062280225347611246061302518700944269*i+24258827884439189921630194891357337251919247640911985316007530753361818017002356139341042484347076016425052347427201331075650085188) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (493247422915008866439761380045366768588987808170881833798118724640073947128203724698787981499305685082211373698208092545911037640*i+4711161300313136875760361679714022752034905712996065197176082185985072738309146477906280015850780716198507641890853776796891917865)*x + (20050642261004089570622556642212546429233124615226575704312377524883708009528039775449853779382062280225347611246061302518700944269*i+24258827884439189921630194891357337251919247640911985316007530753361818017002356139341042484347076016425052347427201331075650085188) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3964534113091798018284373595488390641772206903831240856740562265248669060921100325884569899651457478587722328875619838287291715925*i+23920292224328499390189141461817740832599146007133962330465458272989785759776556149364115768578889057149074466693392034788666601838)*x + (9969164050858612667550646928232661342729027392678643715856819675479961686252997717960581140481032435230292906746202652433790561973*i+10269432981039895992962644537438606984608022909180217790393068750757224664005497505745095210178114857082324318636343029542235471269) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3964534113091798018284373595488390641772206903831240856740562265248669060921100325884569899651457478587722328875619838287291715925*i+23920292224328499390189141461817740832599146007133962330465458272989785759776556149364115768578889057149074466693392034788666601838)*x + (9969164050858612667550646928232661342729027392678643715856819675479961686252997717960581140481032435230292906746202652433790561973*i+10269432981039895992962644537438606984608022909180217790393068750757224664005497505745095210178114857082324318636343029542235471269) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22174150871969569754371179219004051011843629212175138914888380692747774944891612798898091923727227450959764025958886244674249594604*i+16004936009208010915359785299149373714506079766947386398733646053544620987466622066157909923763319472083306047998240101665117088240)*x + (11429822138760919933664827012788708072728189328196692345567960100042303018967654368626779174906665502427062042183914706873439419570*i+10332160815811605931939141890785557216691371679189453595775042194171933260340962487556970779719848153182614470702996648576168712479) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22174150871969569754371179219004051011843629212175138914888380692747774944891612798898091923727227450959764025958886244674249594604*i+16004936009208010915359785299149373714506079766947386398733646053544620987466622066157909923763319472083306047998240101665117088240)*x + (11429822138760919933664827012788708072728189328196692345567960100042303018967654368626779174906665502427062042183914706873439419570*i+10332160815811605931939141890785557216691371679189453595775042194171933260340962487556970779719848153182614470702996648576168712479) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5906127133626339079426505766667777917854319125259428124028726995613027862853571728277784197155674008225974973827758575805419561360*i+6838857583266131806135352272930029582373643682382646539477466486339843841830095108596331754415792528731670648324812212765604481995)*x + (11335726616113608131935654458012633236310982972510759308431667227440524193658593030468784690838240768454191495823005538664977937072*i+3005868259721515343660235464868320650072128067835444455473301597661273971747257868463768237210005860049004062009652955805963157533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5906127133626339079426505766667777917854319125259428124028726995613027862853571728277784197155674008225974973827758575805419561360*i+6838857583266131806135352272930029582373643682382646539477466486339843841830095108596331754415792528731670648324812212765604481995)*x + (11335726616113608131935654458012633236310982972510759308431667227440524193658593030468784690838240768454191495823005538664977937072*i+3005868259721515343660235464868320650072128067835444455473301597661273971747257868463768237210005860049004062009652955805963157533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5213308875200233433580689750190441679298020523588629831733217349826116268959554281197225142842304557424148207871569843718394918743*i+10983801647324496229221693756341777547299391193666518907968528271725899348066662147195507498808301038469992933717130477712174724370)*x + (14277556697187000926016113509671571677836596337160402066447310787081747188069429581660658888859950959950775479382387474411118964742*i+23165497716656999837964637778035299762974124033912719391578765036949547664630863912429689814882024725401047478785645892612236582609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5213308875200233433580689750190441679298020523588629831733217349826116268959554281197225142842304557424148207871569843718394918743*i+10983801647324496229221693756341777547299391193666518907968528271725899348066662147195507498808301038469992933717130477712174724370)*x + (14277556697187000926016113509671571677836596337160402066447310787081747188069429581660658888859950959950775479382387474411118964742*i+23165497716656999837964637778035299762974124033912719391578765036949547664630863912429689814882024725401047478785645892612236582609) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6207309489098229550457599944479537026733361676679328796551948283148567625900719198820777768873956527612367162853000445297970140359*i+19533018305447146242113169649070537750707976674347677819541281062866855586472364100574342067711987388180100465333499039090937785561)*x + (10821769133746331731037321676371760299171440461215693708404018440212731126077380554368284816972002169108340319741245217429776421684*i+11342927809438412776365927507397966782424630044383772502541823765415867662510854261118954172044725813172064314145578999538143720352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6207309489098229550457599944479537026733361676679328796551948283148567625900719198820777768873956527612367162853000445297970140359*i+19533018305447146242113169649070537750707976674347677819541281062866855586472364100574342067711987388180100465333499039090937785561)*x + (10821769133746331731037321676371760299171440461215693708404018440212731126077380554368284816972002169108340319741245217429776421684*i+11342927809438412776365927507397966782424630044383772502541823765415867662510854261118954172044725813172064314145578999538143720352) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6532181610056419045596654638619035407072870186567168532544616291845786011446045977874697618040994239314139054292360439919296379134*i+5879824612084818963990656573478795370395586556616504943851278096914829732347844191913603599441194159457902698256936648096940121847)*x + (23048349915016245657471537502353676858414344619378690111384857498322139108964469916374547684544450490184001990836937645183912536486*i+20870279190770484805422420391261420495991410542578508834626188083859515932560934077781002498874904498969603887585139142084834111925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6532181610056419045596654638619035407072870186567168532544616291845786011446045977874697618040994239314139054292360439919296379134*i+5879824612084818963990656573478795370395586556616504943851278096914829732347844191913603599441194159457902698256936648096940121847)*x + (23048349915016245657471537502353676858414344619378690111384857498322139108964469916374547684544450490184001990836937645183912536486*i+20870279190770484805422420391261420495991410542578508834626188083859515932560934077781002498874904498969603887585139142084834111925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5743159757717773520193800926319778609748279382945226421417092704647571136592993895891572259585224825676072422250013825258752614860*i+15204543119735820996742396743880154941275256264718658765628932428046018291273353408704818843919923236864449066140247132462627247399)*x + (1517794230035983409930337773628777673090323202848021363580060007718370717645086231260967592502558257161476780282579654819874634942*i+8439442928550334858498013443036396953801509010921932274618187326145960642725146947273325817405128572231326640925999598746901213420) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5743159757717773520193800926319778609748279382945226421417092704647571136592993895891572259585224825676072422250013825258752614860*i+15204543119735820996742396743880154941275256264718658765628932428046018291273353408704818843919923236864449066140247132462627247399)*x + (1517794230035983409930337773628777673090323202848021363580060007718370717645086231260967592502558257161476780282579654819874634942*i+8439442928550334858498013443036396953801509010921932274618187326145960642725146947273325817405128572231326640925999598746901213420) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16497489928376234397097843523334728991862834242262069867485077259890336392800912947270624883185540735458668175348170453725393122818*i+7468457900939532041140442777610443651885067245458343379448329781738050143122038172072741020774934941491850822690145202754869583222)*x + (17687710955761409477112141868096358105658049391767419407726731961053583308796067066253160177127896038781938891086249638681397859104*i+19501993444219617197575865349618266195918036558749858557175826787302852444353791216377004310741015640746414533025232995372304218929) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16497489928376234397097843523334728991862834242262069867485077259890336392800912947270624883185540735458668175348170453725393122818*i+7468457900939532041140442777610443651885067245458343379448329781738050143122038172072741020774934941491850822690145202754869583222)*x + (17687710955761409477112141868096358105658049391767419407726731961053583308796067066253160177127896038781938891086249638681397859104*i+19501993444219617197575865349618266195918036558749858557175826787302852444353791216377004310741015640746414533025232995372304218929) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18495350458735281230279583653490113050453274985161246691710185915312694452549258076236528731645535756268816417513138923344747339103*i+5511164004951103503678948990683152668472977152909918148021589991816582875344194303423738674509772474282765328841497027107652867090)*x + (18638253152015091019228967729075504558058808321054892199803034328145222887108898909330579740301215656403505725454805752732982682699*i+6122636790581309788101609821993869558343389243982720413647753491079454148976460147772103370873263146248620555167969686162105426069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18495350458735281230279583653490113050453274985161246691710185915312694452549258076236528731645535756268816417513138923344747339103*i+5511164004951103503678948990683152668472977152909918148021589991816582875344194303423738674509772474282765328841497027107652867090)*x + (18638253152015091019228967729075504558058808321054892199803034328145222887108898909330579740301215656403505725454805752732982682699*i+6122636790581309788101609821993869558343389243982720413647753491079454148976460147772103370873263146248620555167969686162105426069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6734608532089735728997070689938986925866329539382349416893251349651627978118840339266940683769962473316999615965182304995644516313*i+6641575833871998879414836267329918489645441966646089271972812799147370044133042141725184236886141505022189260411215698030184652115)*x + (2488763448940799693042215624933271732985722598614328833260762383012444704800957478780261719786886132621681517271589150432439151600*i+23653216577161625715811200601988442636118414569605212751206414647513788983303050427470224385519903023686572085184514565625523186638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6734608532089735728997070689938986925866329539382349416893251349651627978118840339266940683769962473316999615965182304995644516313*i+6641575833871998879414836267329918489645441966646089271972812799147370044133042141725184236886141505022189260411215698030184652115)*x + (2488763448940799693042215624933271732985722598614328833260762383012444704800957478780261719786886132621681517271589150432439151600*i+23653216577161625715811200601988442636118414569605212751206414647513788983303050427470224385519903023686572085184514565625523186638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24157840124477361874991918486705576970157225059179823426418658542826309789660284578162481595497702207889759369969297694703929843372*i+10812558313946532787145778410502512939554538188983438628228669344503458977142187453268267861256595594478986294566488223500360961454)*x + (13952119731587957531948132504198431965508523333493290343904868672963618722693135729066141188685116410818122001233351254366543696343*i+9076804822686687770077496996116722430573718701193618052930379511887420876972866663719986708926293223203956638000292681609606905239) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24157840124477361874991918486705576970157225059179823426418658542826309789660284578162481595497702207889759369969297694703929843372*i+10812558313946532787145778410502512939554538188983438628228669344503458977142187453268267861256595594478986294566488223500360961454)*x + (13952119731587957531948132504198431965508523333493290343904868672963618722693135729066141188685116410818122001233351254366543696343*i+9076804822686687770077496996116722430573718701193618052930379511887420876972866663719986708926293223203956638000292681609606905239) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17487799864045800586184420783772503920694012378066517443022255226171259266344147302420597327945722468565881629309206082370118277369*i+24140272338615385994074402548591440973350679290139172831709114903489432269553026102907688795884848530155170266545798141672761339043)*x + (19704663465638014892714651941812681957455069707381071528844342215224405845720585616713082431038728390990361614862559037990116393952*i+20928999020293362737996950406412652438030468586024314431787208773085671135416897891632617828497778403274939280163678637639764158767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17487799864045800586184420783772503920694012378066517443022255226171259266344147302420597327945722468565881629309206082370118277369*i+24140272338615385994074402548591440973350679290139172831709114903489432269553026102907688795884848530155170266545798141672761339043)*x + (19704663465638014892714651941812681957455069707381071528844342215224405845720585616713082431038728390990361614862559037990116393952*i+20928999020293362737996950406412652438030468586024314431787208773085671135416897891632617828497778403274939280163678637639764158767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22619042800938950804175882965850179195350192781116517445828453056860048851802529888961881513954937083198025170781318570001734915912*i+22991887110823967219727068588571442340801664188538174065354304066909150686332570056093060540719980608446737808038597393696676107772)*x + (2854701811316640300762870035724663631677294926297041196018614878417053870096005150344466225890588501885851967245333369151879994477*i+5624575755150760145658301470296174315372443747342793359994524570586637011827715178139153577962633708542680955867192034260394225687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22619042800938950804175882965850179195350192781116517445828453056860048851802529888961881513954937083198025170781318570001734915912*i+22991887110823967219727068588571442340801664188538174065354304066909150686332570056093060540719980608446737808038597393696676107772)*x + (2854701811316640300762870035724663631677294926297041196018614878417053870096005150344466225890588501885851967245333369151879994477*i+5624575755150760145658301470296174315372443747342793359994524570586637011827715178139153577962633708542680955867192034260394225687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1315187647769640014255954635086942786625238709671260865750863491637832826539017912087203913487208997782673196293579099419989888763*i+14353955859699768946613620145498237291275537720351461736876679428666304181898024686454183216146812801271498842937934551347808258797)*x + (2069673423627261977260044383649578557847975870910442659732900483452677954309546009097877506120457211258891454078992694747917801239*i+14074666844597200566252462627737167851415057728132039659514102318237366239005841152809305802668208463175769189552826067795960229612) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1315187647769640014255954635086942786625238709671260865750863491637832826539017912087203913487208997782673196293579099419989888763*i+14353955859699768946613620145498237291275537720351461736876679428666304181898024686454183216146812801271498842937934551347808258797)*x + (2069673423627261977260044383649578557847975870910442659732900483452677954309546009097877506120457211258891454078992694747917801239*i+14074666844597200566252462627737167851415057728132039659514102318237366239005841152809305802668208463175769189552826067795960229612) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2686138572655298708520015928236443201851423013627076239868123268279103871402113142458437964536511514028788981490517017649464433766*i+21881302159742222742044803082005532042905275202529544979184428665097459852358706701105621712055889710641830547290268959629925697960)*x + (10907750480954162889071078607557958778164961443917354714948835203846270988709466898578067123598568220657909779398780572349486248079*i+180778460706095459672868138399225860682319993253382428833798822155860490298245766334230187401234065421833514986240295902596066700) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2686138572655298708520015928236443201851423013627076239868123268279103871402113142458437964536511514028788981490517017649464433766*i+21881302159742222742044803082005532042905275202529544979184428665097459852358706701105621712055889710641830547290268959629925697960)*x + (10907750480954162889071078607557958778164961443917354714948835203846270988709466898578067123598568220657909779398780572349486248079*i+180778460706095459672868138399225860682319993253382428833798822155860490298245766334230187401234065421833514986240295902596066700) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11908395872320788766770789039170583873009008980121134000477460839125459850075444708548186689515566208736632115902634331060413013273*i+11632020296679660248893408323815523304231236661943531987658821396513529421605082488973569118138946138349512604415124520665702863918)*x + (16508751392042349399298792395911864700347896003734708678126367720644234683889330642284306575890362084199466959680861351386542246942*i+6854151906678658959442167306213418536507364910128120988695747731986828386111284285726817848130696464925916189330380082641038145133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11908395872320788766770789039170583873009008980121134000477460839125459850075444708548186689515566208736632115902634331060413013273*i+11632020296679660248893408323815523304231236661943531987658821396513529421605082488973569118138946138349512604415124520665702863918)*x + (16508751392042349399298792395911864700347896003734708678126367720644234683889330642284306575890362084199466959680861351386542246942*i+6854151906678658959442167306213418536507364910128120988695747731986828386111284285726817848130696464925916189330380082641038145133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5260886024694815582849061557689776633999227522989564485012397661753404173891524321496153217627085084863152881821310581250809637944*i+3406880315250893258755424716030332452869350135699320339570601956648999355297184084958046309728535559488317959073648978070761781179)*x + (5506202274958727071555369427135901820692528253381812405791365890269895547086748692856224384495520642574432349672386248279327227513*i+17963146277286965692498776069435069824068933611345981369977626837485706940011457832664099251042781558081591975466980288647697077114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5260886024694815582849061557689776633999227522989564485012397661753404173891524321496153217627085084863152881821310581250809637944*i+3406880315250893258755424716030332452869350135699320339570601956648999355297184084958046309728535559488317959073648978070761781179)*x + (5506202274958727071555369427135901820692528253381812405791365890269895547086748692856224384495520642574432349672386248279327227513*i+17963146277286965692498776069435069824068933611345981369977626837485706940011457832664099251042781558081591975466980288647697077114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (301110043436990308132787366318723362030908723795566095208400552313163729873619294903926521003439372551369943687076650279396837975*i+18831207404725353604504530856331569899609681222231412596503786660245733855140727129185159678622185368739116441943292605662580436255)*x + (7160546768135022264737875871540188214692186581465957725487333017125560228561517393426073659482227456644555814519008438660818810852*i+23433964850846443366896295547246400227507246051340611763049058991318044506404528020995209115590795077525575481784076348174537855663) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (301110043436990308132787366318723362030908723795566095208400552313163729873619294903926521003439372551369943687076650279396837975*i+18831207404725353604504530856331569899609681222231412596503786660245733855140727129185159678622185368739116441943292605662580436255)*x + (7160546768135022264737875871540188214692186581465957725487333017125560228561517393426073659482227456644555814519008438660818810852*i+23433964850846443366896295547246400227507246051340611763049058991318044506404528020995209115590795077525575481784076348174537855663) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11585662025576242415204744127573826292139988088167653563258094165063411249448458942021755563274000358748474040707823523355749340360*i+3829173562329657222807570367421057018706963295950877849876808542108171323998688313829845130773425451487871803166685589686954449937)*x + (1244607554369357423040756284017551904415840099372210471891166773390074005682853496515285649034043665290241188942826260461857606153*i+12833112192259926517129068896982011037856429834331880338759563360100904059965734300091261856047425475896351320337505022357783339702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11585662025576242415204744127573826292139988088167653563258094165063411249448458942021755563274000358748474040707823523355749340360*i+3829173562329657222807570367421057018706963295950877849876808542108171323998688313829845130773425451487871803166685589686954449937)*x + (1244607554369357423040756284017551904415840099372210471891166773390074005682853496515285649034043665290241188942826260461857606153*i+12833112192259926517129068896982011037856429834331880338759563360100904059965734300091261856047425475896351320337505022357783339702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2063248649897427635990559888384424485717201972497747162529719214781939787564886856677449631073924109271788134030116059386881586021*i+13549972956408249542939747012330330646135718668646215658674993810065731469142922155225411411405989840506318090832063004521366070600)*x + (21813454579647351076725304740060342355515570008145188237080546613834178665798541675392485392438295269882829381559964379459047992120*i+22620386331568660906467742393530229210572894545885031070241796422244495481281244540880738350140086618147209540412063128058285135660) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2063248649897427635990559888384424485717201972497747162529719214781939787564886856677449631073924109271788134030116059386881586021*i+13549972956408249542939747012330330646135718668646215658674993810065731469142922155225411411405989840506318090832063004521366070600)*x + (21813454579647351076725304740060342355515570008145188237080546613834178665798541675392485392438295269882829381559964379459047992120*i+22620386331568660906467742393530229210572894545885031070241796422244495481281244540880738350140086618147209540412063128058285135660) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24198912524277316955275832079865509553703224342986495977175061417096867595449782295928833148880691689751720004485213008352818244292*i+7179943571977612539382388001147918016610209158923786704363686923704654478767105583935870166848225270845392856209294186785702034154)*x + (9601781841631042990602891459692869654703085195327480123178402899101503930744253224635457121658090200779886574897423015432126597496*i+1067472242284382971576896951226059381034546688742580969775240591662969794803776376232776846842836170586724695776616845051853807526) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24198912524277316955275832079865509553703224342986495977175061417096867595449782295928833148880691689751720004485213008352818244292*i+7179943571977612539382388001147918016610209158923786704363686923704654478767105583935870166848225270845392856209294186785702034154)*x + (9601781841631042990602891459692869654703085195327480123178402899101503930744253224635457121658090200779886574897423015432126597496*i+1067472242284382971576896951226059381034546688742580969775240591662969794803776376232776846842836170586724695776616845051853807526) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3454289490090170189172611949416682003039861288775152434849584878491834092504222676181320291739864491881141061448536788491975605560*i+2605048846225547011546634672022552907498174519236002127223507317264151506972404881086662545200532074632076449389496615302830374420)*x + (14762245227792516509460310854275668225451723265404605189808920913658359375225494622851529629174724937205653199437675780799429098691*i+6626752854748000455331394934487414466122059315502527500092374424226730310033694339642177993716464357315512033058901549525758548415) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3454289490090170189172611949416682003039861288775152434849584878491834092504222676181320291739864491881141061448536788491975605560*i+2605048846225547011546634672022552907498174519236002127223507317264151506972404881086662545200532074632076449389496615302830374420)*x + (14762245227792516509460310854275668225451723265404605189808920913658359375225494622851529629174724937205653199437675780799429098691*i+6626752854748000455331394934487414466122059315502527500092374424226730310033694339642177993716464357315512033058901549525758548415) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7762999721402893928443577432899395870480891554897265545149549535271113183481684915776841020348570642475611349088184746143247853397*i+18457218400601913669449200089520179847333476319422539023178997550550011377102567348921756422414421060914629406914684198772884600819)*x + (2344196707833025396904189693156720264986235121179281517353833329568422131107197046058441521476047226343576758549597985857150520379*i+10396970482594954496947569865584085743187114472752922770095633954550377197365423790173990311358177104012255161509842397258631856494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7762999721402893928443577432899395870480891554897265545149549535271113183481684915776841020348570642475611349088184746143247853397*i+18457218400601913669449200089520179847333476319422539023178997550550011377102567348921756422414421060914629406914684198772884600819)*x + (2344196707833025396904189693156720264986235121179281517353833329568422131107197046058441521476047226343576758549597985857150520379*i+10396970482594954496947569865584085743187114472752922770095633954550377197365423790173990311358177104012255161509842397258631856494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1400571322816079967825584858038468692312444799383744364330876780071940998984327752494637591179877127165493321029624114811514467250*i+3552160649218786334522362939194078437459837453189298565140263938883064420414472240895036658812412112243601538017227398365535996271)*x + (275121418194743671973734857560734937843858159327456009672766776229557860857191099972723372442428169604339226439926260054423139586*i+3120497625342645476081703599455920073438307137808863689971938133916764793251747166895802512405284483981366657462821250160022485402) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1400571322816079967825584858038468692312444799383744364330876780071940998984327752494637591179877127165493321029624114811514467250*i+3552160649218786334522362939194078437459837453189298565140263938883064420414472240895036658812412112243601538017227398365535996271)*x + (275121418194743671973734857560734937843858159327456009672766776229557860857191099972723372442428169604339226439926260054423139586*i+3120497625342645476081703599455920073438307137808863689971938133916764793251747166895802512405284483981366657462821250160022485402) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15441607583892120119056072777602110027608994517341775097030359424619608639896831006442415957105371273083795998571130735008238849552*i+17293380510059624557395192285393883977749531730301458727090160634715557462745301728956378877810367404340499008342902463594137653945)*x + (18225986935235540418372639587875661216062130630860839282546223085960134577911963520357078414939363393179754199377333530101495654932*i+23467177182385335268548542227747313428148858436773565437862993365323953707246488349926440337738224885211276784069797086596268733567) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15441607583892120119056072777602110027608994517341775097030359424619608639896831006442415957105371273083795998571130735008238849552*i+17293380510059624557395192285393883977749531730301458727090160634715557462745301728956378877810367404340499008342902463594137653945)*x + (18225986935235540418372639587875661216062130630860839282546223085960134577911963520357078414939363393179754199377333530101495654932*i+23467177182385335268548542227747313428148858436773565437862993365323953707246488349926440337738224885211276784069797086596268733567) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12050805803159633900033610084892392917939582937055744499434119360958390164981656766659701204993793726041916977654397512233120398944*i+12106518582772959124066745475530949751250054179807700350979478711511016926289944846521048526118643175002627095089309219638903326621)*x + (4140215084830373236333826253438198962445307600344946407991311111536184452409032742715850369058357528903671514499111156027705578968*i+4795899873701128931580007551839669213841955574196850585377984131426680896496976379915848950060718111477472216983296842898805750466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12050805803159633900033610084892392917939582937055744499434119360958390164981656766659701204993793726041916977654397512233120398944*i+12106518582772959124066745475530949751250054179807700350979478711511016926289944846521048526118643175002627095089309219638903326621)*x + (4140215084830373236333826253438198962445307600344946407991311111536184452409032742715850369058357528903671514499111156027705578968*i+4795899873701128931580007551839669213841955574196850585377984131426680896496976379915848950060718111477472216983296842898805750466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17583024380546871877917357809626510986196101810826480535064370761558859291221736713842163188932563513251448761516924685605344634576*i+21202419072503571108959097497906539925494310634683759761081043366949530353726164297007805179076284622070734403126267859187029575254)*x + (5621331221978631214198549450025557318832459803136596671902035679833400283555990844324176102105509243802609253702325290940138590876*i+1560646564990334473647664693655432778146423726683091918469275430318586509077201964876667862402180988352637911233640846111178825960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17583024380546871877917357809626510986196101810826480535064370761558859291221736713842163188932563513251448761516924685605344634576*i+21202419072503571108959097497906539925494310634683759761081043366949530353726164297007805179076284622070734403126267859187029575254)*x + (5621331221978631214198549450025557318832459803136596671902035679833400283555990844324176102105509243802609253702325290940138590876*i+1560646564990334473647664693655432778146423726683091918469275430318586509077201964876667862402180988352637911233640846111178825960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1514036630225286810405461969028744862251801237486510356609454730594946775994603302135212467288140324087686590034186585267867260887*i+9754277072918316015447739158580671098388463380594049128406585549025581270596080920437953238088577579137959256483103130297456624223)*x + (9733213479092465782725729632718966015336758178196468301947219457252701771766052068302610742671782363989464439966898343376756207662*i+8365398617348361421723069711354068083621147001673960531061705475620910040754599748444243973292828445235784896692716299424673412329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1514036630225286810405461969028744862251801237486510356609454730594946775994603302135212467288140324087686590034186585267867260887*i+9754277072918316015447739158580671098388463380594049128406585549025581270596080920437953238088577579137959256483103130297456624223)*x + (9733213479092465782725729632718966015336758178196468301947219457252701771766052068302610742671782363989464439966898343376756207662*i+8365398617348361421723069711354068083621147001673960531061705475620910040754599748444243973292828445235784896692716299424673412329) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21298463981450515495320171615558844771749992677661883519381299502126794154242385577724461200856865297324861869385947194010910567243*i+4110624190965233931738646506792852261912027252702622226432069702480225445780499059776360722625889711669039215130559432014471252981)*x + (1647401368660586421396604300704744125205437866309296026845708486606501972499465226103202683106999345969974265666972083099576107723*i+11595818959098676039148599691797063180284634691376094026828381928816406733496106592715663160611037476249988435855029029861605530804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21298463981450515495320171615558844771749992677661883519381299502126794154242385577724461200856865297324861869385947194010910567243*i+4110624190965233931738646506792852261912027252702622226432069702480225445780499059776360722625889711669039215130559432014471252981)*x + (1647401368660586421396604300704744125205437866309296026845708486606501972499465226103202683106999345969974265666972083099576107723*i+11595818959098676039148599691797063180284634691376094026828381928816406733496106592715663160611037476249988435855029029861605530804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4679545328440422988407225591885650522039886444847789932446714133986174502809175462748597130852100698734164107883658779514196224560*i+3953358671719634955415921693872959184733849368878721794033103401397861528535220751520506059518419868164574663374207920733805855772)*x + (7246447393642132231834429881620717626649767394864056797724932428956241359257883986147710452821970305491225696959669806693061969067*i+14372893517343897071400374310101284850965792501924830758255560671266040118040121415137769389702345012109199025326978876707468585390) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4679545328440422988407225591885650522039886444847789932446714133986174502809175462748597130852100698734164107883658779514196224560*i+3953358671719634955415921693872959184733849368878721794033103401397861528535220751520506059518419868164574663374207920733805855772)*x + (7246447393642132231834429881620717626649767394864056797724932428956241359257883986147710452821970305491225696959669806693061969067*i+14372893517343897071400374310101284850965792501924830758255560671266040118040121415137769389702345012109199025326978876707468585390) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6000260993600561711771473136803105106061896245790075300938857515784529301382267210705593497633575698284195239515829084302291235625*i+17175317675140127939117630859001577129677135816994600938289061372455877081393316205400857362404439019312810168405530429116860708183)*x + (23972679797140326800452363567223702983197699779661525526912792977930052696204974268711342966382575773432729797845877377709540717507*i+12554802841449020133480654764456073120843233940858446663884027465703015710346037227736933738561274512926444575491829422776904936402) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6000260993600561711771473136803105106061896245790075300938857515784529301382267210705593497633575698284195239515829084302291235625*i+17175317675140127939117630859001577129677135816994600938289061372455877081393316205400857362404439019312810168405530429116860708183)*x + (23972679797140326800452363567223702983197699779661525526912792977930052696204974268711342966382575773432729797845877377709540717507*i+12554802841449020133480654764456073120843233940858446663884027465703015710346037227736933738561274512926444575491829422776904936402) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12116332280500280807088864597695008647063645203316811178704672667916673575370590502010326612953218624797136207954155263569535251967*i+3467878968382412786231471457268740497050685474552352447090792042794002906639633109757245271546994753551278981928325749771145824235)*x + (17310860128688387647944627155217577364198965656947583762788009987860959709366432693798635010844683821249262500950121285833775700493*i+6887321224543247202955450755248399735288109341231603366136366992348664699010983551438040568416325849266967309333652514771451202061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12116332280500280807088864597695008647063645203316811178704672667916673575370590502010326612953218624797136207954155263569535251967*i+3467878968382412786231471457268740497050685474552352447090792042794002906639633109757245271546994753551278981928325749771145824235)*x + (17310860128688387647944627155217577364198965656947583762788009987860959709366432693798635010844683821249262500950121285833775700493*i+6887321224543247202955450755248399735288109341231603366136366992348664699010983551438040568416325849266967309333652514771451202061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8980747394068535030430698866527646604752208847041842947554556767879077090829516494191320606347232706086983436918359488948015591856*i+20815817883682503812816270517330400172882303758761903189492232627895493396608686170482693196905833577259718611318770257626981362979)*x + (9341023962519445678052004360862656882319628924503617748727079000770541043474062786110319623311436591890150688854779970036417607334*i+14608105587987592653857093353589751589557907884642000401464463576178329434842755309900882653491086619200236759218867230552311964103) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8980747394068535030430698866527646604752208847041842947554556767879077090829516494191320606347232706086983436918359488948015591856*i+20815817883682503812816270517330400172882303758761903189492232627895493396608686170482693196905833577259718611318770257626981362979)*x + (9341023962519445678052004360862656882319628924503617748727079000770541043474062786110319623311436591890150688854779970036417607334*i+14608105587987592653857093353589751589557907884642000401464463576178329434842755309900882653491086619200236759218867230552311964103) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21833926944824761263060186147747691824414830254548417611044005943814733043630879262513154672081344447286325616922562259316931271884*i+5266534168239759632379977741833024105144905928030022241365632616877724433322936834162521759172733838356258740070965982879244037765)*x + (11472496631560122094621050994081574313362690542477330397277322025100014502312567437848485175770646072948154288067690750335164386557*i+20952310635503022658735723839976946330385453657703092542848805244435424239729253920339518199079823676587165994338014969634384367055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21833926944824761263060186147747691824414830254548417611044005943814733043630879262513154672081344447286325616922562259316931271884*i+5266534168239759632379977741833024105144905928030022241365632616877724433322936834162521759172733838356258740070965982879244037765)*x + (11472496631560122094621050994081574313362690542477330397277322025100014502312567437848485175770646072948154288067690750335164386557*i+20952310635503022658735723839976946330385453657703092542848805244435424239729253920339518199079823676587165994338014969634384367055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16228895597026492236675040859867793760434973880567227190815548005669691362790460502441067692463826601717692932530412792455747879319*i+10946414549000406418959047047388304784480831428681610561469994653557247578786636903362462077939024943257945954862531238903473365322)*x + (22276296422811499880655377871777137853937429346974074534912114605560949002570883395990818091638160424577407792038353583338443467529*i+6583742530584189978978030382011384722664127047575047723160437252806196756652568773308249261857938056642711532807593917800514069572) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16228895597026492236675040859867793760434973880567227190815548005669691362790460502441067692463826601717692932530412792455747879319*i+10946414549000406418959047047388304784480831428681610561469994653557247578786636903362462077939024943257945954862531238903473365322)*x + (22276296422811499880655377871777137853937429346974074534912114605560949002570883395990818091638160424577407792038353583338443467529*i+6583742530584189978978030382011384722664127047575047723160437252806196756652568773308249261857938056642711532807593917800514069572) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4378229642729360137831789489314912327813573932600818392783532565950589358666597696547006613140227946166301350554658049188168544663*i+479644817783092732052902834881307345584292299674875504342598670199415823463087417701830446516032586143149168959885583409299472527)*x + (2642020099262315544995568234720212323326651675047447014077466738265381900600339736957366110601456645726151514104802482138124638768*i+18889908374667070990313095264254532083151431940170248685844883279023599353906480235254942604858968874121939874874960746583490759369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4378229642729360137831789489314912327813573932600818392783532565950589358666597696547006613140227946166301350554658049188168544663*i+479644817783092732052902834881307345584292299674875504342598670199415823463087417701830446516032586143149168959885583409299472527)*x + (2642020099262315544995568234720212323326651675047447014077466738265381900600339736957366110601456645726151514104802482138124638768*i+18889908374667070990313095264254532083151431940170248685844883279023599353906480235254942604858968874121939874874960746583490759369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19003738874664762516660820698233236861742953522485947090522058682996129509518418972082416310110311351051379019098721404876879885869*i+19809519301328450041085419236015458221473201405193265015167189402869714305525098012808733724646954113625749825330140893608673230010)*x + (22790705500413562347076156410655409668694324511099164303950900450651260628667993364294248683034408973414713840137087244770792864129*i+16524773482344642690781747727924661346293456345145655891347826071313015094401394258969811421525940883413825213779013598245054015133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19003738874664762516660820698233236861742953522485947090522058682996129509518418972082416310110311351051379019098721404876879885869*i+19809519301328450041085419236015458221473201405193265015167189402869714305525098012808733724646954113625749825330140893608673230010)*x + (22790705500413562347076156410655409668694324511099164303950900450651260628667993364294248683034408973414713840137087244770792864129*i+16524773482344642690781747727924661346293456345145655891347826071313015094401394258969811421525940883413825213779013598245054015133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20590107628325863160295990405964642776358076273011079039019116326910448315914535722516376688024172636882034747064321046023329583006*i+21730729107359864929769135858453098653385064139690983867624100231852858138650478886007656128432725928770360262213322528945299133452)*x + (23690570293295464786552128208862302781246891259849479477887440275487453972530069797836527013558028336154735034360253891386756183638*i+11987105967139584163300271975122437836669990569736663517392932258042323464610948575297293603815007697902938069773056721190139130534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20590107628325863160295990405964642776358076273011079039019116326910448315914535722516376688024172636882034747064321046023329583006*i+21730729107359864929769135858453098653385064139690983867624100231852858138650478886007656128432725928770360262213322528945299133452)*x + (23690570293295464786552128208862302781246891259849479477887440275487453972530069797836527013558028336154735034360253891386756183638*i+11987105967139584163300271975122437836669990569736663517392932258042323464610948575297293603815007697902938069773056721190139130534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12234819238859766559630245199839819055295190335009217475804386969215028449639637801241595974346094844478924397957996008080237321213*i+12365183115772262598905107415867526118078155338055050132898382973076677413994898975128229122180349624685607228135025288475439588277)*x + (4478353862039608060525060444584472586848473916618639799987713053472213817557431568037232043837170676638047685511268576201042269662*i+6265406973121764669382843457993573383487668363624566245013572157504031628914986736029302593386454351688274817101786797111152908160) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12234819238859766559630245199839819055295190335009217475804386969215028449639637801241595974346094844478924397957996008080237321213*i+12365183115772262598905107415867526118078155338055050132898382973076677413994898975128229122180349624685607228135025288475439588277)*x + (4478353862039608060525060444584472586848473916618639799987713053472213817557431568037232043837170676638047685511268576201042269662*i+6265406973121764669382843457993573383487668363624566245013572157504031628914986736029302593386454351688274817101786797111152908160) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23805219814835560354356380248945606481893360528117527314820621214007369026498721276087550957384684487745905183784175008467645719580*i+7367475365773639601642472763045058509500496819065629123583514294334655059730801231330802344184510809742923307264948261055335525938)*x + (13093421074498291254929913789182381347769628057671493887347659324901045017595633514036655304274499850230675187383489730917488309125*i+12422191617491317130246640666525645260542172977128866366724677395914770989051597710999211314684114693350768121005758703935196645725) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23805219814835560354356380248945606481893360528117527314820621214007369026498721276087550957384684487745905183784175008467645719580*i+7367475365773639601642472763045058509500496819065629123583514294334655059730801231330802344184510809742923307264948261055335525938)*x + (13093421074498291254929913789182381347769628057671493887347659324901045017595633514036655304274499850230675187383489730917488309125*i+12422191617491317130246640666525645260542172977128866366724677395914770989051597710999211314684114693350768121005758703935196645725) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7086940299547353292321440743552204381163048500680180501462391848377204542760219707180576490234767778512613238747163354029581411465*i+1672406807972804489787659175728482219068408949990853885161053532839227149250377278263177739219080885777947381912831900477232720928)*x + (17194658908828625029391706906524540116659510732712058095160951940940871498999187386967223748155628649365272060926446650669151613806*i+4642529397984105227024056558718479145941135089655823463550863226997483433775983326061000646610134018943834175221476538565744577343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7086940299547353292321440743552204381163048500680180501462391848377204542760219707180576490234767778512613238747163354029581411465*i+1672406807972804489787659175728482219068408949990853885161053532839227149250377278263177739219080885777947381912831900477232720928)*x + (17194658908828625029391706906524540116659510732712058095160951940940871498999187386967223748155628649365272060926446650669151613806*i+4642529397984105227024056558718479145941135089655823463550863226997483433775983326061000646610134018943834175221476538565744577343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9219087495572731605798599454232087955125177948466192739760284094262073809009037698479162721281704938680305424064152619369779343521*i+20247037183488702372461669552502304521394968527401404194891699475016449772770839104572361290870562940625629058498640647485903736582)*x + (4668843982219227493725172384248883019769277881485541827515737860920492739228070211917039534149986054576116686757809276710340253869*i+8546266781671759154393953241000525769994792821601609839081976792900732878835596965849079326903265656217515712010849815785330860960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9219087495572731605798599454232087955125177948466192739760284094262073809009037698479162721281704938680305424064152619369779343521*i+20247037183488702372461669552502304521394968527401404194891699475016449772770839104572361290870562940625629058498640647485903736582)*x + (4668843982219227493725172384248883019769277881485541827515737860920492739228070211917039534149986054576116686757809276710340253869*i+8546266781671759154393953241000525769994792821601609839081976792900732878835596965849079326903265656217515712010849815785330860960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1166381096410467864581202804906195748156906430202162365222190124343345460545887652006222594495431722389019758273210653635033559645*i+6447297167937633846571608645148580507294046016648603944789541785622070222770745068145576907118096380765201591417417029865255312390)*x + (10413064233545508332339780846338121488479246046696417456802580169061057049915296075228091728086643043871051310346744299528999526933*i+2268309964065693572457971255091253235571280192865817968337723863542730912356532712858958510626349972000297730313953850953137537009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1166381096410467864581202804906195748156906430202162365222190124343345460545887652006222594495431722389019758273210653635033559645*i+6447297167937633846571608645148580507294046016648603944789541785622070222770745068145576907118096380765201591417417029865255312390)*x + (10413064233545508332339780846338121488479246046696417456802580169061057049915296075228091728086643043871051310346744299528999526933*i+2268309964065693572457971255091253235571280192865817968337723863542730912356532712858958510626349972000297730313953850953137537009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1059770951603560875511429251318547301706551191259494646779085764368033043553565001272933713925272500484851284792852462758770700270*i+19516450130749431025233076926220469733316765411352553496943543259415911178108912742362109141264629150396478414559933136845959259765)*x + (9283620795486121713451636009319014603259936209025646974075132290641300065703844189169718675593528260809922352209215901628132268410*i+20782190005762531555546692049961458732519131624559732358878107856245742180016325113277886930895343688905502540300799747702361914508) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1059770951603560875511429251318547301706551191259494646779085764368033043553565001272933713925272500484851284792852462758770700270*i+19516450130749431025233076926220469733316765411352553496943543259415911178108912742362109141264629150396478414559933136845959259765)*x + (9283620795486121713451636009319014603259936209025646974075132290641300065703844189169718675593528260809922352209215901628132268410*i+20782190005762531555546692049961458732519131624559732358878107856245742180016325113277886930895343688905502540300799747702361914508) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12388504625353868992257461433880426799228065862094015952371687328528355201322886975106237967816984026563518880082095407222364675774*i+16695642447717654390122808530440368006029690247037718961134469301530137278616243145895967403066509105822003501929092185377830115976)*x + (7757701136467299025424628791155125569644385485982566800893642865609333870586529870996629228648037615352560895774784686019805155441*i+24243067051875642778425175402743632845199771357465480119765418544183712390118773569581575253014672149189819718216502796922779310751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12388504625353868992257461433880426799228065862094015952371687328528355201322886975106237967816984026563518880082095407222364675774*i+16695642447717654390122808530440368006029690247037718961134469301530137278616243145895967403066509105822003501929092185377830115976)*x + (7757701136467299025424628791155125569644385485982566800893642865609333870586529870996629228648037615352560895774784686019805155441*i+24243067051875642778425175402743632845199771357465480119765418544183712390118773569581575253014672149189819718216502796922779310751) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13247588388684936884252416337753494088368369140022208612933960002777127504355604584977543996893989394274944555939373876766410877272*i+19341832534884135501410694861594884122405887570811660226014170449601731418620957994911748631587459310477998359773518076491199428116)*x + (3211574469803215610622965203321453303888802497118845250430976636762684122104217017030067714539509842614034129925115763822367280768*i+19826188371592984756104768851073241927130967109029165203460107832328371726749313335806716727219092099855868178888162786645675306390) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13247588388684936884252416337753494088368369140022208612933960002777127504355604584977543996893989394274944555939373876766410877272*i+19341832534884135501410694861594884122405887570811660226014170449601731418620957994911748631587459310477998359773518076491199428116)*x + (3211574469803215610622965203321453303888802497118845250430976636762684122104217017030067714539509842614034129925115763822367280768*i+19826188371592984756104768851073241927130967109029165203460107832328371726749313335806716727219092099855868178888162786645675306390) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (456180264413208734259695075282680444921249041200015055322932115189362705886776481704374988537101976749307483606209527694895080138*i+1149996054995252190633901990535614394766459247968104678997006309706983242892074684059001212444410674232636386896755387207087416836)*x + (11219536446485383679171990092451687282934682759087469713598029387823658689636866491455121367792044729814806496936189977045794690014*i+15992607587587029716119590313235208325090662109070815745209342800529556243031110073104593170045848335176906553444166227953518732724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (456180264413208734259695075282680444921249041200015055322932115189362705886776481704374988537101976749307483606209527694895080138*i+1149996054995252190633901990535614394766459247968104678997006309706983242892074684059001212444410674232636386896755387207087416836)*x + (11219536446485383679171990092451687282934682759087469713598029387823658689636866491455121367792044729814806496936189977045794690014*i+15992607587587029716119590313235208325090662109070815745209342800529556243031110073104593170045848335176906553444166227953518732724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16552196544491214339620770235741357676178841888354259667011849997241616766587351912620625251687353624144049163328445854603952540926*i+1427067976803230693411786883594115779798597149043045347286780928441409467986345998712265826270228712027181829917352697702615798682)*x + (16308760510987044177603207814695689688256287970403626726203753483653714768760057072280132110665770351981171573795715830626016493950*i+8358863799616778557253649128548644494890726007660941612120018736436917095943553883871559493531327286528928116562526077437800704603) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16552196544491214339620770235741357676178841888354259667011849997241616766587351912620625251687353624144049163328445854603952540926*i+1427067976803230693411786883594115779798597149043045347286780928441409467986345998712265826270228712027181829917352697702615798682)*x + (16308760510987044177603207814695689688256287970403626726203753483653714768760057072280132110665770351981171573795715830626016493950*i+8358863799616778557253649128548644494890726007660941612120018736436917095943553883871559493531327286528928116562526077437800704603) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (65715985044416866981265176604135142286773710031269732135357434473988244422412614514404827027271342992793463030243034264693929010*i+8406351774578975591059003777401378989139234674797492178792399765300370977456240449923741836396467318591393719752102701085648660115)*x + (23881720469562160183390342031466908800874517543610579686100693402885883046545995309380916570246169738241155144382111985562546830833*i+8469219590994493148460992728774531133198090219829121329372792536410055376919310581816188962307087325686859722337828519219773691732) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (65715985044416866981265176604135142286773710031269732135357434473988244422412614514404827027271342992793463030243034264693929010*i+8406351774578975591059003777401378989139234674797492178792399765300370977456240449923741836396467318591393719752102701085648660115)*x + (23881720469562160183390342031466908800874517543610579686100693402885883046545995309380916570246169738241155144382111985562546830833*i+8469219590994493148460992728774531133198090219829121329372792536410055376919310581816188962307087325686859722337828519219773691732) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14098713334777811926990077813609281071694982214863374665999796855206617130068776023718922399166842563825915595758628295604237229391*i+24376825823875968012916715692125244093329925504975687881498214136124190111285103904081797727210301060121498008717822521367782226175)*x + (8750590470482818182518042109718059485167182685276511208292834518096915446117997108230975308220791659649452821407125483828785310540*i+10767391589843931161999709328081453822664926382657964615501170123470579428633028697795078768648625445988691750024975174077657105469) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14098713334777811926990077813609281071694982214863374665999796855206617130068776023718922399166842563825915595758628295604237229391*i+24376825823875968012916715692125244093329925504975687881498214136124190111285103904081797727210301060121498008717822521367782226175)*x + (8750590470482818182518042109718059485167182685276511208292834518096915446117997108230975308220791659649452821407125483828785310540*i+10767391589843931161999709328081453822664926382657964615501170123470579428633028697795078768648625445988691750024975174077657105469) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6376445803662547153220417627423020855444093407473593135633484476820753489319228028609749019252265338037046484688765790900991243565*i+9122233486162393598536124707993208450329852383287306051447236645505224150431970635562373619061806344766647641857176883751372603587)*x + (17709765707080674901390134420495196983466879480705279173051214797247987741842000672458359913400920395502947461591067589522696568239*i+14291208092057998790150438739616166480552034232976647117138290413435836714455518429630234500637021494452705329752767044355666311417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6376445803662547153220417627423020855444093407473593135633484476820753489319228028609749019252265338037046484688765790900991243565*i+9122233486162393598536124707993208450329852383287306051447236645505224150431970635562373619061806344766647641857176883751372603587)*x + (17709765707080674901390134420495196983466879480705279173051214797247987741842000672458359913400920395502947461591067589522696568239*i+14291208092057998790150438739616166480552034232976647117138290413435836714455518429630234500637021494452705329752767044355666311417) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7287725484656332961732053765526220446063578520793440595772033201015557145981619580024018132334484572538541379314245064983697989310*i+15800153826083840532947672522477137465291815875737070591210262941521505001537398895908719870010721895452286340607647628032656625527)*x + (23804567026691051610572544146491860463637786123800215990310035414924832862242019362392008230038483866370221093589423665261571289941*i+17089099801536295154427880667638830909781275678642480347011725129136639159457139977284037208275026678129691965157783674382577140446) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7287725484656332961732053765526220446063578520793440595772033201015557145981619580024018132334484572538541379314245064983697989310*i+15800153826083840532947672522477137465291815875737070591210262941521505001537398895908719870010721895452286340607647628032656625527)*x + (23804567026691051610572544146491860463637786123800215990310035414924832862242019362392008230038483866370221093589423665261571289941*i+17089099801536295154427880667638830909781275678642480347011725129136639159457139977284037208275026678129691965157783674382577140446) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10349246899361045351282122081935076977539107810621160710598078929503672253551815282111926370236889659589825615725765727441545341885*i+7324486127045203018200870900170683013256573347634630754473704860592660865361398705927629743741687063503296543352068807541366473356)*x + (6518820120989784633212203977679259704593859451878874672620344146072276354446447747741544137080409511171657569647413027926296506172*i+18234803410416270566355061049518103918501196846060904710464437159719517793284464841107160490733376804166879287614303367696583931713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [117]:
E12 = Phi12.codomain()
E12, E12.j_invariant()
Out[117]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10349246899361045351282122081935076977539107810621160710598078929503672253551815282111926370236889659589825615725765727441545341885*i+7324486127045203018200870900170683013256573347634630754473704860592660865361398705927629743741687063503296543352068807541366473356)*x + (6518820120989784633212203977679259704593859451878874672620344146072276354446447747741544137080409511171657569647413027926296506172*i+18234803410416270566355061049518103918501196846060904710464437159719517793284464841107160490733376804166879287614303367696583931713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 6773817643685352908767736196090375279907263878877817787659990006029906545276121776901591609874042818492455420142032075328870426927*i + 5674949525371294828317093362593374066486762253743894180379831700077176468953480744493682174343599517241142118434588189562115227867)
In [118]:
E21 = Phi21.codomain()
E21, E21.j_invariant()
Out[118]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10349246899361045351282122081935076977539107810621160710598078929503672253551815282111926370236889659589825615725765727441545341885*i+7324486127045203018200870900170683013256573347634630754473704860592660865361398705927629743741687063503296543352068807541366473356)*x + (6518820120989784633212203977679259704593859451878874672620344146072276354446447747741544137080409511171657569647413027926296506172*i+18234803410416270566355061049518103918501196846060904710464437159719517793284464841107160490733376804166879287614303367696583931713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 6773817643685352908767736196090375279907263878877817787659990006029906545276121776901591609874042818492455420142032075328870426927*i + 5674949525371294828317093362593374066486762253743894180379831700077176468953480744493682174343599517241142118434588189562115227867)
In [119]:
E21.j_invariant() == E12.j_invariant()
Out[119]:
True
In [120]:
"""  MLCBT - KEP  with n = 4 """
Out[120]:
'  MLCBT - KEP  with n = 4 '
In [121]:
"""  We will keep the general parameters and just evolves from l= h-1 """
Out[121]:
'  We will keep the general parameters and just evolves from l= h-1 '
In [122]:
Integer(S3).binary(), Integer(S4).binary(), Integer(S5).binary(), Integer(S6).binary()
Out[122]:
('111111000101101110100110111110110000011100111000000011111000001010100010110000110000000111001000010000110101110011111011001110100111110111101011001010111110001110000110011101110001000000000010011001001010011010010010',
 '101001000111011100101001001010001110110000111000010000101010010000000100000011110100100010111001111000010100011100001110110101100000000001000101001101101110001011010100000010100101000101001011110001110011110110101110',
 '1111010001011010110010100101101000001110110101001110011010110000100111010101100001000100111010100101000100101110011101101100010101001010110010001001011110000000010011011101010001000001100100001011110011100111011100101',
 '111101101100001010010111101000111111111111010001101110010100100110101111001100000100001111010101000111111000101110011010011011110101011101111110110101010100001111000111110110001010011110111100000011000101000000001011')
In [153]:
hash(Integer(S3)).__xor__(hash(Integer(E34.j_invariant().norm())))
Out[153]:
1187946119120485602
In [154]:
k3 = Integer(randint(0, l_B^n_B - 1))
k4 = Integer(randint(0, l_B^n_B - 1))
k5 = Integer(randint(0, l_A^n_A - 1))
k6 = Integer(randint(0, l_A^n_A - 1))

k3, k4, k5, k6
Out[154]:
(24508750037346405081686829137794650571342345732489207089665493641,
 136484480014149848848624245512040500226766002599844972124469771042,
 34887826402531063549250163355154943444526784954274006115305934122,
 34625386102344457121439093879556947722214399696537776576382679723)
In [143]:
S3.__xor__(E34.j_invariant())
Out[143]:
NotImplemented
In [157]:
c3 = hash(k3).__xor__(hash(Integer(E34.j_invariant().norm())))
c4 = hash(k4).__xor__(hash(Integer(E43.j_invariant().norm())))

c3, c4
Out[157]:
(629141593461679252, 1974491769222368142)
In [160]:
c3 = k3.__xor__(Integer(E34.j_invariant().norm()))
c4 = k4.__xor__(Integer(E43.j_invariant().norm()))

c3, c4
Out[160]:
(15693260699015510385705905023771462820213268646272237990602628106842086295853695645727449352168027467925349137182942265192384833805,
 15693260699015510385705905023771462820213268646272237990602628106743427862849965555230527071960413999008129609741081937130995439782)
In [169]:
""" The participant P_4 retrieves k3 and computes k3 * k4 """
c3.__xor__(Integer(E43.j_invariant().norm())) == k3
Integer(Mod(c3.__xor__(Integer(E43.j_invariant().norm())) * k4, l_B^n_B))
Out[169]:
188333650718383425648572622857218173280636405483127486353450611520
In [170]:
""" The participant P_3 retrieves k4 and computes k4 * k3 """
c4.__xor__(Integer(E34.j_invariant().norm())) == k4
Integer(Mod(c4.__xor__(Integer(E34.j_invariant().norm())) * k3, l_B^n_B))
Out[170]:
188333650718383425648572622857218173280636405483127486353450611520
In [171]:
S1 = Integer(Mod(c4.__xor__(Integer(E34.j_invariant().norm())) * k3, l_B^n_B))
S1
Out[171]:
188333650718383425648572622857218173280636405483127486353450611520
In [172]:
c5 = k5.__xor__(Integer(E56.j_invariant().norm()))
c6 = k6.__xor__(Integer(E65.j_invariant().norm()))

c5, c6
Out[172]:
(12731802020788625280437640619986989337673210207617421502779333249893731415938280272900921830433075663341018424079251526762230944761,
 12731802020788625280437640619986989337673210207617421502779333249893376578414941930820815552101822403603843952371891198898344256632)
In [173]:
""" The participant P_5 retrieves k6 and computes k5 * k6 """

Integer(Mod(c6.__xor__(Integer(E56.j_invariant().norm())) * k5, l_A^n_A))
Out[173]:
53136765182513283175199007212076444812629987383299060700836794126
In [174]:
""" The participant P_6 retrieves k5 and computes k6 * k5 """

Integer(Mod(c5.__xor__(Integer(E65.j_invariant().norm())) * k6, l_A^n_A))
Out[174]:
53136765182513283175199007212076444812629987383299060700836794126
In [176]:
S2 = Integer(Mod(c5.__xor__(Integer(E65.j_invariant().norm())) * k6, l_A^n_A))
S2
Out[176]:
53136765182513283175199007212076444812629987383299060700836794126
In [177]:
R1 = P1 + Integer(S1) * Q1
R1
Out[177]:
(5689775923508538025865406254790186317145071534825668646462415241332147387761252037514308222764020957914029764610252964405332636406*i + 1458111615353645490191436548436913124801862454738021366128415753274215337591334655038090191394532726894700102168108824288292172806 : 11342699365380381551291945647199120826663863699050194665141367771958564964651274959605520712758448090372467664422158088746335084262*i + 6397040627883249233181436497750034599589224567103771900733905197554842513808317198195707262690980703626498539430401123830214178736 : 1)
In [178]:
R2 = P0 + Integer(S2) * Q0
R2
Out[178]:
(15030817338292946673477114075875188439351151460618835566601868694162601667678793568468244246125001439825691740486254179350042847504*i + 2235401571687371927004511662304199452449404102139189464807679303933669568903243714224748040935443395177434838682931488998956847650 : 17016499322255397844964301790460556342298489548755401022240997582697508000714951520410098341412957788705630045694294718641403355660*i + 14354532902756406330820705287283292294251844787868173135032414610954469298513648469764260590484375688793531094009284609085261230603 : 1)
In [179]:
Phi1 = isogeny_walk (E, R1, l_B, n_B)
Phi1
Out[179]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 4813219499806256080727360664475860652733186331573760157358957127654698345021523345903606250811847755265270184703092745751596166671*x + 8128306828198975511370882453904078308531459311946487122736624031357472915020620097055819354221408300507484961940652068289827994951 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 4813219499806256080727360664475860652733186331573760157358957127654698345021523345903606250811847755265270184703092745751596166671*x + 8128306828198975511370882453904078308531459311946487122736624031357472915020620097055819354221408300507484961940652068289827994951 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10254168258314387728427211473788586099076456953619127843772611533016304317779547506623357720022092197320027639882155671943080418721*i+9543378470943058221898599554821267542642791608425463623378633584378773300294459223358036455732378151836130747704460140898780805879)*x + (5408718248708388204023392205052584647399144117102336346828249135454389623443772021295893417551652938846866673089575580292112400744*i+23377989808988087233452127262330605813956282794853215853472802510700736538407003730842315838227123497389752878200128896696697118090) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10254168258314387728427211473788586099076456953619127843772611533016304317779547506623357720022092197320027639882155671943080418721*i+9543378470943058221898599554821267542642791608425463623378633584378773300294459223358036455732378151836130747704460140898780805879)*x + (5408718248708388204023392205052584647399144117102336346828249135454389623443772021295893417551652938846866673089575580292112400744*i+23377989808988087233452127262330605813956282794853215853472802510700736538407003730842315838227123497389752878200128896696697118090) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (215910796689852278330552114357678792761303563139590228816723291522940381504637530388328246457239202813481458351008837122021092963*i+24396655624906121377363043009271175954034106680837700989997983916281847750218990057585984638974389760751704212816088308483496182735)*x + (12002104588987339512614360921851345278923875995040812431586101390164607383144118829878198877910467450949025708661080387701464955446*i+23984639725802057283311346172563563479336824362261565581141771880455381156682446241542938383781135785755911204726885383828414439502) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (215910796689852278330552114357678792761303563139590228816723291522940381504637530388328246457239202813481458351008837122021092963*i+24396655624906121377363043009271175954034106680837700989997983916281847750218990057585984638974389760751704212816088308483496182735)*x + (12002104588987339512614360921851345278923875995040812431586101390164607383144118829878198877910467450949025708661080387701464955446*i+23984639725802057283311346172563563479336824362261565581141771880455381156682446241542938383781135785755911204726885383828414439502) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18646039069830593265698771011263362436978428126033971936891812253804634639741614330172826439581685481314676255214120877010570918135*i+2019839448084102748875013025595310361834560258842064581793127028974418855786328684680881023821305258139293475622883305398480800240)*x + (17286605037315304790213718500243497658697169007473319641541082679626448891838240758105007926516330379184939356539106929445668406868*i+12447347140185672665502566353137577296227248590150020830678839925804928274451966017099430477371149707172345939972895270605688181359) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18646039069830593265698771011263362436978428126033971936891812253804634639741614330172826439581685481314676255214120877010570918135*i+2019839448084102748875013025595310361834560258842064581793127028974418855786328684680881023821305258139293475622883305398480800240)*x + (17286605037315304790213718500243497658697169007473319641541082679626448891838240758105007926516330379184939356539106929445668406868*i+12447347140185672665502566353137577296227248590150020830678839925804928274451966017099430477371149707172345939972895270605688181359) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (976502211700175212737103580718591099588554899915535658047711137407371968631759481852320147913313641791571082482421252110069306715*i+18896810851330826801389437835046665948588286129104654294307884703120590489655678019113641245904632816882983120281068429653566108177)*x + (17446560521379225579186480074000261083229754330887131803796061254395880294076339580474564302205327662941860436509004304256270325432*i+13573790269709179885846143002737387581497147660912452059649443266524689824302420776725012183520958807002551861942990731664159110035) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (976502211700175212737103580718591099588554899915535658047711137407371968631759481852320147913313641791571082482421252110069306715*i+18896810851330826801389437835046665948588286129104654294307884703120590489655678019113641245904632816882983120281068429653566108177)*x + (17446560521379225579186480074000261083229754330887131803796061254395880294076339580474564302205327662941860436509004304256270325432*i+13573790269709179885846143002737387581497147660912452059649443266524689824302420776725012183520958807002551861942990731664159110035) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16731118337522929766551089024145272061729229819922572505237877672248964506083450949595998535332717403586380723480409075148492797749*i+9658655969475270110225878930758697679114683552803360825767081149929946363150587141829555534976715894633738325077430226644053680729)*x + (787819664495518014066982479231613946992213611453594644220008218865347985783683325209035401798592885423906932644376780375047198816*i+18490968415743212322784567719155761893039246648094163760647530942836537334811481559861599550444012432493987891987998605260929365009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16731118337522929766551089024145272061729229819922572505237877672248964506083450949595998535332717403586380723480409075148492797749*i+9658655969475270110225878930758697679114683552803360825767081149929946363150587141829555534976715894633738325077430226644053680729)*x + (787819664495518014066982479231613946992213611453594644220008218865347985783683325209035401798592885423906932644376780375047198816*i+18490968415743212322784567719155761893039246648094163760647530942836537334811481559861599550444012432493987891987998605260929365009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7897155636393688584245124469792692659291688345326028686737152233078282700547017524643615232756825603276030560642741547484712485049*i+18484737664782586012086162438480087035380622675222408454554226606122878592159796898974265175647253065530630616378202262018232107576)*x + (8756509448211944645336056158615772131277841743374045796180133891304548222093744956627925745511642312115421805424412479524674719180*i+10488421128294225021648684674492984639229891078185012797097133636802632452641654138927927352780996759902922358643055200504913370401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7897155636393688584245124469792692659291688345326028686737152233078282700547017524643615232756825603276030560642741547484712485049*i+18484737664782586012086162438480087035380622675222408454554226606122878592159796898974265175647253065530630616378202262018232107576)*x + (8756509448211944645336056158615772131277841743374045796180133891304548222093744956627925745511642312115421805424412479524674719180*i+10488421128294225021648684674492984639229891078185012797097133636802632452641654138927927352780996759902922358643055200504913370401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2049058262955686985736977657797253744446991820393510829926886936707711026058220663385546693138652493199050502923800863824437814802*i+4686586746540806955244973826173761348282146140684376332641589890726250168591619899613797621994524030676597660281233664830077986380)*x + (4713732785538413677536730664586809468870174058111489750337761129132346889571789716551362845065019504495770529384746045463688156183*i+3111697870142405906089099640317812637847135917055552865814771788917657217849210873352698939094268065009238697262696135427532272667) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2049058262955686985736977657797253744446991820393510829926886936707711026058220663385546693138652493199050502923800863824437814802*i+4686586746540806955244973826173761348282146140684376332641589890726250168591619899613797621994524030676597660281233664830077986380)*x + (4713732785538413677536730664586809468870174058111489750337761129132346889571789716551362845065019504495770529384746045463688156183*i+3111697870142405906089099640317812637847135917055552865814771788917657217849210873352698939094268065009238697262696135427532272667) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6554509980229270524415467784077105986304663410169311896955572267003440319999179677957004984022418931839188040982820528786169479543*i+9597287862203484480419901216333348726296000613253530512642127693238899745330373850531044836704858434116186943018417809599669127178)*x + (19576466387358031201252378896122993975347104315768901724093239010169652625032160856611130751270887962726170640834190970249564492345*i+5218018256924447485042345505773692918507365038983627584195080537617942558091526049333118659615894831951883200849737968771085862676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6554509980229270524415467784077105986304663410169311896955572267003440319999179677957004984022418931839188040982820528786169479543*i+9597287862203484480419901216333348726296000613253530512642127693238899745330373850531044836704858434116186943018417809599669127178)*x + (19576466387358031201252378896122993975347104315768901724093239010169652625032160856611130751270887962726170640834190970249564492345*i+5218018256924447485042345505773692918507365038983627584195080537617942558091526049333118659615894831951883200849737968771085862676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5757446826644797877435876479615042632499442384936864317724970041361184579748582462574005647146892797925790767754060517742919036332*i+5204978547089472055511548312590765678630843482167531275061646466113826280972290045373218402593942605291263542987755163264671158608)*x + (12707008047121501109631407587517952446197900140411236145488321749092716900250572846709902000850028621640004852296093029896217246776*i+631185816271280857725640325171102437430668892697494965148585707411187903089515373432967861456375738409640727671886896464224063427) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5757446826644797877435876479615042632499442384936864317724970041361184579748582462574005647146892797925790767754060517742919036332*i+5204978547089472055511548312590765678630843482167531275061646466113826280972290045373218402593942605291263542987755163264671158608)*x + (12707008047121501109631407587517952446197900140411236145488321749092716900250572846709902000850028621640004852296093029896217246776*i+631185816271280857725640325171102437430668892697494965148585707411187903089515373432967861456375738409640727671886896464224063427) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7735651013263677365863353930496955233371583453895483644901359791006764639406093495099269511127715102082072291670409348448435067417*i+23773728565644449728624132992216008899775661603111910379707374152203429014558717633552246318474694117893668588887966650106474057351)*x + (5610976584901611044754979382909462654672345907986038042338372574017086354741443368815656307191958587011637825202351113795136363343*i+803524503509020785095065060262402963992894733784897483202483967523956306928461058278622556794695784804924847158883008914230478321) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7735651013263677365863353930496955233371583453895483644901359791006764639406093495099269511127715102082072291670409348448435067417*i+23773728565644449728624132992216008899775661603111910379707374152203429014558717633552246318474694117893668588887966650106474057351)*x + (5610976584901611044754979382909462654672345907986038042338372574017086354741443368815656307191958587011637825202351113795136363343*i+803524503509020785095065060262402963992894733784897483202483967523956306928461058278622556794695784804924847158883008914230478321) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20191083430241225050051768520651611557667982693394077818076339537059188902013934620006998601366276989086581334765222147051318348516*i+7572593274689773909953683817617993885461608529666028095439018869566972473237110649086071821452228462415354093592278754785319949827)*x + (21853738459389007066363780306933207725406503637412232402148917565847006994363769734501946304071101767681194275748738156531541568399*i+7724663482758434472434815413276890716452261144981081227278424218652094742873238558752518733866689145973826458818317092248979243013) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20191083430241225050051768520651611557667982693394077818076339537059188902013934620006998601366276989086581334765222147051318348516*i+7572593274689773909953683817617993885461608529666028095439018869566972473237110649086071821452228462415354093592278754785319949827)*x + (21853738459389007066363780306933207725406503637412232402148917565847006994363769734501946304071101767681194275748738156531541568399*i+7724663482758434472434815413276890716452261144981081227278424218652094742873238558752518733866689145973826458818317092248979243013) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1835687414528723075039031092218888388212276932507078236973089100992899153034282780782797404652663169813524755837960261431864643264*i+24360982615493992503199891010585440183593731302097421471301145404808732860943320569865169406661337057475424225208382692584206129148)*x + (21157411051121804537171405653926430568595644689167207369530644528791068339013263418319130987626180520268317099478115137882794772487*i+2470603449348433905088210143375774321523788913769938867926909810381102942408819832858167131923446322798273096423848174052702747786) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1835687414528723075039031092218888388212276932507078236973089100992899153034282780782797404652663169813524755837960261431864643264*i+24360982615493992503199891010585440183593731302097421471301145404808732860943320569865169406661337057475424225208382692584206129148)*x + (21157411051121804537171405653926430568595644689167207369530644528791068339013263418319130987626180520268317099478115137882794772487*i+2470603449348433905088210143375774321523788913769938867926909810381102942408819832858167131923446322798273096423848174052702747786) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10246863339370667846472294352782590615556169931252393052988397209411434520025447285884406439839095657279623599921904510434333543392*i+4039381376736687548850696876425432319788480644267085320452744480409585243706742014436432579685534413410250410539778587282194112398)*x + (10835678290137882131697376212763630999558900421236563449226937739388029028603779073255275900213803410278099756558845295358968862146*i+4779522598864881559511036083954049934265332634127497887679107826465398022768547803559850167748731309149147883253635732102725383595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10246863339370667846472294352782590615556169931252393052988397209411434520025447285884406439839095657279623599921904510434333543392*i+4039381376736687548850696876425432319788480644267085320452744480409585243706742014436432579685534413410250410539778587282194112398)*x + (10835678290137882131697376212763630999558900421236563449226937739388029028603779073255275900213803410278099756558845295358968862146*i+4779522598864881559511036083954049934265332634127497887679107826465398022768547803559850167748731309149147883253635732102725383595) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6351459194370815346362158591855498522344075938348183403258223805256647148590796347964007954686055016823893137383877644776194785066*i+10199872782123417667720883490305777543045929551327522115182589476029417950692688011134958334134092670704109088011611010645317883521)*x + (20786047386253902938468896693852650037909412536657395637944174341073442607789391131554669993097876484741528950629554672513771855603*i+2985798803877609371625990687239527405712231370586649775931670156398163783453279095405123118334528924590560421810118024695443332627) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6351459194370815346362158591855498522344075938348183403258223805256647148590796347964007954686055016823893137383877644776194785066*i+10199872782123417667720883490305777543045929551327522115182589476029417950692688011134958334134092670704109088011611010645317883521)*x + (20786047386253902938468896693852650037909412536657395637944174341073442607789391131554669993097876484741528950629554672513771855603*i+2985798803877609371625990687239527405712231370586649775931670156398163783453279095405123118334528924590560421810118024695443332627) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17968836372576248604108977469638633274065309763844981415448318554685123320116018659096978103828701859126921578680043116852650578463*i+4911705681948851190463359200334166496601121356356152745284856464267150607510022396325572512402798836073800863023568688832761356402)*x + (13608604213553316042519711264938216108955035528800152238897950697421453433039202895330467741545314784322368791013341859103948911844*i+8100631645497851652659210948410316734019535742901032623807117174452536187939156829400590280987884912449745426525299941188465060453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17968836372576248604108977469638633274065309763844981415448318554685123320116018659096978103828701859126921578680043116852650578463*i+4911705681948851190463359200334166496601121356356152745284856464267150607510022396325572512402798836073800863023568688832761356402)*x + (13608604213553316042519711264938216108955035528800152238897950697421453433039202895330467741545314784322368791013341859103948911844*i+8100631645497851652659210948410316734019535742901032623807117174452536187939156829400590280987884912449745426525299941188465060453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13313581156659687125477141956775579847405351389731803853181719834389735221789451110135017164585849644311707116802017557275174414560*i+4584313443358436186653212592285098458943760888150080370767977736073659971535083650187097305403712368491207160138028899375221331395)*x + (15568078816195762494334188740958001713359012162329677415005638736320885554357378808903623718972344426486087518225223357087413193821*i+1102257103843784639477752330799667900936440880203311720980429540454445517660803054113224903070324463000476423783566902786383854302) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13313581156659687125477141956775579847405351389731803853181719834389735221789451110135017164585849644311707116802017557275174414560*i+4584313443358436186653212592285098458943760888150080370767977736073659971535083650187097305403712368491207160138028899375221331395)*x + (15568078816195762494334188740958001713359012162329677415005638736320885554357378808903623718972344426486087518225223357087413193821*i+1102257103843784639477752330799667900936440880203311720980429540454445517660803054113224903070324463000476423783566902786383854302) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21910965249204577537092864620800693695534943798642381781751551409031233393673141943938176419148291073966723821665351211626180950413*i+346886091284761758264288547175565766349395761169111814441727794161026431078440765484709574424087596644724197388528010830488218175)*x + (18026926165984732515014711320694648119749123725694817550113904158545401329291363411995216327530506316697103205372220867410087474903*i+18526705931059994750071690435918858364386689563696651308475405714617497871325470835610431753527768448120166442434323133105190637550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21910965249204577537092864620800693695534943798642381781751551409031233393673141943938176419148291073966723821665351211626180950413*i+346886091284761758264288547175565766349395761169111814441727794161026431078440765484709574424087596644724197388528010830488218175)*x + (18026926165984732515014711320694648119749123725694817550113904158545401329291363411995216327530506316697103205372220867410087474903*i+18526705931059994750071690435918858364386689563696651308475405714617497871325470835610431753527768448120166442434323133105190637550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21259235310315169064132787092525525073973687347284231032795903076191779750957387785231881394248097595708497198764920714821341120590*i+315387868232021780020945885654115963984674456242902948644427378236148447489247148939983258323583620102417454972734385889862107078)*x + (20922962353185160337284422664256970782620618027327891794443367203556685696003130466162499153509444921438349456616145006259562722159*i+2598476205505545819462352447238826191416150335533392961379735132460137993518282857831835974757635131287863683802162224212075208656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21259235310315169064132787092525525073973687347284231032795903076191779750957387785231881394248097595708497198764920714821341120590*i+315387868232021780020945885654115963984674456242902948644427378236148447489247148939983258323583620102417454972734385889862107078)*x + (20922962353185160337284422664256970782620618027327891794443367203556685696003130466162499153509444921438349456616145006259562722159*i+2598476205505545819462352447238826191416150335533392961379735132460137993518282857831835974757635131287863683802162224212075208656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18137394101346137522879765263304389106765448816040492208171950830995568012614521001768372844834076742779326394323584599333274697918*i+892584849183517867266255597953927412927964527599980075054803157727336147975676729390706355941932217812868979972552250947355778209)*x + (19062961562036739393057006132175871887612360460819854215318546539275998147081613702037656619113423657326106365187398981766872464825*i+14320990790708262073698147734189986025685548584113560259988441667002664506989334447665315061324527675785942971859189938983613951476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18137394101346137522879765263304389106765448816040492208171950830995568012614521001768372844834076742779326394323584599333274697918*i+892584849183517867266255597953927412927964527599980075054803157727336147975676729390706355941932217812868979972552250947355778209)*x + (19062961562036739393057006132175871887612360460819854215318546539275998147081613702037656619113423657326106365187398981766872464825*i+14320990790708262073698147734189986025685548584113560259988441667002664506989334447665315061324527675785942971859189938983613951476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1561964331988872893249613604528115798422067458142407124794992422464573673709657730977835192894617839909992304519287696835672568249*i+4201633581959407307839126652104318684203575922691968960604877037709277936631693346172163433160509282051278460524056409682473483052)*x + (9297599783742626692288586384066878112013751208174725518938030404138521350623656014690554217049649649037557662865508132009593776101*i+7300447385532426021122873251802776230408675648083558930838160370115868865312933058993032351062712125090190148869537608827173787481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1561964331988872893249613604528115798422067458142407124794992422464573673709657730977835192894617839909992304519287696835672568249*i+4201633581959407307839126652104318684203575922691968960604877037709277936631693346172163433160509282051278460524056409682473483052)*x + (9297599783742626692288586384066878112013751208174725518938030404138521350623656014690554217049649649037557662865508132009593776101*i+7300447385532426021122873251802776230408675648083558930838160370115868865312933058993032351062712125090190148869537608827173787481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3703919574005128253848066346498689607866185866838919096942582155209600192706003600497817339689514707285186007496955549725850221205*i+6734169144354972300498909647601117686620941794591135988726128178479861259946610765230743086173978467556706859305374654445094753903)*x + (899079596752531623838562535873742391787310645813590263261853718275618461843775644414805484257790660098044512755834351090305215364*i+22395550008446865804851806055353732605927608131900007435922313183209348138830183741109469587949824371487048938772921522416883812302) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3703919574005128253848066346498689607866185866838919096942582155209600192706003600497817339689514707285186007496955549725850221205*i+6734169144354972300498909647601117686620941794591135988726128178479861259946610765230743086173978467556706859305374654445094753903)*x + (899079596752531623838562535873742391787310645813590263261853718275618461843775644414805484257790660098044512755834351090305215364*i+22395550008446865804851806055353732605927608131900007435922313183209348138830183741109469587949824371487048938772921522416883812302) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21692017767198583697928015990802293580495049770377478764682588591319932654524699298359473997258320407360398678333087639185885420483*i+11475137029272445440937951794103374116040584840142397662892097017534785375361828096154440379687119630892041290679475214174815909957)*x + (11232480543784316993985761861594332846958411033156889599591461082785684710447777324624547493243983332264494972092951075158125113552*i+1407294083377313854233297204245121854491759461248119819451429898143369105526438072276031634688970007279847614141271193820533782172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21692017767198583697928015990802293580495049770377478764682588591319932654524699298359473997258320407360398678333087639185885420483*i+11475137029272445440937951794103374116040584840142397662892097017534785375361828096154440379687119630892041290679475214174815909957)*x + (11232480543784316993985761861594332846958411033156889599591461082785684710447777324624547493243983332264494972092951075158125113552*i+1407294083377313854233297204245121854491759461248119819451429898143369105526438072276031634688970007279847614141271193820533782172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10650282359509742534463829275810633374565228014608099492696142895593427034953373101706998354758672411765876859256439493461389992961*i+22320158124993738879493325092693328860549968985120660947209993741466695437059137413767223051417872899919194453953574497215181049406)*x + (8333326172802708887344217617470257422032065019844391321464101898067640581912546156512174645001517536622378852648885265684116488416*i+6986210499683018382830256630475234097518787920928797659435924491622896726794542110615581270174803719089927896139701768788961584664) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10650282359509742534463829275810633374565228014608099492696142895593427034953373101706998354758672411765876859256439493461389992961*i+22320158124993738879493325092693328860549968985120660947209993741466695437059137413767223051417872899919194453953574497215181049406)*x + (8333326172802708887344217617470257422032065019844391321464101898067640581912546156512174645001517536622378852648885265684116488416*i+6986210499683018382830256630475234097518787920928797659435924491622896726794542110615581270174803719089927896139701768788961584664) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9307431987653921124338691928824564689104793930538567127613895019126677360909730068481140442390363531669180714304832321565772606696*i+4131664420256153175546321961110830398180072467677707354245893111047604875580171736484634291964659582389559264867383605350067419703)*x + (9171426836085427164450863690554289367213935773490968711542823336940452716323172766509790796053054022885813581914695424736480917828*i+12993644784010876056110157949142606072600873635844642538203270098549905081817351184396634449485700056088159773233198682008592149198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9307431987653921124338691928824564689104793930538567127613895019126677360909730068481140442390363531669180714304832321565772606696*i+4131664420256153175546321961110830398180072467677707354245893111047604875580171736484634291964659582389559264867383605350067419703)*x + (9171426836085427164450863690554289367213935773490968711542823336940452716323172766509790796053054022885813581914695424736480917828*i+12993644784010876056110157949142606072600873635844642538203270098549905081817351184396634449485700056088159773233198682008592149198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13693103371556920855114922697268827772299403285480845292880653693311478824585644710749005685939252700432913828040899393348181844194*i+8501190348650706086802396434847095805142251782511683587024172249643632492083632272819169973306896069287443677111187143950625433486)*x + (4224220130372321681040437534400295316598657790516143619237936589129634208141160921476135017531433724664782525651437017724395260565*i+17726258122832355070086522364483230798766759949774940220348354445595211833985680784906648555888083927838797947788206388898862302676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13693103371556920855114922697268827772299403285480845292880653693311478824585644710749005685939252700432913828040899393348181844194*i+8501190348650706086802396434847095805142251782511683587024172249643632492083632272819169973306896069287443677111187143950625433486)*x + (4224220130372321681040437534400295316598657790516143619237936589129634208141160921476135017531433724664782525651437017724395260565*i+17726258122832355070086522364483230798766759949774940220348354445595211833985680784906648555888083927838797947788206388898862302676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2673823771059654466503689162842822616564290823524085559376387608232746389859063745454588901129147506233119652764264646725740631945*i+2704542288563725136121594214186946382938247895799142100476513347479891347890742434686096524297268908849081046885638133435871978573)*x + (2483016896253122298629119248258960173634103651267168885062782590807138049175254941168733131008796494632414953099377903208962587955*i+14900757692233694487953966768401675586485588660145876070149817153695989277184907941474780426564059323336905964620397161761300757370) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2673823771059654466503689162842822616564290823524085559376387608232746389859063745454588901129147506233119652764264646725740631945*i+2704542288563725136121594214186946382938247895799142100476513347479891347890742434686096524297268908849081046885638133435871978573)*x + (2483016896253122298629119248258960173634103651267168885062782590807138049175254941168733131008796494632414953099377903208962587955*i+14900757692233694487953966768401675586485588660145876070149817153695989277184907941474780426564059323336905964620397161761300757370) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8827170413118550435245213129731538686748623741881488301287641845394825435887357848660275407864908401711005475795128194327964567790*i+3165908523683845868009152410980065237440337432808795186427523537144911291715554993240339900488970525565330680524426070293121503770)*x + (6548271618858471858815173599076041218633156006250707488286953679394528466408520954407610757446490368076691487387778690358234277334*i+5082718509615019715514636030828439107764978630896354179312664936236580718691580000788813267834185430990711000825799872011313191644) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8827170413118550435245213129731538686748623741881488301287641845394825435887357848660275407864908401711005475795128194327964567790*i+3165908523683845868009152410980065237440337432808795186427523537144911291715554993240339900488970525565330680524426070293121503770)*x + (6548271618858471858815173599076041218633156006250707488286953679394528466408520954407610757446490368076691487387778690358234277334*i+5082718509615019715514636030828439107764978630896354179312664936236580718691580000788813267834185430990711000825799872011313191644) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11494537089487238811633662600494330856900657699779598915381189665604850358060046097313288401076804237242459338686448587555494295231*i+13056037719798093919829837837392511939264706181676939593681070982278303757696125909997983223859898597020098458784494575869017859389)*x + (21644861384116847581965907642514470303616534422943431737441981291465441351514012925177127238133458850236427320021771018180830606991*i+20287455978012985896861639984461480051052941120956752526446366787419406764851891527248542760884090170921802888185038313333203414155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11494537089487238811633662600494330856900657699779598915381189665604850358060046097313288401076804237242459338686448587555494295231*i+13056037719798093919829837837392511939264706181676939593681070982278303757696125909997983223859898597020098458784494575869017859389)*x + (21644861384116847581965907642514470303616534422943431737441981291465441351514012925177127238133458850236427320021771018180830606991*i+20287455978012985896861639984461480051052941120956752526446366787419406764851891527248542760884090170921802888185038313333203414155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (522877427596806377137917445477536091890546615248957840092573930794981910650593486292919558676784415697047031832187459423211737825*i+3313662607766407639279633861246554025544928269065675057244316189155656628294730693419661601715462226784617531312255478734364227544)*x + (16859157397732273416537791376306255364111597227984940643304850401686894082702644437428220858395344744599760968836947439007075658285*i+15664047908217175082589507512035001376752080420192381572348735377386995226116795075820847368880343924567159759863138135894315769494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (522877427596806377137917445477536091890546615248957840092573930794981910650593486292919558676784415697047031832187459423211737825*i+3313662607766407639279633861246554025544928269065675057244316189155656628294730693419661601715462226784617531312255478734364227544)*x + (16859157397732273416537791376306255364111597227984940643304850401686894082702644437428220858395344744599760968836947439007075658285*i+15664047908217175082589507512035001376752080420192381572348735377386995226116795075820847368880343924567159759863138135894315769494) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14540397502780032600055075594960583474382703265943486636056551107604153726179639281947565033270353708313291352591081095753099000346*i+24215331350201184263989219373463102528529872737057683359083313768378285781804145949568929165550430462939368113512762146775800478527)*x + (4470453995716884041798889246270499954385327453875443616977131366304843502536981884263521666808095455797210690063280077918271612453*i+1002953389532859284623085344099155019868716735373888655721753754547158825866410584133978722794981928734239682226403935982449680561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14540397502780032600055075594960583474382703265943486636056551107604153726179639281947565033270353708313291352591081095753099000346*i+24215331350201184263989219373463102528529872737057683359083313768378285781804145949568929165550430462939368113512762146775800478527)*x + (4470453995716884041798889246270499954385327453875443616977131366304843502536981884263521666808095455797210690063280077918271612453*i+1002953389532859284623085344099155019868716735373888655721753754547158825866410584133978722794981928734239682226403935982449680561) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10725335584193445288806142564964972499707767252548533151902734065239993724401845479490027195526433845546449689800056880451454377224*i+13472166978813530243600139087743540484839654751350531799106036201062474841303781008618027718127503185229519634276429407098689417581)*x + (6429101066534502165183990337644105408515895578106439799866480203941212633301661453593101581863524095716922307627360194426165693022*i+3022287310329650702317447879128849364187891695362366395660064812148405059200169947208180992491121201360401531896823496838736775931) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10725335584193445288806142564964972499707767252548533151902734065239993724401845479490027195526433845546449689800056880451454377224*i+13472166978813530243600139087743540484839654751350531799106036201062474841303781008618027718127503185229519634276429407098689417581)*x + (6429101066534502165183990337644105408515895578106439799866480203941212633301661453593101581863524095716922307627360194426165693022*i+3022287310329650702317447879128849364187891695362366395660064812148405059200169947208180992491121201360401531896823496838736775931) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1508828206526713872169140765860125279428164335682321375256092559114776589593240831674686358034294831428733851023712132080815418024*i+19581615751944401636649513088091908275710693152205947726620603544672631848644720897646650821155377507468284402981320751275223471367)*x + (3906509723949036102563847205368137046791586228135880050334457459420059966665721660255885824576797438436460005083919621751010293508*i+186530069863476973088217824801197513759684959806501264189878514722350003550972909857422498070464990260144812950645098931359107998) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1508828206526713872169140765860125279428164335682321375256092559114776589593240831674686358034294831428733851023712132080815418024*i+19581615751944401636649513088091908275710693152205947726620603544672631848644720897646650821155377507468284402981320751275223471367)*x + (3906509723949036102563847205368137046791586228135880050334457459420059966665721660255885824576797438436460005083919621751010293508*i+186530069863476973088217824801197513759684959806501264189878514722350003550972909857422498070464990260144812950645098931359107998) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15032007794293652130533599561029472584589664991635062977353515791158878742186063639198215142353920718037179714296818187464855203425*i+832256772680576137649272466019008915284498950511452613579958477758289321810886255777672792923505416373405156187373363462111014142)*x + (22402573587601764761696527568535878917134881653299539437786516049604394470648357855575755255772243982076985016275469060964175722988*i+15871576492385403840902879933227589301735346573410906558621965039485059884870208639481287702440095586038979222017052714513198713395) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15032007794293652130533599561029472584589664991635062977353515791158878742186063639198215142353920718037179714296818187464855203425*i+832256772680576137649272466019008915284498950511452613579958477758289321810886255777672792923505416373405156187373363462111014142)*x + (22402573587601764761696527568535878917134881653299539437786516049604394470648357855575755255772243982076985016275469060964175722988*i+15871576492385403840902879933227589301735346573410906558621965039485059884870208639481287702440095586038979222017052714513198713395) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8222307611895507173060727810197818635531541381725118957619519679111428390726947648860016421737301066265761099964687525227953825868*i+3707961942302926422850125065133544745394005050195605866195329856543896617292416313757791572875512874140688845735084951238501830654)*x + (17493378025264857306673320607916180359067898067526023138250029373233921948181303465375080814724748589934420924010824622425800200425*i+13468320414835351654923288746718930042700923776896786397123707987916955427244118079884490960137883114979246505439328191823329841514) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8222307611895507173060727810197818635531541381725118957619519679111428390726947648860016421737301066265761099964687525227953825868*i+3707961942302926422850125065133544745394005050195605866195329856543896617292416313757791572875512874140688845735084951238501830654)*x + (17493378025264857306673320607916180359067898067526023138250029373233921948181303465375080814724748589934420924010824622425800200425*i+13468320414835351654923288746718930042700923776896786397123707987916955427244118079884490960137883114979246505439328191823329841514) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22643337358646997800026830072127912605408293287591407876562951190582214612724243010544874996644923839091500279461212032666740155864*i+17429696085326432616179700721485568468677997258255948628015832138335240517654702160515001555846495997650242116646920917804925360424)*x + (19512988405914644601028573380095972376432664697304001898127084389508703611204907650161196352108731194100291512746274485650497494498*i+2627054301975503253978145282465143284930955977991089674871208573756402758979661229354632014424404854037728785861781394133588452638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22643337358646997800026830072127912605408293287591407876562951190582214612724243010544874996644923839091500279461212032666740155864*i+17429696085326432616179700721485568468677997258255948628015832138335240517654702160515001555846495997650242116646920917804925360424)*x + (19512988405914644601028573380095972376432664697304001898127084389508703611204907650161196352108731194100291512746274485650497494498*i+2627054301975503253978145282465143284930955977991089674871208573756402758979661229354632014424404854037728785861781394133588452638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17192590631274310367542595679515381793712046510995572207705501157655133356240177790507402821552295762615639297485796099434352612271*i+19617544489822861980914198368979587085306912068744976890960157345739566700846637347097500342012568407663859816649321608556515114232)*x + (8471292449286583334282025562030845501941929906103555696089369416523334358765558006713170575302821552217111669338443485354088061827*i+14065597788731735128088903551223169261110667584623422806693158973391205379757141690476426154967005139039615893150092919518073597530) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17192590631274310367542595679515381793712046510995572207705501157655133356240177790507402821552295762615639297485796099434352612271*i+19617544489822861980914198368979587085306912068744976890960157345739566700846637347097500342012568407663859816649321608556515114232)*x + (8471292449286583334282025562030845501941929906103555696089369416523334358765558006713170575302821552217111669338443485354088061827*i+14065597788731735128088903551223169261110667584623422806693158973391205379757141690476426154967005139039615893150092919518073597530) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3383540860774917724154556057956307638021497436984914371859323975120781052949693631480438753554351256991155113847969387439484677604*i+4256502770561773967091834392703089494168027978728515837408521694048878765394215733834020366752218261932306111348844770821170090089)*x + (4146317192646334890683604978397366499412295740053234133181414667275650966090813198447859478234848260986889571123468378618538014907*i+19614811498778930866685557539779229234105963144143019743349810352598891006276601910080661349177080437514982929547162004193271583262) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3383540860774917724154556057956307638021497436984914371859323975120781052949693631480438753554351256991155113847969387439484677604*i+4256502770561773967091834392703089494168027978728515837408521694048878765394215733834020366752218261932306111348844770821170090089)*x + (4146317192646334890683604978397366499412295740053234133181414667275650966090813198447859478234848260986889571123468378618538014907*i+19614811498778930866685557539779229234105963144143019743349810352598891006276601910080661349177080437514982929547162004193271583262) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23309538615823189162120217351471919708244689001094812770027539818882776349953300859899993233595040036774555335218612445948834576443*i+10073882213094529858002167731814977181083627506828860754013089475376947916874177848982045346775895927261110727931595952457663182176)*x + (14473831078244236943587767091713775839478035297164544150657364081342475735724416918081152571351942462313158348878832072606901419992*i+17765970783849035572077630350117255475700982957382657230680419585307490781219876313045591449973370630544521203317274616697019967356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23309538615823189162120217351471919708244689001094812770027539818882776349953300859899993233595040036774555335218612445948834576443*i+10073882213094529858002167731814977181083627506828860754013089475376947916874177848982045346775895927261110727931595952457663182176)*x + (14473831078244236943587767091713775839478035297164544150657364081342475735724416918081152571351942462313158348878832072606901419992*i+17765970783849035572077630350117255475700982957382657230680419585307490781219876313045591449973370630544521203317274616697019967356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17214047336472451696688343291182323258537864056588199338741717907819482647905108585688950051851605697308684506573386573069857564378*i+23851436847181711398622510753194883422795415659671495853580242669262141045103759496670559652908879721111571848686141229435925862892)*x + (20926573677244768092471717140613811330178419768701477975065586559995533629856573985336410697485200819411478180069112559806980549393*i+13790322838143079376266770436856709299660592250102872424106168863668931138506826011456306217251254320419016553627545405775423108422) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17214047336472451696688343291182323258537864056588199338741717907819482647905108585688950051851605697308684506573386573069857564378*i+23851436847181711398622510753194883422795415659671495853580242669262141045103759496670559652908879721111571848686141229435925862892)*x + (20926573677244768092471717140613811330178419768701477975065586559995533629856573985336410697485200819411478180069112559806980549393*i+13790322838143079376266770436856709299660592250102872424106168863668931138506826011456306217251254320419016553627545405775423108422) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14353849672760136366016749608448975347902368420648558771655606216206806202514665494974911797282702877967431985552025073288768622138*i+14024989341548766068722327093937407058160399349347804858309600702381061333211279956824384212104018943121255639610310838581589608250)*x + (12733735702661111962935622679178967354491303280990231879639987495400825508132471564532436532011308791118602759178147006670267979257*i+12614102283884562841105344303604624493102660059150870300675536038251548844341355948609057716116364224720092658577735806573911464945) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14353849672760136366016749608448975347902368420648558771655606216206806202514665494974911797282702877967431985552025073288768622138*i+14024989341548766068722327093937407058160399349347804858309600702381061333211279956824384212104018943121255639610310838581589608250)*x + (12733735702661111962935622679178967354491303280990231879639987495400825508132471564532436532011308791118602759178147006670267979257*i+12614102283884562841105344303604624493102660059150870300675536038251548844341355948609057716116364224720092658577735806573911464945) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9895490090019201666472672869569795012975878245051523820848656003332621883719241270149666728955519027041320885288079387262472133711*i+20998953793570850693153650955282674669632011330013613384750709492080036015390715105700875159518135137600790169146260091360051749338)*x + (2287626247287572052535483484696798301262733790644332418499028583916931571342910652944607571004647319012574770693538276242706384334*i+12781117684675987045769873092208217378140202208432218660347118363283140837885496481825475267459388515937043294277323859615450503681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9895490090019201666472672869569795012975878245051523820848656003332621883719241270149666728955519027041320885288079387262472133711*i+20998953793570850693153650955282674669632011330013613384750709492080036015390715105700875159518135137600790169146260091360051749338)*x + (2287626247287572052535483484696798301262733790644332418499028583916931571342910652944607571004647319012574770693538276242706384334*i+12781117684675987045769873092208217378140202208432218660347118363283140837885496481825475267459388515937043294277323859615450503681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22355400106054804017882739346409531816772712287038192850157411216450244494435752688326471692205943538997962836280064485384963698381*i+15845341000121956250144594609668467101832053550506735918534509332114308161326147857869685049569431390463916759199347308160940587419)*x + (321474532425333721249805307063608231637571719264389754029910589384943170464193900069121236625186057795913985035649570573551496619*i+20605213952395369255987379881173558406582905831724649124942920543384703535333614704423648135819045690980330683710404141921529480850) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22355400106054804017882739346409531816772712287038192850157411216450244494435752688326471692205943538997962836280064485384963698381*i+15845341000121956250144594609668467101832053550506735918534509332114308161326147857869685049569431390463916759199347308160940587419)*x + (321474532425333721249805307063608231637571719264389754029910589384943170464193900069121236625186057795913985035649570573551496619*i+20605213952395369255987379881173558406582905831724649124942920543384703535333614704423648135819045690980330683710404141921529480850) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11102104363448200141069463422416447512772777288642442365389182159328234054220819718444584748665831540764143714463179973573247374784*i+4502135217309821514894312498126410925578226672701563122804125826455159078881453499437137296092581267643955992767639817699677893334)*x + (17050001324963610905531315637475560782038362915400090225454937179629686068336856455047681416673011778205980682866965754084329316807*i+7438151686456411718762040846874562873245449721416623268744155169846787551180270149598036798983534572226882701314189524654802268051) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11102104363448200141069463422416447512772777288642442365389182159328234054220819718444584748665831540764143714463179973573247374784*i+4502135217309821514894312498126410925578226672701563122804125826455159078881453499437137296092581267643955992767639817699677893334)*x + (17050001324963610905531315637475560782038362915400090225454937179629686068336856455047681416673011778205980682866965754084329316807*i+7438151686456411718762040846874562873245449721416623268744155169846787551180270149598036798983534572226882701314189524654802268051) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19955147011695878932891236400531124624732308666337946322765490475421649916972080880658917724945489324918875405253687322998539495243*i+3095346887922342199169117588442904917334980696556713416421782540725858134614766928170728142811813652286493999725452769138636945977)*x + (23596993435420322787334508959331505059174111528351308152706399529832836718867869450914068265764984637078272821794652028333774884898*i+10489506562677644733628078299269868626390204998313909731908116845866329794149534638089431006831151410998777986876878599768050849246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19955147011695878932891236400531124624732308666337946322765490475421649916972080880658917724945489324918875405253687322998539495243*i+3095346887922342199169117588442904917334980696556713416421782540725858134614766928170728142811813652286493999725452769138636945977)*x + (23596993435420322787334508959331505059174111528351308152706399529832836718867869450914068265764984637078272821794652028333774884898*i+10489506562677644733628078299269868626390204998313909731908116845866329794149534638089431006831151410998777986876878599768050849246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13368270468423446000718965719192648887219481672454680677898806420034329491074728398252861890029056858131649173136198365589616831111*i+19432981163256772489848456036257187646256555343918115663371483253338663962498762015572165406757152983705847889674962513278908537309)*x + (22263826456762991308987901641259678481595042672092965502079768090279364055867521691451320618181718293806889113397145026818797618942*i+23923012257767043972141256382508114557296916711131540024642884837354369474522232422279844641544091680791891404034995803124192330345) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13368270468423446000718965719192648887219481672454680677898806420034329491074728398252861890029056858131649173136198365589616831111*i+19432981163256772489848456036257187646256555343918115663371483253338663962498762015572165406757152983705847889674962513278908537309)*x + (22263826456762991308987901641259678481595042672092965502079768090279364055867521691451320618181718293806889113397145026818797618942*i+23923012257767043972141256382508114557296916711131540024642884837354369474522232422279844641544091680791891404034995803124192330345) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10853675244617935022798850498610424120550580753138581671221403810453590347563174247258613671281583379196305722291154067527543687966*i+9764244726331651255606919538480129846786531747441635789976230517766466036515297459095982919627866408832012058243138718476898276141)*x + (19100266454199300411592252577258874778944067868216676432322635508807483052342558573290483389832596852452392724421758614900927625719*i+3873489175783092961235254056446634167246060495891297599377438011191506483288733618998892238985298344615135148901605170382131046026) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10853675244617935022798850498610424120550580753138581671221403810453590347563174247258613671281583379196305722291154067527543687966*i+9764244726331651255606919538480129846786531747441635789976230517766466036515297459095982919627866408832012058243138718476898276141)*x + (19100266454199300411592252577258874778944067868216676432322635508807483052342558573290483389832596852452392724421758614900927625719*i+3873489175783092961235254056446634167246060495891297599377438011191506483288733618998892238985298344615135148901605170382131046026) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9767881581276262714890038932695241888111662704559473274440562645931383484400127980813338992178549305713784662720992179279740488801*i+2434937380667221429320668308828252988664652206292145240382002783288945441604258936992140630946946848363316309250928241812927604564)*x + (14762134648448065426180512996634678531275856487742361194142613878266634792994324195001338303702031088423797002551422777938434121086*i+7810892037575269111801377487689774121123363755125303799401391744812917072243539876088963072498246083078283363291190591596804241759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9767881581276262714890038932695241888111662704559473274440562645931383484400127980813338992178549305713784662720992179279740488801*i+2434937380667221429320668308828252988664652206292145240382002783288945441604258936992140630946946848363316309250928241812927604564)*x + (14762134648448065426180512996634678531275856487742361194142613878266634792994324195001338303702031088423797002551422777938434121086*i+7810892037575269111801377487689774121123363755125303799401391744812917072243539876088963072498246083078283363291190591596804241759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5612104865429720319522210221038463874271020067591624307614972986336288768740891170893884547970559079660958387151772639914992315935*i+9440600388976582294525917773103532967442976064636031951034874189836776772144505563514855503006987475125767319381020081871812212771)*x + (17131986406128081231151582989863723036894671965490789387360854739423800006853198033156493913450857945842302065513678314770444260940*i+9440655285977912017429893077586312067306539972600907370753761322054292657306630242311214959673369376422603428007139804170094844730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5612104865429720319522210221038463874271020067591624307614972986336288768740891170893884547970559079660958387151772639914992315935*i+9440600388976582294525917773103532967442976064636031951034874189836776772144505563514855503006987475125767319381020081871812212771)*x + (17131986406128081231151582989863723036894671965490789387360854739423800006853198033156493913450857945842302065513678314770444260940*i+9440655285977912017429893077586312067306539972600907370753761322054292657306630242311214959673369376422603428007139804170094844730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6581352871447832781456659986945657551166222797049712259974506957472942976517966522956132681631300311734324796970952242630114184033*i+20042300259145243374955075257392914270599516678520063161070926566628259046372812212427231271894562498173031829743091310944924453286)*x + (13182893474506135899274138964047537083061260050833297949622393738908826154742325592461697973460296311019441236908856917737764228738*i+4053765236956462486106991605614627631930218793707129988012008197186253907667580681492915302492764640869806744954399517766702289439) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6581352871447832781456659986945657551166222797049712259974506957472942976517966522956132681631300311734324796970952242630114184033*i+20042300259145243374955075257392914270599516678520063161070926566628259046372812212427231271894562498173031829743091310944924453286)*x + (13182893474506135899274138964047537083061260050833297949622393738908826154742325592461697973460296311019441236908856917737764228738*i+4053765236956462486106991605614627631930218793707129988012008197186253907667580681492915302492764640869806744954399517766702289439) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2495579172199041673957198597960040043553501026089077347576678515103853689465346156087596857484472359990668446050785215685564566115*i+582858859645977693806341962550811901935453754161579370798886846283108406911199801028679300291836657019144389455238758372350986947)*x + (16059165478634136669211934018366628013266108723225514544168326020959087907002557801904778874538351125038008461667543992042363303576*i+19810100958554968175987269760253217744934986233839571162950890840093909231500365033876996515744292190413582313081302923020832446970) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2495579172199041673957198597960040043553501026089077347576678515103853689465346156087596857484472359990668446050785215685564566115*i+582858859645977693806341962550811901935453754161579370798886846283108406911199801028679300291836657019144389455238758372350986947)*x + (16059165478634136669211934018366628013266108723225514544168326020959087907002557801904778874538351125038008461667543992042363303576*i+19810100958554968175987269760253217744934986233839571162950890840093909231500365033876996515744292190413582313081302923020832446970) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17312220641852875521096699023115540598301179052331203415219889432069766648070098314033816046512804140886054672561883625676676847227*i+6002678567464634289618393758952128328393816307760069191530275462481131351753587004346522433198944607630522920016808326639839930352)*x + (21477521767181056791161841411138414889822231534643816584485214045965779187342389986397195439565226638345945149177359120847605861903*i+21712091588584323656462891139372104478017595607483702125468741274463920576260787040674849818745635692743755483709625323633761862251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17312220641852875521096699023115540598301179052331203415219889432069766648070098314033816046512804140886054672561883625676676847227*i+6002678567464634289618393758952128328393816307760069191530275462481131351753587004346522433198944607630522920016808326639839930352)*x + (21477521767181056791161841411138414889822231534643816584485214045965779187342389986397195439565226638345945149177359120847605861903*i+21712091588584323656462891139372104478017595607483702125468741274463920576260787040674849818745635692743755483709625323633761862251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3582105425466135754405845903266140190599847281228091526651221636071296715590783280464240844633157293388565361409565593318887097102*i+9058562273120415784572445704945621414352333319555870190696653249203243907395341642273105427176087977111542724042373754900944255611)*x + (3281550797825573251363966373056125447452004596818349989526723673956100638490069704378639850290468876740001858612185055113147925346*i+5661369363942716418611845094394366037682579825042094394455989233452852952443704625919916134953556697608271326464210797018388495460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3582105425466135754405845903266140190599847281228091526651221636071296715590783280464240844633157293388565361409565593318887097102*i+9058562273120415784572445704945621414352333319555870190696653249203243907395341642273105427176087977111542724042373754900944255611)*x + (3281550797825573251363966373056125447452004596818349989526723673956100638490069704378639850290468876740001858612185055113147925346*i+5661369363942716418611845094394366037682579825042094394455989233452852952443704625919916134953556697608271326464210797018388495460) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1156851311159815714634201528512585349957080058363252006492792131752000700801726845836463511471733649646428819250249090444885460465*i+243679339782272804660163316833057035647751295004965348263015874230516131487463562394268516918514313570411982187961636916456550991)*x + (8925271515079967516182581726683560511364228080652787543760925211971325198066995226465477327722254409604212743529652778372190910721*i+1419979852396070419451636815074922937095432366910195082849933986809395132996774274517176098652743544209302194752537958716103129726) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1156851311159815714634201528512585349957080058363252006492792131752000700801726845836463511471733649646428819250249090444885460465*i+243679339782272804660163316833057035647751295004965348263015874230516131487463562394268516918514313570411982187961636916456550991)*x + (8925271515079967516182581726683560511364228080652787543760925211971325198066995226465477327722254409604212743529652778372190910721*i+1419979852396070419451636815074922937095432366910195082849933986809395132996774274517176098652743544209302194752537958716103129726) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (793600062173117337110744297547611853844027735874824426413355967867541637018443127106281036364756754232791709116903601950328197921*i+22552936723887323367083965695707820646602175934898982061350827151025464125088807502409090322489860582677959852343528759930430872702)*x + (11673936763792837121049191496212727890470061107033805420823901451581338701979943326574992616331682659859739164977095982079826691022*i+2874282066094657125757697337942225458654105006163131939110976437688310141348656165709897654132595261662092405968112259450750848769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (793600062173117337110744297547611853844027735874824426413355967867541637018443127106281036364756754232791709116903601950328197921*i+22552936723887323367083965695707820646602175934898982061350827151025464125088807502409090322489860582677959852343528759930430872702)*x + (11673936763792837121049191496212727890470061107033805420823901451581338701979943326574992616331682659859739164977095982079826691022*i+2874282066094657125757697337942225458654105006163131939110976437688310141348656165709897654132595261662092405968112259450750848769) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11986826087460848264315596954981536267659270682118467862173803357572735139301872927678466542298248175744788305525295797475299821070*i+16338504742313502114080704814167472041548155367139509016497065604215254046997417268677939178454497850360688825294522532999979305574)*x + (6082878703585986058097164304841603792149450571374691425564062151614563819879664614486552156033463898928917206041641328688402581545*i+2398259107942140658653273615514997512203246242171002179568105726934261403858226535628551330466757608527877480128912557489616341458) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11986826087460848264315596954981536267659270682118467862173803357572735139301872927678466542298248175744788305525295797475299821070*i+16338504742313502114080704814167472041548155367139509016497065604215254046997417268677939178454497850360688825294522532999979305574)*x + (6082878703585986058097164304841603792149450571374691425564062151614563819879664614486552156033463898928917206041641328688402581545*i+2398259107942140658653273615514997512203246242171002179568105726934261403858226535628551330466757608527877480128912557489616341458) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12486364090597098214912010176012832202275113878145866508924508655680788132780153147812543369266644521026420476370537047255904374716*i+20922259797947395916354816288645476470714671283819118783339826219886259124585928815531570988635763717417314139860339924237929518155)*x + (4900566025524449913020899570638438068493369643020025333040557292717052129581484665555982004638507208236684687536160453087700227654*i+11947333807196968910251576278492495856354607485092303070699344956575059347966867171799614914418158640949848654085553947442845553055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12486364090597098214912010176012832202275113878145866508924508655680788132780153147812543369266644521026420476370537047255904374716*i+20922259797947395916354816288645476470714671283819118783339826219886259124585928815531570988635763717417314139860339924237929518155)*x + (4900566025524449913020899570638438068493369643020025333040557292717052129581484665555982004638507208236684687536160453087700227654*i+11947333807196968910251576278492495856354607485092303070699344956575059347966867171799614914418158640949848654085553947442845553055) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17578096877954363640394011538798474051885477461398643574765812031534357455216508199517917030085758609973739522887792621822386557567*i+11865018871319055081767818956038312935779421300609452452474600686113762370711907135332398491774313046364771943411871091880194193880)*x + (7113777450752850820470808684131049133448923532892182853213618897916273940024425689971914348466362324424082781116127601417163868480*i+18852369488072041244222440880402160271629239159628144548204122798368180065444861747630976894385335067856557586466376454802105689110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17578096877954363640394011538798474051885477461398643574765812031534357455216508199517917030085758609973739522887792621822386557567*i+11865018871319055081767818956038312935779421300609452452474600686113762370711907135332398491774313046364771943411871091880194193880)*x + (7113777450752850820470808684131049133448923532892182853213618897916273940024425689971914348466362324424082781116127601417163868480*i+18852369488072041244222440880402160271629239159628144548204122798368180065444861747630976894385335067856557586466376454802105689110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2713585745008452014401733315667265838078552204784308565864328791745578237026173846558216866985609961318221229303812089913254446427*i+9100350841953754560046362034681897781940392264890457847097329266255861107346744647973389395196438766445622196669460252548079824752)*x + (21003025181022352833528444343460900347668707240367557049290361828866740244876872861596877653785692906484419534528439965676471691413*i+2488278742868189119497669336381600500809156342496743856564748432888229789647336416384714128237657036659008715757968470477893841370) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2713585745008452014401733315667265838078552204784308565864328791745578237026173846558216866985609961318221229303812089913254446427*i+9100350841953754560046362034681897781940392264890457847097329266255861107346744647973389395196438766445622196669460252548079824752)*x + (21003025181022352833528444343460900347668707240367557049290361828866740244876872861596877653785692906484419534528439965676471691413*i+2488278742868189119497669336381600500809156342496743856564748432888229789647336416384714128237657036659008715757968470477893841370) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10444323262747261492974411996021886255656450806006426545823089138767770687525572367332274849148682247039376736547236571545479743845*i+23655385348913063957613907703046994912788256029327995818438493426646581120107755306051792397623351259425196300194181864563418047442)*x + (16861485556046073728302503271947978350956963189100138921967364241318410283911207587074374140211700306468785967322419555442303836339*i+16751018961865624214563141004359079946542988988624490778239223065737778137484946514022720723732838567116800749970286118603910870632) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10444323262747261492974411996021886255656450806006426545823089138767770687525572367332274849148682247039376736547236571545479743845*i+23655385348913063957613907703046994912788256029327995818438493426646581120107755306051792397623351259425196300194181864563418047442)*x + (16861485556046073728302503271947978350956963189100138921967364241318410283911207587074374140211700306468785967322419555442303836339*i+16751018961865624214563141004359079946542988988624490778239223065737778137484946514022720723732838567116800749970286118603910870632) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8475156229263805559969537663202511492753413081937359367560077772263177794013856115213559436054947459792763942043264435666032202342*i+7036290863089854977568910497755510586155683705194747350953418030262446781015005515103702404546648180953937034305968505454900979590)*x + (19189460298986056220000906620392934256179521801428624304038556024880051687515569090791430990784595820844826861574155478389299247655*i+17931185741816351529966167092861294641833215814052683297075105296540056419801570568818820493036179377212822913720972018867102107835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8475156229263805559969537663202511492753413081937359367560077772263177794013856115213559436054947459792763942043264435666032202342*i+7036290863089854977568910497755510586155683705194747350953418030262446781015005515103702404546648180953937034305968505454900979590)*x + (19189460298986056220000906620392934256179521801428624304038556024880051687515569090791430990784595820844826861574155478389299247655*i+17931185741816351529966167092861294641833215814052683297075105296540056419801570568818820493036179377212822913720972018867102107835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4068746982537455792499527538981468269169094630076721003416021843741839493110151957642647130847024418445132583788592252640921157763*i+3910499616267603108013433811510272745206823513297633047421342367092098529855780012033075724879778999171031226473175516424507593410)*x + (13289976778040605270378616311014842673307965075276297693990936042252517579824208811288736188437652771026011903833208423954447902944*i+16682805126724245684039691491113337538984850453318198722223032424723284331323561997871147322681151945943146658299725253437089884125) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4068746982537455792499527538981468269169094630076721003416021843741839493110151957642647130847024418445132583788592252640921157763*i+3910499616267603108013433811510272745206823513297633047421342367092098529855780012033075724879778999171031226473175516424507593410)*x + (13289976778040605270378616311014842673307965075276297693990936042252517579824208811288736188437652771026011903833208423954447902944*i+16682805126724245684039691491113337538984850453318198722223032424723284331323561997871147322681151945943146658299725253437089884125) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20980200544279526826115067576725485676227529326957782825464620906573260526185234442498786843228981278887158052053392136074196546998*i+701228228030707685227488922093943753214993701698981518102042189411881350611614348015888220656615753510584956819342070024786941359)*x + (14703890731848338351334755051511472175485916819428954272105941857291049471914750097262619981991441921976372556197366398329493714052*i+21747595822085985588466060539613571933793559823932863030567309183136497872170077830958219922238451973977350594768625532362098276596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20980200544279526826115067576725485676227529326957782825464620906573260526185234442498786843228981278887158052053392136074196546998*i+701228228030707685227488922093943753214993701698981518102042189411881350611614348015888220656615753510584956819342070024786941359)*x + (14703890731848338351334755051511472175485916819428954272105941857291049471914750097262619981991441921976372556197366398329493714052*i+21747595822085985588466060539613571933793559823932863030567309183136497872170077830958219922238451973977350594768625532362098276596) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22439730578597825279882208347474903899394300874711885070300381957457642215519032065193617032349319461676371084791337053311933879987*i+19962056816520462495838773521038254772371705390314719697468891057015149891937369077224415714816639920861396333499771802716433445224)*x + (5881302652721594653344879467761258568419226975924767696114804704798931423803737567232175591725684682886026430994088364845880636668*i+6144317784937896703132347033531364004295026438392461339121817397451906595328822830303163991261391237421302024312183358084979090534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22439730578597825279882208347474903899394300874711885070300381957457642215519032065193617032349319461676371084791337053311933879987*i+19962056816520462495838773521038254772371705390314719697468891057015149891937369077224415714816639920861396333499771802716433445224)*x + (5881302652721594653344879467761258568419226975924767696114804704798931423803737567232175591725684682886026430994088364845880636668*i+6144317784937896703132347033531364004295026438392461339121817397451906595328822830303163991261391237421302024312183358084979090534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11834214122790168169631515654870512415832506695238444104311194031280698300463234994911519134061758218989484746556112143955761490643*i+21720536829697621135120654518244718861938113465577802805952611272695093524804163981346349769648642534447455721285615024816242215679)*x + (16713014596929389593458452871363949289009757986142787313321781344867530579417813520798361050357552721840296232772875341940888679481*i+4657887653608126026581872513956430070802754593212925394706852097597487420748310878934463904286453727336516701856035828978288115195) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11834214122790168169631515654870512415832506695238444104311194031280698300463234994911519134061758218989484746556112143955761490643*i+21720536829697621135120654518244718861938113465577802805952611272695093524804163981346349769648642534447455721285615024816242215679)*x + (16713014596929389593458452871363949289009757986142787313321781344867530579417813520798361050357552721840296232772875341940888679481*i+4657887653608126026581872513956430070802754593212925394706852097597487420748310878934463904286453727336516701856035828978288115195) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8852311943146552915387877400720535514135452753104287102233322344799606243897174103695909837271496903721071740835552627566176780837*i+18935927053474663399827875014422839777602060317954451375097864624211696639672506399054640158505720240870980260855734459898300529143)*x + (850338796646573062296399309494428376956314207829386803238514379223534201332971840273317995871475812294686223213191076893044716294*i+8669166322019025651805727736380712884718394011119258134659988757388071760054160971875798488723319209209676425628503625851952267209) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8852311943146552915387877400720535514135452753104287102233322344799606243897174103695909837271496903721071740835552627566176780837*i+18935927053474663399827875014422839777602060317954451375097864624211696639672506399054640158505720240870980260855734459898300529143)*x + (850338796646573062296399309494428376956314207829386803238514379223534201332971840273317995871475812294686223213191076893044716294*i+8669166322019025651805727736380712884718394011119258134659988757388071760054160971875798488723319209209676425628503625851952267209) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24429820030823640712367586495579343405386883197487297060313355999641353159599968436732151828113511195500774636039191599754241310266*i+21480778879610882551783912421747858465149423401711796728071708847415375839801690945831415693152702241304082784145252914986449102720)*x + (18485644893440623550809658033015918096027703060506448276387547983691599587470062068733718300553169780071173847421300228026248679160*i+21851483773499649030255497666526558816885646886663778078785093474062666156697283589224182883763546508138789565315485231746889162110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24429820030823640712367586495579343405386883197487297060313355999641353159599968436732151828113511195500774636039191599754241310266*i+21480778879610882551783912421747858465149423401711796728071708847415375839801690945831415693152702241304082784145252914986449102720)*x + (18485644893440623550809658033015918096027703060506448276387547983691599587470062068733718300553169780071173847421300228026248679160*i+21851483773499649030255497666526558816885646886663778078785093474062666156697283589224182883763546508138789565315485231746889162110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4763770625613691481023764187727214277529361923539841484881817202617110158467468532521789788489090385954161346092744508961997765294*i+16924705302138058167880029612063098849649132092805252008646161859712356749222397949633256473238686825971624999696953373393894892516)*x + (7747492087457046618678361637683087708593559321613140138786227880801037471616288203268459781079213518942544413354192831966497384143*i+13581368057288014412930249184448938958778113994116455055761997592287160776610100833852616130646473370458163728906172263689562013851) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4763770625613691481023764187727214277529361923539841484881817202617110158467468532521789788489090385954161346092744508961997765294*i+16924705302138058167880029612063098849649132092805252008646161859712356749222397949633256473238686825971624999696953373393894892516)*x + (7747492087457046618678361637683087708593559321613140138786227880801037471616288203268459781079213518942544413354192831966497384143*i+13581368057288014412930249184448938958778113994116455055761997592287160776610100833852616130646473370458163728906172263689562013851) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23695466850912487314948582258973753614975477265974709380723050540174737847006050595212014568226170062707142764345021711950273851025*i+12826765879683981628694561748115712864483157871710706021543523370960142556519881764626997589179526091274970807191374521933664027182)*x + (11139626749870977828500087422592302533938285514120734325198313010729504437665117898701435196068171151055544009294973503517655052598*i+19130847021936201887016319210443125163947743382633826204445703252925410897790676826382059943500240073303261422948613295566163547690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23695466850912487314948582258973753614975477265974709380723050540174737847006050595212014568226170062707142764345021711950273851025*i+12826765879683981628694561748115712864483157871710706021543523370960142556519881764626997589179526091274970807191374521933664027182)*x + (11139626749870977828500087422592302533938285514120734325198313010729504437665117898701435196068171151055544009294973503517655052598*i+19130847021936201887016319210443125163947743382633826204445703252925410897790676826382059943500240073303261422948613295566163547690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3810560424684180153718087516186036541985099755407515018509706698303190507869543301163981991638861103032930638648416101154532245501*i+912658450580721888878927639557629082753691922926940838307869721433378855011880326746308912221729046132383581996444774412191821662)*x + (23625050215933324947175024777850024699443699284725485696485374104757471139628794936884511552155600822778712493529451109554555336645*i+19118608236721110231606679700053224035666635631082528590490960886341204837051741434466563483036839952500521620401324804956512899278) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3810560424684180153718087516186036541985099755407515018509706698303190507869543301163981991638861103032930638648416101154532245501*i+912658450580721888878927639557629082753691922926940838307869721433378855011880326746308912221729046132383581996444774412191821662)*x + (23625050215933324947175024777850024699443699284725485696485374104757471139628794936884511552155600822778712493529451109554555336645*i+19118608236721110231606679700053224035666635631082528590490960886341204837051741434466563483036839952500521620401324804956512899278) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7245604480191701759468916236196575446085574790043014055073114755192138461485951993763064635540641171188370545478114273160529369042*i+245459996608902547759813613997332710074728580692920097322069466503827866186862099775013461383971730446115144616624809279049036626)*x + (13004078384003685455502581837940883040770293363617766781465695692289604262213395165401771377902675185942676362127700201881599874076*i+15197384781052077984177393344986188173183257491368755306711673062331256048791553491409276239322532210018823957630560220781220228203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7245604480191701759468916236196575446085574790043014055073114755192138461485951993763064635540641171188370545478114273160529369042*i+245459996608902547759813613997332710074728580692920097322069466503827866186862099775013461383971730446115144616624809279049036626)*x + (13004078384003685455502581837940883040770293363617766781465695692289604262213395165401771377902675185942676362127700201881599874076*i+15197384781052077984177393344986188173183257491368755306711673062331256048791553491409276239322532210018823957630560220781220228203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22136672271925924084352566187103130055346423180214417060113882422529644196203935906365269802506234100377758932912627959946684451466*i+18053409183947597609225855043360614229681807095334877351673466163910591326648840051122180871779370084264453032707768217556275444188)*x + (7297898798765264033404677793454444353534432616398315645814480850081555140343752857202293862247337043258763929281542655683234507695*i+10564508303336228815216074769705348945119056541672856986121474334742406153971611703050292536786515693237911516893732194012875511271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22136672271925924084352566187103130055346423180214417060113882422529644196203935906365269802506234100377758932912627959946684451466*i+18053409183947597609225855043360614229681807095334877351673466163910591326648840051122180871779370084264453032707768217556275444188)*x + (7297898798765264033404677793454444353534432616398315645814480850081555140343752857202293862247337043258763929281542655683234507695*i+10564508303336228815216074769705348945119056541672856986121474334742406153971611703050292536786515693237911516893732194012875511271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22217614854981980522377070529388578102471655356668914477864298809907882971988306779778070330851643401912637953089807107025405806044*i+14725770565829434757084174052513722496955322993650871138168305931024537715760093738092939935769496568782937469071147828999350280199)*x + (19036735736323202769749842804168089515301115843485607905290947228597315299786498186915221601387146783769386565952271282817489964207*i+23378612757563149617129984813068118672429693788302526273520004926662217298910179924530766415244986603790891602202330816942197393806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22217614854981980522377070529388578102471655356668914477864298809907882971988306779778070330851643401912637953089807107025405806044*i+14725770565829434757084174052513722496955322993650871138168305931024537715760093738092939935769496568782937469071147828999350280199)*x + (19036735736323202769749842804168089515301115843485607905290947228597315299786498186915221601387146783769386565952271282817489964207*i+23378612757563149617129984813068118672429693788302526273520004926662217298910179924530766415244986603790891602202330816942197393806) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4977953340637704735409010840927385827667870367692196929396326977873684722355649748820302456768467849948935529434886185550660043098*i+16046747254139609514689586585927273156939095658035086211665169494574548525349704555822757492256781150547701213635588369424057846100)*x + (11209154160320799925275265546778043110540723097332862618069491596818768077934275073387288294406338502984044501218407360906930720078*i+1353920154694016353724329490717379076823118658277568648740805846370197928318993581458090364762230452824735461283293128827209139036) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4977953340637704735409010840927385827667870367692196929396326977873684722355649748820302456768467849948935529434886185550660043098*i+16046747254139609514689586585927273156939095658035086211665169494574548525349704555822757492256781150547701213635588369424057846100)*x + (11209154160320799925275265546778043110540723097332862618069491596818768077934275073387288294406338502984044501218407360906930720078*i+1353920154694016353724329490717379076823118658277568648740805846370197928318993581458090364762230452824735461283293128827209139036) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2214600085219456326072424451269905080591059027337306168415260954528696566079005759966987246256460470084057523855903921763393020812*i+24046531624885034244538906282081330137562412744605550639216835559434405186002836242337869710679501180774820475328686961203301150035)*x + (14406119957921734520205743364113295373856503982191769270306352797534544830536266121992220935848952763356805997740164550380896668642*i+10005821329778600498713053524162048061346104586346038062859816510245294244814933304789733252331274661329324600574930114003667563792) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2214600085219456326072424451269905080591059027337306168415260954528696566079005759966987246256460470084057523855903921763393020812*i+24046531624885034244538906282081330137562412744605550639216835559434405186002836242337869710679501180774820475328686961203301150035)*x + (14406119957921734520205743364113295373856503982191769270306352797534544830536266121992220935848952763356805997740164550380896668642*i+10005821329778600498713053524162048061346104586346038062859816510245294244814933304789733252331274661329324600574930114003667563792) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8842508772542271470775435067292578302600016624253089134416022768145751475356430985670086305530367945923630755467044019276660315679*i+17036134876669832595937750926244698599341019362805986771274351550562295951077478318147661872810203939061547681285672585827228690564)*x + (16455170379766635668683687963322897582476194822109538278238847473947737894144683830805554133475115922036816723237490185474256267081*i+22898600740472451669340869712274234469380514396544926400875744295304352116071055921979360085893262638783303268601138519882681075944) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8842508772542271470775435067292578302600016624253089134416022768145751475356430985670086305530367945923630755467044019276660315679*i+17036134876669832595937750926244698599341019362805986771274351550562295951077478318147661872810203939061547681285672585827228690564)*x + (16455170379766635668683687963322897582476194822109538278238847473947737894144683830805554133475115922036816723237490185474256267081*i+22898600740472451669340869712274234469380514396544926400875744295304352116071055921979360085893262638783303268601138519882681075944) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9985286540805468309672442474037195614590488558565629373098024666951445356550715749650462589893863190562151273618911592764120009935*i+2940482714872473485119476879001814685671783341532846439566256727787879050134466654861792156189021957353062740397490344846449675747)*x + (15295672336602465903053363435197238062891660837092315464847258711243921880218757881013492010617645838009704201457835835787457205450*i+2650543563168488615329059553173086373095120814227269565219233808142028377308915587943050261874663685030245024898021283370798219185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9985286540805468309672442474037195614590488558565629373098024666951445356550715749650462589893863190562151273618911592764120009935*i+2940482714872473485119476879001814685671783341532846439566256727787879050134466654861792156189021957353062740397490344846449675747)*x + (15295672336602465903053363435197238062891660837092315464847258711243921880218757881013492010617645838009704201457835835787457205450*i+2650543563168488615329059553173086373095120814227269565219233808142028377308915587943050261874663685030245024898021283370798219185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21878245169639174607002440077514475524892796208114479378395198078711930176498773673390662247137447072880618267864127235960917654880*i+18030552483133008312101854725124708581014422107743355330707818415340917579649988762600716076626837958497766108664819918828527662741)*x + (7659599268798792656338372763058058603708772821152578875949325924363372071036883632058611192250439159133349986628936817366781601761*i+10359657711230207144037436204437501833241703257915888600384666346837769857418178293865914572886709322011068046414273310905241573147) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21878245169639174607002440077514475524892796208114479378395198078711930176498773673390662247137447072880618267864127235960917654880*i+18030552483133008312101854725124708581014422107743355330707818415340917579649988762600716076626837958497766108664819918828527662741)*x + (7659599268798792656338372763058058603708772821152578875949325924363372071036883632058611192250439159133349986628936817366781601761*i+10359657711230207144037436204437501833241703257915888600384666346837769857418178293865914572886709322011068046414273310905241573147) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8232061565735063140388684070151626045803025357305579812082926112207545565624707665010340762698525781543861444100145512608775738301*i+2430436973962795132993355158470398091029097649188839569555751860701103874729856357335497110126246652354192984917016268384937673136)*x + (8165706646243628392404654157153662386597945519120999693630987767476223192258200173346445807419819755647784043101260096827206513540*i+22942873367120176444042357233103458770032706800476947297887660294065125364645160360123520384070666168809637245910130428983163343308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8232061565735063140388684070151626045803025357305579812082926112207545565624707665010340762698525781543861444100145512608775738301*i+2430436973962795132993355158470398091029097649188839569555751860701103874729856357335497110126246652354192984917016268384937673136)*x + (8165706646243628392404654157153662386597945519120999693630987767476223192258200173346445807419819755647784043101260096827206513540*i+22942873367120176444042357233103458770032706800476947297887660294065125364645160360123520384070666168809637245910130428983163343308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1662424936977483611615989536576764246414451339910787288790650305140872995704206559385786855647981879702522793893912123292102050626*i+4767700305751625972736998226135634022874006326754637610866159974011375988983254227764873007012883826146419621955704556030949214778)*x + (14454072662604691767363058139007960770302875211305562663286267611666088538419365510045067812666519546673396613153329205500116567793*i+1231007084972795338383555399545604068157807057852688663407921061812888759494284330459739816699242620093794504826064557242006226549) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1662424936977483611615989536576764246414451339910787288790650305140872995704206559385786855647981879702522793893912123292102050626*i+4767700305751625972736998226135634022874006326754637610866159974011375988983254227764873007012883826146419621955704556030949214778)*x + (14454072662604691767363058139007960770302875211305562663286267611666088538419365510045067812666519546673396613153329205500116567793*i+1231007084972795338383555399545604068157807057852688663407921061812888759494284330459739816699242620093794504826064557242006226549) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10215652097560547147185887227458216623344969305893054006136856692076964177683778208180983706881478136587694685570043255712745301413*i+9060509060117354075260813864666528496983356435439042639070215489857014461824456638784931077951495581183005330910679387025289126025)*x + (14720322915621829202018192450930676787810540337413453684008987936721847565313298723379327295982246198226193178278491564541954389792*i+14823709163941577138453647941287062067297181869871409758732736587012805402991240799410568735424552900476762233952995104899367745662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10215652097560547147185887227458216623344969305893054006136856692076964177683778208180983706881478136587694685570043255712745301413*i+9060509060117354075260813864666528496983356435439042639070215489857014461824456638784931077951495581183005330910679387025289126025)*x + (14720322915621829202018192450930676787810540337413453684008987936721847565313298723379327295982246198226193178278491564541954389792*i+14823709163941577138453647941287062067297181869871409758732736587012805402991240799410568735424552900476762233952995104899367745662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20057997656429649186838457820249933854442489226046508736919370514726996575662308984987311485903077619429886435925152164214321940705*i+21754752188167201828197866324871874138078544391857626995514583471434966344358794248791801035341994227624298961004635337823193904608)*x + (10510879144228213515755834361510658054317816114806338188692712328477328752215485007095606613439925959005644461796386480997943847847*i+16322658986255105088219330474746554771876723457263444650037712552368307279550320301502182627408075753872729397859116955223266740432) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20057997656429649186838457820249933854442489226046508736919370514726996575662308984987311485903077619429886435925152164214321940705*i+21754752188167201828197866324871874138078544391857626995514583471434966344358794248791801035341994227624298961004635337823193904608)*x + (10510879144228213515755834361510658054317816114806338188692712328477328752215485007095606613439925959005644461796386480997943847847*i+16322658986255105088219330474746554771876723457263444650037712552368307279550320301502182627408075753872729397859116955223266740432) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13370137025903013570439554831026274194779194663252909189338487179619860874898180650651713336747018272036704506939985330111484936173*i+13264209947042319971617243235549846954334120075604288079296963106261350698733207165760302458350453731776819905571434497370832022285)*x + (7973685421791749292474657060721705950545844508213305078480824222729923640506192128264074838618433778926160584984533979505929411363*i+5105253660913760805860538062937468544010618250007903292736923930437012952820503222461465065699526642715712711711700519099450277589) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13370137025903013570439554831026274194779194663252909189338487179619860874898180650651713336747018272036704506939985330111484936173*i+13264209947042319971617243235549846954334120075604288079296963106261350698733207165760302458350453731776819905571434497370832022285)*x + (7973685421791749292474657060721705950545844508213305078480824222729923640506192128264074838618433778926160584984533979505929411363*i+5105253660913760805860538062937468544010618250007903292736923930437012952820503222461465065699526642715712711711700519099450277589) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18980176953586555358960166375086425337800220854016382225088583674544835755694196407063296348704902199252294211239579268536178208563*i+22407369761270044909661345670132479131344446110632587568875548082035058331046105499515468712865474861081214601779030563754014499953)*x + (504111731634481739830109943963851306834642119695345701216326896610903458918828959352374854328145998841663696728956350945337613325*i+22465707046433094706236114349488616748827344316889871198443250104735143038485697206539186638663300212124685471468071422247380166849) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18980176953586555358960166375086425337800220854016382225088583674544835755694196407063296348704902199252294211239579268536178208563*i+22407369761270044909661345670132479131344446110632587568875548082035058331046105499515468712865474861081214601779030563754014499953)*x + (504111731634481739830109943963851306834642119695345701216326896610903458918828959352374854328145998841663696728956350945337613325*i+22465707046433094706236114349488616748827344316889871198443250104735143038485697206539186638663300212124685471468071422247380166849) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13298943589296080009322982839070392589073500230448979490008201647598715148727551373990876913262317817916494983955703118610140671910*i+3401231824466798134699301733160671791812249710975558792502091379963779334776180489193040415331449211418748064764533996280176242589)*x + (8257938196523984003501755988317193632402232237067671955672292118800993330127620804720419781346499607059055264532467235657011899830*i+1782337773322132716864448895384699424911299467435471437714193316713391684270841089792578501223702576906441916676123647120699638478) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13298943589296080009322982839070392589073500230448979490008201647598715148727551373990876913262317817916494983955703118610140671910*i+3401231824466798134699301733160671791812249710975558792502091379963779334776180489193040415331449211418748064764533996280176242589)*x + (8257938196523984003501755988317193632402232237067671955672292118800993330127620804720419781346499607059055264532467235657011899830*i+1782337773322132716864448895384699424911299467435471437714193316713391684270841089792578501223702576906441916676123647120699638478) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15764734257212354662676026672440933153760624017053816626412429439664369165629922198088703425508409586407419423087367789346824994144*i+16124094754032971881493017185876336620348297710207883648177492381381734169389923805119088896656185302112211331944800050850794507676)*x + (18399612887272008361372991099075400838332966273151882372285897178520438481046976605188461694960471321946577553359053241110244995556*i+14229003529996410719781697996137390733620126040248624415052335696225708375314451174408250903829614286948164973922707809606581356558) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15764734257212354662676026672440933153760624017053816626412429439664369165629922198088703425508409586407419423087367789346824994144*i+16124094754032971881493017185876336620348297710207883648177492381381734169389923805119088896656185302112211331944800050850794507676)*x + (18399612887272008361372991099075400838332966273151882372285897178520438481046976605188461694960471321946577553359053241110244995556*i+14229003529996410719781697996137390733620126040248624415052335696225708375314451174408250903829614286948164973922707809606581356558) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12708149173585641140728053133156256171277586673361417870522955086445760170301831384944112874124690186776925058762934390767330539716*i+11792477476069239689229269727950035020713177531962307380141167254441688371111376473649967035397707537176660063423419139749657979521)*x + (14989616192476811220241030244446505133924500184853704046552350831027586856301658814426595356598356054176408290233168970645488669210*i+10937301124751851873621300563651552049832013628371959955928326804928290476630471541359950017019288330390436787343755677016901722198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12708149173585641140728053133156256171277586673361417870522955086445760170301831384944112874124690186776925058762934390767330539716*i+11792477476069239689229269727950035020713177531962307380141167254441688371111376473649967035397707537176660063423419139749657979521)*x + (14989616192476811220241030244446505133924500184853704046552350831027586856301658814426595356598356054176408290233168970645488669210*i+10937301124751851873621300563651552049832013628371959955928326804928290476630471541359950017019288330390436787343755677016901722198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8611680503734008571887171452168927439216618250278543482698915254414371565279920063573056430814443094836392861817275335141781560155*i+10973607256707585855703802941811543854634503198594232264191255944997205005953880768026682990448600692738423890384003012278644891235)*x + (5401361706093774830785954129378313472867006023474583624442160911050320957942068292049523974774663326350786883794216194515020261811*i+24066375343132234310703747323910671363142095385719052835525169649237283997655320321220897480101132627813984293760191844292854164237) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8611680503734008571887171452168927439216618250278543482698915254414371565279920063573056430814443094836392861817275335141781560155*i+10973607256707585855703802941811543854634503198594232264191255944997205005953880768026682990448600692738423890384003012278644891235)*x + (5401361706093774830785954129378313472867006023474583624442160911050320957942068292049523974774663326350786883794216194515020261811*i+24066375343132234310703747323910671363142095385719052835525169649237283997655320321220897480101132627813984293760191844292854164237) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14844891002891468113006054154703182001374683447625044510030660032769845282172193491236974745759429045930292448324455815040152700728*i+5644359288141698090275867887097740904179543577176864800279147302826018839493814213766491579838264868097585820449071673442526491747)*x + (6607324998578688596017181099002481631298194858146578736608329506947500663249536689494739424246054055165824691101935000379164597411*i+23398829578170639748627232344662963078205425453453035945615969819419017903641572212704393788327821012399006643895566176098011201145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14844891002891468113006054154703182001374683447625044510030660032769845282172193491236974745759429045930292448324455815040152700728*i+5644359288141698090275867887097740904179543577176864800279147302826018839493814213766491579838264868097585820449071673442526491747)*x + (6607324998578688596017181099002481631298194858146578736608329506947500663249536689494739424246054055165824691101935000379164597411*i+23398829578170639748627232344662963078205425453453035945615969819419017903641572212704393788327821012399006643895566176098011201145) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (312910591984776395827406211455657719938386929992839443497750735357426967691268648256957847591211573700686172926201853987728878937*i+5771198900062091371793064210789961544223942094041566531859115716986559666858741357614862536662929114274436928210606493153270271105)*x + (11907709853528362511468324769715718886404782262030405547338472125099507973352717092933137214646946563255635882959046496250976855218*i+13183633102286037722811154566915806434855796179338186054395645676393625991490118561766530717926136595291001094616411908299704994231) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (312910591984776395827406211455657719938386929992839443497750735357426967691268648256957847591211573700686172926201853987728878937*i+5771198900062091371793064210789961544223942094041566531859115716986559666858741357614862536662929114274436928210606493153270271105)*x + (11907709853528362511468324769715718886404782262030405547338472125099507973352717092933137214646946563255635882959046496250976855218*i+13183633102286037722811154566915806434855796179338186054395645676393625991490118561766530717926136595291001094616411908299704994231) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9444389915147479676409169088434425612184979177882406188288784718000307549748202710560544376010750757521270617588451467497609856665*i+20255826746348720839890689639283100574026091722616781833448897683571587959202093762948243705636377657397887719595062306614085133315)*x + (9105867703147440616053317774780806101245221967164846381535237446289049082470302336292102281889635984980599916833439337298226223697*i+9886464603499698247810367170440988389320291917661688784080918269758189888051958357426276145944518331786163235196110993926428288016) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9444389915147479676409169088434425612184979177882406188288784718000307549748202710560544376010750757521270617588451467497609856665*i+20255826746348720839890689639283100574026091722616781833448897683571587959202093762948243705636377657397887719595062306614085133315)*x + (9105867703147440616053317774780806101245221967164846381535237446289049082470302336292102281889635984980599916833439337298226223697*i+9886464603499698247810367170440988389320291917661688784080918269758189888051958357426276145944518331786163235196110993926428288016) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4525487802635541865885662776488054750432200989182826713054750676016532124370321389989675548015925803386300093421923526682782278966*i+5386269515181168575722126612359450730714939292287291099858613139855661207668254983851345847750638318864714601411632750901276049145)*x + (6106318792989869225309231212380644216379992639632938218530205979657760324321042010094598886713763658936560610135448676055670528533*i+14231471577992842215190500699243811774747789126867774645877233499262438481151091083047978657526811631408076071315568880857033624213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4525487802635541865885662776488054750432200989182826713054750676016532124370321389989675548015925803386300093421923526682782278966*i+5386269515181168575722126612359450730714939292287291099858613139855661207668254983851345847750638318864714601411632750901276049145)*x + (6106318792989869225309231212380644216379992639632938218530205979657760324321042010094598886713763658936560610135448676055670528533*i+14231471577992842215190500699243811774747789126867774645877233499262438481151091083047978657526811631408076071315568880857033624213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22472260254479507461832958784494153037459443649316704825214843765528603473582711642289947351625864096572962020361449487213677572903*i+20452501092559347985992174122639466428222532838920375667092329476810300022307461755800506664532548252748932324560923192872373745132)*x + (564476060780918992827129705303330399657656328009086625575686047948892285700808439239763885334344223311030818992904164096940290828*i+8715459597957102761495638870426048912830597450702146731097463224901824696703121344136204330970247757328602994622941626481684271185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22472260254479507461832958784494153037459443649316704825214843765528603473582711642289947351625864096572962020361449487213677572903*i+20452501092559347985992174122639466428222532838920375667092329476810300022307461755800506664532548252748932324560923192872373745132)*x + (564476060780918992827129705303330399657656328009086625575686047948892285700808439239763885334344223311030818992904164096940290828*i+8715459597957102761495638870426048912830597450702146731097463224901824696703121344136204330970247757328602994622941626481684271185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23227555776512810362374487619966036486950673616620220163188315029567849504134132026193017703271032842566067944237136053246411938156*i+10074734981294177719637896802012897513260606449523461816266031851702243300802926852076468056459149814949118702867004950369839123414)*x + (5064271380342213885153780080347064008657278504178302702491091390751253566510255976026859767228193634562678052340724946362323322098*i+16436577633415860011111998050164951394283482857522232721793160997068766001798140924233127602011541946847841603585713044211015377693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23227555776512810362374487619966036486950673616620220163188315029567849504134132026193017703271032842566067944237136053246411938156*i+10074734981294177719637896802012897513260606449523461816266031851702243300802926852076468056459149814949118702867004950369839123414)*x + (5064271380342213885153780080347064008657278504178302702491091390751253566510255976026859767228193634562678052340724946362323322098*i+16436577633415860011111998050164951394283482857522232721793160997068766001798140924233127602011541946847841603585713044211015377693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20196796371670947182148014876154808485288587458328131382749562381860386644913785773391740260144913538878948129144431925201058716786*i+3947827195372333038799587030648172841789548384870809740883472548682544879433843479445706560328657610092549368088197606988215576713)*x + (1636676925698985558825989032935109631307641968928982657931088893481444568579606067412831346349894017515096671707188442402390299115*i+23234659030688372045543280779101590757642961481164160126530076422648873350000896091419848163957322742071264400108211531995131703721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20196796371670947182148014876154808485288587458328131382749562381860386644913785773391740260144913538878948129144431925201058716786*i+3947827195372333038799587030648172841789548384870809740883472548682544879433843479445706560328657610092549368088197606988215576713)*x + (1636676925698985558825989032935109631307641968928982657931088893481444568579606067412831346349894017515096671707188442402390299115*i+23234659030688372045543280779101590757642961481164160126530076422648873350000896091419848163957322742071264400108211531995131703721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4382468643739628981719306597818288892805689233033549108328852520409000915189405420358184867231249648764307166893933425786705924724*i+18072620319846631020269404837077377367486565893219264584151662219778031913286656040300422259021278749793631855998152148339585946346)*x + (22979620823277929061461619100034620888835695513701656303065547596136773982017371877909679204637175089905963149199927602484228536864*i+19515283006958370452303074688656863179922364972265063769457681297249026961703334191647712273941897269183965950170779421768744596257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4382468643739628981719306597818288892805689233033549108328852520409000915189405420358184867231249648764307166893933425786705924724*i+18072620319846631020269404837077377367486565893219264584151662219778031913286656040300422259021278749793631855998152148339585946346)*x + (22979620823277929061461619100034620888835695513701656303065547596136773982017371877909679204637175089905963149199927602484228536864*i+19515283006958370452303074688656863179922364972265063769457681297249026961703334191647712273941897269183965950170779421768744596257) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15689024849194697424127441040731155872270703465395857224467448249895274091927881859169432224237723323462355391492526018438302330380*i+5647251395234422238806641975813629398822188358277732675570068965502461539988993264126784932427026038221630175235567691799083049744)*x + (15723704494405539881623242205381834454842878042878989835117169789675988652888823051168948751642228109640942454161255885939802234429*i+10224722108832619557689572543106205686565462845296648853161748972835069236643924952356096945188306601332772627528653705697746037721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15689024849194697424127441040731155872270703465395857224467448249895274091927881859169432224237723323462355391492526018438302330380*i+5647251395234422238806641975813629398822188358277732675570068965502461539988993264126784932427026038221630175235567691799083049744)*x + (15723704494405539881623242205381834454842878042878989835117169789675988652888823051168948751642228109640942454161255885939802234429*i+10224722108832619557689572543106205686565462845296648853161748972835069236643924952356096945188306601332772627528653705697746037721) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22201951839458021178190461100220220647104100573697514255636829932123906570512501585415071592989928903892560882654808496503658904140*i+22577359196997723067774270926664038130562299532538918477786122519899903029323497873263519032544254222940543627637865278044291982539)*x + (643580868813464254028676941439177337173359121792867228428609038379817845575240843397230173021858919131164994764339008151232679155*i+266344283286719687606467512364419578248768510772602484771114862664583100500490141365053283895949532844886960674465315865083822434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22201951839458021178190461100220220647104100573697514255636829932123906570512501585415071592989928903892560882654808496503658904140*i+22577359196997723067774270926664038130562299532538918477786122519899903029323497873263519032544254222940543627637865278044291982539)*x + (643580868813464254028676941439177337173359121792867228428609038379817845575240843397230173021858919131164994764339008151232679155*i+266344283286719687606467512364419578248768510772602484771114862664583100500490141365053283895949532844886960674465315865083822434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14047004204186152429527105205061769064093536149864971819937353818642108410113993986050723651364977174368052937078208909859690498617*i+19180377490268449237118939004053176872394537918487906673316778027952819319104090603593586952631042923595617699395294857938108195875)*x + (9235014539786408447366640024927423772719623143246497326400773705503453301568735687080846226432437540519535764398007901924561106483*i+20177228574584774395944060144639016002311704520162812579493082552915207702531758905909368384456590312363792114214739621443405374718) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14047004204186152429527105205061769064093536149864971819937353818642108410113993986050723651364977174368052937078208909859690498617*i+19180377490268449237118939004053176872394537918487906673316778027952819319104090603593586952631042923595617699395294857938108195875)*x + (9235014539786408447366640024927423772719623143246497326400773705503453301568735687080846226432437540519535764398007901924561106483*i+20177228574584774395944060144639016002311704520162812579493082552915207702531758905909368384456590312363792114214739621443405374718) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7278874586702133925242820496286239882777835603952108623371117658543836589166201141137899587569191051729124994825943059189708644157*i+10211090819726910619971117772407828658083466754406213271453239708256035974171322112941777734131171524397215232453705048451075114918)*x + (11286454188528976768621644237523730978437798540382381402832955845673667256666381655959311006979355244723988961287156247979827780395*i+24336676590932195723169811504656372737153803329957711037597748246632587601012264199451555801033715741013295204254166251974959647735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7278874586702133925242820496286239882777835603952108623371117658543836589166201141137899587569191051729124994825943059189708644157*i+10211090819726910619971117772407828658083466754406213271453239708256035974171322112941777734131171524397215232453705048451075114918)*x + (11286454188528976768621644237523730978437798540382381402832955845673667256666381655959311006979355244723988961287156247979827780395*i+24336676590932195723169811504656372737153803329957711037597748246632587601012264199451555801033715741013295204254166251974959647735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15099733511839367717459443392272201663314333133941532295288552778305381019979220096115767365147425885045492570257620427628613303428*i+3898374574056589779619890531808993334690306263699797641981643578855171108356081484754561303021935244865392403264817476327423654818)*x + (15106804515628285012322031628394833697128807420391602930881277381204727598545227560059702362311483327941022257530243062652314333923*i+629811962612310584120944638189168162033049765828860435515768399331934909930494717436787808633351868104682276223469669149160492841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15099733511839367717459443392272201663314333133941532295288552778305381019979220096115767365147425885045492570257620427628613303428*i+3898374574056589779619890531808993334690306263699797641981643578855171108356081484754561303021935244865392403264817476327423654818)*x + (15106804515628285012322031628394833697128807420391602930881277381204727598545227560059702362311483327941022257530243062652314333923*i+629811962612310584120944638189168162033049765828860435515768399331934909930494717436787808633351868104682276223469669149160492841) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14834216002539356189585280760351311739170893148650705420274616973292604286531398917096267134561093173935244697846169839409159344383*i+23880636185844642399816190668938974194425721577006202366431727548024932495704051227621939034787725187844839887304846139587574500887)*x + (14378735851839607462634253836946968659685126721461563633384036000589721832756733834815664835245000133352509912993268666337498897822*i+20463928412609074517677619877317574156661113136448161070247031880506042764100969973382762536446838129206546546347252332309072719379) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14834216002539356189585280760351311739170893148650705420274616973292604286531398917096267134561093173935244697846169839409159344383*i+23880636185844642399816190668938974194425721577006202366431727548024932495704051227621939034787725187844839887304846139587574500887)*x + (14378735851839607462634253836946968659685126721461563633384036000589721832756733834815664835245000133352509912993268666337498897822*i+20463928412609074517677619877317574156661113136448161070247031880506042764100969973382762536446838129206546546347252332309072719379) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23129001334235501324872763194507516453260794721270365249158168950672312348780344294083493082127597247299778721729421052013154868849*i+3426280094414589442507617403805197353921503074267159060830372811217255167606931383240480511229501081473537254360309303970115503707)*x + (8282294248376568387089569355034274514389894153158292610077323564319731384247647386634813464593406476869726777449506729678272181557*i+8922163496375830382711918279492629194587368912294814090009807861798911276160647257328469872854879360033668788106091060749365129163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23129001334235501324872763194507516453260794721270365249158168950672312348780344294083493082127597247299778721729421052013154868849*i+3426280094414589442507617403805197353921503074267159060830372811217255167606931383240480511229501081473537254360309303970115503707)*x + (8282294248376568387089569355034274514389894153158292610077323564319731384247647386634813464593406476869726777449506729678272181557*i+8922163496375830382711918279492629194587368912294814090009807861798911276160647257328469872854879360033668788106091060749365129163) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19661184378875650953611704655435011934185905306469389803838518432859833350651013439590479757675789601055572414876014439857342992508*i+17479768855292115878844192893866342084568610691175698628238435300555112477348180429411486577089849832808019913466083407697960745333)*x + (12423956285463009443019689616536129232336767794591516906679372095962085698764624771789916123940936207594118777394406236645018627880*i+1952251620050967552243544966451433165638865892844430373286974429217337089363143520704803432147565334868484733448009900526044324100) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19661184378875650953611704655435011934185905306469389803838518432859833350651013439590479757675789601055572414876014439857342992508*i+17479768855292115878844192893866342084568610691175698628238435300555112477348180429411486577089849832808019913466083407697960745333)*x + (12423956285463009443019689616536129232336767794591516906679372095962085698764624771789916123940936207594118777394406236645018627880*i+1952251620050967552243544966451433165638865892844430373286974429217337089363143520704803432147565334868484733448009900526044324100) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22931509357943201503294438124146240016239279002250006035062259347877076787048141092531441495139643283609995484459049818154272784113*i+9774552895246184479848777416063692392875791201593488951447155578185315759579700045479211785981230653366222362426010109445235978161)*x + (17035840813695084678081752988088877801291012758801112450024712000616781548505295464803038458878995577454326134500637443260843506190*i+12720818385404534126082846671055151335793959525087022462373258509290448700693032600230297305320552535054357500121965455929057700149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22931509357943201503294438124146240016239279002250006035062259347877076787048141092531441495139643283609995484459049818154272784113*i+9774552895246184479848777416063692392875791201593488951447155578185315759579700045479211785981230653366222362426010109445235978161)*x + (17035840813695084678081752988088877801291012758801112450024712000616781548505295464803038458878995577454326134500637443260843506190*i+12720818385404534126082846671055151335793959525087022462373258509290448700693032600230297305320552535054357500121965455929057700149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17535335609831002877333261383966934779128407271696215766904041092907863638103780314242854266307433972265163456032305491518510891685*i+538093448064101102364724684113368637675436377278936217916695183994494526980343450910631482972851908074407397762590339117688957805)*x + (16641820651692019110003965637653728891955895820790339755173491382979921007722378481714898100218458072312259137880541413294546867680*i+20325954381659204600807649863835981447619210914356888087225105088069711114209560240689500242869251398942137295930201515058117834615) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17535335609831002877333261383966934779128407271696215766904041092907863638103780314242854266307433972265163456032305491518510891685*i+538093448064101102364724684113368637675436377278936217916695183994494526980343450910631482972851908074407397762590339117688957805)*x + (16641820651692019110003965637653728891955895820790339755173491382979921007722378481714898100218458072312259137880541413294546867680*i+20325954381659204600807649863835981447619210914356888087225105088069711114209560240689500242869251398942137295930201515058117834615) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12794197957708210574950517417565138040692181047040740513132263873984376664151557260348016095956305982452615141517388650846427281212*i+20331897336523307863582588332101183548989239731770346576047368880086217585467668846333492065289167596938805156339462050491107047040)*x + (18600499031947725414131036250248130243073852267849299615039165407609054647573756352724234237937853403120397632287074754409334146822*i+6404239204736231735894362136168113532445207324209172491208759797458787841553313858561176930713312549704414194860873039772304897497) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12794197957708210574950517417565138040692181047040740513132263873984376664151557260348016095956305982452615141517388650846427281212*i+20331897336523307863582588332101183548989239731770346576047368880086217585467668846333492065289167596938805156339462050491107047040)*x + (18600499031947725414131036250248130243073852267849299615039165407609054647573756352724234237937853403120397632287074754409334146822*i+6404239204736231735894362136168113532445207324209172491208759797458787841553313858561176930713312549704414194860873039772304897497) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13465330327013532780178801221064914142478577121236742180689835825373867486614969858146135999463714598264499478901502219282043109166*i+13736872529846588025797158601063081898581146076515648196344770114624369561996371787847373378300656288442613926805721818902335210765)*x + (22721405161264637081121632905604202372849423290825355500670730187021037087167684199797918172971333941017133492566746270942532354181*i+12444518910407036583757473310977275085837285569644640525750554067953563531797941920466493077374369059362570334958616153152738572738) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13465330327013532780178801221064914142478577121236742180689835825373867486614969858146135999463714598264499478901502219282043109166*i+13736872529846588025797158601063081898581146076515648196344770114624369561996371787847373378300656288442613926805721818902335210765)*x + (22721405161264637081121632905604202372849423290825355500670730187021037087167684199797918172971333941017133492566746270942532354181*i+12444518910407036583757473310977275085837285569644640525750554067953563531797941920466493077374369059362570334958616153152738572738) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14712853171946706572648795865868832278243246908874008161813525246329383107177164547074337372897553357719247026287922102721440077476*i+11823145526622600833720234427841401872408610640744721325009561046173613963883698883544257638855062206120599265911913301503474373428)*x + (23816578117148958761111292600652697865851162581259833362645699654346966513312846655876090293642644559756306133704958296855264547007*i+16245191528291680180687633537035687059509450655808995957236409585056279995494822885281026089122738189112950621431431444507928742617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14712853171946706572648795865868832278243246908874008161813525246329383107177164547074337372897553357719247026287922102721440077476*i+11823145526622600833720234427841401872408610640744721325009561046173613963883698883544257638855062206120599265911913301503474373428)*x + (23816578117148958761111292600652697865851162581259833362645699654346966513312846655876090293642644559756306133704958296855264547007*i+16245191528291680180687633537035687059509450655808995957236409585056279995494822885281026089122738189112950621431431444507928742617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6427855961395528976324836331141752846431831510824216155696798324955671537397748333780435694595030137997701214516787016264511151626*i+5371901492757435269757841170170010577343145394353385052843338870721018424167972374851185444374823704785259910975633056327949833431)*x + (23448997465480386200373847877799474744563695690328096506987530179934167558888378476561755876855530808607083558677080648202953677643*i+21260030799782294158987859174118061645777235372940389403532286725856666133420106100731415742510284993711314919517071416683723283966) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6427855961395528976324836331141752846431831510824216155696798324955671537397748333780435694595030137997701214516787016264511151626*i+5371901492757435269757841170170010577343145394353385052843338870721018424167972374851185444374823704785259910975633056327949833431)*x + (23448997465480386200373847877799474744563695690328096506987530179934167558888378476561755876855530808607083558677080648202953677643*i+21260030799782294158987859174118061645777235372940389403532286725856666133420106100731415742510284993711314919517071416683723283966) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7167827313723289923063065307747564818431580104325920595119722171157526906229267543058298028112012401955400802028876642615060051234*i+5095732703078653300980254285438534889847614262146892725075880929757877164676862955520638072824083228008852554446163091236414068098)*x + (21211268663886034248613701214407634500914428595130903773707692143096807320233216763368237006820931313616977901883049389777090190822*i+2144984956645292307435883108282157533735793987425803051159305333287369226566194420451033623488299523182634391382472325144780461488) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7167827313723289923063065307747564818431580104325920595119722171157526906229267543058298028112012401955400802028876642615060051234*i+5095732703078653300980254285438534889847614262146892725075880929757877164676862955520638072824083228008852554446163091236414068098)*x + (21211268663886034248613701214407634500914428595130903773707692143096807320233216763368237006820931313616977901883049389777090190822*i+2144984956645292307435883108282157533735793987425803051159305333287369226566194420451033623488299523182634391382472325144780461488) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6046178889683787994433511486066631092456318608756389823373264890599847048089644058753272101415951016012461080995325147589018440903*i+398373999394536493886508117919934161091188547898022856180400386250727835782784898911420768837211717745825494744879123199201021504)*x + (16920110182625558954083944455696380842558239100192932351986475294495472390896820697470921537732960543069900436097529889871594882908*i+3014936418220960829162583965468035735871078497701512557126911002347595321668007720039680411738526745325330893114751840177305306589) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6046178889683787994433511486066631092456318608756389823373264890599847048089644058753272101415951016012461080995325147589018440903*i+398373999394536493886508117919934161091188547898022856180400386250727835782784898911420768837211717745825494744879123199201021504)*x + (16920110182625558954083944455696380842558239100192932351986475294495472390896820697470921537732960543069900436097529889871594882908*i+3014936418220960829162583965468035735871078497701512557126911002347595321668007720039680411738526745325330893114751840177305306589) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (552325218032205023544617582510626250973553897412862646616254585346693134227152076112970733370725643727304453658190148512034908575*i+8048488466687424641867134131393937415864707931874207831209725283169360418695767674795232447452924751260919369236469396238082396818)*x + (18298458064526086097162198482809133529788475355164606528634936050369438291745622058379317453830846617174009520677870853948473960676*i+16743893740777112003296514823576346129161212281592471480021666320660126669472746974052017926343276480402436417746957776746632835215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (552325218032205023544617582510626250973553897412862646616254585346693134227152076112970733370725643727304453658190148512034908575*i+8048488466687424641867134131393937415864707931874207831209725283169360418695767674795232447452924751260919369236469396238082396818)*x + (18298458064526086097162198482809133529788475355164606528634936050369438291745622058379317453830846617174009520677870853948473960676*i+16743893740777112003296514823576346129161212281592471480021666320660126669472746974052017926343276480402436417746957776746632835215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15999664544012833696612069280037940816705346489924170953858514340957554813705455025118571834672771228749713233681747633740402575568*i+8669183552435631633111018780885317472354200274599061514494554406952253838466970835325737497350524321119495140190097880021975899736)*x + (17431408619631081070545430474449433544813203104709817184731912172518841126226128961545150680044062836923787307433371328190960275375*i+18606550121706837030978375583225672488678011218264121953287052081284025568046995039562554548182794928606901620824789467725514554668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15999664544012833696612069280037940816705346489924170953858514340957554813705455025118571834672771228749713233681747633740402575568*i+8669183552435631633111018780885317472354200274599061514494554406952253838466970835325737497350524321119495140190097880021975899736)*x + (17431408619631081070545430474449433544813203104709817184731912172518841126226128961545150680044062836923787307433371328190960275375*i+18606550121706837030978375583225672488678011218264121953287052081284025568046995039562554548182794928606901620824789467725514554668) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9410170044456973893069087091448911506024688696544083949616382035890740934809138459341482762283164905882104683534737669738523510823*i+11870964487335539073519400870908715072682916727802285538948027639033598555217463540673921465050713527742987741793047499769003211026)*x + (6438772703461391112780106789893445903163323578645645153796525392287574076640884477337642331805926705113713026540168670920177285987*i+22472570053645812974076162925197874821411618313938188662970586409412675700588983826616390406372272265924793373832382166071461074236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9410170044456973893069087091448911506024688696544083949616382035890740934809138459341482762283164905882104683534737669738523510823*i+11870964487335539073519400870908715072682916727802285538948027639033598555217463540673921465050713527742987741793047499769003211026)*x + (6438772703461391112780106789893445903163323578645645153796525392287574076640884477337642331805926705113713026540168670920177285987*i+22472570053645812974076162925197874821411618313938188662970586409412675700588983826616390406372272265924793373832382166071461074236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10399851753655352377211544265621702501088406770026814516726928154017044178047131770754749279529944638881190186287354398897556337829*i+5309263273478410082793958892545222578479867381533072917056711896731146582348535823087839047367411801116718833543717746773488210203)*x + (3196962560637829274964535641908870561149876179357841370207464731234032495989511972211068147471268009472914557878515702609522720020*i+5891368421015771763328141872492157269812147271539748722649594676498745560719235958789372797581816779064365538265003935162489221697) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10399851753655352377211544265621702501088406770026814516726928154017044178047131770754749279529944638881190186287354398897556337829*i+5309263273478410082793958892545222578479867381533072917056711896731146582348535823087839047367411801116718833543717746773488210203)*x + (3196962560637829274964535641908870561149876179357841370207464731234032495989511972211068147471268009472914557878515702609522720020*i+5891368421015771763328141872492157269812147271539748722649594676498745560719235958789372797581816779064365538265003935162489221697) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16592164462067721814377920326459771883594482263977646095248373363255192292922059143118842999725198292753072730136347375517207867920*i+3746708336782780952959767900295684727912994392583396342964979109365988615852119286260902418993853856281700553840397670953253257684)*x + (13290538923771207787554114971399558633060127354938985131521947010785334339381965856954393526696975035712247949335289275707849108761*i+22950914043330561273302517752001540571923851762836147604858172565447974588360576804049302065461374401943415011968910438885795152459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16592164462067721814377920326459771883594482263977646095248373363255192292922059143118842999725198292753072730136347375517207867920*i+3746708336782780952959767900295684727912994392583396342964979109365988615852119286260902418993853856281700553840397670953253257684)*x + (13290538923771207787554114971399558633060127354938985131521947010785334339381965856954393526696975035712247949335289275707849108761*i+22950914043330561273302517752001540571923851762836147604858172565447974588360576804049302065461374401943415011968910438885795152459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20007143593603828407671859377322693753627501644429305255824347487889641042449755633067038916954859009288922028064154311954095217925*i+16939227291745887515708719685070212207450668799948089852091531543304596846915688427758071819887283957778345382848406039907520164254)*x + (1693048185773077660233378359299926959594225756378011769798334756078249728876842623922733973433511974626846823591503467326766805549*i+9881482513014538612371409416412627647853185073327975459795652412111412026603311447513449091419394884513975969617533004015977848947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20007143593603828407671859377322693753627501644429305255824347487889641042449755633067038916954859009288922028064154311954095217925*i+16939227291745887515708719685070212207450668799948089852091531543304596846915688427758071819887283957778345382848406039907520164254)*x + (1693048185773077660233378359299926959594225756378011769798334756078249728876842623922733973433511974626846823591503467326766805549*i+9881482513014538612371409416412627647853185073327975459795652412111412026603311447513449091419394884513975969617533004015977848947) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21932569948131005847549950046762421745359765522017932048709934424275812021001986209800352196624519100561523579444866534063308006259*i+1163427186280284513556075339979338108406258659732608567792232236277283438743430446365018069400675747882899101595979543766908782118)*x + (12281776532544338198660737228713122174989055754097046441637254924510508406886513657505679094238060641051083282656088155458161767540*i+4814921266443990480274137072666947572396817323041680910764229312519282167063764318669421251690574700889896166605865674642348030967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21932569948131005847549950046762421745359765522017932048709934424275812021001986209800352196624519100561523579444866534063308006259*i+1163427186280284513556075339979338108406258659732608567792232236277283438743430446365018069400675747882899101595979543766908782118)*x + (12281776532544338198660737228713122174989055754097046441637254924510508406886513657505679094238060641051083282656088155458161767540*i+4814921266443990480274137072666947572396817323041680910764229312519282167063764318669421251690574700889896166605865674642348030967) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23405229103809091149271654097147080566322598961150988339462795439277011760330366642385538198988166187476438674526281342261455814096*i+24062705726447390875347608873651682937981868163557987123083180347859513697811709822048890120699100197987743399231904591372544769851)*x + (18422630892306256213735495400571548918768917027889485660705589979880789263293132321224883297886308646295199900888820122232749680600*i+17239363510921002985578990715449568714059435607564358505254970994329625977842454170052595098500940048352532817662006072219716353377) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23405229103809091149271654097147080566322598961150988339462795439277011760330366642385538198988166187476438674526281342261455814096*i+24062705726447390875347608873651682937981868163557987123083180347859513697811709822048890120699100197987743399231904591372544769851)*x + (18422630892306256213735495400571548918768917027889485660705589979880789263293132321224883297886308646295199900888820122232749680600*i+17239363510921002985578990715449568714059435607564358505254970994329625977842454170052595098500940048352532817662006072219716353377) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6981987858461506311932881044984104015245543403547284338987256817861058984497736788328613779657605213630763570399219010330950325426*i+23205350339015903410679787723196139803002858108061522507485519216700158679751367580990793649210853138958137891134517810015792776598)*x + (3118928971541251683284617351043691298002926092881241951124381089582423752149994552058523955548448362359155335738475544062452230016*i+22388090575699209241471368831345622581930897150200010440506671001105790357204446494758871783975168452758812590754421564364173756325) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6981987858461506311932881044984104015245543403547284338987256817861058984497736788328613779657605213630763570399219010330950325426*i+23205350339015903410679787723196139803002858108061522507485519216700158679751367580990793649210853138958137891134517810015792776598)*x + (3118928971541251683284617351043691298002926092881241951124381089582423752149994552058523955548448362359155335738475544062452230016*i+22388090575699209241471368831345622581930897150200010440506671001105790357204446494758871783975168452758812590754421564364173756325) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2958188945320126262632800261626116167779166609574880427742670725314996154184491501955689832603183105479503761698795862264640151641*i+20782840552819749471589342076337993100499144791195790000650418303706496018053424175307239241107194074929097090133496499520400264306)*x + (15423447378763272241510219242460183943296187300106885483680984373907686154328080500775372374031275209851538516459239204746008614737*i+22794347339509830983030729140753163028199188795383266633517804763426486918956442830043549684554118923052648924152263205952224327454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2958188945320126262632800261626116167779166609574880427742670725314996154184491501955689832603183105479503761698795862264640151641*i+20782840552819749471589342076337993100499144791195790000650418303706496018053424175307239241107194074929097090133496499520400264306)*x + (15423447378763272241510219242460183943296187300106885483680984373907686154328080500775372374031275209851538516459239204746008614737*i+22794347339509830983030729140753163028199188795383266633517804763426486918956442830043549684554118923052648924152263205952224327454) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5154961352441344160699830457261507720427411001489415321090207752258278795824100074275332038109446379162247176890115830386823552206*i+18897813542605395223264507022293612609508893370208952375416463120260843906591187692248005371374894258057366730134445438322776897503)*x + (16131133131927818541840776564087453014442895729540852243677973227080326987008677874487665674674364907708835311290311602317724834836*i+14839723693316543196625472065466550662395288047720096032735032223922426445936579184439215377375534379068233364426107981107152837107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5154961352441344160699830457261507720427411001489415321090207752258278795824100074275332038109446379162247176890115830386823552206*i+18897813542605395223264507022293612609508893370208952375416463120260843906591187692248005371374894258057366730134445438322776897503)*x + (16131133131927818541840776564087453014442895729540852243677973227080326987008677874487665674674364907708835311290311602317724834836*i+14839723693316543196625472065466550662395288047720096032735032223922426445936579184439215377375534379068233364426107981107152837107) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10856738419393371987836506045136465380382590728507810782348578813551106392437455723462268088193799376400238704803754688523503177558*i+22051524592395289417236635042167801870501597836130014290689599743708461534167394684797855519873660860366199125958444657783105114929)*x + (18295981931224277913651127498039561821282780887432447540024199974045294010574113537603419841465106073287954152509780996949630858891*i+3063897304698078916229853954923537603446932989112577227907698652856367368894388950059922074073729846732522142578268004254589817005) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10856738419393371987836506045136465380382590728507810782348578813551106392437455723462268088193799376400238704803754688523503177558*i+22051524592395289417236635042167801870501597836130014290689599743708461534167394684797855519873660860366199125958444657783105114929)*x + (18295981931224277913651127498039561821282780887432447540024199974045294010574113537603419841465106073287954152509780996949630858891*i+3063897304698078916229853954923537603446932989112577227907698652856367368894388950059922074073729846732522142578268004254589817005) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20359885745050948304731371489532763060485140237175079324641971446496397140755161358535441809642839615921396635013365245429378953876*i+7010394315750847926535166322337039671542633176190202032094446707642713925253566028634400825667528270632969349745624921103073575311)*x + (13286499944030237974407622465476683940552893430146753326278533740603884193914340891593747702171572717157553248372514309783197582726*i+19521330462788276967606385362488666354030904853812239910033892482967168248618904239845492715474493458705271104968568654454744306314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20359885745050948304731371489532763060485140237175079324641971446496397140755161358535441809642839615921396635013365245429378953876*i+7010394315750847926535166322337039671542633176190202032094446707642713925253566028634400825667528270632969349745624921103073575311)*x + (13286499944030237974407622465476683940552893430146753326278533740603884193914340891593747702171572717157553248372514309783197582726*i+19521330462788276967606385362488666354030904853812239910033892482967168248618904239845492715474493458705271104968568654454744306314) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (82542851463536771473363032203980327642202401399545965814097552556047226776804496968894353909008313845367032189571400525425321481*i+8429617310043008828797093242356004323386167482879982661093131861746780321333500871155992101707034146591813304075023022789705299245)*x + (20751021527032377855843182941257162568499894630605618940360945176670674369386140951635196661303029724707017200438458295574763990108*i+2834513157611237668066422404504430616028774244706270426258225588877440372194895754206760451814042805726509525966427693821696792434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (82542851463536771473363032203980327642202401399545965814097552556047226776804496968894353909008313845367032189571400525425321481*i+8429617310043008828797093242356004323386167482879982661093131861746780321333500871155992101707034146591813304075023022789705299245)*x + (20751021527032377855843182941257162568499894630605618940360945176670674369386140951635196661303029724707017200438458295574763990108*i+2834513157611237668066422404504430616028774244706270426258225588877440372194895754206760451814042805726509525966427693821696792434) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18539498335615606155308050681607466155999950515103701198269231378738692303449438282891322222729980321847553738380490208895790773499*i+17354739462505872328392242937579732215476382862099682995076313018036274923064800745991195720252967219563473726568621709635413744463)*x + (3330116984388476397036367655356995964358164880042490826151850357222578395719345971060893494103768453947894289302394161800170305778*i+21224291760396673824589144299868831028674658132021505053883995076260518102572037448020155726832014575512151115041889878417694887925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18539498335615606155308050681607466155999950515103701198269231378738692303449438282891322222729980321847553738380490208895790773499*i+17354739462505872328392242937579732215476382862099682995076313018036274923064800745991195720252967219563473726568621709635413744463)*x + (3330116984388476397036367655356995964358164880042490826151850357222578395719345971060893494103768453947894289302394161800170305778*i+21224291760396673824589144299868831028674658132021505053883995076260518102572037448020155726832014575512151115041889878417694887925) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17297865402020553129464422552128723301414815793400118377349976086614206975417582439924903869145790700386377471781477815536406159602*i+23224118446749210411465973407037779479931249815103837850315154185121083084827326278804187570808549973204355715358144368850698625979)*x + (10245358323852289859258439429704101883060309019451634370829331236411726969175661944106283579518862865730318846517744839787183182637*i+16846539787437224049475548816174101315373092010046876318894173542246940826672906098891815470501242393425417208929246717146096282638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17297865402020553129464422552128723301414815793400118377349976086614206975417582439924903869145790700386377471781477815536406159602*i+23224118446749210411465973407037779479931249815103837850315154185121083084827326278804187570808549973204355715358144368850698625979)*x + (10245358323852289859258439429704101883060309019451634370829331236411726969175661944106283579518862865730318846517744839787183182637*i+16846539787437224049475548816174101315373092010046876318894173542246940826672906098891815470501242393425417208929246717146096282638) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13736430434001672858307203184208095845811058520269441281420323914618708277978692075732529441573653765211259970359359175025154169057*i+2942300503398883700705750060827066572288798196591306997452916959037988072749381170155351451489084821674616341628224450724159932669)*x + (17661607385618709921643325074392732758319701584888119882912424138735881249037793157472264047305485985867740154599497140288634196738*i+2781505607842405323296782795311496621520581429175360246642673671211646966326219240829463185826435116923279258110992620696490306750) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13736430434001672858307203184208095845811058520269441281420323914618708277978692075732529441573653765211259970359359175025154169057*i+2942300503398883700705750060827066572288798196591306997452916959037988072749381170155351451489084821674616341628224450724159932669)*x + (17661607385618709921643325074392732758319701584888119882912424138735881249037793157472264047305485985867740154599497140288634196738*i+2781505607842405323296782795311496621520581429175360246642673671211646966326219240829463185826435116923279258110992620696490306750) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18248559385352680482836967630898287549446904529506513190150089305059437958601309137664409363812595793231515368471011743197955907148*i+14144719081272583770571190706359688533058894629711071813510280686442702403502380804537995500355656634968597647203596968636074191657)*x + (2693686571968910691247599150834585337238166983767246542613042745396017879765665207528965991045422850991446289453915383428562852705*i+3478900836655713826533295021853518869420949005716620830062431341329659042263057146288212566672064192049084497056350939513969765326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18248559385352680482836967630898287549446904529506513190150089305059437958601309137664409363812595793231515368471011743197955907148*i+14144719081272583770571190706359688533058894629711071813510280686442702403502380804537995500355656634968597647203596968636074191657)*x + (2693686571968910691247599150834585337238166983767246542613042745396017879765665207528965991045422850991446289453915383428562852705*i+3478900836655713826533295021853518869420949005716620830062431341329659042263057146288212566672064192049084497056350939513969765326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22547214879238404333816817259998148179432642228600448420695860939918410612888351259511200113598119839181829303482348717590206618660*i+16020672314281758038951640403092179298239949491451144182230346273894061932273754690873653751912171584914479442112979105275122657221)*x + (1946159885656376987293269781052887202536977228289292766443054262160300603901530368169241370608480367457972430917701142042005223703*i+9893594262655806105816014558240043584479215186491903787475764294330213333274350571228291683002728739111873437660650470596604627256) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22547214879238404333816817259998148179432642228600448420695860939918410612888351259511200113598119839181829303482348717590206618660*i+16020672314281758038951640403092179298239949491451144182230346273894061932273754690873653751912171584914479442112979105275122657221)*x + (1946159885656376987293269781052887202536977228289292766443054262160300603901530368169241370608480367457972430917701142042005223703*i+9893594262655806105816014558240043584479215186491903787475764294330213333274350571228291683002728739111873437660650470596604627256) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2814811016452312399002759619081573015170421329770493990775902839334018501308846768943920339481165275430774849752715239592576275062*i+16852650209548743382122967422508043117287960530362957042877833990503815583047397977034760349139034771338351363039981295279984279838)*x + (12131924565490280350730104747952481636406208505040125069238795925538569928117835149151103428727513979890252705974017389331871486769*i+2236780250646654584985869725201603568615871774656415281656890573298703897592560892819137169815201415456157483472237895806985746324) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2814811016452312399002759619081573015170421329770493990775902839334018501308846768943920339481165275430774849752715239592576275062*i+16852650209548743382122967422508043117287960530362957042877833990503815583047397977034760349139034771338351363039981295279984279838)*x + (12131924565490280350730104747952481636406208505040125069238795925538569928117835149151103428727513979890252705974017389331871486769*i+2236780250646654584985869725201603568615871774656415281656890573298703897592560892819137169815201415456157483472237895806985746324) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1542661656772455501558506693242896730092725579893096209420259337228653531167394362236701472648611496645471386425524281624182032567*i+3443046112854621192585380475364512419685068168091979701333921168231522497262228064779403470837570773601878098267492697182890865792)*x + (11016602126967846427879033024693068099049941764576495439411841507528703923187510209713498389566383714440866518351983759653888998483*i+2245461911051234104710300574763535769348971989213742034290014384400706009685263471795725269681429398897261974359594019357809083464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1542661656772455501558506693242896730092725579893096209420259337228653531167394362236701472648611496645471386425524281624182032567*i+3443046112854621192585380475364512419685068168091979701333921168231522497262228064779403470837570773601878098267492697182890865792)*x + (11016602126967846427879033024693068099049941764576495439411841507528703923187510209713498389566383714440866518351983759653888998483*i+2245461911051234104710300574763535769348971989213742034290014384400706009685263471795725269681429398897261974359594019357809083464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19105304133636500241474816219862902783857353839622823801621180162591409577189848546383659853686652880174208299333425650069676152934*i+17093542139116204240845998451314667472474357174583522895978165234029129856852249228624506407836717863168951259712916694110283676854)*x + (3276827612515166287925317133890568283605977697579847342471393386738002817814514544164833124972796297333149243102485804747544329298*i+23104504887522612796680864674708247136011794584295484500238134631191422415786170823350976223176031030977568864778894160573488872918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19105304133636500241474816219862902783857353839622823801621180162591409577189848546383659853686652880174208299333425650069676152934*i+17093542139116204240845998451314667472474357174583522895978165234029129856852249228624506407836717863168951259712916694110283676854)*x + (3276827612515166287925317133890568283605977697579847342471393386738002817814514544164833124972796297333149243102485804747544329298*i+23104504887522612796680864674708247136011794584295484500238134631191422415786170823350976223176031030977568864778894160573488872918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16381226136488771254646901863606468791985515557785012341886176735684681020664424961741545372025463485463827004604896774199482206543*i+11873192402851177784429875124298372847515116994851941135195774517694523456786654838949922215589353115191595559300611970091332501395)*x + (3129410344241145932480255872555354065597563079346639736749490986656069853640218685374962243211440767121958524206800408398069398306*i+12344349113569603695378848117031792728593726588156396983464056856090351114467483781012426633874796808472833664045011902690670288160) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16381226136488771254646901863606468791985515557785012341886176735684681020664424961741545372025463485463827004604896774199482206543*i+11873192402851177784429875124298372847515116994851941135195774517694523456786654838949922215589353115191595559300611970091332501395)*x + (3129410344241145932480255872555354065597563079346639736749490986656069853640218685374962243211440767121958524206800408398069398306*i+12344349113569603695378848117031792728593726588156396983464056856090351114467483781012426633874796808472833664045011902690670288160) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24231969660027282488386358724750799406255379972629641715309280020372115685424754238138966793585999127682486283510850081741938081566*i+14063229121860456697461176464579215517688646051929697542034012656977976859491292235323295600945818449191007566947205876300453472222)*x + (23612892418516893112836690587239205246849053797052913576668155751654605506224367745560362538654800470410153403264227553925504067323*i+5568093248061985367382027779103414376278232080501194329207706553932568810836146214305711527444253648962902575982545727656935796674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24231969660027282488386358724750799406255379972629641715309280020372115685424754238138966793585999127682486283510850081741938081566*i+14063229121860456697461176464579215517688646051929697542034012656977976859491292235323295600945818449191007566947205876300453472222)*x + (23612892418516893112836690587239205246849053797052913576668155751654605506224367745560362538654800470410153403264227553925504067323*i+5568093248061985367382027779103414376278232080501194329207706553932568810836146214305711527444253648962902575982545727656935796674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [180]:
Phi2 = isogeny_walk (E, R2, l_A, n_A)
Phi2
Out[180]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + x over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 7340296971894359839450285360851195821277331163816789674709422736847804885110998221234891973520575185927754926015293367825470070776*x + 1439826482742894054964917547457080045750142597135655530569616094082099265984182299434221821464149529991753591844965720155841845176 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + 7340296971894359839450285360851195821277331163816789674709422736847804885110998221234891973520575185927754926015293367825470070776*x + 1439826482742894054964917547457080045750142597135655530569616094082099265984182299434221821464149529991753591844965720155841845176 over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16837585681671908583734401043107587935231028053452818256329174614070921831702419943507250930093087657914723607620388456087043450931*i+17183825424358795451234278224745775153324419986827914049733189959219801487335030539173594418027939781552356280751870431744601169842)*x + (13642982643268944289777989279683600632680331938583954182051964933435605844890107370606046013719380201243181687120357219800070791464*i+12892526877074111695047466894173659136557953011171482769980535106682517403465798699667322113101365361878979429157291320970309029979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16837585681671908583734401043107587935231028053452818256329174614070921831702419943507250930093087657914723607620388456087043450931*i+17183825424358795451234278224745775153324419986827914049733189959219801487335030539173594418027939781552356280751870431744601169842)*x + (13642982643268944289777989279683600632680331938583954182051964933435605844890107370606046013719380201243181687120357219800070791464*i+12892526877074111695047466894173659136557953011171482769980535106682517403465798699667322113101365361878979429157291320970309029979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14339525268951533365533854974400264020350873652582414794365961751518008841471892532037407810963758694397380523010250031568264649674*i+6480325347868498961672142226629016070297455918429441236075671579244516903012380879264033692833431353544550965852272098752990940857)*x + (16566170088449013066263439502131241198584193803747952796577945093944284479215480435904128776653771150656182834567276766816761889648*i+22839919829875511818202250374825355047187759424001929874201816994084011939095399570404560090483403546999016048781693682005256576277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14339525268951533365533854974400264020350873652582414794365961751518008841471892532037407810963758694397380523010250031568264649674*i+6480325347868498961672142226629016070297455918429441236075671579244516903012380879264033692833431353544550965852272098752990940857)*x + (16566170088449013066263439502131241198584193803747952796577945093944284479215480435904128776653771150656182834567276766816761889648*i+22839919829875511818202250374825355047187759424001929874201816994084011939095399570404560090483403546999016048781693682005256576277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17198896171257273900053197875916475702781717240525887638632727760995429485077034263491519422558889677383345392350081872417054894856*i+4140949484775115770047579110703877980794698468796451179495414251457440534571810542990420087895733035699223006272804331753759454768)*x + (12864770145384242511945691964894162549000389229420453876666519157086461860284756676045540509021295530175523625901849105038896446778*i+9938466938597919911816665993506135284668736756415320098793102879176577922298933568680398601865550427871597436970525330876873472246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17198896171257273900053197875916475702781717240525887638632727760995429485077034263491519422558889677383345392350081872417054894856*i+4140949484775115770047579110703877980794698468796451179495414251457440534571810542990420087895733035699223006272804331753759454768)*x + (12864770145384242511945691964894162549000389229420453876666519157086461860284756676045540509021295530175523625901849105038896446778*i+9938466938597919911816665993506135284668736756415320098793102879176577922298933568680398601865550427871597436970525330876873472246) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17039188894241473916858240430777956133325218947300560107188885149290589452454406385976726512732534468251378826394606138036773340292*i+4161249845912064770343318687744599692370646118862199145472746941205563729114442782795629188755128168604225117909932939439718275388)*x + (17071150467366486097988242330195361102357642026368047683646408394132454559361554757850473250808072106687308733955374418847466486368*i+7349386395907815445219181401135765489379711476047023234072605058070950458756360320520638217241330721579854501652944048109511908463) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17039188894241473916858240430777956133325218947300560107188885149290589452454406385976726512732534468251378826394606138036773340292*i+4161249845912064770343318687744599692370646118862199145472746941205563729114442782795629188755128168604225117909932939439718275388)*x + (17071150467366486097988242330195361102357642026368047683646408394132454559361554757850473250808072106687308733955374418847466486368*i+7349386395907815445219181401135765489379711476047023234072605058070950458756360320520638217241330721579854501652944048109511908463) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18088602892062736105825898311609049143357697375593540533905319805477062522295550873229704799513206045014567888745687154561981826792*i+4426607590876971705999296184515908434199710032322761477999413634715616385704322076796961262096648597140199686413039012840642277925)*x + (16493726816263245006042161139655938101988017889868075467323162115648918206296164501880665275337767681238377492821710476113535042179*i+17996720336777511433110232950363511386272332186110492760138250487467576246354555359774565514102674378664069124433751164538866040037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18088602892062736105825898311609049143357697375593540533905319805477062522295550873229704799513206045014567888745687154561981826792*i+4426607590876971705999296184515908434199710032322761477999413634715616385704322076796961262096648597140199686413039012840642277925)*x + (16493726816263245006042161139655938101988017889868075467323162115648918206296164501880665275337767681238377492821710476113535042179*i+17996720336777511433110232950363511386272332186110492760138250487467576246354555359774565514102674378664069124433751164538866040037) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21774818830541758779913683465068187438283991962500747203110184705215472455450865650884716116405314797635812426011238824342555025378*i+14553632599042816319921100762714165737218247471922971619855864386583502971342890302246850277854342071279001779315620775620986753188)*x + (7959771984356653188518785866261037309439406169313748652269555268004659487623724780203846918744719564385080653737953295249684403049*i+9209551256335916166697183557581986759554419381903636617678226473747499585482098429412252623534698208394107254216607343393498682730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21774818830541758779913683465068187438283991962500747203110184705215472455450865650884716116405314797635812426011238824342555025378*i+14553632599042816319921100762714165737218247471922971619855864386583502971342890302246850277854342071279001779315620775620986753188)*x + (7959771984356653188518785866261037309439406169313748652269555268004659487623724780203846918744719564385080653737953295249684403049*i+9209551256335916166697183557581986759554419381903636617678226473747499585482098429412252623534698208394107254216607343393498682730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15854056737218569191317285596716711937536110435320152428467021109523015439187668080649292474130009812927700211229590785725755506895*i+14637811272024565172933902161769229427419505655323692120248999391873336457865825455520672316533345574568461435754211028641243189423)*x + (5916296019336828876616319574663618628018137086191738264868846983884082832596665986110619558891287833222996741849226090062217080764*i+12216109116419530542186428060528336091518223278933974137512483799746720885734394841239906713471470852785404449505548823075514439093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15854056737218569191317285596716711937536110435320152428467021109523015439187668080649292474130009812927700211229590785725755506895*i+14637811272024565172933902161769229427419505655323692120248999391873336457865825455520672316533345574568461435754211028641243189423)*x + (5916296019336828876616319574663618628018137086191738264868846983884082832596665986110619558891287833222996741849226090062217080764*i+12216109116419530542186428060528336091518223278933974137512483799746720885734394841239906713471470852785404449505548823075514439093) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6508006253078491690847385614543089268010124065275392115683294270639619714534703235363775057939780909017552025635280783113104727651*i+18681637463682609580248233659221625686275354030536853942700455070018828715165882180242940789629503727138187301626598414828306244160)*x + (9741729593691320693206012245334940758408747147276392981554299850703690493723404062469867509580883415759837175622484759324137489593*i+11365226106152566416644002583213892121446637515493852191677849035027767074467757836503805188064055636387819277701894537812596501710) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6508006253078491690847385614543089268010124065275392115683294270639619714534703235363775057939780909017552025635280783113104727651*i+18681637463682609580248233659221625686275354030536853942700455070018828715165882180242940789629503727138187301626598414828306244160)*x + (9741729593691320693206012245334940758408747147276392981554299850703690493723404062469867509580883415759837175622484759324137489593*i+11365226106152566416644002583213892121446637515493852191677849035027767074467757836503805188064055636387819277701894537812596501710) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12734107338465973492475161609239181194596729675696405783444283083043443721104643664668861799259590459569717534001376133767078673229*i+13335609979257340161867014390245096982381634862712858288643870890393719402833010621198889970285957237156107621240015770298326917700)*x + (18713758534857351825853639140206207362776581161253496271914003992527088024825117868553772049353971607234501203976087429862007721994*i+6983634847291534013256214683693838821428331584606634992590413568941567009581473016194384550548666007788311815234306871032948866027) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12734107338465973492475161609239181194596729675696405783444283083043443721104643664668861799259590459569717534001376133767078673229*i+13335609979257340161867014390245096982381634862712858288643870890393719402833010621198889970285957237156107621240015770298326917700)*x + (18713758534857351825853639140206207362776581161253496271914003992527088024825117868553772049353971607234501203976087429862007721994*i+6983634847291534013256214683693838821428331584606634992590413568941567009581473016194384550548666007788311815234306871032948866027) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6440745252561049510006950981581830491419567071378494845034769741528087337450741953694099770998348202337104956129687391878807805357*i+3615263322545752669526113590009644085638954325389308504882866230007554633073262962146226976709972936459490624642372678687441082497)*x + (15897709075808976020602886477044634867910473774029898902469019215910744058303891769833990255973328513261759358087467377997909961752*i+5627730123058745121665453291231910446499166339773999814484389906319224959473357212027528470472076756531973714232362121269348061053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6440745252561049510006950981581830491419567071378494845034769741528087337450741953694099770998348202337104956129687391878807805357*i+3615263322545752669526113590009644085638954325389308504882866230007554633073262962146226976709972936459490624642372678687441082497)*x + (15897709075808976020602886477044634867910473774029898902469019215910744058303891769833990255973328513261759358087467377997909961752*i+5627730123058745121665453291231910446499166339773999814484389906319224959473357212027528470472076756531973714232362121269348061053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10702081588072782890600102443705994278748695423459535513026942786597697320869170406019556565418151381967446833656364876183344224320*i+18910466777785842516653201449666323412243262784634098079744667977911676303275167936959917574203101053463018180866998018852654978731)*x + (17364177779867662763524465163958924917399872235006849231434898893643257027581802348973217083823541659911393639344489573805064544233*i+10226438932420670179373832742788465245419616527106345107841748120877914445634002353878330833445604646788420461466699947533469070302) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10702081588072782890600102443705994278748695423459535513026942786597697320869170406019556565418151381967446833656364876183344224320*i+18910466777785842516653201449666323412243262784634098079744667977911676303275167936959917574203101053463018180866998018852654978731)*x + (17364177779867662763524465163958924917399872235006849231434898893643257027581802348973217083823541659911393639344489573805064544233*i+10226438932420670179373832742788465245419616527106345107841748120877914445634002353878330833445604646788420461466699947533469070302) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18212366886211656324249263056393332214262536375959839640366441687321496671843231639993331855022475521546493173491457934444781814318*i+22116945292502925748231122401961041525870234972941466516963075583711453414018596903634715812631231339833450255745473300895175991653)*x + (5008200607347936121211103883811825301940389689634170727141105799453269746415092599155517749957704688309436579614169266109433684810*i+12600265680571152937636784199690263821321103331024548734203707503782251453870712688681468833946089057852739646392393985477249791423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18212366886211656324249263056393332214262536375959839640366441687321496671843231639993331855022475521546493173491457934444781814318*i+22116945292502925748231122401961041525870234972941466516963075583711453414018596903634715812631231339833450255745473300895175991653)*x + (5008200607347936121211103883811825301940389689634170727141105799453269746415092599155517749957704688309436579614169266109433684810*i+12600265680571152937636784199690263821321103331024548734203707503782251453870712688681468833946089057852739646392393985477249791423) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2078521687729318870207485818515818852889878865986639677885220644115980867692014184222157304710886714359242534738712412081968261286*i+20442893124777044790580656484318234442905337808955876534050075697517442224957040101769330092649983019783724119108063297396175895856)*x + (19703170500071944547672027046691832585437674818594359918020907020697280953001268655062140884339150486970040854259540248604000682474*i+4464635529175100238905438552748237879970113676090214303877328308115069167208172034681559618804758360779768472752263502581716043679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2078521687729318870207485818515818852889878865986639677885220644115980867692014184222157304710886714359242534738712412081968261286*i+20442893124777044790580656484318234442905337808955876534050075697517442224957040101769330092649983019783724119108063297396175895856)*x + (19703170500071944547672027046691832585437674818594359918020907020697280953001268655062140884339150486970040854259540248604000682474*i+4464635529175100238905438552748237879970113676090214303877328308115069167208172034681559618804758360779768472752263502581716043679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2679047725888476823589936690907576645764957546562864190467352093622957737878957292287863053891728814537766211265732135433971523214*i+10185075018966032905181217437922183995266562611511947312463739092221187599412068717144744731560889026873273215010785071604303698989)*x + (21313204788439292752648746553191474700719348815741758173694978926458490444741079442070335025993977529297988452175687990344688626199*i+3117249436429591392355830771500642878229232874394535028179802998430511183969965846630525273193587678324241619718935163405654891059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2679047725888476823589936690907576645764957546562864190467352093622957737878957292287863053891728814537766211265732135433971523214*i+10185075018966032905181217437922183995266562611511947312463739092221187599412068717144744731560889026873273215010785071604303698989)*x + (21313204788439292752648746553191474700719348815741758173694978926458490444741079442070335025993977529297988452175687990344688626199*i+3117249436429591392355830771500642878229232874394535028179802998430511183969965846630525273193587678324241619718935163405654891059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11862487951151105964635217581996497761166802315412889945034443890250780986254933463788449045680416858308625013034902727451716166817*i+2083670655225397420921180084329862959673244992433092741102647944445088200153270432300352398402603532762014947329594700981032665566)*x + (21538395409734183229139741226162852406547740206535553550067653857145948104441833383221548028965482728867775494808325028011200900353*i+4757720916990568205916842100243942153210536610256930783643867990325723725134146235818118568562772788159534094554876675005078450696) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11862487951151105964635217581996497761166802315412889945034443890250780986254933463788449045680416858308625013034902727451716166817*i+2083670655225397420921180084329862959673244992433092741102647944445088200153270432300352398402603532762014947329594700981032665566)*x + (21538395409734183229139741226162852406547740206535553550067653857145948104441833383221548028965482728867775494808325028011200900353*i+4757720916990568205916842100243942153210536610256930783643867990325723725134146235818118568562772788159534094554876675005078450696) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2421657249816175649087982727126355187841832870184696128614478579887525371386321750644193405846556966090963969339668666467722218436*i+16070873851544929205429083925830338018881881691719545387082195253801370333618834316456437459730271009683731538283624280470846225503)*x + (11390602843748478541520944050954708093457463339897733898246772342105681167629976466344220071137181788557043754978946131502599074255*i+22115734381021152978144322595255544174666808998692981090826055871468701363398951789880659399486104089040401663045985375174111817174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2421657249816175649087982727126355187841832870184696128614478579887525371386321750644193405846556966090963969339668666467722218436*i+16070873851544929205429083925830338018881881691719545387082195253801370333618834316456437459730271009683731538283624280470846225503)*x + (11390602843748478541520944050954708093457463339897733898246772342105681167629976466344220071137181788557043754978946131502599074255*i+22115734381021152978144322595255544174666808998692981090826055871468701363398951789880659399486104089040401663045985375174111817174) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13276475417344885816587479670653132827981469277505205729714598758274830586680119396314338895242040331064851005947685181646541470345*i+19018248018782752345568773147374631065122079139813896211553586963065663491499401529436054640765935004112441792830919412360582448129)*x + (9890390142160863847062030002414832940692265939986819262743779466680149798259513249763027347623246561324214422242429383836093050936*i+2341504767417418486859683827511489122663099858497697069547106986888945894330464221137268084149717537851527986145430175893540438738) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13276475417344885816587479670653132827981469277505205729714598758274830586680119396314338895242040331064851005947685181646541470345*i+19018248018782752345568773147374631065122079139813896211553586963065663491499401529436054640765935004112441792830919412360582448129)*x + (9890390142160863847062030002414832940692265939986819262743779466680149798259513249763027347623246561324214422242429383836093050936*i+2341504767417418486859683827511489122663099858497697069547106986888945894330464221137268084149717537851527986145430175893540438738) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1771192037900250248727186469622113469059583943888409530944251797305854740404778824776132116254891405752614165197196419679597784916*i+2735343148867108903943676794759851804925831980509425375046140147038604994079605328852637712820698627494940320976720997798658923263)*x + (2883740504487770294776884262425395198855429005633683276087168976464893547304438485854568295806324163539514145857623520413319642622*i+23063900697899932062019095372254220292078534490696091917857276332599166529777114684749516715398090710349486403119794229692507010063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1771192037900250248727186469622113469059583943888409530944251797305854740404778824776132116254891405752614165197196419679597784916*i+2735343148867108903943676794759851804925831980509425375046140147038604994079605328852637712820698627494940320976720997798658923263)*x + (2883740504487770294776884262425395198855429005633683276087168976464893547304438485854568295806324163539514145857623520413319642622*i+23063900697899932062019095372254220292078534490696091917857276332599166529777114684749516715398090710349486403119794229692507010063) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3343030793065274827785450396313007773257183993719226209231287715456315236790316412307068664838453273604659083975982654559154893897*i+22963419592983557312295553420205062140970080486852451389239314313665710177522450147664531491304412731961571923065744765049885579196)*x + (6909461465555249969377500686603464035879464726310499243350970877464351483965387545778875403100791204934416249127794942084265811169*i+6526548132790984295005987120086381919696604419309469993129130838566455546686446468923371154758506915606168753621344311130512723893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3343030793065274827785450396313007773257183993719226209231287715456315236790316412307068664838453273604659083975982654559154893897*i+22963419592983557312295553420205062140970080486852451389239314313665710177522450147664531491304412731961571923065744765049885579196)*x + (6909461465555249969377500686603464035879464726310499243350970877464351483965387545778875403100791204934416249127794942084265811169*i+6526548132790984295005987120086381919696604419309469993129130838566455546686446468923371154758506915606168753621344311130512723893) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12140389979623083311398901395118955908725479479313735358604048642553859304977079449700308865462778043679540245335546824743096706501*i+8452062408442673299802320028685996394008520186158635945160390220209203240376066102811763454329440094999969429503914530225389119981)*x + (24066220994006100387137770059700246428800583307614658641293567442578918202901732752432254369649329035519398926309980889312743494575*i+528743493008909311951248486222554102067383601530735178136411056805012126746691158979278402145459744378537438276091866614550648251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12140389979623083311398901395118955908725479479313735358604048642553859304977079449700308865462778043679540245335546824743096706501*i+8452062408442673299802320028685996394008520186158635945160390220209203240376066102811763454329440094999969429503914530225389119981)*x + (24066220994006100387137770059700246428800583307614658641293567442578918202901732752432254369649329035519398926309980889312743494575*i+528743493008909311951248486222554102067383601530735178136411056805012126746691158979278402145459744378537438276091866614550648251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3139310978562517112049371350180030716020194305927541625833225138032083250939264152974166096700762302083194899839219299183572511526*i+2830057744143079674942650954619199737104516533741442051875877829318040832099686433342082094018021405960410108722642708020593107113)*x + (8928074495628362254350263399406943366091201776060897225764390499495347736129858001782646785647392603013108433867933702515214766826*i+13388796618831884634576230943332748887254893997979561655985109751804220354840065274137158144161027940951696276097134136778288248384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3139310978562517112049371350180030716020194305927541625833225138032083250939264152974166096700762302083194899839219299183572511526*i+2830057744143079674942650954619199737104516533741442051875877829318040832099686433342082094018021405960410108722642708020593107113)*x + (8928074495628362254350263399406943366091201776060897225764390499495347736129858001782646785647392603013108433867933702515214766826*i+13388796618831884634576230943332748887254893997979561655985109751804220354840065274137158144161027940951696276097134136778288248384) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5845332568733912629939451694207431342157152186414635520165095687135299789696083634064013944106597153241553621842323107719308049979*i+8493033466694775534948862615387777691704266558788544337845141321495211648475941034978249511569239382624349958845105893444737899710)*x + (20218407013460296069972101623406293699520471878607849457686961426444065502360013186473750393617046229486615027910563086659126780852*i+19459129147586977529934540622164527131303677508540118463817089996374702541101343415167464361655496215140827107383552817850341872104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5845332568733912629939451694207431342157152186414635520165095687135299789696083634064013944106597153241553621842323107719308049979*i+8493033466694775534948862615387777691704266558788544337845141321495211648475941034978249511569239382624349958845105893444737899710)*x + (20218407013460296069972101623406293699520471878607849457686961426444065502360013186473750393617046229486615027910563086659126780852*i+19459129147586977529934540622164527131303677508540118463817089996374702541101343415167464361655496215140827107383552817850341872104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16634942099310647141295557575500331914899912705094473240454595198038554933123927532536020513461744496241117443140853763822239645986*i+8059412697938666109011484137103937177158969459581386215926471253435956203984445066150396930150288133874184020564942981797044706394)*x + (15656542776744712732298023488692508648481007562353454426689731423427374171411957689594708755694371824646980937628888710012968402724*i+23521160794394122772823640420674176527743291544036201473279103638698559727377649598822290245822609892075990695718848518502171830153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16634942099310647141295557575500331914899912705094473240454595198038554933123927532536020513461744496241117443140853763822239645986*i+8059412697938666109011484137103937177158969459581386215926471253435956203984445066150396930150288133874184020564942981797044706394)*x + (15656542776744712732298023488692508648481007562353454426689731423427374171411957689594708755694371824646980937628888710012968402724*i+23521160794394122772823640420674176527743291544036201473279103638698559727377649598822290245822609892075990695718848518502171830153) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12664817587027138828416616624277678595352045414034457212639705963864361088235269308611268629329806982490156383240765093197620261196*i+24288842480078220409886637162476761594018859215114568254605063954556037079162063713202092386101253347562357031154140326967250143090)*x + (17356824674885121677470540472023654393495624157405757089240173197671137449692700259811183941842116317212486551082390523581397978167*i+5256902367400776847293362584655982257918019201160348674934959807405909542772597993571111971055642600183795639366355392544718635862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12664817587027138828416616624277678595352045414034457212639705963864361088235269308611268629329806982490156383240765093197620261196*i+24288842480078220409886637162476761594018859215114568254605063954556037079162063713202092386101253347562357031154140326967250143090)*x + (17356824674885121677470540472023654393495624157405757089240173197671137449692700259811183941842116317212486551082390523581397978167*i+5256902367400776847293362584655982257918019201160348674934959807405909542772597993571111971055642600183795639366355392544718635862) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10177431221906357028560428225519543170911625033597700772307186314212519886755658265251064424059585577192961191136255532900057804746*i+17746697314569726214357496132281979487481667410453517345702940698494752239163527807439706330671617901686700875045366387362263702447)*x + (15372568235985386925319738741568279412948928433942908006548857842139820785578468335118488473983606572597815967986729710380309740561*i+6246741887647424137086949998206850709544943137322992073480509804654279378309258441490234147051335654090065536910846655445092714814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10177431221906357028560428225519543170911625033597700772307186314212519886755658265251064424059585577192961191136255532900057804746*i+17746697314569726214357496132281979487481667410453517345702940698494752239163527807439706330671617901686700875045366387362263702447)*x + (15372568235985386925319738741568279412948928433942908006548857842139820785578468335118488473983606572597815967986729710380309740561*i+6246741887647424137086949998206850709544943137322992073480509804654279378309258441490234147051335654090065536910846655445092714814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3584315591328157291488566724494391187456006802428728153329722610590590727553330114618386714609813314230305439423518990856995325827*i+10453324687679983255540276645496258069136565594144869841795072804450669003933396990482600059458279861449998719390879791668065881816)*x + (10348086066150462730039930612217494040169278902939761385299091277527460055065947145895023966006361631670376312679424813355067356321*i+16438653014380058695625805421479179741863234938121536515536760416766706048051679068814169898774169489246073775353910976123037671814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3584315591328157291488566724494391187456006802428728153329722610590590727553330114618386714609813314230305439423518990856995325827*i+10453324687679983255540276645496258069136565594144869841795072804450669003933396990482600059458279861449998719390879791668065881816)*x + (10348086066150462730039930612217494040169278902939761385299091277527460055065947145895023966006361631670376312679424813355067356321*i+16438653014380058695625805421479179741863234938121536515536760416766706048051679068814169898774169489246073775353910976123037671814) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18562249188694366970763313864845832801800216258080227905009103429606704755848605965293850115164148687883683028243280182203962282506*i+5795245021370500794310525661925134393404178663438490495432462995836801802501977990960322159724931170047886112494276413772355453057)*x + (6809179476918056410120522635051084062225882071099141178394972435870636196676330936619653409971151787501241302686447440690672493637*i+12064089155462377987018818619838514078417343671740939206620986460709111095645472448640813730132832544018853790292642776885238445938) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18562249188694366970763313864845832801800216258080227905009103429606704755848605965293850115164148687883683028243280182203962282506*i+5795245021370500794310525661925134393404178663438490495432462995836801802501977990960322159724931170047886112494276413772355453057)*x + (6809179476918056410120522635051084062225882071099141178394972435870636196676330936619653409971151787501241302686447440690672493637*i+12064089155462377987018818619838514078417343671740939206620986460709111095645472448640813730132832544018853790292642776885238445938) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15699545655437702034251541756491213187525327324145973528546412424579147014897546180971802260143978472931877400027119639754943952437*i+22902359249961887412519691535249108723858352174459922254060426974693667104637107366504991921033625888728888883350035779101819347419)*x + (527806822544566366571017398100093720296998075776128805186560655727005396504611988531936753273617939663254224405027107071988972567*i+6722427032546048571156223671095154769671243278444388497347111592329718861479018126168040574452753952174664425306930003564254788642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15699545655437702034251541756491213187525327324145973528546412424579147014897546180971802260143978472931877400027119639754943952437*i+22902359249961887412519691535249108723858352174459922254060426974693667104637107366504991921033625888728888883350035779101819347419)*x + (527806822544566366571017398100093720296998075776128805186560655727005396504611988531936753273617939663254224405027107071988972567*i+6722427032546048571156223671095154769671243278444388497347111592329718861479018126168040574452753952174664425306930003564254788642) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5116136082170497287932325085198320626116414176749742574409096755145681696335640144644489557305470150544791836917316155527511775682*i+14244395885288950499277454896622474867362759540071132315500510084845936401403915303745323721811452088133480532080097879150221931859)*x + (9108249880520070747086819321887229856778956910427988453410840800033071712699259857644653704989962508070510077576865762472435384174*i+15841355490367426536492191960317394950566139984092575976275016233978257240228226192564966886884979156916672122741237351997474416133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5116136082170497287932325085198320626116414176749742574409096755145681696335640144644489557305470150544791836917316155527511775682*i+14244395885288950499277454896622474867362759540071132315500510084845936401403915303745323721811452088133480532080097879150221931859)*x + (9108249880520070747086819321887229856778956910427988453410840800033071712699259857644653704989962508070510077576865762472435384174*i+15841355490367426536492191960317394950566139984092575976275016233978257240228226192564966886884979156916672122741237351997474416133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6774867828734472288637457376580174513608751228560597932215703139529245855342080042464844805132425092481459908000133964674866796338*i+20641936638400480353804521695265107231894297066476803238892617933266110803904721757042399291441435138183922727076173111677367416323)*x + (17188540867019686568653932088775160927118458140546414358242386919349884898596727763004581577385688912157435523326440433320965166112*i+12801824671952879781616597719942572018604248067893520235428549798945346026128420217958584345865670155185196976524350070691821399767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6774867828734472288637457376580174513608751228560597932215703139529245855342080042464844805132425092481459908000133964674866796338*i+20641936638400480353804521695265107231894297066476803238892617933266110803904721757042399291441435138183922727076173111677367416323)*x + (17188540867019686568653932088775160927118458140546414358242386919349884898596727763004581577385688912157435523326440433320965166112*i+12801824671952879781616597719942572018604248067893520235428549798945346026128420217958584345865670155185196976524350070691821399767) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15881371242882394661495017655346127469872855498868891566543711808908240015694088130503363461668022340174472896453693380400617607823*i+7019389499657305559045876844856485287715078494523738431881432868227254051545917110950678933532329348844469219225599476996748478595)*x + (10355352338205638623134103393880967063915434859520187157959512918383482152327302339919905452229398714613901124037126034814111161006*i+11754960715211897028837875598288993696353524288128640352470934061748441135955017424642954863491323156416796234379864017932656436679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15881371242882394661495017655346127469872855498868891566543711808908240015694088130503363461668022340174472896453693380400617607823*i+7019389499657305559045876844856485287715078494523738431881432868227254051545917110950678933532329348844469219225599476996748478595)*x + (10355352338205638623134103393880967063915434859520187157959512918383482152327302339919905452229398714613901124037126034814111161006*i+11754960715211897028837875598288993696353524288128640352470934061748441135955017424642954863491323156416796234379864017932656436679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3918356073057246375474278208809273832382815226913406933173550701046188299751587807523967993603038386125441246454628195429451213675*i+23583264250465050277344083168398362903869375563819993046528021031073839937102666633074748496056460066548099245617932150534033251671)*x + (8601217284909579102919487837500911554438331797515987299391076254236884898807880533735078233972722482627578865500645643974008779707*i+20201565203595625932840582712768682997425986768938047822342756632618273638911610809815398394058691025419416614660899512225148424776) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3918356073057246375474278208809273832382815226913406933173550701046188299751587807523967993603038386125441246454628195429451213675*i+23583264250465050277344083168398362903869375563819993046528021031073839937102666633074748496056460066548099245617932150534033251671)*x + (8601217284909579102919487837500911554438331797515987299391076254236884898807880533735078233972722482627578865500645643974008779707*i+20201565203595625932840582712768682997425986768938047822342756632618273638911610809815398394058691025419416614660899512225148424776) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23336320490585825854878328488608210641166191382377483330544274219313432223091766991787345201556352664522871631395043362492922495228*i+9263257994490533442002911037477710294282649233720001155991298087322869797786314413327688157011505657077723167158179658100878103160)*x + (13262788819848284536333185239708158236246467319381747312615187826358787241418843422026825667457350749436960005078361368589352308992*i+1523185641356155671394512747210082139123800832870608617523753084870982746067156169807070844568652538715731615636324701352717245559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23336320490585825854878328488608210641166191382377483330544274219313432223091766991787345201556352664522871631395043362492922495228*i+9263257994490533442002911037477710294282649233720001155991298087322869797786314413327688157011505657077723167158179658100878103160)*x + (13262788819848284536333185239708158236246467319381747312615187826358787241418843422026825667457350749436960005078361368589352308992*i+1523185641356155671394512747210082139123800832870608617523753084870982746067156169807070844568652538715731615636324701352717245559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3542258279299073932826627677523946668197404791523811031218119251139923498750502256909882206902738421021801551008983825721407912679*i+3023759256740660774576276191250760735943987034324411645517039004418162241262032098544993580175948499159412508034105342563220303893)*x + (620477757620227415915006596380067674005362314887411358204100584485737296546051005817901972969734381690036916992019433594217251764*i+11637458951838657787285490205546141816399800173546220425148667493148082375321461175530541115558487062801654864173786764328373230240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3542258279299073932826627677523946668197404791523811031218119251139923498750502256909882206902738421021801551008983825721407912679*i+3023759256740660774576276191250760735943987034324411645517039004418162241262032098544993580175948499159412508034105342563220303893)*x + (620477757620227415915006596380067674005362314887411358204100584485737296546051005817901972969734381690036916992019433594217251764*i+11637458951838657787285490205546141816399800173546220425148667493148082375321461175530541115558487062801654864173786764328373230240) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22041180153209328674602978315892453020822178107175979588134754114321160231075533305039880769445760602200106962415583158485057269064*i+2463675325372760453507066025093965694448416449718957341143240500507398059802386439044834557058011537075507908284189377958138486946)*x + (6641799563025715545194624577756520138661894236192467495738313311377858283425471988655433474054827032209722997356250421874640850084*i+17829495675396163727411988143830758367877260931458393167142319403438421660651642674442794222914669739253799660024467268785184648340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22041180153209328674602978315892453020822178107175979588134754114321160231075533305039880769445760602200106962415583158485057269064*i+2463675325372760453507066025093965694448416449718957341143240500507398059802386439044834557058011537075507908284189377958138486946)*x + (6641799563025715545194624577756520138661894236192467495738313311377858283425471988655433474054827032209722997356250421874640850084*i+17829495675396163727411988143830758367877260931458393167142319403438421660651642674442794222914669739253799660024467268785184648340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9783232290869187693735327898188106440149456796556984029420966488374707636522312308649897783393976495230337379126539613938257914869*i+6397092583156422298861533358269866034615282229580289266181091561794757516398657224712110831842284177004031942192847008630860458135)*x + (4134836646099466228021320649014974479669960306905818289473250800893078486734995652839488434322858011956986289459150809132837751978*i+23139724401621629218999390757108243678732891444636812274298167462281506322164822786194245174490926227263967203737360838568314510395) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9783232290869187693735327898188106440149456796556984029420966488374707636522312308649897783393976495230337379126539613938257914869*i+6397092583156422298861533358269866034615282229580289266181091561794757516398657224712110831842284177004031942192847008630860458135)*x + (4134836646099466228021320649014974479669960306905818289473250800893078486734995652839488434322858011956986289459150809132837751978*i+23139724401621629218999390757108243678732891444636812274298167462281506322164822786194245174490926227263967203737360838568314510395) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17616616065142146819430418866347888239604229319321033249156861366746318210452042536227219390025310530232664702484712618905775504971*i+5345901171130754851865295621215345472648857454532510189004769797702850748213059856991996156188071434378667480011099191523946377416)*x + (7164350855214106992699994227014867747089575461327748905215458047640506259851797336060395469245548962372776541773624187987889609464*i+13192891801583943580295100031626576086576026828343750000256144431320276932698928386714922792890593973232974490759687550123724021961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17616616065142146819430418866347888239604229319321033249156861366746318210452042536227219390025310530232664702484712618905775504971*i+5345901171130754851865295621215345472648857454532510189004769797702850748213059856991996156188071434378667480011099191523946377416)*x + (7164350855214106992699994227014867747089575461327748905215458047640506259851797336060395469245548962372776541773624187987889609464*i+13192891801583943580295100031626576086576026828343750000256144431320276932698928386714922792890593973232974490759687550123724021961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17566847339552760881504489242911462992166556015691065287611232839385201452518771465146490336467772465098103692832596245318372826940*i+12891440968639993978914874778136635448082089147357293379174492975105608186270245519564635636542282997310174694268523140282924132485)*x + (8234483899627927805591531643599321694505056626483134939520293821282508394525862672105749620134280154667163779276093563081291261878*i+13555073598231932044861341234230666574629066404799445816272960243877207947850834179495713031720234730189329915572972319744987463524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17566847339552760881504489242911462992166556015691065287611232839385201452518771465146490336467772465098103692832596245318372826940*i+12891440968639993978914874778136635448082089147357293379174492975105608186270245519564635636542282997310174694268523140282924132485)*x + (8234483899627927805591531643599321694505056626483134939520293821282508394525862672105749620134280154667163779276093563081291261878*i+13555073598231932044861341234230666574629066404799445816272960243877207947850834179495713031720234730189329915572972319744987463524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4375963074722962421053476148829635835930501447274202608287890310644684511629685830608645720847581856439594194835576483000800764792*i+13146543573565784421003271451009224802164758827184287598661988716292673676071590085065239762873949973541656616747048856320719892758)*x + (1735331770437130025989571749325911563594294407114365178139882350343757578326794786074620353033559271359488383933513149920905100167*i+23315756117754123040913094261087411440627394311846595026239699672753289416853847179866098743597278441145324113268207009621676129866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4375963074722962421053476148829635835930501447274202608287890310644684511629685830608645720847581856439594194835576483000800764792*i+13146543573565784421003271451009224802164758827184287598661988716292673676071590085065239762873949973541656616747048856320719892758)*x + (1735331770437130025989571749325911563594294407114365178139882350343757578326794786074620353033559271359488383933513149920905100167*i+23315756117754123040913094261087411440627394311846595026239699672753289416853847179866098743597278441145324113268207009621676129866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18940731404946022981341854420791359557705909938383354050545080629616253266361016968464000559383402381828775906337477013029118972102*i+11557252961077953175691536271446524892076862639640023308301784123385417317580923760227495231459301365406710710979859480215841702678)*x + (14174730149824699450481305833108657032027697057899785086069682862662102442891777917685433574682245865107317669951690329098069489834*i+5861459566432241167737888844845477414044213879520234015148321120526374306111891446244637866976998449075676355029613835289980050061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18940731404946022981341854420791359557705909938383354050545080629616253266361016968464000559383402381828775906337477013029118972102*i+11557252961077953175691536271446524892076862639640023308301784123385417317580923760227495231459301365406710710979859480215841702678)*x + (14174730149824699450481305833108657032027697057899785086069682862662102442891777917685433574682245865107317669951690329098069489834*i+5861459566432241167737888844845477414044213879520234015148321120526374306111891446244637866976998449075676355029613835289980050061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23082397136961450767154498598931396668863015772197404263512217663141827551298574982506665672371523848539699170728795105045583951414*i+9604321937829656974265690912497266440771704089508215245823914412131460697279320139370958506260756441471620068840101941807051426549)*x + (23386454439706829284070137862303564459110783336175924714085911656021144137396019670426114349354255691557568722008356397315383069316*i+10869479060576090153100891379128553248717738632089753839259826840262765865234066255813164114733982634724730047654606021226485500114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23082397136961450767154498598931396668863015772197404263512217663141827551298574982506665672371523848539699170728795105045583951414*i+9604321937829656974265690912497266440771704089508215245823914412131460697279320139370958506260756441471620068840101941807051426549)*x + (23386454439706829284070137862303564459110783336175924714085911656021144137396019670426114349354255691557568722008356397315383069316*i+10869479060576090153100891379128553248717738632089753839259826840262765865234066255813164114733982634724730047654606021226485500114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13783089155517679437494408423740841092815417494943035310041602169395212113633746615471906104308308087096001952546310885825730597211*i+1643889106976423003453143698547691337421799178328537625386808459956862958030757727039368480113040536483100297445652681851773899056)*x + (13211845906189220741954173356413727315057722738012501855791825510916276472082063230611231308034261398558037867989065920139390784709*i+8536804685718634121383976011768213284037018378765499445539143280081698255914075660604618449370541384253045003081368824371955229136) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13783089155517679437494408423740841092815417494943035310041602169395212113633746615471906104308308087096001952546310885825730597211*i+1643889106976423003453143698547691337421799178328537625386808459956862958030757727039368480113040536483100297445652681851773899056)*x + (13211845906189220741954173356413727315057722738012501855791825510916276472082063230611231308034261398558037867989065920139390784709*i+8536804685718634121383976011768213284037018378765499445539143280081698255914075660604618449370541384253045003081368824371955229136) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8086029062150214005681334897086940361960047440279471020981069416394532494132180765185154648946021286803928078248890196400918308715*i+16358038998294154350665334624013168090809081472164458406788965970962116788495628339196899257057591167421478460039937603833058166101)*x + (15525532287300346358224965303496767640138984986801373510948533996788616273594660469661957826116927962713921527533281048953875579384*i+8198781094969919776868405922724738559163847006142872336720775127502388098885633115472604238902646681072102859041838752560680152643) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8086029062150214005681334897086940361960047440279471020981069416394532494132180765185154648946021286803928078248890196400918308715*i+16358038998294154350665334624013168090809081472164458406788965970962116788495628339196899257057591167421478460039937603833058166101)*x + (15525532287300346358224965303496767640138984986801373510948533996788616273594660469661957826116927962713921527533281048953875579384*i+8198781094969919776868405922724738559163847006142872336720775127502388098885633115472604238902646681072102859041838752560680152643) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7265047881750622794235101781574954797696358622878811936088251907875532951311725125062604812584148902553320375270380557732401108236*i+6749319639316520076245983949037579712842943970783487669629035217911740828701677954471853640664513405199752851711115446369519622733)*x + (13466193783475168492350443486283969801365329333615406559598076111689220002230796418133179767641526981748754863829144579658881885786*i+20441911733453917459356870979288004175627323290834197685380644264431261827543108717518192917759968371719544267227837450386715123274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7265047881750622794235101781574954797696358622878811936088251907875532951311725125062604812584148902553320375270380557732401108236*i+6749319639316520076245983949037579712842943970783487669629035217911740828701677954471853640664513405199752851711115446369519622733)*x + (13466193783475168492350443486283969801365329333615406559598076111689220002230796418133179767641526981748754863829144579658881885786*i+20441911733453917459356870979288004175627323290834197685380644264431261827543108717518192917759968371719544267227837450386715123274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2082407364239046384564076071119143786456457330497528820902297446550173188390307864819202640986128712174297385285560847465320137570*i+6550169861752367133971153699358190304469109437841500175733227119309696595747375351051121765312985246835841410138729925113225530812)*x + (5360004057870028563053429667955681295878927017020081689504832538128008350874857285000866391657413477395436090398044048257674301048*i+14909689869915083734934202732714160957622764504637293808344101771273839354577886517469312039800832114958970761322178141548224567810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2082407364239046384564076071119143786456457330497528820902297446550173188390307864819202640986128712174297385285560847465320137570*i+6550169861752367133971153699358190304469109437841500175733227119309696595747375351051121765312985246835841410138729925113225530812)*x + (5360004057870028563053429667955681295878927017020081689504832538128008350874857285000866391657413477395436090398044048257674301048*i+14909689869915083734934202732714160957622764504637293808344101771273839354577886517469312039800832114958970761322178141548224567810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5784300877708177531938066609486600936624595254525816889658236915611661066917588202903304248540241909827434674087087582817691241520*i+24143381916713325542692056519031162407497804644478733677862553825540717456937441021573083990861459096370115173850204085723563840901)*x + (20544897795003953073986815063929814266444957861494418229171051808730849486260204299063890962553510617794357068537878955559131889512*i+17236212282929792158020559563858461785929910662459105025046870940883974852901235911846831456553016507305078713149745003004221894133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5784300877708177531938066609486600936624595254525816889658236915611661066917588202903304248540241909827434674087087582817691241520*i+24143381916713325542692056519031162407497804644478733677862553825540717456937441021573083990861459096370115173850204085723563840901)*x + (20544897795003953073986815063929814266444957861494418229171051808730849486260204299063890962553510617794357068537878955559131889512*i+17236212282929792158020559563858461785929910662459105025046870940883974852901235911846831456553016507305078713149745003004221894133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4677548747635569699737854790049616259150414963459553162717554893160544179024320080635696470426429640828148147676228702617433809828*i+14880429428170597504314038278225138496535209303559683963595018904526004018897227807808019118455593452418733821083429334979485867236)*x + (181434180187040220929935274421810486690059070197080953285776358143677567937526732126113247298651623104091354201753803252229748660*i+20637867550649918867849327874373904700666939329843702747138423035885771152301526255971110206344823328527277417762109762395296515601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4677548747635569699737854790049616259150414963459553162717554893160544179024320080635696470426429640828148147676228702617433809828*i+14880429428170597504314038278225138496535209303559683963595018904526004018897227807808019118455593452418733821083429334979485867236)*x + (181434180187040220929935274421810486690059070197080953285776358143677567937526732126113247298651623104091354201753803252229748660*i+20637867550649918867849327874373904700666939329843702747138423035885771152301526255971110206344823328527277417762109762395296515601) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24354662990111587153469268584234670489066107530625065112963458747605687972916257919345279663361117692292418598159723641993168104144*i+6775232797625501977296332259035818579503625168763542271066081607781487227648002426874053271560190493530741521852308983415056563279)*x + (9313715768983730599750591450464715154547244813109632108466335109182223576861031666489729362993696731891864330578528570548718911824*i+20041057619032422185413003067303317782718918200529039511582255012974349112797070356444953885165976045683416773775479337327987385154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24354662990111587153469268584234670489066107530625065112963458747605687972916257919345279663361117692292418598159723641993168104144*i+6775232797625501977296332259035818579503625168763542271066081607781487227648002426874053271560190493530741521852308983415056563279)*x + (9313715768983730599750591450464715154547244813109632108466335109182223576861031666489729362993696731891864330578528570548718911824*i+20041057619032422185413003067303317782718918200529039511582255012974349112797070356444953885165976045683416773775479337327987385154) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (221508310569403998337346920785056712338594356903209887793348778701653113436397274895083050075437453404885556465175637284678687319*i+19673101420072015095879752549824414551478960596951603420590335874240344051067715563086873760893390430966279561070305511373335943660)*x + (2405435087476555579877433365207933081270806670912773263114000103741478977533690943100782363863453007362748631341512722796500527421*i+4131595457906420506709204269129857954031643995048177872550973152225120202871555993688824298145760199589675699587378534781320729399) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (221508310569403998337346920785056712338594356903209887793348778701653113436397274895083050075437453404885556465175637284678687319*i+19673101420072015095879752549824414551478960596951603420590335874240344051067715563086873760893390430966279561070305511373335943660)*x + (2405435087476555579877433365207933081270806670912773263114000103741478977533690943100782363863453007362748631341512722796500527421*i+4131595457906420506709204269129857954031643995048177872550973152225120202871555993688824298145760199589675699587378534781320729399) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9372120932648497607631311418347646893861805165527068390276513171690512229721952417789190366952596029494972769149334026358920717220*i+17670131720095376445470805504630720873281119331459854616259382942931710571498981855536991263516058947927521222843042826665098419066)*x + (9554225584193940159311490517156952243790022328079528887156561026030709204334359346321238925143065556061504057358469335821617476728*i+5923566893454189068649389022409416461817850865809987238938812241193765364772141808996039802788162981369676301002965201223813517238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9372120932648497607631311418347646893861805165527068390276513171690512229721952417789190366952596029494972769149334026358920717220*i+17670131720095376445470805504630720873281119331459854616259382942931710571498981855536991263516058947927521222843042826665098419066)*x + (9554225584193940159311490517156952243790022328079528887156561026030709204334359346321238925143065556061504057358469335821617476728*i+5923566893454189068649389022409416461817850865809987238938812241193765364772141808996039802788162981369676301002965201223813517238) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17075503831193359962076567297880053457480951193188546801362687201766429606825989064053995705538111937520317029544086241279605270210*i+23787946858671042969887486499060304060603056194116058270329081613396906643151383041369869412847413853425461691506767723400365830652)*x + (16735068639902158220139569667843314810455277127018274168960663751662080493378706864775144204544106004430672958316501560230691121186*i+17303885373726454412273304236072601654779721174395086742399137453238435715674560027328192480396987877487575302683173689295300225301) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17075503831193359962076567297880053457480951193188546801362687201766429606825989064053995705538111937520317029544086241279605270210*i+23787946858671042969887486499060304060603056194116058270329081613396906643151383041369869412847413853425461691506767723400365830652)*x + (16735068639902158220139569667843314810455277127018274168960663751662080493378706864775144204544106004430672958316501560230691121186*i+17303885373726454412273304236072601654779721174395086742399137453238435715674560027328192480396987877487575302683173689295300225301) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3220347646980551266040006320769051794460183502592227213248511751570518647329975784528375274199742316702166467893655277293512501598*i+9823397414285668778368384401496166303823545947113122681143515997203873278683910586913126054916184322077046858866636761412300557915)*x + (12367559172015483702839514585446052271688415667993148122349455555719359480067308375952985236079507531702230983897597643125699015814*i+12911811277227082430839378287843665136226350789159830593307288470943015990725578209850045635315712159708540029188622066980570929271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3220347646980551266040006320769051794460183502592227213248511751570518647329975784528375274199742316702166467893655277293512501598*i+9823397414285668778368384401496166303823545947113122681143515997203873278683910586913126054916184322077046858866636761412300557915)*x + (12367559172015483702839514585446052271688415667993148122349455555719359480067308375952985236079507531702230983897597643125699015814*i+12911811277227082430839378287843665136226350789159830593307288470943015990725578209850045635315712159708540029188622066980570929271) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6824139581853863222547485906144584967268065832329681338261603314011422763140633082364042528258527585028319866047259030542167287861*i+15231349119944357528871794524895996307869766544335364109711398671002314087976858372988606817165715534313637699409789822696293566136)*x + (38615009728410778530954788611174835910208004539173841069446462624067011494569261824112946574722355653656117409199101254063280285*i+7514113282543143341824170230858015704904393904508533094070362566957115266632561591630789371605413307461224951650294691521712091428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6824139581853863222547485906144584967268065832329681338261603314011422763140633082364042528258527585028319866047259030542167287861*i+15231349119944357528871794524895996307869766544335364109711398671002314087976858372988606817165715534313637699409789822696293566136)*x + (38615009728410778530954788611174835910208004539173841069446462624067011494569261824112946574722355653656117409199101254063280285*i+7514113282543143341824170230858015704904393904508533094070362566957115266632561591630789371605413307461224951650294691521712091428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16246771481170626135034738967125738099034538154832468259102028284753518527823657741759694179169679297982099678280230061229728127870*i+9696318095410351817935896875712536695560600259090427132801377452208211927990827999613506555426992101844643194443915477036931028137)*x + (11347571256414957100009429145466112588577520505936904367961462496815392591330471420658004580164154152906472979524983341605340177823*i+15296032250507512198357965305674089513910319407904114972909782138638450946900336487570885256796655962685385623872700661942387480706) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16246771481170626135034738967125738099034538154832468259102028284753518527823657741759694179169679297982099678280230061229728127870*i+9696318095410351817935896875712536695560600259090427132801377452208211927990827999613506555426992101844643194443915477036931028137)*x + (11347571256414957100009429145466112588577520505936904367961462496815392591330471420658004580164154152906472979524983341605340177823*i+15296032250507512198357965305674089513910319407904114972909782138638450946900336487570885256796655962685385623872700661942387480706) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8102725511421945318960415908069082761858826803824623247076487562915331878801043426860128504098710595909682209212928713896305245660*i+8019225338398089613776244754518330321753677612928290423665624754813874939534036627314850450576030908226535427733688339334754231476)*x + (10781409374011585622325713111710809628787063640022170951215583250089028184798737213697608001700744253956985647875620821204406639158*i+9951128726959342165804444989524774319153270723231653266668928035634633144996304194499683494153534402343961066261507373606342997579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8102725511421945318960415908069082761858826803824623247076487562915331878801043426860128504098710595909682209212928713896305245660*i+8019225338398089613776244754518330321753677612928290423665624754813874939534036627314850450576030908226535427733688339334754231476)*x + (10781409374011585622325713111710809628787063640022170951215583250089028184798737213697608001700744253956985647875620821204406639158*i+9951128726959342165804444989524774319153270723231653266668928035634633144996304194499683494153534402343961066261507373606342997579) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13466590745029477561117123113507410637100599510312848539463386585493633650093733643193570978163172869897260678531684106122967056276*i+20052127159049031733951954349161182762841013246204482710927024382906463864666309218702997642059177154109137487772316862651471717819)*x + (23880432780366122350133912513227938519171465869991248099205709065812365560373763325807986491367095183134281282163656898689402100240*i+17443018790261777880265015211367764318359655000262010156138351002343204939109737445887270238184478935378158594407573573041944420718) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13466590745029477561117123113507410637100599510312848539463386585493633650093733643193570978163172869897260678531684106122967056276*i+20052127159049031733951954349161182762841013246204482710927024382906463864666309218702997642059177154109137487772316862651471717819)*x + (23880432780366122350133912513227938519171465869991248099205709065812365560373763325807986491367095183134281282163656898689402100240*i+17443018790261777880265015211367764318359655000262010156138351002343204939109737445887270238184478935378158594407573573041944420718) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3721440659026468511100077033912961760662167443005056639900115740540492948167532008378519258251702983775908909664029372017970991611*i+21189129017965347486794507458449528030720432290190467382091802942470161445206413148762954201124576568043457263693912092965924972354)*x + (1396342170098186692253127178192446473136314754632190847919932461942105754940011561429545232216718345256344497328361688207010368552*i+24218161317240319647979880273134485430123892995848472336955950790679250280624101346079887759842206371458803573476010729068999882236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3721440659026468511100077033912961760662167443005056639900115740540492948167532008378519258251702983775908909664029372017970991611*i+21189129017965347486794507458449528030720432290190467382091802942470161445206413148762954201124576568043457263693912092965924972354)*x + (1396342170098186692253127178192446473136314754632190847919932461942105754940011561429545232216718345256344497328361688207010368552*i+24218161317240319647979880273134485430123892995848472336955950790679250280624101346079887759842206371458803573476010729068999882236) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1637219016746849534645708879377734053115700025793766975280516972666060236638288552939337820675471052607813737683184792364622267044*i+4652462708432363764218726103674967656336538559421607878573785280173934966980460208203295280564009699770313773855717649236227898917)*x + (16028173182323524171498917771086494273140678828710037696584988579999755651707853674113121735426308057868503887039624411787863206045*i+10309952095708050631711496965385116206768735483672285848581260235677628233996764065133942203425040243847742338944347651859956578658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1637219016746849534645708879377734053115700025793766975280516972666060236638288552939337820675471052607813737683184792364622267044*i+4652462708432363764218726103674967656336538559421607878573785280173934966980460208203295280564009699770313773855717649236227898917)*x + (16028173182323524171498917771086494273140678828710037696584988579999755651707853674113121735426308057868503887039624411787863206045*i+10309952095708050631711496965385116206768735483672285848581260235677628233996764065133942203425040243847742338944347651859956578658) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5722668920484423198638516760923726900351841994059467538159022869333978933373280761418869124896098578813153806373439786548579622419*i+20868386589592786149444055461797752772348594679496730505291244509019690678052813153423863192624655922134189521212746996024733895829)*x + (2443304836854807483754494197599514179721530782991718522697949835494998625689361035295703228333575962979540370052345017041897932058*i+21831966171250653663375745065400513811146817666133695108210565094250629931596047813957617975498321496001044912562919832802480420131) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5722668920484423198638516760923726900351841994059467538159022869333978933373280761418869124896098578813153806373439786548579622419*i+20868386589592786149444055461797752772348594679496730505291244509019690678052813153423863192624655922134189521212746996024733895829)*x + (2443304836854807483754494197599514179721530782991718522697949835494998625689361035295703228333575962979540370052345017041897932058*i+21831966171250653663375745065400513811146817666133695108210565094250629931596047813957617975498321496001044912562919832802480420131) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6828086563117659068960100065611992481528817539600255791505068213998267480027862973559511955779124144436307557082226758514979660498*i+14868003848799370500833901656111171510117745151582673260596661009964094673868800625721532774292047970519798695589438777216520901563)*x + (11173360590526593889746513673401552054475135104961961339214037149748711653409352104595277338188626052821849805667489046941420623747*i+21497649620079583005654437081999489242855682657020895451971009123240947376751239837321763794040003297988044546492192048944360688056) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6828086563117659068960100065611992481528817539600255791505068213998267480027862973559511955779124144436307557082226758514979660498*i+14868003848799370500833901656111171510117745151582673260596661009964094673868800625721532774292047970519798695589438777216520901563)*x + (11173360590526593889746513673401552054475135104961961339214037149748711653409352104595277338188626052821849805667489046941420623747*i+21497649620079583005654437081999489242855682657020895451971009123240947376751239837321763794040003297988044546492192048944360688056) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9951628081273436650755055721408158749000371634910909346726137321931862391159171555765468580077878408541324728035727753244121586650*i+18679307588220028783651144934276146319933884877001894686551805853999513751697118277631033276914319268710573760000614161241387598721)*x + (23117068978688770896926523374838062210548362167293348487807489239892954352084267211989502162714626061882169915005031481196040460777*i+17272472389166312682149217928984081288912999031113999676634474004134758587885682329317214284669756252252761985376258768462601373027) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9951628081273436650755055721408158749000371634910909346726137321931862391159171555765468580077878408541324728035727753244121586650*i+18679307588220028783651144934276146319933884877001894686551805853999513751697118277631033276914319268710573760000614161241387598721)*x + (23117068978688770896926523374838062210548362167293348487807489239892954352084267211989502162714626061882169915005031481196040460777*i+17272472389166312682149217928984081288912999031113999676634474004134758587885682329317214284669756252252761985376258768462601373027) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20026254185653666427739631442918190459071512570214294641829200955176095323878212788494094338474631878313204210907339550695123921721*i+17675427055895477987967855211552544243746068345250847574043609603738984895341232805871326388016636078503939845476988527212136493187)*x + (10094859623356457137329865348347682637562952864280189428446839997695942823011889725906852077673123628612661589519826151669334991476*i+7043954349459771109989436601993051967828955522093868560477470696895438803837048762276119036189967305296964754946132835762989522482) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20026254185653666427739631442918190459071512570214294641829200955176095323878212788494094338474631878313204210907339550695123921721*i+17675427055895477987967855211552544243746068345250847574043609603738984895341232805871326388016636078503939845476988527212136493187)*x + (10094859623356457137329865348347682637562952864280189428446839997695942823011889725906852077673123628612661589519826151669334991476*i+7043954349459771109989436601993051967828955522093868560477470696895438803837048762276119036189967305296964754946132835762989522482) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3325342054835186084434444258129251538545356574895039545030619627173558266800536041787014607845059290143647279091509020458198619498*i+24151651398553976359585471051816668100389583714940651535595189378714972571331473928036239507962546367730745877739590072205352750927)*x + (9534603925857449379498563503135380985226763105423470541687546526934544377409034028689514121150059747484098409909405662482283281151*i+904684631404793660519080450933015765928172440072296324939886893802491581613026958004557967886462056550935402989917110797213395827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3325342054835186084434444258129251538545356574895039545030619627173558266800536041787014607845059290143647279091509020458198619498*i+24151651398553976359585471051816668100389583714940651535595189378714972571331473928036239507962546367730745877739590072205352750927)*x + (9534603925857449379498563503135380985226763105423470541687546526934544377409034028689514121150059747484098409909405662482283281151*i+904684631404793660519080450933015765928172440072296324939886893802491581613026958004557967886462056550935402989917110797213395827) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17285296235325067659100132063925964294958298031008171379585384797899610860038480497783034672613829448155652738971796425865267728450*i+8656379923407570956622462294896441458282377802649111458431695961718536480651367729863049117702099368203627512502068289380944624764)*x + (14079005496482163644965784283721766054512921744141551324921215880222321397953601528604026458548816891873727870924363098195595585673*i+19306171834839683706191756190620470429861854295363089030895131765001157104556630539548067636694684663296696363199511161928789580148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17285296235325067659100132063925964294958298031008171379585384797899610860038480497783034672613829448155652738971796425865267728450*i+8656379923407570956622462294896441458282377802649111458431695961718536480651367729863049117702099368203627512502068289380944624764)*x + (14079005496482163644965784283721766054512921744141551324921215880222321397953601528604026458548816891873727870924363098195595585673*i+19306171834839683706191756190620470429861854295363089030895131765001157104556630539548067636694684663296696363199511161928789580148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9870053736475821574527175849049779948640228530411476319654478950465661978006227868815534472187741794410259808718595162047897337556*i+8064265714219322230576800721740411739277796678210806190320738114185834632490806632197977207628045194107079850853621074810676462034)*x + (9181815379424235525846278156180873612812417010561235962941475397123734057966298139280255875494823407462587660965839658833027327591*i+6746573423039415320253717245268530024938457373361394504292024661775985130962318265117016879522572384560757793504707390627769316048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9870053736475821574527175849049779948640228530411476319654478950465661978006227868815534472187741794410259808718595162047897337556*i+8064265714219322230576800721740411739277796678210806190320738114185834632490806632197977207628045194107079850853621074810676462034)*x + (9181815379424235525846278156180873612812417010561235962941475397123734057966298139280255875494823407462587660965839658833027327591*i+6746573423039415320253717245268530024938457373361394504292024661775985130962318265117016879522572384560757793504707390627769316048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20498250167282088377852351477573172820757991177672499604108078794542501180931886785949410946712085236692327354617117438534262616071*i+12686864737818487129174642971787141481017411541126957803847204665838392242538385170552915739384418031152810125408080374635322414150)*x + (1511888207952032199964654956714070058361113460186154902211689280020746983267588029764544545972360739909433447739886056807865976458*i+761034041980409845739163887666704303853721662856070407465773279321537610600530194100887743558277476490383971805754259162569300656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20498250167282088377852351477573172820757991177672499604108078794542501180931886785949410946712085236692327354617117438534262616071*i+12686864737818487129174642971787141481017411541126957803847204665838392242538385170552915739384418031152810125408080374635322414150)*x + (1511888207952032199964654956714070058361113460186154902211689280020746983267588029764544545972360739909433447739886056807865976458*i+761034041980409845739163887666704303853721662856070407465773279321537610600530194100887743558277476490383971805754259162569300656) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5874436324689547478397754639323611821885715319199015753593067664114017117453982973173281285474760930774366123755769466005315593742*i+7259240483120524753944861248186726723274966515317235807507192526745922732208234773369248635757854572786185996488508965051495090017)*x + (16357286284706750068315822126876274674106105632876108823745062070102975922926887702501016967963285463255505134277802777800538776745*i+19379175843759568682188752574633860902873399871836155584711123713134994163845022748302061031535331071899984572480298697750523998358) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5874436324689547478397754639323611821885715319199015753593067664114017117453982973173281285474760930774366123755769466005315593742*i+7259240483120524753944861248186726723274966515317235807507192526745922732208234773369248635757854572786185996488508965051495090017)*x + (16357286284706750068315822126876274674106105632876108823745062070102975922926887702501016967963285463255505134277802777800538776745*i+19379175843759568682188752574633860902873399871836155584711123713134994163845022748302061031535331071899984572480298697750523998358) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9370415286419185458615586243088880106466428376110961576298034185730934704166817657725028403446382177954923578438637740364604530440*i+3367315583756583223137824109883847897609684409844050862300351537790980243246347167976176305247517449799263706700498831087176814277)*x + (24220776943577072010734262584807705558976623181258759755553051363296974010147884090980117360703434601177492362339819312896256071030*i+2776949963520826250401715211670332925665460105969823426932929211705015604157619044516942122791454110275748867786488529159312602179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9370415286419185458615586243088880106466428376110961576298034185730934704166817657725028403446382177954923578438637740364604530440*i+3367315583756583223137824109883847897609684409844050862300351537790980243246347167976176305247517449799263706700498831087176814277)*x + (24220776943577072010734262584807705558976623181258759755553051363296974010147884090980117360703434601177492362339819312896256071030*i+2776949963520826250401715211670332925665460105969823426932929211705015604157619044516942122791454110275748867786488529159312602179) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6638235245198449363371879221883847432216506276813507190362034400181486549279238106334672653950699840673384402613411975308459668095*i+21206184333005587506499235283927657225952316302680053350242154169151467895178201528643548131989930014099066292607065447372287536655)*x + (16919009227333937542084886660428004586284480877117466238730086778311677965463969357096632629537817065708768372362168186631139606566*i+11087667782290840204596311449597810557297997310872609093088366913391869302072643032311936499391770463240996019578109633817498470565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6638235245198449363371879221883847432216506276813507190362034400181486549279238106334672653950699840673384402613411975308459668095*i+21206184333005587506499235283927657225952316302680053350242154169151467895178201528643548131989930014099066292607065447372287536655)*x + (16919009227333937542084886660428004586284480877117466238730086778311677965463969357096632629537817065708768372362168186631139606566*i+11087667782290840204596311449597810557297997310872609093088366913391869302072643032311936499391770463240996019578109633817498470565) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3042155109711284628220946490452545393379208111583118085017978224931708962118720908278400712111281155776982981510533427305248968294*i+15069870133653624229722631168351938848002667070418252934541303308049870374885128901558858932815263840225858535007910054967091745133)*x + (17152832519640318740828169523912356339940318453760586643922596762347783515878944644843474022975332614327134085955423870048965238368*i+7784400972731595410846004568047388333717528590113899492428054028467861019951066533198856631816051227865783001942161668469189562289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3042155109711284628220946490452545393379208111583118085017978224931708962118720908278400712111281155776982981510533427305248968294*i+15069870133653624229722631168351938848002667070418252934541303308049870374885128901558858932815263840225858535007910054967091745133)*x + (17152832519640318740828169523912356339940318453760586643922596762347783515878944644843474022975332614327134085955423870048965238368*i+7784400972731595410846004568047388333717528590113899492428054028467861019951066533198856631816051227865783001942161668469189562289) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6650356821829769798602827595146124499377121614973533433599913211769927811397527689148662500000151037374878415635459677264573597606*i+18847199490910717971203685945992089451280182484498670169428381915335591731338777511786131022073061109769747569469052526192495129644)*x + (18224591086233732961285261410920778997420936148497711444012918447237467885356527315690749745969104527163164525531207505118951865447*i+14748176850202409316475153884021812405053409266542683596487863491982862165645689622689543970445265157625530241946013619482796952768) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6650356821829769798602827595146124499377121614973533433599913211769927811397527689148662500000151037374878415635459677264573597606*i+18847199490910717971203685945992089451280182484498670169428381915335591731338777511786131022073061109769747569469052526192495129644)*x + (18224591086233732961285261410920778997420936148497711444012918447237467885356527315690749745969104527163164525531207505118951865447*i+14748176850202409316475153884021812405053409266542683596487863491982862165645689622689543970445265157625530241946013619482796952768) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2418020907394822142456545672281653179587709592351195603927053111884304805718244327602195365710891048370413338441055190608038955950*i+2006191833728127724207080482536589208360104863971535998774317760520928498995986844031326037451595383324456474999186495740984837352)*x + (13188135801744779708652583200496156080806180700459717823040634525184157143893900143912303934040685726845448225404959072000718017922*i+20776099929853912143091694074430885739725927044249052896642624960184646907803017833113794355045558384015723986155218144278380699357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2418020907394822142456545672281653179587709592351195603927053111884304805718244327602195365710891048370413338441055190608038955950*i+2006191833728127724207080482536589208360104863971535998774317760520928498995986844031326037451595383324456474999186495740984837352)*x + (13188135801744779708652583200496156080806180700459717823040634525184157143893900143912303934040685726845448225404959072000718017922*i+20776099929853912143091694074430885739725927044249052896642624960184646907803017833113794355045558384015723986155218144278380699357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8099355671693960815829191621252939360336657860101662614017298140501874698329533763905711215029310403350629784074363055799134512190*i+7399103695176161180596934044383415586632245833115665450254636957080383547442371475176906966755460719800663818765247620297020922742)*x + (8679463538415129268933071210635484512936539698972791362422216503451236552887586277644699721499987903114677541120943359036050274976*i+2239735843351091186258396757602369095586015102471591585559464954958799430193691250052192156666098920221360965192112458314336722664) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8099355671693960815829191621252939360336657860101662614017298140501874698329533763905711215029310403350629784074363055799134512190*i+7399103695176161180596934044383415586632245833115665450254636957080383547442371475176906966755460719800663818765247620297020922742)*x + (8679463538415129268933071210635484512936539698972791362422216503451236552887586277644699721499987903114677541120943359036050274976*i+2239735843351091186258396757602369095586015102471591585559464954958799430193691250052192156666098920221360965192112458314336722664) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15905603592619225372990267618813820894815622583845992300243890479210162737767128072418320545089339098478857514580761033811845862757*i+1130961699655561753337413243131377150576033023938722465913340471772403676478891967737007539150848044651260962830971706040352197584)*x + (19949650697618679965126284167727760190199504382322430620190237036241702618999083168212997249434191303938719306337515794257472638006*i+19301248215950396128157232941721708292335317469338682286570790447952634196467929544947544911424418868783611940991531419362170876254) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15905603592619225372990267618813820894815622583845992300243890479210162737767128072418320545089339098478857514580761033811845862757*i+1130961699655561753337413243131377150576033023938722465913340471772403676478891967737007539150848044651260962830971706040352197584)*x + (19949650697618679965126284167727760190199504382322430620190237036241702618999083168212997249434191303938719306337515794257472638006*i+19301248215950396128157232941721708292335317469338682286570790447952634196467929544947544911424418868783611940991531419362170876254) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5581963371769628257122271802277101652786365685312453836282675006234601339293286765403766131058261413509717502053752535511638528419*i+18255001861146702657206027850897939517140280958470401807069577236380659633069042770171786591388938137209160618442328023869411851625)*x + (12953884170136710813492227151314814990929862547158713599631714661754181069340693573946079698459968379494438906089139903568489772795*i+20651080800760227666466530861794524182517574790119451768582123584042938843405767369999911062712918902860077835993739841563038376785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5581963371769628257122271802277101652786365685312453836282675006234601339293286765403766131058261413509717502053752535511638528419*i+18255001861146702657206027850897939517140280958470401807069577236380659633069042770171786591388938137209160618442328023869411851625)*x + (12953884170136710813492227151314814990929862547158713599631714661754181069340693573946079698459968379494438906089139903568489772795*i+20651080800760227666466530861794524182517574790119451768582123584042938843405767369999911062712918902860077835993739841563038376785) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (920304904583235104943380859473708155231450106260122889373258874736333999094276291143982752200013512418180824412047749838024851927*i+23148561530176649591722803499255506571179278036812456812462788517105727640787472012338262727610773683850415725166895040910517382304)*x + (5165499230736035133640851896254023143814696763692873174747149303621229682611304644444327801216643525238559940347406563404376030062*i+7914957501658113297716244516037586032634769482075582740085819610862432990720078326278527298907165817747073338537005587478891220053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (920304904583235104943380859473708155231450106260122889373258874736333999094276291143982752200013512418180824412047749838024851927*i+23148561530176649591722803499255506571179278036812456812462788517105727640787472012338262727610773683850415725166895040910517382304)*x + (5165499230736035133640851896254023143814696763692873174747149303621229682611304644444327801216643525238559940347406563404376030062*i+7914957501658113297716244516037586032634769482075582740085819610862432990720078326278527298907165817747073338537005587478891220053) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2041210834759593754306462615974317093673801734016607657210606001002441643529601913183823828567923565963588233030767422754783745639*i+2216327355558018227258670699342652429771122235293567002426362395764698900572422840035646130788214130118684294202570153740801736379)*x + (14849201561126729822402496330750843361120299301951138029313853010264705099949319583447098333185342391673998761855117207901900389080*i+1759307811987943094447514199954452203385423332730417070964552924032319838168293396670586701227430145433516781539824545182604552908) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2041210834759593754306462615974317093673801734016607657210606001002441643529601913183823828567923565963588233030767422754783745639*i+2216327355558018227258670699342652429771122235293567002426362395764698900572422840035646130788214130118684294202570153740801736379)*x + (14849201561126729822402496330750843361120299301951138029313853010264705099949319583447098333185342391673998761855117207901900389080*i+1759307811987943094447514199954452203385423332730417070964552924032319838168293396670586701227430145433516781539824545182604552908) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6778006402703918619571537725538832914653164270376119452711661537429059666510376685881902804170297205199187436849215490115975955082*i+6989942163141696396619429481443533709012318111429667492697898291833513449478778223741894076685566052765222834546396999895628034193)*x + (14972238698605859621808370972507387433138336379802605973886340125288018679199356921617273670044359057944892569585872397267354189855*i+4288889202194518926399820501659064877195500191103873214566179931614691601416155284509948743673319207522937415691815645931881957165) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6778006402703918619571537725538832914653164270376119452711661537429059666510376685881902804170297205199187436849215490115975955082*i+6989942163141696396619429481443533709012318111429667492697898291833513449478778223741894076685566052765222834546396999895628034193)*x + (14972238698605859621808370972507387433138336379802605973886340125288018679199356921617273670044359057944892569585872397267354189855*i+4288889202194518926399820501659064877195500191103873214566179931614691601416155284509948743673319207522937415691815645931881957165) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (687123227052612489290777962084998134885283139502151699161612634234432890091223826548718310529931073710256137584270363227898832225*i+7645066921216297145718254966842584415638867423569121601031446417004606842946494536285669931441108149867943593670383325969122398522)*x + (10234713466264938422705602484141594945388903581253589470478013695305605750257381590669600378720722076849153370988625240726849558104*i+10556990984800232046647323682333016405654779912967605506806587304576101695157507424485463345927529673952777253594642556959057923086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (687123227052612489290777962084998134885283139502151699161612634234432890091223826548718310529931073710256137584270363227898832225*i+7645066921216297145718254966842584415638867423569121601031446417004606842946494536285669931441108149867943593670383325969122398522)*x + (10234713466264938422705602484141594945388903581253589470478013695305605750257381590669600378720722076849153370988625240726849558104*i+10556990984800232046647323682333016405654779912967605506806587304576101695157507424485463345927529673952777253594642556959057923086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23956799141292836046005333693005458132772455863891763212446869185324869216739371623623108808111451687990556292434325117435900578065*i+4813507133163950503346451309452991468818186944297107013567794987372871486682217502616944107520744794722095631432796093628272862042)*x + (20561858734499185269311555422113774888310471499339670838591131992880921133921557020397030572688513870737110700147845859317094517038*i+5796010969966697445051214205053265376340142714740044073328852810137420541437348109994755606484061087974097039134659025200894136088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23956799141292836046005333693005458132772455863891763212446869185324869216739371623623108808111451687990556292434325117435900578065*i+4813507133163950503346451309452991468818186944297107013567794987372871486682217502616944107520744794722095631432796093628272862042)*x + (20561858734499185269311555422113774888310471499339670838591131992880921133921557020397030572688513870737110700147845859317094517038*i+5796010969966697445051214205053265376340142714740044073328852810137420541437348109994755606484061087974097039134659025200894136088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3250865499154334572870237187852258554424305460828967409754780093021688876498334601848804277621080216050671773212256912261060902488*i+13193489269068607310931059568867522829589900678975191735734101944903195053452838622628855874339738927712558625799537819741837288029)*x + (10860978774928998507607131386742363778269003866628768913941659555436742189626942871000810907654721428704964501259842829519007566466*i+4126429411332174834897695690277977434154582392831478749122048541460743895336478263862766248851702026918195077573727300199399128801) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3250865499154334572870237187852258554424305460828967409754780093021688876498334601848804277621080216050671773212256912261060902488*i+13193489269068607310931059568867522829589900678975191735734101944903195053452838622628855874339738927712558625799537819741837288029)*x + (10860978774928998507607131386742363778269003866628768913941659555436742189626942871000810907654721428704964501259842829519007566466*i+4126429411332174834897695690277977434154582392831478749122048541460743895336478263862766248851702026918195077573727300199399128801) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6625775579034831999476960618747365388107868368909614750729739653059456800868291981626006522606848404374188614321248554010523835945*i+3995332880456908248557030780618343278063444694482575434990816596637724752854236328023669596059170420394956469845954655439470372255)*x + (3419724718180602633995204248007480554594843015622751834037782105063805392172023117841242229427793062291230438059378836760899107271*i+23037257783357425497242515895216410356364627682761213796482805157826850182394507946393905857605132299464411003062674564985943693613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6625775579034831999476960618747365388107868368909614750729739653059456800868291981626006522606848404374188614321248554010523835945*i+3995332880456908248557030780618343278063444694482575434990816596637724752854236328023669596059170420394956469845954655439470372255)*x + (3419724718180602633995204248007480554594843015622751834037782105063805392172023117841242229427793062291230438059378836760899107271*i+23037257783357425497242515895216410356364627682761213796482805157826850182394507946393905857605132299464411003062674564985943693613) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24316534612206088561374573972245316962582567168372541306697633670192820689525640842985728132835045519486202995242280634532462823027*i+17745957562048632945182463132794437987937072855732590712179256466289277746088513909438050254267631722320247487327382829354361979364)*x + (148557816310745361732155256197260127581089636268280034117723012787382246946951496252253621303407367746293058170813083583624692013*i+24376673762588482012272819343456109461700095673912300428512668350436115468151084414750110220090975585415718413324044004164085070039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24316534612206088561374573972245316962582567168372541306697633670192820689525640842985728132835045519486202995242280634532462823027*i+17745957562048632945182463132794437987937072855732590712179256466289277746088513909438050254267631722320247487327382829354361979364)*x + (148557816310745361732155256197260127581089636268280034117723012787382246946951496252253621303407367746293058170813083583624692013*i+24376673762588482012272819343456109461700095673912300428512668350436115468151084414750110220090975585415718413324044004164085070039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19025281780063626890254992500761284801861825171593147306209483178038396988108206766398855523636147342860526063219101605217158745728*i+1546483348453770968906659689753584254610451883643814948569427638570060375419470031963870173942325333385312309972941949511385573952)*x + (23538984918304184129176057036616336397141759362089878614242576337668136742714223167827342633524894940478912476807499667932238815042*i+7605843941520570992359529763773833452888662840709666464460180979448324721962484625972857240563780057207521185564889737813700039546) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19025281780063626890254992500761284801861825171593147306209483178038396988108206766398855523636147342860526063219101605217158745728*i+1546483348453770968906659689753584254610451883643814948569427638570060375419470031963870173942325333385312309972941949511385573952)*x + (23538984918304184129176057036616336397141759362089878614242576337668136742714223167827342633524894940478912476807499667932238815042*i+7605843941520570992359529763773833452888662840709666464460180979448324721962484625972857240563780057207521185564889737813700039546) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22315355705390533314690238189253272236182207541843627761199623211362320653655426971883892822385717505468375782646156228707318557227*i+16932926127480320105116536209426060788484404553505534579395144926336539947345123682682051837340847695787139036775921353102579049447)*x + (9319867513276603988535573436473694297393720973444694497972347981038644260451962849865450614228849574265788056420387703954761060397*i+14657794631475789296259421832598613451622567971952917523999218631393192192045589146315836231367288293866989416763587102473454445371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22315355705390533314690238189253272236182207541843627761199623211362320653655426971883892822385717505468375782646156228707318557227*i+16932926127480320105116536209426060788484404553505534579395144926336539947345123682682051837340847695787139036775921353102579049447)*x + (9319867513276603988535573436473694297393720973444694497972347981038644260451962849865450614228849574265788056420387703954761060397*i+14657794631475789296259421832598613451622567971952917523999218631393192192045589146315836231367288293866989416763587102473454445371) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3716759188620230556159896100197197427565752431571255362533116036299847202039001651044650477503440380690167996330199954791013081968*i+485087716704800400042189005819211237012396693032295506010421460266180487037375752041557592305461649476456514652905174246539895700)*x + (15302642917156309547320870842671644036640237231972722978826880801567490266791387100485932494804871390930517048974115466222281973399*i+7848301849893348534276397384204766667906565448940406530838609449267011109236908296979226370963884668022432747267368344258271529793) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3716759188620230556159896100197197427565752431571255362533116036299847202039001651044650477503440380690167996330199954791013081968*i+485087716704800400042189005819211237012396693032295506010421460266180487037375752041557592305461649476456514652905174246539895700)*x + (15302642917156309547320870842671644036640237231972722978826880801567490266791387100485932494804871390930517048974115466222281973399*i+7848301849893348534276397384204766667906565448940406530838609449267011109236908296979226370963884668022432747267368344258271529793) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19263864430420327085058096821733821407754582329896369026351910847715270441103127162867667190244827573259717738446817956902529622234*i+7579640436746145926249477904604267530690038077024066904149900809320690776420199422199007618613142969324310703247262601599484048740)*x + (23361758367059016539512476985644200151357356884317213790743395978633828462047820794310811578206065876742593185518901523755829838251*i+15686980858238419921604426285273260354131750599842912363638344416121733913190150473346234412277776752499296563058648830882288096304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19263864430420327085058096821733821407754582329896369026351910847715270441103127162867667190244827573259717738446817956902529622234*i+7579640436746145926249477904604267530690038077024066904149900809320690776420199422199007618613142969324310703247262601599484048740)*x + (23361758367059016539512476985644200151357356884317213790743395978633828462047820794310811578206065876742593185518901523755829838251*i+15686980858238419921604426285273260354131750599842912363638344416121733913190150473346234412277776752499296563058648830882288096304) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22601638147045966491959324927439915314833779249389083150821438223748612451513623640008472880849726245757616677018389460952056478809*i+18785596313035506334455589993998286736994006775105559064135796831295184873529519105037659733415544947269426653486897437618346726643)*x + (8353871974542127655983643662750524891915033747736587846795409467420552537116318335980845038905208539717490404626541821034652180390*i+20454929472547808388603765079176026943460549926404626064223379045028405382121649863372214458414330725403738931639686807418824687404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22601638147045966491959324927439915314833779249389083150821438223748612451513623640008472880849726245757616677018389460952056478809*i+18785596313035506334455589993998286736994006775105559064135796831295184873529519105037659733415544947269426653486897437618346726643)*x + (8353871974542127655983643662750524891915033747736587846795409467420552537116318335980845038905208539717490404626541821034652180390*i+20454929472547808388603765079176026943460549926404626064223379045028405382121649863372214458414330725403738931639686807418824687404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5116080808319910402878869669827242206454106087704861175880925833030998023531071369384583381113736014823962596828242041022137683687*i+718195785090260046892073852243026103355391122306167618750571582772548193919508618028062562730229407116709963863793306005155052950)*x + (23708245152181034723530072358418643883957107107779759575100692413742585741128658441399656106386258927386561438552400621433328256077*i+10038017227111161075920236500914260387846552297705564757234154220851638416664800270265477527575935492192801460574312497767973746813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5116080808319910402878869669827242206454106087704861175880925833030998023531071369384583381113736014823962596828242041022137683687*i+718195785090260046892073852243026103355391122306167618750571582772548193919508618028062562730229407116709963863793306005155052950)*x + (23708245152181034723530072358418643883957107107779759575100692413742585741128658441399656106386258927386561438552400621433328256077*i+10038017227111161075920236500914260387846552297705564757234154220851638416664800270265477527575935492192801460574312497767973746813) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14593824139104771750818571117637057227905607234479516500874033212801760143099838645472850491000301885274988833318401300655132119123*i+9315474276573776923609509197010923914571874691733651055141758731817550868636408895174145834584100333905971353391141342724568353000)*x + (13871156983857824229617665602727987634429434390530734812521400221461460253421677545814207467905530280434914391150374665680441933072*i+8747278245150072728544347871918677221734469779647512367263701891758268018530457004931332163202698260342171033623060651448417778183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14593824139104771750818571117637057227905607234479516500874033212801760143099838645472850491000301885274988833318401300655132119123*i+9315474276573776923609509197010923914571874691733651055141758731817550868636408895174145834584100333905971353391141342724568353000)*x + (13871156983857824229617665602727987634429434390530734812521400221461460253421677545814207467905530280434914391150374665680441933072*i+8747278245150072728544347871918677221734469779647512367263701891758268018530457004931332163202698260342171033623060651448417778183) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5587634965204870729537186528625784861117598443602933392052509175713480607878534851643914016694705910121388071649700483756855069631*i+1397420554556967880898243352257670293663636201946484011151245138778535478984899332260296925187991992035555596956848378618063088137)*x + (3769965150073286642630353745520611095055278072007153783463906267159308202176019901789613740003002845654852769327535155759102630991*i+10150982915072132368420031081557089509661787358803274409086113032434197722096466634478049094570068979073877886392055622427757161944) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5587634965204870729537186528625784861117598443602933392052509175713480607878534851643914016694705910121388071649700483756855069631*i+1397420554556967880898243352257670293663636201946484011151245138778535478984899332260296925187991992035555596956848378618063088137)*x + (3769965150073286642630353745520611095055278072007153783463906267159308202176019901789613740003002845654852769327535155759102630991*i+10150982915072132368420031081557089509661787358803274409086113032434197722096466634478049094570068979073877886392055622427757161944) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17883273501576955689675105590141293100159008740671271303978631767453106460236577759636012926337080678340976130561295633968155494830*i+14927060223014213784653151084263594241333419997017109565660388518336364375603552124417938931689178743500901366377487053095399161467)*x + (18057300996895832596822218978084493511613037429272406560447764328381276414471744008855617098365698882758662465769558871528026496079*i+17837458526355557973667094343592065601647352765109683500041893663445708393967320926579150801179386219464950946487838991091080241820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17883273501576955689675105590141293100159008740671271303978631767453106460236577759636012926337080678340976130561295633968155494830*i+14927060223014213784653151084263594241333419997017109565660388518336364375603552124417938931689178743500901366377487053095399161467)*x + (18057300996895832596822218978084493511613037429272406560447764328381276414471744008855617098365698882758662465769558871528026496079*i+17837458526355557973667094343592065601647352765109683500041893663445708393967320926579150801179386219464950946487838991091080241820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10666247998635205069576502193272225285599986547712919465953286717666822296359330947956584194656335927265455080822706470870953755515*i+15702880034617662298163238185193951196524157840431694780037818195484020015790905393761192930307741856429364153622266397937671575247)*x + (16550047919633574752589174105593737740686633376575375368067040935862179082978525067229478086616648270765684938238069025573675374007*i+24055350166947247642526420274300843175696222267996458012364737589967801329148422155086584285555694215623700027389435443397398015761) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10666247998635205069576502193272225285599986547712919465953286717666822296359330947956584194656335927265455080822706470870953755515*i+15702880034617662298163238185193951196524157840431694780037818195484020015790905393761192930307741856429364153622266397937671575247)*x + (16550047919633574752589174105593737740686633376575375368067040935862179082978525067229478086616648270765684938238069025573675374007*i+24055350166947247642526420274300843175696222267996458012364737589967801329148422155086584285555694215623700027389435443397398015761) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6796760843638646964625315217878164826245003834825259761616254698707977765455375810533738628857762002202764667279086884527403899352*i+9423929045105500756844879002988964764065667193472129679253921316321276422678763651764865691668012574964329011095028170569703173091)*x + (1339526478940320662518347601870151332633760687934904105737239286951467203282212265677299468041103406754590307149884481503356348677*i+22401520092443040226373096965950754299349263425417446875801788493605298278461789351810213345336437453455511508878328540879415055854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6796760843638646964625315217878164826245003834825259761616254698707977765455375810533738628857762002202764667279086884527403899352*i+9423929045105500756844879002988964764065667193472129679253921316321276422678763651764865691668012574964329011095028170569703173091)*x + (1339526478940320662518347601870151332633760687934904105737239286951467203282212265677299468041103406754590307149884481503356348677*i+22401520092443040226373096965950754299349263425417446875801788493605298278461789351810213345336437453455511508878328540879415055854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5992014069106300332904035891016373608826638076774796576498487877186242680178535613365785817976629412149486945065147769795137947416*i+14259231091973965638740963735227486309792876400368069302789691266167669570937727053575428738016955396184004890395912573113229827797)*x + (14978885163874607945607818406872186444630682242294959915360074879744369922842127119961057280213251052414593158955740581767196657462*i+11177975179649991265992093902951348492403304206037374822888349370827602970274781326469304214174146341235649277808821537054297787459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5992014069106300332904035891016373608826638076774796576498487877186242680178535613365785817976629412149486945065147769795137947416*i+14259231091973965638740963735227486309792876400368069302789691266167669570937727053575428738016955396184004890395912573113229827797)*x + (14978885163874607945607818406872186444630682242294959915360074879744369922842127119961057280213251052414593158955740581767196657462*i+11177975179649991265992093902951348492403304206037374822888349370827602970274781326469304214174146341235649277808821537054297787459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18555960276752549686627321460060006727409341098075582110680553510970189531421994650290644538000561074646156656200932930165643191419*i+13637018959217166914863680018221496044187992045838158622072495171753871523443594232665003704951285470358387634244619592797875168275)*x + (11631191481372929303469463860702896104223052672904821833781438885903491596042762037137977430683670119289326172413688028386818731527*i+5281483778434975466507623020500546619622587062406338336003337454445942735736242059718959486246473856995521738741624384344054552319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18555960276752549686627321460060006727409341098075582110680553510970189531421994650290644538000561074646156656200932930165643191419*i+13637018959217166914863680018221496044187992045838158622072495171753871523443594232665003704951285470358387634244619592797875168275)*x + (11631191481372929303469463860702896104223052672904821833781438885903491596042762037137977430683670119289326172413688028386818731527*i+5281483778434975466507623020500546619622587062406338336003337454445942735736242059718959486246473856995521738741624384344054552319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7261938983002532133709533248856105509978706273916732974075947197557287881390656296385525655805084786408881626423985123108524959279*i+4545569266113946813992816933134637147887972614452209340422231299941582516602242481086228407270748751117566018496857229964583395848)*x + (16342055236993801731190441236383352772299296361047865125264517294953526724653955647855352979554433775250531489659636679327550622120*i+7100327722338737305678772263994403714979226365047638603917374216545174963927908495156662281511679964890976020086728903546729176148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7261938983002532133709533248856105509978706273916732974075947197557287881390656296385525655805084786408881626423985123108524959279*i+4545569266113946813992816933134637147887972614452209340422231299941582516602242481086228407270748751117566018496857229964583395848)*x + (16342055236993801731190441236383352772299296361047865125264517294953526724653955647855352979554433775250531489659636679327550622120*i+7100327722338737305678772263994403714979226365047638603917374216545174963927908495156662281511679964890976020086728903546729176148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23264956580304246301807381282545245540623832994564706332027276695025022663911294372969847822473159406434833647049361883004781475560*i+7825450048218587561536691344760661767311842510300883852147249040273306027665551620756738196061390650016612769921260994851030875611)*x + (7076463063164699004560220002564376259637150460566276801753435305897147976478692959545109478617005460638934962560748682993825338785*i+19368965446888307128592681648227136596393016608066379887268115383116160401230747058885762982007528684647592320158986085848044487471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23264956580304246301807381282545245540623832994564706332027276695025022663911294372969847822473159406434833647049361883004781475560*i+7825450048218587561536691344760661767311842510300883852147249040273306027665551620756738196061390650016612769921260994851030875611)*x + (7076463063164699004560220002564376259637150460566276801753435305897147976478692959545109478617005460638934962560748682993825338785*i+19368965446888307128592681648227136596393016608066379887268115383116160401230747058885762982007528684647592320158986085848044487471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4797970636595512501402145003287436791003463166876670558916191315742831785834313347265255209014205835096859854023373084178717462721*i+22718289182628857929552239191121594606776332972117234245500596513640158031744792100072769500920247353375824794380723870345865579978)*x + (6805564388727706467760785269611826693153072841546642517201474141507727507017638667974017278802925770138793211864529605540029245430*i+7087107910994398038498423021311816386578459971371764756115438995116677737573287451818233165112209318639482695519334772536384899611) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4797970636595512501402145003287436791003463166876670558916191315742831785834313347265255209014205835096859854023373084178717462721*i+22718289182628857929552239191121594606776332972117234245500596513640158031744792100072769500920247353375824794380723870345865579978)*x + (6805564388727706467760785269611826693153072841546642517201474141507727507017638667974017278802925770138793211864529605540029245430*i+7087107910994398038498423021311816386578459971371764756115438995116677737573287451818233165112209318639482695519334772536384899611) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11185219873277396983017618813423874709386586680969132134217644831013948885375062894064811573298773433747717122880206195488271662881*i+23774473241760936949938899144767676420230469723594401902761827156927632003552660521740103792665200020245057871926494754640294350642)*x + (1658276464041317657075230993047540927410467903135725357188676094537968028038282625058245436771485061072996388258564895783926568743*i+11430874768240182140167591342229219403416630576960702418357677783881251308081671255527520996614880972049081109603131457773957369258) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11185219873277396983017618813423874709386586680969132134217644831013948885375062894064811573298773433747717122880206195488271662881*i+23774473241760936949938899144767676420230469723594401902761827156927632003552660521740103792665200020245057871926494754640294350642)*x + (1658276464041317657075230993047540927410467903135725357188676094537968028038282625058245436771485061072996388258564895783926568743*i+11430874768240182140167591342229219403416630576960702418357677783881251308081671255527520996614880972049081109603131457773957369258) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21408938363622404024583797100302396379599290843429320713097702942347819933559771146977287136734138857599447652623774736187910668109*i+17288392024941389855981124560532438822043200515882235729558664369462088857132016058739539887235404766718239803686317908681033755721)*x + (18571933244926852374826010589368907100348638217648871897211183904194005151795040735175497882161480912104323166137834140690297086913*i+19682244817094886953206013071468544225177722680937654943715539722775473874069449378333527085185948669468711264749373035809457628803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21408938363622404024583797100302396379599290843429320713097702942347819933559771146977287136734138857599447652623774736187910668109*i+17288392024941389855981124560532438822043200515882235729558664369462088857132016058739539887235404766718239803686317908681033755721)*x + (18571933244926852374826010589368907100348638217648871897211183904194005151795040735175497882161480912104323166137834140690297086913*i+19682244817094886953206013071468544225177722680937654943715539722775473874069449378333527085185948669468711264749373035809457628803) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3435159750302337019114462981341356794801282368024396404594370244570096513356617147826872947836096779209823998236007189165484920720*i+13074227257097306990576364065906621400386437850391286192521334655774268612635244864662479560421967862876794892848933140300005446823)*x + (6357131280658083858800811664581580372095034226706123951992292658059206696790911699349775413942755114811590095100145207536797006311*i+18460705409773016764874380022058577413454518630666598872605445732636568721154260931172420485586027295593756796950941336577040693079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3435159750302337019114462981341356794801282368024396404594370244570096513356617147826872947836096779209823998236007189165484920720*i+13074227257097306990576364065906621400386437850391286192521334655774268612635244864662479560421967862876794892848933140300005446823)*x + (6357131280658083858800811664581580372095034226706123951992292658059206696790911699349775413942755114811590095100145207536797006311*i+18460705409773016764874380022058577413454518630666598872605445732636568721154260931172420485586027295593756796950941336577040693079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3572272651037530794366432059088358474973076802142842125581890102416622400156517965366815418821170818125494174237607893239325517559*i+20192907041150905314965736230244389987505838639084425289412322302256365920179975646498380392909845154282650215092778077776257880248)*x + (14806573506521964924758761365848263729936070676748051766534445990927213676490096538549021583375654348635479920495124808370122064025*i+12087475462405438956248535689233831706924832996178259733414793901256418501061776627191749820131632381016944010790002826104596574129) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3572272651037530794366432059088358474973076802142842125581890102416622400156517965366815418821170818125494174237607893239325517559*i+20192907041150905314965736230244389987505838639084425289412322302256365920179975646498380392909845154282650215092778077776257880248)*x + (14806573506521964924758761365848263729936070676748051766534445990927213676490096538549021583375654348635479920495124808370122064025*i+12087475462405438956248535689233831706924832996178259733414793901256418501061776627191749820131632381016944010790002826104596574129) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15481062573107031678907982725884569171310942634536281742445193175305282835838213495803480457051488305548238976667868358858119445636*i+4711841325492023747199332503182993442368187775707427228629875814298362589700192435467726620323219476754560583507383170015585875728)*x + (18558519883809822040180320815887786860574310909071920856947989965092532949815061344503625514945062219950951414552675524265076329915*i+13133277090758329825878425705864762789919904217822988634649877932731986140197169432400326326247437205598792115096881107769999491819) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15481062573107031678907982725884569171310942634536281742445193175305282835838213495803480457051488305548238976667868358858119445636*i+4711841325492023747199332503182993442368187775707427228629875814298362589700192435467726620323219476754560583507383170015585875728)*x + (18558519883809822040180320815887786860574310909071920856947989965092532949815061344503625514945062219950951414552675524265076329915*i+13133277090758329825878425705864762789919904217822988634649877932731986140197169432400326326247437205598792115096881107769999491819) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (540571139814051484200059786087801243037653680044071519692381608204682899181034228341937819165189491432995398183359878981494349457*i+22291317198265378912729981285596520992902053408855981739609841861691412481738551746015514165612563108233872311070344900555441595529)*x + (17141473461947449781981441576279398506172270734417249751195475948174543846561759223328347853460423650490771561016331072393543363452*i+9059556831869787428098526422626335206867284149168472197564435673902302558348954128983709596602641002030593085359467958299579249277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (540571139814051484200059786087801243037653680044071519692381608204682899181034228341937819165189491432995398183359878981494349457*i+22291317198265378912729981285596520992902053408855981739609841861691412481738551746015514165612563108233872311070344900555441595529)*x + (17141473461947449781981441576279398506172270734417249751195475948174543846561759223328347853460423650490771561016331072393543363452*i+9059556831869787428098526422626335206867284149168472197564435673902302558348954128983709596602641002030593085359467958299579249277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20823394446228157995565523436416783410748895062256296028981818343673233535437769938692817568818274196591871884389078478239630173104*i+18007412454841415291734580741767057633190116504907627658253732505633900873191770548041223472932384705984002366326748878516582102239)*x + (8236414075683236085690124540816357419085239851046274222755600772254489667922559151065797260086885089259357098748084919817654671028*i+9137094245002350026212402203386889076409430910248513034437090462207882789370293444042213330163591893679321149377266870585435504225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20823394446228157995565523436416783410748895062256296028981818343673233535437769938692817568818274196591871884389078478239630173104*i+18007412454841415291734580741767057633190116504907627658253732505633900873191770548041223472932384705984002366326748878516582102239)*x + (8236414075683236085690124540816357419085239851046274222755600772254489667922559151065797260086885089259357098748084919817654671028*i+9137094245002350026212402203386889076409430910248513034437090462207882789370293444042213330163591893679321149377266870585435504225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17223000162895750888099705612282630850776818825711957423781195385558838213474402462502108395603691897666203645191911113734525912450*i+11389147555989237378907012383156651684066838933377261247103525884664920807726221182121634407281070676706587747214682070772103866815)*x + (10935006631442294295377741593380080519726316137446049839204076985018950957628640046087641176227888201386832327708833738678027584834*i+12979564300613086084404737142636644812170884960419278708005218070253707050798963243460719658267875152168664365359625538498428451606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17223000162895750888099705612282630850776818825711957423781195385558838213474402462502108395603691897666203645191911113734525912450*i+11389147555989237378907012383156651684066838933377261247103525884664920807726221182121634407281070676706587747214682070772103866815)*x + (10935006631442294295377741593380080519726316137446049839204076985018950957628640046087641176227888201386832327708833738678027584834*i+12979564300613086084404737142636644812170884960419278708005218070253707050798963243460719658267875152168664365359625538498428451606) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17104312632605834017453972902744392993435164889202165981949319238503550401338853915956815280176899328310941653854122192014989933749*i+5883335833857452914723329558131319897851247329654746892709809601729080645384194947976156004758761745728489725512401669278333896075)*x + (15339966617463021009402603258521418722198262166759624601259650950475648817705487637490287761534809288676622224359474059498636116634*i+11399446347115089905810474803401347383634078976660905829897024679352255575389587916364468333995971706771795854456039983122774806325) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17104312632605834017453972902744392993435164889202165981949319238503550401338853915956815280176899328310941653854122192014989933749*i+5883335833857452914723329558131319897851247329654746892709809601729080645384194947976156004758761745728489725512401669278333896075)*x + (15339966617463021009402603258521418722198262166759624601259650950475648817705487637490287761534809288676622224359474059498636116634*i+11399446347115089905810474803401347383634078976660905829897024679352255575389587916364468333995971706771795854456039983122774806325) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1328383048444665964059052238898709193679266244708430897033998613847572437965719034158720660295891113093935011277129184029858216873*i+4694806813764894224561234012120329569378335267086749941016635651372648936168558759422314926790136056109427915814108127440157081884)*x + (14858776132882932528862898712177318406128222611649908796610706578889612036044208681332622795918722501938078112172785726739061903387*i+2708903654308858246319014277627614744099532995442849763672587548684871608009269895780480064641675174648121449029359019323467597531) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1328383048444665964059052238898709193679266244708430897033998613847572437965719034158720660295891113093935011277129184029858216873*i+4694806813764894224561234012120329569378335267086749941016635651372648936168558759422314926790136056109427915814108127440157081884)*x + (14858776132882932528862898712177318406128222611649908796610706578889612036044208681332622795918722501938078112172785726739061903387*i+2708903654308858246319014277627614744099532995442849763672587548684871608009269895780480064641675174648121449029359019323467597531) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20287415052629003195943025495392494786477284188077770789372317867180493413259526945509491826289311811348883232690768923917962472570*i+18533923219927409779644608076917319179238823959642183757799397739437571669283934706556349752308085618298757022054513374864160541996)*x + (17922309891297699956248478071527621543192057098579995958580133495827852513361134396808203494076597757110846382797725104944843297991*i+14612720945707932170007919091212671291548611497326302537318844048406259931794916582573680702275875540846896569123754431822857543256) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20287415052629003195943025495392494786477284188077770789372317867180493413259526945509491826289311811348883232690768923917962472570*i+18533923219927409779644608076917319179238823959642183757799397739437571669283934706556349752308085618298757022054513374864160541996)*x + (17922309891297699956248478071527621543192057098579995958580133495827852513361134396808203494076597757110846382797725104944843297991*i+14612720945707932170007919091212671291548611497326302537318844048406259931794916582573680702275875540846896569123754431822857543256) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1451913235181831576080640790880017072072869690044215351118592523969025574001172684586729188926169265781520887182108909156137616494*i+780353644765219371733626490758360609721640619055025704491033089883307208785871217663194228414583634996291561106055032027091742533)*x + (23791042424236356550106076875133644229823933751770907702931107928514697857987221481843959584551435905757190730920190986771667303401*i+21727813576089049561070657262200122873468020255151585010021969814846729656966453679530847339615677940673337081417125351179208295338) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1451913235181831576080640790880017072072869690044215351118592523969025574001172684586729188926169265781520887182108909156137616494*i+780353644765219371733626490758360609721640619055025704491033089883307208785871217663194228414583634996291561106055032027091742533)*x + (23791042424236356550106076875133644229823933751770907702931107928514697857987221481843959584551435905757190730920190986771667303401*i+21727813576089049561070657262200122873468020255151585010021969814846729656966453679530847339615677940673337081417125351179208295338) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23750136434220248534080026741460653986358932422157208303250614510716374120801192173253043416948937502160157556688825992681183519176*i+480056317013940177923530817836887877857289932587052996192324738858531968551952607347395166466780163921850207748151760645771915676)*x + (2667231541421081859107117465445842566103695080246248329472051193072418566353544825207527136858924766004255847662907508581877804310*i+24287933552594695285237953283395389186198076377782614864150418575489202726916015673328691000454087939849164521187958091323435119683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23750136434220248534080026741460653986358932422157208303250614510716374120801192173253043416948937502160157556688825992681183519176*i+480056317013940177923530817836887877857289932587052996192324738858531968551952607347395166466780163921850207748151760645771915676)*x + (2667231541421081859107117465445842566103695080246248329472051193072418566353544825207527136858924766004255847662907508581877804310*i+24287933552594695285237953283395389186198076377782614864150418575489202726916015673328691000454087939849164521187958091323435119683) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23466487419716802177069459673317883764647878235423314649033610322729589429083332171063224823071348190728291790754835396700596058575*i+9957268124322561273753860589761784561796636780150803327644594978114865447150649911475089428599959879141757215423189327102587406722)*x + (14257084821252980475772749380712150737011646783982824567078816395409588357936884125190975318320157519762178216099984025180192444640*i+5272616629278977172092453555348162985686914254463019946643472603849540102015374831280070609084122954328090044894318386746824171464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23466487419716802177069459673317883764647878235423314649033610322729589429083332171063224823071348190728291790754835396700596058575*i+9957268124322561273753860589761784561796636780150803327644594978114865447150649911475089428599959879141757215423189327102587406722)*x + (14257084821252980475772749380712150737011646783982824567078816395409588357936884125190975318320157519762178216099984025180192444640*i+5272616629278977172092453555348162985686914254463019946643472603849540102015374831280070609084122954328090044894318386746824171464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23039266385535447623505107498541686339179472474956390381855862729793244972657649134444509617801667398040969402626096929157206448595*i+19321533829363768664902696642588251965166924838220793331662550818123905309147897301075482287297914598033861854147696191601250638040)*x + (23888754005564995021041507636800943389391290512602287182528841092661063795324032962244059214277916522277695454181492561950468426436*i+3903100026575591091650920793022174399132582465196657549204120221070089870465231245829602616801413636065485866811313735375471732610) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23039266385535447623505107498541686339179472474956390381855862729793244972657649134444509617801667398040969402626096929157206448595*i+19321533829363768664902696642588251965166924838220793331662550818123905309147897301075482287297914598033861854147696191601250638040)*x + (23888754005564995021041507636800943389391290512602287182528841092661063795324032962244059214277916522277695454181492561950468426436*i+3903100026575591091650920793022174399132582465196657549204120221070089870465231245829602616801413636065485866811313735375471732610) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22176762742110515749407783522466424033887987440213961063819584940882290237535341066163881038299844709293661478287331384871401199999*i+18233835761208817613562001307062741303003095819244474570162845177321606933465969261911460464192563117557234293468480194485227668689)*x + (6544606479658597408825176657499874503798799751864519449844830133682993613149370486996315048621594212741364403065818282765353913205*i+15193348532637514180485812188465747520117899665989501573522224332745257374833992026868290899095358228954135889730722849263325643645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22176762742110515749407783522466424033887987440213961063819584940882290237535341066163881038299844709293661478287331384871401199999*i+18233835761208817613562001307062741303003095819244474570162845177321606933465969261911460464192563117557234293468480194485227668689)*x + (6544606479658597408825176657499874503798799751864519449844830133682993613149370486996315048621594212741364403065818282765353913205*i+15193348532637514180485812188465747520117899665989501573522224332745257374833992026868290899095358228954135889730722849263325643645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4256229561035355333045265770000856602469503815316932064179376088602069659372959516634760097589553229129730812033479161950500453657*i+17667502396162923914897946632999171014380548967423271924443926907432717868815467812975064725721109617058682222946309059260920255912)*x + (1186462318979511656731090617852539761320551190739521442525067906120660035156811195564707608171193589435134026867954399969486763179*i+22298593405835161953350110499729927961921652585551871161158223566367327858025019002197409715365099134470526333244911191107739707173) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4256229561035355333045265770000856602469503815316932064179376088602069659372959516634760097589553229129730812033479161950500453657*i+17667502396162923914897946632999171014380548967423271924443926907432717868815467812975064725721109617058682222946309059260920255912)*x + (1186462318979511656731090617852539761320551190739521442525067906120660035156811195564707608171193589435134026867954399969486763179*i+22298593405835161953350110499729927961921652585551871161158223566367327858025019002197409715365099134470526333244911191107739707173) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10159709990758502191601780828831204245345410467627955288693504991901663551388944270346980984546066717532893919594401336569945942975*i+15115053722747717996559460156343294367904182882636042380232208375030146455308726558889410537463304924858340344882903286654341722583)*x + (13210655311692669466721174407894003165714469515754380514430707175819344408819805256160129734559366880742962665390854705745940670477*i+15728122796417918650401533154522215407940692199758699611236554099969071602972962122494711041645133765074969325165057199703625467039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10159709990758502191601780828831204245345410467627955288693504991901663551388944270346980984546066717532893919594401336569945942975*i+15115053722747717996559460156343294367904182882636042380232208375030146455308726558889410537463304924858340344882903286654341722583)*x + (13210655311692669466721174407894003165714469515754380514430707175819344408819805256160129734559366880742962665390854705745940670477*i+15728122796417918650401533154522215407940692199758699611236554099969071602972962122494711041645133765074969325165057199703625467039) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7281767498159925336624452780135901637924872470594106452246276042744245934467788420060235856767359241410317615315680723793855635862*i+22076361337960704400725923383128291740931246054442258692714498604452689434674455892876978503254256184669715670480497512019006979732)*x + (22760547542872258705047137914112851340757434635288368425658789520557784794176708625367328406955311475256338044021107309493195091657*i+17635047542531220802734957862941438781888051553718602312976418310980725136358580649957330948862695685551326151282534231816743123274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7281767498159925336624452780135901637924872470594106452246276042744245934467788420060235856767359241410317615315680723793855635862*i+22076361337960704400725923383128291740931246054442258692714498604452689434674455892876978503254256184669715670480497512019006979732)*x + (22760547542872258705047137914112851340757434635288368425658789520557784794176708625367328406955311475256338044021107309493195091657*i+17635047542531220802734957862941438781888051553718602312976418310980725136358580649957330948862695685551326151282534231816743123274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9630692348620928209372717560189874916987168353555562859111671316042434407171373268467912917894924274213647985446104109570540808331*i+20659696785628758854691658484296616512081965872875517070655340426289568823832344551101807912887561055079700619510538734283033326143)*x + (23191495613774992275572573767732774239282568370806788750062232856645812815820269591203578782085852861138514581613028590406803439377*i+17345665443740834401559217932626324015839170070189591777974373997307502902076991673150319204789918324784843416099764656188265057014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9630692348620928209372717560189874916987168353555562859111671316042434407171373268467912917894924274213647985446104109570540808331*i+20659696785628758854691658484296616512081965872875517070655340426289568823832344551101807912887561055079700619510538734283033326143)*x + (23191495613774992275572573767732774239282568370806788750062232856645812815820269591203578782085852861138514581613028590406803439377*i+17345665443740834401559217932626324015839170070189591777974373997307502902076991673150319204789918324784843416099764656188265057014) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12961597358323047090677868958651509021705151835573132653609228737603318272675782129523954719072668364877232506658524826470138617032*i+2057815199667031446536514404035252508309914224166901012538692362215995935627059821853697091195597656259356892468517148692260588698)*x + (316818075644388930205130397490165882618559715103486054849015457824535233959473168529686021322105173276650040837256545905036584367*i+22654451062863101380890736575950476042824766700698952029972240039346873874477154454574056817204248040732292627656303543464880185048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12961597358323047090677868958651509021705151835573132653609228737603318272675782129523954719072668364877232506658524826470138617032*i+2057815199667031446536514404035252508309914224166901012538692362215995935627059821853697091195597656259356892468517148692260588698)*x + (316818075644388930205130397490165882618559715103486054849015457824535233959473168529686021322105173276650040837256545905036584367*i+22654451062863101380890736575950476042824766700698952029972240039346873874477154454574056817204248040732292627656303543464880185048) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9113016422607450429216472832075679078350435958922666792558639303227274130500767332736099315477374512622074641968338277801192501245*i+13612501814727964601675648617552563285177993684507692353988460013961221915118835917802268569172364199007876545068139953353818461558)*x + (2460300548774884285836504195434389024674223969235750698849220744795495831672155962344540327323127349456391784726228950302439194149*i+15747223039253768522850773874121211294177654774497715411139348278603401389913124647743341861346831565340830864137289274151273109818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9113016422607450429216472832075679078350435958922666792558639303227274130500767332736099315477374512622074641968338277801192501245*i+13612501814727964601675648617552563285177993684507692353988460013961221915118835917802268569172364199007876545068139953353818461558)*x + (2460300548774884285836504195434389024674223969235750698849220744795495831672155962344540327323127349456391784726228950302439194149*i+15747223039253768522850773874121211294177654774497715411139348278603401389913124647743341861346831565340830864137289274151273109818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13710011815843287756895583134521153552080260716601827551575999885862298643347069068046559887365564886980243606118989215755366533084*i+19048031477876161976429544479805326777495612505845001090276722725113601459701186573246219739649219317994117082736300600613831555179)*x + (12006478123448207659321867428695425307399690339936628135946060632672007155867206067961056170245245026665015360447974414688943004275*i+18471910854987179644642880905851702759730588807629298492051464927167727352343893947484874733521967754193435637525685644270957032118) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13710011815843287756895583134521153552080260716601827551575999885862298643347069068046559887365564886980243606118989215755366533084*i+19048031477876161976429544479805326777495612505845001090276722725113601459701186573246219739649219317994117082736300600613831555179)*x + (12006478123448207659321867428695425307399690339936628135946060632672007155867206067961056170245245026665015360447974414688943004275*i+18471910854987179644642880905851702759730588807629298492051464927167727352343893947484874733521967754193435637525685644270957032118) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13394375557147944674663827593004892381675780403920710364479184363984797659981312372239284934671362447747275905121170860984467119560*i+23633118100258076838315807247852352149018523501024021266887557751597891713619641572228178344419494647493033307546278348218746813958)*x + (4738846314976888719511385338628334345872690223636714372610992477412426519447452316028305955539353150620692127242210115573460050516*i+18612755924816320881371300552891748018266028557009411711385679362381436243696805419053471784385686646364343492340230610813561000557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13394375557147944674663827593004892381675780403920710364479184363984797659981312372239284934671362447747275905121170860984467119560*i+23633118100258076838315807247852352149018523501024021266887557751597891713619641572228178344419494647493033307546278348218746813958)*x + (4738846314976888719511385338628334345872690223636714372610992477412426519447452316028305955539353150620692127242210115573460050516*i+18612755924816320881371300552891748018266028557009411711385679362381436243696805419053471784385686646364343492340230610813561000557) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23745751962580146565653641363875864460234494451085893033282274726566951691237262002032233130751747935649124083557955403224422316385*i+18842410611943162287278698400596477317201966073316301978856502991795394387772068294276334625727619764553005670684154352024029085621)*x + (7674510311798178405804266120721946761950691410187955343100034008964668870134306636917618748210547868012758855824293801457872317615*i+11229952856719063566171625741423092303382379134223091660642518834484641298682091225935935607996406544790099059040137019043222817050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23745751962580146565653641363875864460234494451085893033282274726566951691237262002032233130751747935649124083557955403224422316385*i+18842410611943162287278698400596477317201966073316301978856502991795394387772068294276334625727619764553005670684154352024029085621)*x + (7674510311798178405804266120721946761950691410187955343100034008964668870134306636917618748210547868012758855824293801457872317615*i+11229952856719063566171625741423092303382379134223091660642518834484641298682091225935935607996406544790099059040137019043222817050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4332636586793110251570413472953487983725728829079366039472573102396621413098441135864768547263480211336916472971209201692501472685*i+2793381642244558235740611220668845900989048760443964944835481913584541428412329364658284714574409001186524991300929729694535560178)*x + (20747547959121129880000397915540150859991249826909099531157418416578014100199395596891730908702943169727813102242639696110010139106*i+12640254344354155213245535114653987124242225839974408942009156616066990551526077901944024771851313186018172657593660421224299780559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4332636586793110251570413472953487983725728829079366039472573102396621413098441135864768547263480211336916472971209201692501472685*i+2793381642244558235740611220668845900989048760443964944835481913584541428412329364658284714574409001186524991300929729694535560178)*x + (20747547959121129880000397915540150859991249826909099531157418416578014100199395596891730908702943169727813102242639696110010139106*i+12640254344354155213245535114653987124242225839974408942009156616066990551526077901944024771851313186018172657593660421224299780559) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16378295775234167050517885447825829249768653566227243696228786209734051529833583081419172691089972818594333735115491532560811901741*i+13027586329124278887500225605694805435452263267876195654979601919888165514424105999071907848035726745561924769528101053586583435580)*x + (15385308490828825003863434532977955907082073793281389145038660848525003714664983328860561265483533471483895330621577332414004793424*i+9511316950316187618314944940482821801920599723338078291126315109675950612096707496588239467785925076650788162317044224562446295735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16378295775234167050517885447825829249768653566227243696228786209734051529833583081419172691089972818594333735115491532560811901741*i+13027586329124278887500225605694805435452263267876195654979601919888165514424105999071907848035726745561924769528101053586583435580)*x + (15385308490828825003863434532977955907082073793281389145038660848525003714664983328860561265483533471483895330621577332414004793424*i+9511316950316187618314944940482821801920599723338078291126315109675950612096707496588239467785925076650788162317044224562446295735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4964296699819966924546403866581823097844589673825839115867184965507841958003822491874209320773206190542415062011494857878661599406*i+1022082355891235233069008023609941808250016423690572785426526717466667048416764018177119639761200376593863012005183373292457618272)*x + (1360354491719927072235265387616100526572330175647053993152488393347622344527914864837385775263076609684934520801001481270042341459*i+8799720417600596952313256889266091830142441336087360987023187420549019348827813273551260195888830913553491041646515565148266315136) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4964296699819966924546403866581823097844589673825839115867184965507841958003822491874209320773206190542415062011494857878661599406*i+1022082355891235233069008023609941808250016423690572785426526717466667048416764018177119639761200376593863012005183373292457618272)*x + (1360354491719927072235265387616100526572330175647053993152488393347622344527914864837385775263076609684934520801001481270042341459*i+8799720417600596952313256889266091830142441336087360987023187420549019348827813273551260195888830913553491041646515565148266315136) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18475279165622848548476553728782003403446318085789220061880596299060351166447784401342928418496396809918847395739045535492609143688*i+554729972646937104067811496561462257962076578829363434014844134763461625706389070523887165249913701691975409709515205637220201549)*x + (442198464672481867477358440444083605355946375137269256780688596798038049655630112535600381650115091157767599105675165977299770701*i+6080163102442483154113990779342022231663359075178039968083624564898957884977464041390436098831290666894468724681322274630736306069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18475279165622848548476553728782003403446318085789220061880596299060351166447784401342928418496396809918847395739045535492609143688*i+554729972646937104067811496561462257962076578829363434014844134763461625706389070523887165249913701691975409709515205637220201549)*x + (442198464672481867477358440444083605355946375137269256780688596798038049655630112535600381650115091157767599105675165977299770701*i+6080163102442483154113990779342022231663359075178039968083624564898957884977464041390436098831290666894468724681322274630736306069) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (197426390146370440270274233375783754380768307066400306263545258622558086405088364280757661436852993673087217397300582372752528307*i+13332811609862639110001103191801571861241867473321129080439112734536271376908328505733185990178426229936929394408404381811401505087)*x + (17930704008771242274058744789990665722675861254731157204711445795931149586314507159555784286591573194772264394169307588051857908183*i+17144846345077352053304842969661520545212425548789340517499778926035208122975119526890210419334208367639108539561248725751285018086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (197426390146370440270274233375783754380768307066400306263545258622558086405088364280757661436852993673087217397300582372752528307*i+13332811609862639110001103191801571861241867473321129080439112734536271376908328505733185990178426229936929394408404381811401505087)*x + (17930704008771242274058744789990665722675861254731157204711445795931149586314507159555784286591573194772264394169307588051857908183*i+17144846345077352053304842969661520545212425548789340517499778926035208122975119526890210419334208367639108539561248725751285018086) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1120673907935820052379668453561076256896519762050489405090529141351165074306994305211815346020933161013296623968362669031059662510*i+11857349803785458390649881786729702492177774202842360596315089455488249105913291042891956872294531751816849478144584872530698181368)*x + (20015908239225488070695566404013011133134614619897506122587952691103844177411982735081340192815391130084702552597972295365006036299*i+222841637632319378023760785773616147938954496445357010414635612429956179100043244058809189681043740953902987405922214576477952844) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1120673907935820052379668453561076256896519762050489405090529141351165074306994305211815346020933161013296623968362669031059662510*i+11857349803785458390649881786729702492177774202842360596315089455488249105913291042891956872294531751816849478144584872530698181368)*x + (20015908239225488070695566404013011133134614619897506122587952691103844177411982735081340192815391130084702552597972295365006036299*i+222841637632319378023760785773616147938954496445357010414635612429956179100043244058809189681043740953902987405922214576477952844) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7807334965892568684282433095072301743056308144313833335510353153665233385327089846236323976998373949747635028276651613198037598338*i+18983357751097019930925138073965941552358740960208516413755159524534924158499843678921182686404493946586935991244972598155038539101)*x + (18993499393751750139245013536857104009526443913750499642923326162387553492310098972895724311005253476131550567526430176569682486955*i+8594603695753018325564440648223391781009840189202270968824230290528652708038714911940299806502761581768555260214937252226942161677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7807334965892568684282433095072301743056308144313833335510353153665233385327089846236323976998373949747635028276651613198037598338*i+18983357751097019930925138073965941552358740960208516413755159524534924158499843678921182686404493946586935991244972598155038539101)*x + (18993499393751750139245013536857104009526443913750499642923326162387553492310098972895724311005253476131550567526430176569682486955*i+8594603695753018325564440648223391781009840189202270968824230290528652708038714911940299806502761581768555260214937252226942161677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4942294273291518368956527167545267935567808366556022492070986554939908593746182981614473751169934181071050481341055571120664438355*i+19919891821354280755268993196265480714367547789113547352334547029523232445778718236325092792130147761788130482890261917527772868963)*x + (4082744181282241934588424115828043529950749685439218342865436827894405280451201907402393202299654197626005676651712956236838821016*i+10431268771587339867310568068948407141691380390403807694340098149524109718235090691271157466658902925722596763110880309454817114167) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4942294273291518368956527167545267935567808366556022492070986554939908593746182981614473751169934181071050481341055571120664438355*i+19919891821354280755268993196265480714367547789113547352334547029523232445778718236325092792130147761788130482890261917527772868963)*x + (4082744181282241934588424115828043529950749685439218342865436827894405280451201907402393202299654197626005676651712956236838821016*i+10431268771587339867310568068948407141691380390403807694340098149524109718235090691271157466658902925722596763110880309454817114167) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22549443800616796250316346279770174816020187985403586598881963936107544584575049519454285550529618735928438837144207222445213349855*i+21312351762301555035663901710994407236478115250358909784069080143577606799554691187417201826785854785528539915555919505220290461098)*x + (3760208006093546231266785486161123208517319190624110372542505442217839427126070032211941377629211383075939934782015387818908476064*i+5181790341751004288046716476577816944426544366220586158780463132274403799142398960486383680929900250259545371396540290221883114868) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22549443800616796250316346279770174816020187985403586598881963936107544584575049519454285550529618735928438837144207222445213349855*i+21312351762301555035663901710994407236478115250358909784069080143577606799554691187417201826785854785528539915555919505220290461098)*x + (3760208006093546231266785486161123208517319190624110372542505442217839427126070032211941377629211383075939934782015387818908476064*i+5181790341751004288046716476577816944426544366220586158780463132274403799142398960486383680929900250259545371396540290221883114868) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5869176674277388417805204017865851613486760019122346058388743440577547021306101932027374695655326669481430044628818430363603576592*i+7325796700696337373215999146476019839852153231691595744774695615827218047594658780496611781894644008312086002867416378054956874818)*x + (22251624830254187025195095386258393917850915725654162256053660911674699743490206122216985888542047819659140179872768249049558063377*i+23780125418322613745750825821176625488850742174339773291091364029314596688036404845383580184710215302024821982276972843191486738355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5869176674277388417805204017865851613486760019122346058388743440577547021306101932027374695655326669481430044628818430363603576592*i+7325796700696337373215999146476019839852153231691595744774695615827218047594658780496611781894644008312086002867416378054956874818)*x + (22251624830254187025195095386258393917850915725654162256053660911674699743490206122216985888542047819659140179872768249049558063377*i+23780125418322613745750825821176625488850742174339773291091364029314596688036404845383580184710215302024821982276972843191486738355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23798825235402825777698466527227271139949781109898767809544491887277613620343965675791769144713903369724987653961929242388222809501*i+24392381728261680248539947349035048935995511985177926011022412865405445232317673301759695208593225935060685769820267496995206391630)*x + (15495251853315029026941433397424933238110219911374686524835689026959100469228964427661035278896209753950702797734654732643425049294*i+17395195579323378705668033483238288184977234457662754844596250568115999096690499580998486161940600141450589276489824786542091700905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23798825235402825777698466527227271139949781109898767809544491887277613620343965675791769144713903369724987653961929242388222809501*i+24392381728261680248539947349035048935995511985177926011022412865405445232317673301759695208593225935060685769820267496995206391630)*x + (15495251853315029026941433397424933238110219911374686524835689026959100469228964427661035278896209753950702797734654732643425049294*i+17395195579323378705668033483238288184977234457662754844596250568115999096690499580998486161940600141450589276489824786542091700905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6595154083769177027212653593335611144492419374875210556773928085022457447874134974287177425051355489968735833947658141233319135552*i+12097460884253597281233666790739802443922837302125552118143040215104100427898650730544943732556393998226248598467898075506576526747)*x + (16237654440291946198482670951802563851536361192518226528796564275518711359760500644614907186785677013297597447493268528100210697008*i+7862638776228652936096505067091658240881965635421123746483595327686937327176982414889199429833293752237093507398088232391310128898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6595154083769177027212653593335611144492419374875210556773928085022457447874134974287177425051355489968735833947658141233319135552*i+12097460884253597281233666790739802443922837302125552118143040215104100427898650730544943732556393998226248598467898075506576526747)*x + (16237654440291946198482670951802563851536361192518226528796564275518711359760500644614907186785677013297597447493268528100210697008*i+7862638776228652936096505067091658240881965635421123746483595327686937327176982414889199429833293752237093507398088232391310128898) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18974242565274539913891879658544452853984678430358519442218682012677670678867660133461507803395354582030768965545416374102889752710*i+7703633133173500194433198800402170085048637016643688521803260802388094407229559618836945222932048693952769505230188545897572649279)*x + (6120805846768047202405786936237498396659032090733286682641726965634288377960711028557622635956697840113764659203739968475866144768*i+15884942703970824465962476252495702435817737150917226662880557864367885528155271865667927439036470176202215634927748336832848585428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18974242565274539913891879658544452853984678430358519442218682012677670678867660133461507803395354582030768965545416374102889752710*i+7703633133173500194433198800402170085048637016643688521803260802388094407229559618836945222932048693952769505230188545897572649279)*x + (6120805846768047202405786936237498396659032090733286682641726965634288377960711028557622635956697840113764659203739968475866144768*i+15884942703970824465962476252495702435817737150917226662880557864367885528155271865667927439036470176202215634927748336832848585428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1639803202427579015470157899605795050364635941458840666502844655836510886734904876066571886151525382333790518700772902504540966198*i+20382277025152544743565987459576523491362161719648914277942302554154983171158606912202386299794965892097132459034685462519195389556)*x + (22957567987840232789245476294453186069381637550048456380028240127747546968777741275161091169857275775973464135313817558601250614168*i+4169192027356575942576409003381650718894029451150633066512650837724208055766155009245049231761113902784440021595786057253356931684) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1639803202427579015470157899605795050364635941458840666502844655836510886734904876066571886151525382333790518700772902504540966198*i+20382277025152544743565987459576523491362161719648914277942302554154983171158606912202386299794965892097132459034685462519195389556)*x + (22957567987840232789245476294453186069381637550048456380028240127747546968777741275161091169857275775973464135313817558601250614168*i+4169192027356575942576409003381650718894029451150633066512650837724208055766155009245049231761113902784440021595786057253356931684) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10781428488707991582379791195082462993155677193347673110859453621810783083390134120491084684047466543926540925248419183863901088783*i+14139571740202785669523003033435396759386871535983897065333070618916197161558869578995319296770248869429118129019440767871482541189)*x + (10236938762725533563662588189283670978220924438042724429574658695909629301127758162284548311244773394218231324806877946185149741245*i+13827281040496926317717949761241676636716746521357587078840250323566342273594923210703775085346518696633575001805272214766146618410) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10781428488707991582379791195082462993155677193347673110859453621810783083390134120491084684047466543926540925248419183863901088783*i+14139571740202785669523003033435396759386871535983897065333070618916197161558869578995319296770248869429118129019440767871482541189)*x + (10236938762725533563662588189283670978220924438042724429574658695909629301127758162284548311244773394218231324806877946185149741245*i+13827281040496926317717949761241676636716746521357587078840250323566342273594923210703775085346518696633575001805272214766146618410) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (541301891539310596802543574942682714673297468494020221198777778622936882169770514570436075634914321512141985492709159171878375177*i+23414241475430971180696928623739799014345338474571486511083466670921313219791386924361610175368341646609091817218961788222426049312)*x + (20604937808005535657759246002263540067756607646641965790268044876404549958270649709189773487382096880442747903021711697911623193275*i+8886563829947576867466722152287173391264563298747484552891498928582622434784364313132729582370521813212422084338103435372135083743) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (541301891539310596802543574942682714673297468494020221198777778622936882169770514570436075634914321512141985492709159171878375177*i+23414241475430971180696928623739799014345338474571486511083466670921313219791386924361610175368341646609091817218961788222426049312)*x + (20604937808005535657759246002263540067756607646641965790268044876404549958270649709189773487382096880442747903021711697911623193275*i+8886563829947576867466722152287173391264563298747484552891498928582622434784364313132729582370521813212422084338103435372135083743) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1260807341938031205319902162393531214830225561705276336020591010475452031402402987670854573617425807606580637728184458579164211526*i+12571852223884468203158231212651155790904396157651687548810065041360950626676953015933639954322119130229258276407807767551737814926)*x + (10807774857260189134359805186174731295145019691993837636015514712755241658936223329279252022525154281875789242494936291916171884221*i+23120671847124213305922456633185277395039354928814764898127781316160084685551823755142990821912890299331114363024890598733021848044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1260807341938031205319902162393531214830225561705276336020591010475452031402402987670854573617425807606580637728184458579164211526*i+12571852223884468203158231212651155790904396157651687548810065041360950626676953015933639954322119130229258276407807767551737814926)*x + (10807774857260189134359805186174731295145019691993837636015514712755241658936223329279252022525154281875789242494936291916171884221*i+23120671847124213305922456633185277395039354928814764898127781316160084685551823755142990821912890299331114363024890598733021848044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19145441812066435784868635792488490055451101908703665861590633807783581535871251602110709710445023152739231346282517905865503304400*i+14664355588288272214569041405062657102577668645291746603260261207410711359142076656776791721981542585979782686564195966235142696105)*x + (14634882577255685249202759104225447009301498930813614128030218878820578465111743543986448777922017560770584290279259683861941333006*i+22491519318520262716950840615683655079067324163923746112066262672167713473704122306475703736499155350611774839548575497655884079931) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19145441812066435784868635792488490055451101908703665861590633807783581535871251602110709710445023152739231346282517905865503304400*i+14664355588288272214569041405062657102577668645291746603260261207410711359142076656776791721981542585979782686564195966235142696105)*x + (14634882577255685249202759104225447009301498930813614128030218878820578465111743543986448777922017560770584290279259683861941333006*i+22491519318520262716950840615683655079067324163923746112066262672167713473704122306475703736499155350611774839548575497655884079931) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1446996052824527350343252771927566397333005178670278500895064953323696533852825028491858417805098941280148266995781582272121090171*i+11301721083669844751432055296724481868008069574488375519296019375542162361403564482775643885165943123275891969683277793304455448108)*x + (2293189947451658235440797286726824341289620208149544235961784704016722714002909162225163161643639882116901791551557650871905475397*i+5677083180240979007879573903810966145601867939762832108613651865168771744099477096226863907483343221262580058761182601144664198633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1446996052824527350343252771927566397333005178670278500895064953323696533852825028491858417805098941280148266995781582272121090171*i+11301721083669844751432055296724481868008069574488375519296019375542162361403564482775643885165943123275891969683277793304455448108)*x + (2293189947451658235440797286726824341289620208149544235961784704016722714002909162225163161643639882116901791551557650871905475397*i+5677083180240979007879573903810966145601867939762832108613651865168771744099477096226863907483343221262580058761182601144664198633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19138925325581136966480175625234339012852285813005883163948239872723594077446032197042698123101548655611995307532887985360563957988*i+18125656849303301001325117023853336577209465952388580313602727935928101731552362032540771469354871520276371631305501010803809400547)*x + (9069179996439906095838889194737171482564915109389937896068221396830259410686008826097324263096938095617435866495697017543599237400*i+1580954875284276101555210095876176752939811246645516735368041600761008441949741353090237795486673387706088097203532595364413828985) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19138925325581136966480175625234339012852285813005883163948239872723594077446032197042698123101548655611995307532887985360563957988*i+18125656849303301001325117023853336577209465952388580313602727935928101731552362032540771469354871520276371631305501010803809400547)*x + (9069179996439906095838889194737171482564915109389937896068221396830259410686008826097324263096938095617435866495697017543599237400*i+1580954875284276101555210095876176752939811246645516735368041600761008441949741353090237795486673387706088097203532595364413828985) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7858614613684084170283817529537197446254742661343049086765973563200662362362500762764839631580396452586691543053669082851057627809*i+8804467098616232007716993659294742591736952500626047198502105409715849396724208630316857816970025546308618639606333744049272305896)*x + (12837713487145171095441638765233063810324427013573490089612380215175135462698948278098838410832168225752957890628825010942377393649*i+8175670211963840492290793109198368032248975275893848990139866571079404534060940073637390951681209576587008587220755680205651271155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7858614613684084170283817529537197446254742661343049086765973563200662362362500762764839631580396452586691543053669082851057627809*i+8804467098616232007716993659294742591736952500626047198502105409715849396724208630316857816970025546308618639606333744049272305896)*x + (12837713487145171095441638765233063810324427013573490089612380215175135462698948278098838410832168225752957890628825010942377393649*i+8175670211963840492290793109198368032248975275893848990139866571079404534060940073637390951681209576587008587220755680205651271155) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22213070639147900564019789680926381336349789383238441058401256033655857723338372588635203875002853215751040042173295149335594219727*i+327164837326421266836717263645268070946295659459455196657165171369653899878591573565732998335552704183270064776797303878183993551)*x + (4425558907902078045468348812569854759685872229118606509808811762419093650620444936750188036438065931980774400525951231122485113314*i+23474011526712088131098748541364951145944898059228229007587736301683344579644711942269326086678593983219570283393041367633313741499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22213070639147900564019789680926381336349789383238441058401256033655857723338372588635203875002853215751040042173295149335594219727*i+327164837326421266836717263645268070946295659459455196657165171369653899878591573565732998335552704183270064776797303878183993551)*x + (4425558907902078045468348812569854759685872229118606509808811762419093650620444936750188036438065931980774400525951231122485113314*i+23474011526712088131098748541364951145944898059228229007587736301683344579644711942269326086678593983219570283393041367633313741499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17051352182727655957393687849308702144912645565830840081542728271258479976262628910310140516967338668498882359108265478142391532702*i+17097601176435502055535197837271121378616721013652444229842844511724071484377757421292973962372097391039398163543618221208644755546)*x + (11449470764788623304710999757913389871310463312096246240551465587118524228409021586614630812751373514265224610149777601751922816994*i+2438004245585349000401268166765670042728802607696800422109528571509317428648981579088294683365550789417534936612235489226346091387) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17051352182727655957393687849308702144912645565830840081542728271258479976262628910310140516967338668498882359108265478142391532702*i+17097601176435502055535197837271121378616721013652444229842844511724071484377757421292973962372097391039398163543618221208644755546)*x + (11449470764788623304710999757913389871310463312096246240551465587118524228409021586614630812751373514265224610149777601751922816994*i+2438004245585349000401268166765670042728802607696800422109528571509317428648981579088294683365550789417534936612235489226346091387) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21100274656291163554673832293588366151837540309699206837768082938935966527194080760515861555730757702217156823215631557003844118910*i+7209827348715755139257517253799139605327148740958274335764915170909660961047568687749396682401331773513131107667721282501612410583)*x + (12479034144430618514062210273066991368008182080078078597230462085644762579736877278973166376345995493293951039208588103197919752433*i+12876238190401671169309545340155383604897042202537515035429186121057633750369451590490416149463344337845966668470235274022941005628) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21100274656291163554673832293588366151837540309699206837768082938935966527194080760515861555730757702217156823215631557003844118910*i+7209827348715755139257517253799139605327148740958274335764915170909660961047568687749396682401331773513131107667721282501612410583)*x + (12479034144430618514062210273066991368008182080078078597230462085644762579736877278973166376345995493293951039208588103197919752433*i+12876238190401671169309545340155383604897042202537515035429186121057633750369451590490416149463344337845966668470235274022941005628) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20092441258997605024101610040397911750179308331021386827825099985433908624424002016603332820995530545736048385866367435086936669217*i+17429076268680740921152110855693487083112038947232987625582399636390614207656024625846909064338671833397185490142053868026981607238)*x + (11191371289214356915712716017837077295026715661854255377184570442758622542363083176708800145437409834117949240011844345755731909297*i+10353319322925838234948087486411271069571568127669940158690490232627416560182842430705800875255673500280539722547316613095318874336) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20092441258997605024101610040397911750179308331021386827825099985433908624424002016603332820995530545736048385866367435086936669217*i+17429076268680740921152110855693487083112038947232987625582399636390614207656024625846909064338671833397185490142053868026981607238)*x + (11191371289214356915712716017837077295026715661854255377184570442758622542363083176708800145437409834117949240011844345755731909297*i+10353319322925838234948087486411271069571568127669940158690490232627416560182842430705800875255673500280539722547316613095318874336) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18354533883683117965561841695143529154084428815882312031813710824699034213644049231164051389933946586601088430245718949384679938234*i+11297406142108356919021121607429677949682733758738691898027241993462445658706642600335183686714086426194956282755091807143738985854)*x + (16410102861092777108480854778162163068550050464764550778615423036774838260210385201767451717696228480205515557343278300968560937112*i+15966351011045080356976598167059356599721672247552747599764870663376993993155525408826371917084909695038201924527812310946175786617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18354533883683117965561841695143529154084428815882312031813710824699034213644049231164051389933946586601088430245718949384679938234*i+11297406142108356919021121607429677949682733758738691898027241993462445658706642600335183686714086426194956282755091807143738985854)*x + (16410102861092777108480854778162163068550050464764550778615423036774838260210385201767451717696228480205515557343278300968560937112*i+15966351011045080356976598167059356599721672247552747599764870663376993993155525408826371917084909695038201924527812310946175786617) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6597887655208171321057857442733835002349198531481240419943416622161609446073497008574091904801657142407165180959904369300349573877*i+8101661250312085690622881444558214148200759252744034281574747540308074265196710490660067268456457895951732223456581016631328794003)*x + (23134594354669616723171871731658430807001350550221568513921088584187278166937015872682130200089288337906434018617266244997637389489*i+14461789913993259575201107551803625802392054971260280766188070507252759388729942399359981039746559621756421678076030871083474896401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6597887655208171321057857442733835002349198531481240419943416622161609446073497008574091904801657142407165180959904369300349573877*i+8101661250312085690622881444558214148200759252744034281574747540308074265196710490660067268456457895951732223456581016631328794003)*x + (23134594354669616723171871731658430807001350550221568513921088584187278166937015872682130200089288337906434018617266244997637389489*i+14461789913993259575201107551803625802392054971260280766188070507252759388729942399359981039746559621756421678076030871083474896401) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (427773405185952102302069598434498523286021747746198473720174473973159894121020501965580020524589932623850845606217944670033054105*i+4257632123009832709192222940768930560844635422230864583041786497129836077238720906041726113475779871967996407679304410218063812466)*x + (1370821405557149700153225586175950905203586389881304891550314052210746469077176146337020727477155537948555154170268946237137209197*i+17014665331409805698465768001230705465319446200030523238515242343924471767938561769924884968862628759607881793413440401942952413981) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (427773405185952102302069598434498523286021747746198473720174473973159894121020501965580020524589932623850845606217944670033054105*i+4257632123009832709192222940768930560844635422230864583041786497129836077238720906041726113475779871967996407679304410218063812466)*x + (1370821405557149700153225586175950905203586389881304891550314052210746469077176146337020727477155537948555154170268946237137209197*i+17014665331409805698465768001230705465319446200030523238515242343924471767938561769924884968862628759607881793413440401942952413981) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21225129798675889062428670583979556675606847044016688210828413021558470051141091525134807053778156872875618046706507418719660379408*i+2578088695988786171744107216498421436406229500286927488089909316026927388829046189868695258243467157356285467174393993308392666890)*x + (15913466533502916439203901374930519276110603230179305648434316232328796595468293427149118344956191036199032348124840126876103664826*i+5325956290451263987231224662880499832519051820786602492376083655931021175718523576514774582225343097402076273220493626338802108471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21225129798675889062428670583979556675606847044016688210828413021558470051141091525134807053778156872875618046706507418719660379408*i+2578088695988786171744107216498421436406229500286927488089909316026927388829046189868695258243467157356285467174393993308392666890)*x + (15913466533502916439203901374930519276110603230179305648434316232328796595468293427149118344956191036199032348124840126876103664826*i+5325956290451263987231224662880499832519051820786602492376083655931021175718523576514774582225343097402076273220493626338802108471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15456676560931478512769739397600484403216443801950252736166229186332010369378996237268741632670266406223821304748103508692754523536*i+16391028750860105300503127900951284860343266792317858638489546357131502370950310806775012458000159262029533267769646207626608176322)*x + (7581570694463931811111183476804007039539290178648232526332288792364155743975505904186358627805741922747214128608572997168607406552*i+21081227359169094962223675569368187649540430043118674191650390847099517542066245830392405233029124743050462140230454306597600551297) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15456676560931478512769739397600484403216443801950252736166229186332010369378996237268741632670266406223821304748103508692754523536*i+16391028750860105300503127900951284860343266792317858638489546357131502370950310806775012458000159262029533267769646207626608176322)*x + (7581570694463931811111183476804007039539290178648232526332288792364155743975505904186358627805741922747214128608572997168607406552*i+21081227359169094962223675569368187649540430043118674191650390847099517542066245830392405233029124743050462140230454306597600551297) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16818377900191467968592371951756164887153536652012637949578653871249826566549577769212812556172050626334264556871948667408211968183*i+14788807851580412896645257660242426669650527011063712258190481052602877249907804971249988593405359276559210838625099868506716091708)*x + (11942264293486064307006053981023664755287207845504151676066341706382437022462533261795138323749828462125116208820781390505238377076*i+21326352342346916111462764286449720753248452408257455205966895269434052697896900032540502330667000700253904133196760532420206684954) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16818377900191467968592371951756164887153536652012637949578653871249826566549577769212812556172050626334264556871948667408211968183*i+14788807851580412896645257660242426669650527011063712258190481052602877249907804971249988593405359276559210838625099868506716091708)*x + (11942264293486064307006053981023664755287207845504151676066341706382437022462533261795138323749828462125116208820781390505238377076*i+21326352342346916111462764286449720753248452408257455205966895269434052697896900032540502330667000700253904133196760532420206684954) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7249247580535065024835657310552160892173727254452885360095656061267289737889673015840169617217708515452980475726701075254774703547*i+9652785139556726997241621913854655945897783252326342606378917688239125792023374838520764927707935435108865561509616620849251831360)*x + (18639865256347236669444210109293388080524733308778717014270149851169221016516705276205673721616216022891587228234154531201244987097*i+3569513583849418177673951798806891403971060589684212134607330149648115235563751053645763830331743876386818197943379218552550933171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7249247580535065024835657310552160892173727254452885360095656061267289737889673015840169617217708515452980475726701075254774703547*i+9652785139556726997241621913854655945897783252326342606378917688239125792023374838520764927707935435108865561509616620849251831360)*x + (18639865256347236669444210109293388080524733308778717014270149851169221016516705276205673721616216022891587228234154531201244987097*i+3569513583849418177673951798806891403971060589684212134607330149648115235563751053645763830331743876386818197943379218552550933171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15980315637666270092587998960295531380286147500835342961807614262263508322765572034651769739673921087143160646638772410692125862814*i+20942163814380383661618054348794303673332184470608613012357909388758455924421576599738886699393561212228451716528400214019144942024)*x + (12299048311729268466909921523326856465781407541339350904156756087051377110080781048811644180309653281762374651136986099182059740301*i+15774763016657466526843409509487941718870967941767813391472465797865175929400210170076473748871306240352228311894997885207217142961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15980315637666270092587998960295531380286147500835342961807614262263508322765572034651769739673921087143160646638772410692125862814*i+20942163814380383661618054348794303673332184470608613012357909388758455924421576599738886699393561212228451716528400214019144942024)*x + (12299048311729268466909921523326856465781407541339350904156756087051377110080781048811644180309653281762374651136986099182059740301*i+15774763016657466526843409509487941718870967941767813391472465797865175929400210170076473748871306240352228311894997885207217142961) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4423176754935831977555242175323756224922923121218573092501796727836962966094109140667536056980258237805913692760129194956146634890*i+11084811990356456837509377453173175466984819229136324728977224978828052971515941263828882147127124723863156426252505799929424851560)*x + (2930377598350084225648178602733452298802760137541636649274808773049800870136347266517917236592176800821710848743385044964479960473*i+16423465632227275385359998430257472778432866097989060268155986401356746820659647720050585994112410895880792625444313552088036707973) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4423176754935831977555242175323756224922923121218573092501796727836962966094109140667536056980258237805913692760129194956146634890*i+11084811990356456837509377453173175466984819229136324728977224978828052971515941263828882147127124723863156426252505799929424851560)*x + (2930377598350084225648178602733452298802760137541636649274808773049800870136347266517917236592176800821710848743385044964479960473*i+16423465632227275385359998430257472778432866097989060268155986401356746820659647720050585994112410895880792625444313552088036707973) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20893046421693288179931039525108251934006711641347564971018627393728194803166484507405705712538039718187421069284580254849709239226*i+24016782019327495994886943283156303257498761251220648902085249980796884593908384881510614112557440113085523993335299819063835859944)*x + (7692404862072299301442021160195102545054715915553734540447693869095123693754487235785609672375811632555853728252932163055631501494*i+15479009841702536938972794580613839487463925828618828712586628813750886142127538700904397172083214046936398585992517332124489324804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20893046421693288179931039525108251934006711641347564971018627393728194803166484507405705712538039718187421069284580254849709239226*i+24016782019327495994886943283156303257498761251220648902085249980796884593908384881510614112557440113085523993335299819063835859944)*x + (7692404862072299301442021160195102545054715915553734540447693869095123693754487235785609672375811632555853728252932163055631501494*i+15479009841702536938972794580613839487463925828618828712586628813750886142127538700904397172083214046936398585992517332124489324804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19647727850446966912495241613824388937888345198974472805936458216671167747968974327569052594888329292533276934109923442943134320077*i+6908816719938490718180070617828141490149375181415682562994653910409095385556029183170891051962401622237955699534300635984486078549)*x + (17180968441995312818946051611756672784029774077223538556331977756104111533360335527263233309524236744558975384339678788377727075398*i+9271736977419621549713721630961348756957316727864406445276291487885140509994075047091229809357485946262409108133779028487942264091) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19647727850446966912495241613824388937888345198974472805936458216671167747968974327569052594888329292533276934109923442943134320077*i+6908816719938490718180070617828141490149375181415682562994653910409095385556029183170891051962401622237955699534300635984486078549)*x + (17180968441995312818946051611756672784029774077223538556331977756104111533360335527263233309524236744558975384339678788377727075398*i+9271736977419621549713721630961348756957316727864406445276291487885140509994075047091229809357485946262409108133779028487942264091) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18831392766833171084921938423445208364262586457208284907387655674981164540263417523341258643741866437375639266463665816887581257305*i+3523297151176784990550399994455166522856984843886178737874816520537652551949824633177315008292398836787668173167022637567298201487)*x + (2126383722979943874275520918894277006718324777104783167011741495490809484156173297773259010665651226337908645046739798824202553893*i+857896702835592598818674590104184100894865704562645300827931882015881198988297990721538626631548487984884548405107205787319516655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18831392766833171084921938423445208364262586457208284907387655674981164540263417523341258643741866437375639266463665816887581257305*i+3523297151176784990550399994455166522856984843886178737874816520537652551949824633177315008292398836787668173167022637567298201487)*x + (2126383722979943874275520918894277006718324777104783167011741495490809484156173297773259010665651226337908645046739798824202553893*i+857896702835592598818674590104184100894865704562645300827931882015881198988297990721538626631548487984884548405107205787319516655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (745634368362341918806731022942956366807572043128595146581902372032627929341530758717761013167226679226402357478993845145103756051*i+13792771106144320327269926874450689082400166655802855822143246463712278609607673592331551802177934250519589834767756037660107728559)*x + (6572198439513523820152155280959001167772791566450098393486086626950030843055301711881754638904591379604361441376338686644762354969*i+17507044273337855769372749862508105794455536148006620745078337900870659148849212545036342933240407409504507556735283697338197194133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (745634368362341918806731022942956366807572043128595146581902372032627929341530758717761013167226679226402357478993845145103756051*i+13792771106144320327269926874450689082400166655802855822143246463712278609607673592331551802177934250519589834767756037660107728559)*x + (6572198439513523820152155280959001167772791566450098393486086626950030843055301711881754638904591379604361441376338686644762354969*i+17507044273337855769372749862508105794455536148006620745078337900870659148849212545036342933240407409504507556735283697338197194133) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7821384847361177435540524841392183167649004637624064150982516660279777402224018181062674827837566273014638632758059477990163241035*i+7557299185744592109743855945718198266787182590110195981597224322355505477059800977700067088452482859545172548908038559528000972183)*x + (7806985418568322282393616133661893270349762647356255403525483629358272467847434839619504524925258928576102147278741579573343911402*i+14483370301490122280617790090051049056785704200890510906092984289240433668301229444203769487790936124202689863722408017836049026188) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7821384847361177435540524841392183167649004637624064150982516660279777402224018181062674827837566273014638632758059477990163241035*i+7557299185744592109743855945718198266787182590110195981597224322355505477059800977700067088452482859545172548908038559528000972183)*x + (7806985418568322282393616133661893270349762647356255403525483629358272467847434839619504524925258928576102147278741579573343911402*i+14483370301490122280617790090051049056785704200890510906092984289240433668301229444203769487790936124202689863722408017836049026188) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19583573611511777752462667551662949949593544023123951851917631749732587525670635563911079704222098600703881230942645260450181777710*i+9291797400828118752759281148105346241380332719933739023737522576647319187580615862104450305468988144058107669613069920543250312559)*x + (10287204701585124540388475844925141747478107136249678204332648488516854976355924559814322377117033961537885756343121099883969189620*i+6698935796796281330210634128398840508253060475049904502235728738262937104225171429543512530992021266571151180232775445454759051398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19583573611511777752462667551662949949593544023123951851917631749732587525670635563911079704222098600703881230942645260450181777710*i+9291797400828118752759281148105346241380332719933739023737522576647319187580615862104450305468988144058107669613069920543250312559)*x + (10287204701585124540388475844925141747478107136249678204332648488516854976355924559814322377117033961537885756343121099883969189620*i+6698935796796281330210634128398840508253060475049904502235728738262937104225171429543512530992021266571151180232775445454759051398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17203240131801973798385549930093450251421729795088304860094431423153471377035581230003120273718057807492365388600597318175796340530*i+22651834349793441124008975337268947170538036731989474094364028727413652433893040064033081355302576493767380299872547697552426719230)*x + (17925166740683214956315415831831722488993934448679871931736802788643193275098329824352736897511691646559079659817976719616511532151*i+17436759237780630079127412701181064076994212291048172237946451309095455497893316305146244351231393633439032450354441750900198233247) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17203240131801973798385549930093450251421729795088304860094431423153471377035581230003120273718057807492365388600597318175796340530*i+22651834349793441124008975337268947170538036731989474094364028727413652433893040064033081355302576493767380299872547697552426719230)*x + (17925166740683214956315415831831722488993934448679871931736802788643193275098329824352736897511691646559079659817976719616511532151*i+17436759237780630079127412701181064076994212291048172237946451309095455497893316305146244351231393633439032450354441750900198233247) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18517834687520550217115646916754725894997004773498727911930135503463444407266754303666451550403749153769947736846843713490071852224*i+13498357407345961759821740601235793522572109243257394318635433702431162819086240990130977687406077965337407643101024553645431842538)*x + (21365480004604434275050043680016660490625120903098672292779546163789506571232510312507265502618431906254802631008712989516501382239*i+16885441545442353467346759678741610108333526979877481831503619352204560102537557570698120251004268931604727047450595190395628866428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18517834687520550217115646916754725894997004773498727911930135503463444407266754303666451550403749153769947736846843713490071852224*i+13498357407345961759821740601235793522572109243257394318635433702431162819086240990130977687406077965337407643101024553645431842538)*x + (21365480004604434275050043680016660490625120903098672292779546163789506571232510312507265502618431906254802631008712989516501382239*i+16885441545442353467346759678741610108333526979877481831503619352204560102537557570698120251004268931604727047450595190395628866428) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2029958854646882638764183982656836833300753828411410619303285580852148863702058475167005069839446216752182785581948843941812855530*i+13357928182590803620586813278438606570048148860880802236514570789918687160883751434740606428252314543220798187328237231893199610186)*x + (9616795638585198199690338753725434123775154717439269248508085556013493034789477848211950629342760749977843462894301853838935449492*i+18093926957643375994144451413023935615422005547608687493422749429949973581677393159394845183266592016119056153045698674930916761678) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2029958854646882638764183982656836833300753828411410619303285580852148863702058475167005069839446216752182785581948843941812855530*i+13357928182590803620586813278438606570048148860880802236514570789918687160883751434740606428252314543220798187328237231893199610186)*x + (9616795638585198199690338753725434123775154717439269248508085556013493034789477848211950629342760749977843462894301853838935449492*i+18093926957643375994144451413023935615422005547608687493422749429949973581677393159394845183266592016119056153045698674930916761678) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18616011734157723805486881405693123824110643483650846589849149953720573429267875873827962339389260401380953480063965917092038526736*i+18628529586477965775812721534057488217120135852346267901851250095829875267912248669464281634497683141443140312126540610129670806827)*x + (4374483323418775384556629575711357926270533115706909063309968774290425768856122097223806960794403481319172456174437407806518851003*i+3131335912970314441593551937233897021474178630695658934912570704987208596345683207616329629930835761500723747661170279812243448702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18616011734157723805486881405693123824110643483650846589849149953720573429267875873827962339389260401380953480063965917092038526736*i+18628529586477965775812721534057488217120135852346267901851250095829875267912248669464281634497683141443140312126540610129670806827)*x + (4374483323418775384556629575711357926270533115706909063309968774290425768856122097223806960794403481319172456174437407806518851003*i+3131335912970314441593551937233897021474178630695658934912570704987208596345683207616329629930835761500723747661170279812243448702) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6040115650176546704511450458798169417911073620742060090060227802947078399667389410361621126884602796829524589630213479238165225714*i+7935663162032524433450441981028114836335060630019246433423044521049582373643877403593455556222032587412161128186512673217980167595)*x + (3263869188055525477047493259606366070669476497467790831022646773222536970624420020775451572740968434231358882847972915368819122218*i+1843941182137507145430960283931414252432515515200335325258362615196513463056318777055493468526140253856265453305226289377839084176) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6040115650176546704511450458798169417911073620742060090060227802947078399667389410361621126884602796829524589630213479238165225714*i+7935663162032524433450441981028114836335060630019246433423044521049582373643877403593455556222032587412161128186512673217980167595)*x + (3263869188055525477047493259606366070669476497467790831022646773222536970624420020775451572740968434231358882847972915368819122218*i+1843941182137507145430960283931414252432515515200335325258362615196513463056318777055493468526140253856265453305226289377839084176) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3031537326503026513404144556671525465802294031745198613194274551699548120459751621793739624288821291908546619361340409141426436651*i+1233257555620312447075870244201781494137707836284892684964793781794760949566864098689345101937185887283093159538066331338156856047)*x + (1328837273614402478736471174067802140779474311919825866365058736159347812344512220429083158890598098430504295507085436135904109393*i+16231908878372029672731432819411966498528291167074218623009856211131504680045990214362462850010885584034993437117058994954317055999) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3031537326503026513404144556671525465802294031745198613194274551699548120459751621793739624288821291908546619361340409141426436651*i+1233257555620312447075870244201781494137707836284892684964793781794760949566864098689345101937185887283093159538066331338156856047)*x + (1328837273614402478736471174067802140779474311919825866365058736159347812344512220429083158890598098430504295507085436135904109393*i+16231908878372029672731432819411966498528291167074218623009856211131504680045990214362462850010885584034993437117058994954317055999) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (738006132473037279864328083987862168117301798549447838665676278985642755791166908666962513469498771237947468305455925781540876244*i+9254015700265008022941734203535890668747839594325402412118708670621964559077933454177288174893012169817848156945681903151569235343)*x + (20405316135179836984877253269235708665104892819529456533274114426858231670387878827670069082297564038508941570092219251788840299119*i+20314451414024735204249362052210594008238659209527930633417759034379391243510476892696103308110225613688332503003665514612235300948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (738006132473037279864328083987862168117301798549447838665676278985642755791166908666962513469498771237947468305455925781540876244*i+9254015700265008022941734203535890668747839594325402412118708670621964559077933454177288174893012169817848156945681903151569235343)*x + (20405316135179836984877253269235708665104892819529456533274114426858231670387878827670069082297564038508941570092219251788840299119*i+20314451414024735204249362052210594008238659209527930633417759034379391243510476892696103308110225613688332503003665514612235300948) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13554502422805203497885067449459802354401586336299861635229477583054352388993289778029018928145924150742874015042237614715746988701*i+18606096013975430226686363601096571749876804015502956936675455713401321980472245090743763036674756853788934592422795358448914946744)*x + (10470378686397508388579253401580522201828506336823063357027119524489379963529012169303141637058541537776786381425248302417124253458*i+17197170102890590424033731077274796781560611920148925982549077117760815579218121909075139778654963022628207317640794659337621162730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13554502422805203497885067449459802354401586336299861635229477583054352388993289778029018928145924150742874015042237614715746988701*i+18606096013975430226686363601096571749876804015502956936675455713401321980472245090743763036674756853788934592422795358448914946744)*x + (10470378686397508388579253401580522201828506336823063357027119524489379963529012169303141637058541537776786381425248302417124253458*i+17197170102890590424033731077274796781560611920148925982549077117760815579218121909075139778654963022628207317640794659337621162730) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17057466507769769853960584749576312892583951580936746100568224624697114429787431043795127074814296648147840168808466936652754308058*i+500828674954883646166968548729166845247561770044149736872911673136389026754003910575948201705027254574059094725684078385569656998)*x + (23753907830494492698223014877767996341937133001816113482034955417974142816475895991322598813983581782488986507934711366618801541346*i+15206851929805424138368593749414290459425730986852829403853397868984570120789464870508519693369109297610713069765219703956151790476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17057466507769769853960584749576312892583951580936746100568224624697114429787431043795127074814296648147840168808466936652754308058*i+500828674954883646166968548729166845247561770044149736872911673136389026754003910575948201705027254574059094725684078385569656998)*x + (23753907830494492698223014877767996341937133001816113482034955417974142816475895991322598813983581782488986507934711366618801541346*i+15206851929805424138368593749414290459425730986852829403853397868984570120789464870508519693369109297610713069765219703956151790476) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8516181407536900569997136632541583463651197342623648954650305713787021172532355072420977551948930688419121257662182556456943181415*i+8090679115542766797246815653908604409410005252933357669065238462929238918386926756792465061181199571607224540750742134927198444114)*x + (1557725514254039137435898119607984642028186917303508195978759760563324789316048402822305443376295204771529860140936345057846797547*i+2675940154635670566139253546515527783096628736166261870158298333800835705074001255946830935122463316077716047618844766047848005221) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8516181407536900569997136632541583463651197342623648954650305713787021172532355072420977551948930688419121257662182556456943181415*i+8090679115542766797246815653908604409410005252933357669065238462929238918386926756792465061181199571607224540750742134927198444114)*x + (1557725514254039137435898119607984642028186917303508195978759760563324789316048402822305443376295204771529860140936345057846797547*i+2675940154635670566139253546515527783096628736166261870158298333800835705074001255946830935122463316077716047618844766047848005221) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16255985383506517092345673975934813513344538622702066298375440002142482762922624368814242601600161137243084222930793958358390565149*i+6301510558102134728211615496408255886660088216392509522771216628706997663147966193609893343246804140999246695488402720666873913525)*x + (4677057613827222596077238066381556642241621761069864328439077857111147642957385147265069810427623192359192510469889832235833792315*i+9179755208455759917875214155320014698250487923269955687918776902729047471744279839306942505564857500123147219893882132646373002211) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16255985383506517092345673975934813513344538622702066298375440002142482762922624368814242601600161137243084222930793958358390565149*i+6301510558102134728211615496408255886660088216392509522771216628706997663147966193609893343246804140999246695488402720666873913525)*x + (4677057613827222596077238066381556642241621761069864328439077857111147642957385147265069810427623192359192510469889832235833792315*i+9179755208455759917875214155320014698250487923269955687918776902729047471744279839306942505564857500123147219893882132646373002211) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3049993827267497876388732400858985193148002789088409159674616786223919055217185763134494591121120732836238303269430210312555512203*i+4385872374509407235507026164630696783863635374292075483867558843924622894090343070365509191749218258242667896998576841506602463879)*x + (21191335674444171678279410578318576021475302174831140162710143576593865362396445966827691834453065281760101184565363121931595381472*i+9767486836965866713178612705588878186546531775895953628508245414473621813487257048048073350279239769681608735839459001508573785585) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3049993827267497876388732400858985193148002789088409159674616786223919055217185763134494591121120732836238303269430210312555512203*i+4385872374509407235507026164630696783863635374292075483867558843924622894090343070365509191749218258242667896998576841506602463879)*x + (21191335674444171678279410578318576021475302174831140162710143576593865362396445966827691834453065281760101184565363121931595381472*i+9767486836965866713178612705588878186546531775895953628508245414473621813487257048048073350279239769681608735839459001508573785585) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2130389784177415577689454792302743449330601893563564381558570376044434669881260886760410280358314624864476589995769751741748947406*i+10961059658178121464951966656947206572337564611150145818459379487155353681252136084600405864190123742145319745332712645965398049654)*x + (1428186452452249061302781435395108970925202379016669712954428892003488415533094415744696079472920374576178041658289905290904633884*i+14844887182014269318680088202385538328579176979724878496122884503906621726868730552703853314640482563532750476971070489133696561823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2130389784177415577689454792302743449330601893563564381558570376044434669881260886760410280358314624864476589995769751741748947406*i+10961059658178121464951966656947206572337564611150145818459379487155353681252136084600405864190123742145319745332712645965398049654)*x + (1428186452452249061302781435395108970925202379016669712954428892003488415533094415744696079472920374576178041658289905290904633884*i+14844887182014269318680088202385538328579176979724878496122884503906621726868730552703853314640482563532750476971070489133696561823) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7809793799696551118746145001442600707920998456485244779086889686201559309483789371379035413482484178452124341572771258030194156622*i+12311549293636663221820314752541577355081744958161906596756146105264578548372818403632037941852500248568283727544540009310177888366)*x + (16785868058771121245437278468142849056884950570720313745461561486901814068929578214622147633354716790015842498662681766024973577718*i+11821927511194822466543126510730278190097673961134241416249751557936147848134026812075401261427709816573590806625180117015818590645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7809793799696551118746145001442600707920998456485244779086889686201559309483789371379035413482484178452124341572771258030194156622*i+12311549293636663221820314752541577355081744958161906596756146105264578548372818403632037941852500248568283727544540009310177888366)*x + (16785868058771121245437278468142849056884950570720313745461561486901814068929578214622147633354716790015842498662681766024973577718*i+11821927511194822466543126510730278190097673961134241416249751557936147848134026812075401261427709816573590806625180117015818590645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3491921020464661506483738479866611764409666509607204034052848667746400931217116580087982671473449551087625085804456619679682906357*i+22962557040013922836924879947082983225778725143035343879968885166037007958059233496375884350590410380180900972247119499420488272416)*x + (10913954809796136226137993762028936060918343855054639870401081532769660775600665138471773966435494599603582530922213699214258788785*i+22544952140954466157488298950494169941119029533548254142347708629859613373801347770785986233390883654491213751320357021922319797977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3491921020464661506483738479866611764409666509607204034052848667746400931217116580087982671473449551087625085804456619679682906357*i+22962557040013922836924879947082983225778725143035343879968885166037007958059233496375884350590410380180900972247119499420488272416)*x + (10913954809796136226137993762028936060918343855054639870401081532769660775600665138471773966435494599603582530922213699214258788785*i+22544952140954466157488298950494169941119029533548254142347708629859613373801347770785986233390883654491213751320357021922319797977) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8191266176231988935297522794471656857000483211576374917763206910719621573904159097564164419294606071847620300080373497075157285228*i+7609216934382577779340761461666782414985415484467676006166121981198407685966344544783886717703632395505304073270124803157472821599)*x + (18744876474482107886119895645552703071799370160435989576636107158342277738571313747525542818818796034074007708727830936769609803056*i+1203496206175676102925760786402723764308452611486405618824251923194152424038688935644181087454256779525504543660595921735880295825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8191266176231988935297522794471656857000483211576374917763206910719621573904159097564164419294606071847620300080373497075157285228*i+7609216934382577779340761461666782414985415484467676006166121981198407685966344544783886717703632395505304073270124803157472821599)*x + (18744876474482107886119895645552703071799370160435989576636107158342277738571313747525542818818796034074007708727830936769609803056*i+1203496206175676102925760786402723764308452611486405618824251923194152424038688935644181087454256779525504543660595921735880295825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6373335081555961041717858573682751595184172638349419413971884437244008613097307813026247284496727727283638002629593386415443097385*i+12225412210761372564031014484372996207573505543919476553550850219800575731246567927381468173191130609680519547565745882454652995759)*x + (3534649775982818311465810824299972593932896327565081680029498868510548709312091730529077795173222916238172163645009267055042971358*i+23938482639075072197911321460283970406408034828136800641480411904886020515729267136641443495380738182249573225784745326417426856950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6373335081555961041717858573682751595184172638349419413971884437244008613097307813026247284496727727283638002629593386415443097385*i+12225412210761372564031014484372996207573505543919476553550850219800575731246567927381468173191130609680519547565745882454652995759)*x + (3534649775982818311465810824299972593932896327565081680029498868510548709312091730529077795173222916238172163645009267055042971358*i+23938482639075072197911321460283970406408034828136800641480411904886020515729267136641443495380738182249573225784745326417426856950) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15563727871331859552305970259255395815116873148113314863244521426885165220108538906677635966528145084567217307464199244326581255652*i+6297640777465589909383036605432912964420899763424530300455414695047833287296138739413054699234231072318109739827443524653264836611)*x + (21377159619180066546226219037554597853073002338815837009522699386093918344820993267164203694171931354406946937878488820151665437875*i+16419562357039456167895009652488306424932359213951117158682724396958978417475302159965666352321311781326509964953868286195009968383) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15563727871331859552305970259255395815116873148113314863244521426885165220108538906677635966528145084567217307464199244326581255652*i+6297640777465589909383036605432912964420899763424530300455414695047833287296138739413054699234231072318109739827443524653264836611)*x + (21377159619180066546226219037554597853073002338815837009522699386093918344820993267164203694171931354406946937878488820151665437875*i+16419562357039456167895009652488306424932359213951117158682724396958978417475302159965666352321311781326509964953868286195009968383) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8488575654334423268730273510145731757923603178550912896980699768246530528001224559415669336805437616597846618488562674202157518385*i+23707388055102937297973737154466352559036481263019039839219235038575107371946577168313197549070393726422781782426065596521403478509)*x + (8848284959710098984074257095143876707180237798430330314072673620676129799789896365369574699856349882530436397196297676379668814819*i+13950940541050719518681284331593707850260794200347964175689212705937223683066908391060019889276954796655824061018277805576925167714) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8488575654334423268730273510145731757923603178550912896980699768246530528001224559415669336805437616597846618488562674202157518385*i+23707388055102937297973737154466352559036481263019039839219235038575107371946577168313197549070393726422781782426065596521403478509)*x + (8848284959710098984074257095143876707180237798430330314072673620676129799789896365369574699856349882530436397196297676379668814819*i+13950940541050719518681284331593707850260794200347964175689212705937223683066908391060019889276954796655824061018277805576925167714) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3986671918576839853963842701372968418330985185707890701571778939843711554240449260738676591250286461632046324340374759828906481396*i+12922512352904326981113218118698782766386185600236957088849393799850796912336670136020972338310331367532455912046713764410881048614)*x + (17063683980181000908260316620528241654400948873693485219073931169983373586472773381681052319517022866272893705931543971301473971747*i+7359239108171645666510948380214892156399276915794092816796379311562375694575434719169648694529901891183364916157787179915010518009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3986671918576839853963842701372968418330985185707890701571778939843711554240449260738676591250286461632046324340374759828906481396*i+12922512352904326981113218118698782766386185600236957088849393799850796912336670136020972338310331367532455912046713764410881048614)*x + (17063683980181000908260316620528241654400948873693485219073931169983373586472773381681052319517022866272893705931543971301473971747*i+7359239108171645666510948380214892156399276915794092816796379311562375694575434719169648694529901891183364916157787179915010518009) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23101330229193688939690987375684628377945872474159087951972044669141676375178921034419197350592390532279471856927066389393554536927*i+19439852868787596531373590645007942412933495169853268106701455696269669851254586947229309626140934779669007867307644399662614825725)*x + (21522349754876476333268478019039063686172179523840875935321421313495386185095780278833561464733999212780198001074779502073575370550*i+15423398526060626477986671719794109331151056225622194152725910007368015901412372560992944086821336763831703110262850435030261456720) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23101330229193688939690987375684628377945872474159087951972044669141676375178921034419197350592390532279471856927066389393554536927*i+19439852868787596531373590645007942412933495169853268106701455696269669851254586947229309626140934779669007867307644399662614825725)*x + (21522349754876476333268478019039063686172179523840875935321421313495386185095780278833561464733999212780198001074779502073575370550*i+15423398526060626477986671719794109331151056225622194152725910007368015901412372560992944086821336763831703110262850435030261456720) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9740237431656906799995635237491764778444747735954109543355535352011312914543638016566660989087069379500274165811246905301616552592*i+14775321400310150518416593202192584249390303711817092037073634319758216129155813487949851767784184102855001269877979663340318250017)*x + (20767301007653992532978192986260768407419188389164826278228600213355779497078983748928128831291748394829493853321527437026340606909*i+5844264227844292560055213637661283507660664413882818242469017084917173811110958015693909660984094584670793917681840437119770317010) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9740237431656906799995635237491764778444747735954109543355535352011312914543638016566660989087069379500274165811246905301616552592*i+14775321400310150518416593202192584249390303711817092037073634319758216129155813487949851767784184102855001269877979663340318250017)*x + (20767301007653992532978192986260768407419188389164826278228600213355779497078983748928128831291748394829493853321527437026340606909*i+5844264227844292560055213637661283507660664413882818242469017084917173811110958015693909660984094584670793917681840437119770317010) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3375448919934500295492958876779555108685973164480796305630551162354630405681185163070379273095989173320227066207122548055865935337*i+7657193692324147311203859485139215583771379805757682859413766863376894889504440466116123187653225081698769965635251038577880136219)*x + (19146451945459546115673618521577780128289659759730447375461658787663674698731508124961720486744963820274798331355812090412818019124*i+4024242150132855921735809264713799350026523989095821483788551588781003296142314019612172894518605405458251766688730287402405673229) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3375448919934500295492958876779555108685973164480796305630551162354630405681185163070379273095989173320227066207122548055865935337*i+7657193692324147311203859485139215583771379805757682859413766863376894889504440466116123187653225081698769965635251038577880136219)*x + (19146451945459546115673618521577780128289659759730447375461658787663674698731508124961720486744963820274798331355812090412818019124*i+4024242150132855921735809264713799350026523989095821483788551588781003296142314019612172894518605405458251766688730287402405673229) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23662831555580154692504446216878439564741903253146809294213116701216035247777524002083157614450180009814872816899811449366065222427*i+210995661872662596616393466135587192134609043503845052667212687752638651843383290041990941889908097512672679570410623382054803245)*x + (10801957292206343168257205506265812026187225112008806797736452497960884396628830161621041592864601919568479412917660868113523020092*i+19655415206096985892597872928436405419545889063047384824779722932287618203765189532556082235700476198649361432264723998464761220268) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23662831555580154692504446216878439564741903253146809294213116701216035247777524002083157614450180009814872816899811449366065222427*i+210995661872662596616393466135587192134609043503845052667212687752638651843383290041990941889908097512672679570410623382054803245)*x + (10801957292206343168257205506265812026187225112008806797736452497960884396628830161621041592864601919568479412917660868113523020092*i+19655415206096985892597872928436405419545889063047384824779722932287618203765189532556082235700476198649361432264723998464761220268) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3521554347485894895414032748276472235007227766251966061565483366493013967916192872389761270041641181544770661791227799506613611358*i+4520765889782728710676996880585080155826900058320382780415577902052207036084335875219344040839383803605876190583748539979928127464)*x + (23243901828319843126642398845299858866803596319778552278009872526725151218849481891924594963262349883118230426025249669798107043817*i+10265780072341597980694241246730408224465117675510663602363236766215656281355296474906704697267468367041401376893577183577431758919) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3521554347485894895414032748276472235007227766251966061565483366493013967916192872389761270041641181544770661791227799506613611358*i+4520765889782728710676996880585080155826900058320382780415577902052207036084335875219344040839383803605876190583748539979928127464)*x + (23243901828319843126642398845299858866803596319778552278009872526725151218849481891924594963262349883118230426025249669798107043817*i+10265780072341597980694241246730408224465117675510663602363236766215656281355296474906704697267468367041401376893577183577431758919) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9186686796829070816628888837992740106057813568153918867679157852907657619518676309573277371882223436909205046345065946577726363439*i+5338094666440572931803460281987304525656239875493184593109344901864812355097810198444747805677475254394889968558133820628218786035)*x + (8083916392253737153011800772976766226918741323158045936891563285518859377713919332022665619817608446083659590299599127281783039829*i+21634630764892387192031643249133096299303855332877451769003886308006867075739850116670153114081775654482407465038608727632703493593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9186686796829070816628888837992740106057813568153918867679157852907657619518676309573277371882223436909205046345065946577726363439*i+5338094666440572931803460281987304525656239875493184593109344901864812355097810198444747805677475254394889968558133820628218786035)*x + (8083916392253737153011800772976766226918741323158045936891563285518859377713919332022665619817608446083659590299599127281783039829*i+21634630764892387192031643249133096299303855332877451769003886308006867075739850116670153114081775654482407465038608727632703493593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23462715890604729387061212533993740347556165729661118630948827968356667110831951050189451243741571441975533824746169763209691130063*i+22120863058258477672308558740524738287931606951112338059980455505066917966041413700494449018751441913885291938757408610231524271226)*x + (18073051295040048512185511349805773627381605091873492606727532427700980572826337476382100074768148615524415902097651876243960266442*i+13536473701813769230040041696786151535567407219214324427245056350587161283959781120957998078209523996591657152494790138657283975986) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23462715890604729387061212533993740347556165729661118630948827968356667110831951050189451243741571441975533824746169763209691130063*i+22120863058258477672308558740524738287931606951112338059980455505066917966041413700494449018751441913885291938757408610231524271226)*x + (18073051295040048512185511349805773627381605091873492606727532427700980572826337476382100074768148615524415902097651876243960266442*i+13536473701813769230040041696786151535567407219214324427245056350587161283959781120957998078209523996591657152494790138657283975986) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10011654250200783298033122469161178654672184438290583838691075678651851696001805711952991064094435345663093096751657660886384946645*i+11263223878755651379208963837078222888736915435265806388716629409281808693183452514942695919512978933187557357303090933465763690864)*x + (11877623376547769536516413217996319439706253658333927308481256384799674880735608634652429428778854482025615738449823404954627015913*i+13890245693529294263605651810390232729820362084580189309852640272707198218287357113452757284581921104030957836461468377856832180172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10011654250200783298033122469161178654672184438290583838691075678651851696001805711952991064094435345663093096751657660886384946645*i+11263223878755651379208963837078222888736915435265806388716629409281808693183452514942695919512978933187557357303090933465763690864)*x + (11877623376547769536516413217996319439706253658333927308481256384799674880735608634652429428778854482025615738449823404954627015913*i+13890245693529294263605651810390232729820362084580189309852640272707198218287357113452757284581921104030957836461468377856832180172) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8105316958424222943231048723864979117678458454440394815172232250297419919133045345844363512733145175238125652905271683875312170357*i+12185576730930162054439564293671545092853547611304734800837135915264803159303144071532218402517622062150395702258754626327190516708)*x + (11387220061105549182840765624729891785444336889070316330785249180783419686344960814308634800556991362179331358033694455950456988712*i+22283241041389389151221891045039821967255507180432160739740396148440726377356841151672292468411849659462556396707457687323617920466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8105316958424222943231048723864979117678458454440394815172232250297419919133045345844363512733145175238125652905271683875312170357*i+12185576730930162054439564293671545092853547611304734800837135915264803159303144071532218402517622062150395702258754626327190516708)*x + (11387220061105549182840765624729891785444336889070316330785249180783419686344960814308634800556991362179331358033694455950456988712*i+22283241041389389151221891045039821967255507180432160739740396148440726377356841151672292468411849659462556396707457687323617920466) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21565977373265653608139031164453643785229396084579380707181787903471351551098905359256189799558268717825229349676133624502574173886*i+17982724732889807221097677662575116598067617909011570244916712989572637048192736616984629048478358629761394251866806647389176829418)*x + (182449847406180329912035850399209854034811541385845427160984515194614435841294847869602461126269506564867298636065019592166587849*i+3503680266586145047449659468131357646366809035866480308249311674039319648297691331738862953765061176571243400046597761781376228787) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21565977373265653608139031164453643785229396084579380707181787903471351551098905359256189799558268717825229349676133624502574173886*i+17982724732889807221097677662575116598067617909011570244916712989572637048192736616984629048478358629761394251866806647389176829418)*x + (182449847406180329912035850399209854034811541385845427160984515194614435841294847869602461126269506564867298636065019592166587849*i+3503680266586145047449659468131357646366809035866480308249311674039319648297691331738862953765061176571243400046597761781376228787) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11391054160323987011021478458822752941544002907847740845396750402104595455386498484542575406911863330197532991078394429599042222963*i+2235039589740345343021001112849724615486626629719562316800937694319279685483480040452206950738773647816157083947740940664204084071)*x + (13682417909216075481846429582464876555067209142066577740433409595474052167749889978062391523806548995969688819950248199262874781028*i+10571169657545830159174426036925819793162932822811842278213653391310178652368506299079626329787952863386173840920815180159388504222) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11391054160323987011021478458822752941544002907847740845396750402104595455386498484542575406911863330197532991078394429599042222963*i+2235039589740345343021001112849724615486626629719562316800937694319279685483480040452206950738773647816157083947740940664204084071)*x + (13682417909216075481846429582464876555067209142066577740433409595474052167749889978062391523806548995969688819950248199262874781028*i+10571169657545830159174426036925819793162932822811842278213653391310178652368506299079626329787952863386173840920815180159388504222) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22883058376561057589525015711135612196773711044413967057091546854130791008139738481396113807001214290021125042914007892331868572037*i+4185090287756420022648220712280511978301524898604071280255279054325165006533383348659968883936078087334621875491425428649278243042)*x + (19280318352539272085897344090531063347292509662755288490205148859572986553502337788825005814977465400819003736518593493308875122471*i+2257896302798325518585295609634929127461205910639407869125049681111428567821088932194583909709417974602737380700250283879359265110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22883058376561057589525015711135612196773711044413967057091546854130791008139738481396113807001214290021125042914007892331868572037*i+4185090287756420022648220712280511978301524898604071280255279054325165006533383348659968883936078087334621875491425428649278243042)*x + (19280318352539272085897344090531063347292509662755288490205148859572986553502337788825005814977465400819003736518593493308875122471*i+2257896302798325518585295609634929127461205910639407869125049681111428567821088932194583909709417974602737380700250283879359265110) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16945344511742808393002697567685663503337145630789342543049144869311910276073951085792866798316403865511710673352669383949610803344*i+8169417967282476404610909312435608062736067185860732081803757154333649819794444725843720378634660621168130424580209411540523614066)*x + (14182691166450348602367587607460272972752359118133942710468558584826254504264434445654293222341734106077150667952415384783014113692*i+5427107776403662700337256038378967634096943297417591168702757190357435542335555848387060538431785915650727049616750873407414202287) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16945344511742808393002697567685663503337145630789342543049144869311910276073951085792866798316403865511710673352669383949610803344*i+8169417967282476404610909312435608062736067185860732081803757154333649819794444725843720378634660621168130424580209411540523614066)*x + (14182691166450348602367587607460272972752359118133942710468558584826254504264434445654293222341734106077150667952415384783014113692*i+5427107776403662700337256038378967634096943297417591168702757190357435542335555848387060538431785915650727049616750873407414202287) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10576659583483676683694210570958134998638400655161711345870497635511467117201886338356439572349978338548068477507577303510311488446*i+18989679897873951919667897303952784752599849246892927487712946119313668519105388803643539740189916276677625478183020050899542162747)*x + (20142620509630625515602900533664252773594792142656001776825930948616381132135626233867236690985636962021563401235064546452362771151*i+23073154429635362006470423090407069888239421920909974016022243491662905865127511290154248299442205702025748132257305603160856434504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10576659583483676683694210570958134998638400655161711345870497635511467117201886338356439572349978338548068477507577303510311488446*i+18989679897873951919667897303952784752599849246892927487712946119313668519105388803643539740189916276677625478183020050899542162747)*x + (20142620509630625515602900533664252773594792142656001776825930948616381132135626233867236690985636962021563401235064546452362771151*i+23073154429635362006470423090407069888239421920909974016022243491662905865127511290154248299442205702025748132257305603160856434504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21362202677743478782457709668540997914203611993047318885140236324580747120062030297816734541741234928775805803849928563276852376496*i+21038508400829585784280110538820398916084427055488161491893542123769570272209165533680441209994197571262436657667585423581522524559)*x + (8738146747576767387575087550219207251547990471289094646503816592596785269526664939277593439905945850032690969068104589185248327631*i+9620414132719739128637288710213073480874888090201301145586825863329176480185111952619026248025519081126034443498485657050740769651) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21362202677743478782457709668540997914203611993047318885140236324580747120062030297816734541741234928775805803849928563276852376496*i+21038508400829585784280110538820398916084427055488161491893542123769570272209165533680441209994197571262436657667585423581522524559)*x + (8738146747576767387575087550219207251547990471289094646503816592596785269526664939277593439905945850032690969068104589185248327631*i+9620414132719739128637288710213073480874888090201301145586825863329176480185111952619026248025519081126034443498485657050740769651) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9527424263151031792697277772873554243774567682367651404337871852802192444155500922436265126479047063162812464084848485729060780547*i+3559581748044732320673436831579094567392990369503379878571433626728999890200983330364910177320528364245088381203547058237918266966)*x + (5199721302520775285820355760337639544727663213260330111298997927060588260159631684070367927517557393084133939429882645542546195257*i+15604185433415005190821284193420680495319405805610579801132832040555013252402247568590110372028339335400581782427165481943891732602) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9527424263151031792697277772873554243774567682367651404337871852802192444155500922436265126479047063162812464084848485729060780547*i+3559581748044732320673436831579094567392990369503379878571433626728999890200983330364910177320528364245088381203547058237918266966)*x + (5199721302520775285820355760337639544727663213260330111298997927060588260159631684070367927517557393084133939429882645542546195257*i+15604185433415005190821284193420680495319405805610579801132832040555013252402247568590110372028339335400581782427165481943891732602) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21944701390069865563492632230266488268135160477631360423010850421678939075115936882095208451630635958182959624120345362499941114088*i+10775820695428670939231027156967718295565550767662462864507902202219165720753555111855084882429243653991224975866862827253553518561)*x + (23864481076561043316232087266095367176439245899517507640162661922894161758466767845285278376452799966334629228461847792594413514496*i+9671752688017431156554613824628709453408816262795936285086599134749384736666959154657912801049692529773483075305052734786510151655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21944701390069865563492632230266488268135160477631360423010850421678939075115936882095208451630635958182959624120345362499941114088*i+10775820695428670939231027156967718295565550767662462864507902202219165720753555111855084882429243653991224975866862827253553518561)*x + (23864481076561043316232087266095367176439245899517507640162661922894161758466767845285278376452799966334629228461847792594413514496*i+9671752688017431156554613824628709453408816262795936285086599134749384736666959154657912801049692529773483075305052734786510151655) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23188022080100120164166119777483568152468867097381327982881275859733032589502981970100231846354955650769753828551443272192490808036*i+13600828399790836916967184736794252076072896187389091761345544750688159373091280248427806191418514699770969766069210664972394231054)*x + (13629850311656715675887521381139937218395050951327680148165967030668904633274622927719956644047398066626650130754901879500346139426*i+20946757680427118955732886653978278248754461624606986717175759610603809173506875615590211260998085834706142838919042018560524791946) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23188022080100120164166119777483568152468867097381327982881275859733032589502981970100231846354955650769753828551443272192490808036*i+13600828399790836916967184736794252076072896187389091761345544750688159373091280248427806191418514699770969766069210664972394231054)*x + (13629850311656715675887521381139937218395050951327680148165967030668904633274622927719956644047398066626650130754901879500346139426*i+20946757680427118955732886653978278248754461624606986717175759610603809173506875615590211260998085834706142838919042018560524791946) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15873235099413858520047971467751063747862161952816750762300527713671241096678333179818797997129466714047099201875280403124446387341*i+8302982343304515629553048552535658909537772190009361584598560778258031063719706140349053959244544090318290093970151435635055137618)*x + (8893092048023330938661306679702429943426290650200766630086509769545467465470837047865387882556348219395327839295582528366114667740*i+22086232775580015833590086912968715990268428470778035881925023878315630675782774698469476570760092904583248172115580009883532238453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15873235099413858520047971467751063747862161952816750762300527713671241096678333179818797997129466714047099201875280403124446387341*i+8302982343304515629553048552535658909537772190009361584598560778258031063719706140349053959244544090318290093970151435635055137618)*x + (8893092048023330938661306679702429943426290650200766630086509769545467465470837047865387882556348219395327839295582528366114667740*i+22086232775580015833590086912968715990268428470778035881925023878315630675782774698469476570760092904583248172115580009883532238453) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (222494848982296540919219888678891994295656475371915538740122191387998644850403657240952549610705153104616185788787505094585696992*i+10821568316816443305205063292517564310323510938624038875127648645746572644265398643935499075912098972727260136415616492052772976724)*x + (4610131583311011294598051418969445437473663170227597642294633232077277167415638916445142195904190713387838794679243457775464123343*i+11277223615750953579121569821384572271656744346021701252358514717323072004707194559037796407137656528591788645838952487912709948710) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (222494848982296540919219888678891994295656475371915538740122191387998644850403657240952549610705153104616185788787505094585696992*i+10821568316816443305205063292517564310323510938624038875127648645746572644265398643935499075912098972727260136415616492052772976724)*x + (4610131583311011294598051418969445437473663170227597642294633232077277167415638916445142195904190713387838794679243457775464123343*i+11277223615750953579121569821384572271656744346021701252358514717323072004707194559037796407137656528591788645838952487912709948710) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21647553640757747598344592264748645817465050406117222178662756626337293128696681392130465329639050795139266640609946519318276407138*i+23346351821325282258750248105339678487465453805285202605378926504192691940517725602149230752244031223592424033246271148200666014511)*x + (16507970561307066133927489675209236910951207224398311946433909955972003322599857609380677957665122319633835222673402046527101966748*i+9409533097206497684480140171373246293842861706003395417817736145357593918254023303785351328936872456127397509478794366578710770471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21647553640757747598344592264748645817465050406117222178662756626337293128696681392130465329639050795139266640609946519318276407138*i+23346351821325282258750248105339678487465453805285202605378926504192691940517725602149230752244031223592424033246271148200666014511)*x + (16507970561307066133927489675209236910951207224398311946433909955972003322599857609380677957665122319633835222673402046527101966748*i+9409533097206497684480140171373246293842861706003395417817736145357593918254023303785351328936872456127397509478794366578710770471) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5761959066924574572155877254503152578013516905560606323008578392847584072603114056665006074092784087590881456723560280344350152318*i+19764877891674288534465326713240934304868655640648745099672853771513405811577939274663451149231077877980844684552841404288997615021)*x + (148397031403523237891545180452150649507111082826879092992770732324560135876769234099004658509168266750006996319524748749491044882*i+4080598026043233004843325858813857408419497772071623185494556909684461316285840472558677343922165208491242440385527608472561951605) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5761959066924574572155877254503152578013516905560606323008578392847584072603114056665006074092784087590881456723560280344350152318*i+19764877891674288534465326713240934304868655640648745099672853771513405811577939274663451149231077877980844684552841404288997615021)*x + (148397031403523237891545180452150649507111082826879092992770732324560135876769234099004658509168266750006996319524748749491044882*i+4080598026043233004843325858813857408419497772071623185494556909684461316285840472558677343922165208491242440385527608472561951605) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2793942222075364315781373143978036443909958132897938628287159056528279130111665785147595895602550942485160836842104584951963032873*i+12781154655351087648525384859435841607449200993331660834994771626572869932050296773102934391076787218536237371865356034338705115996)*x + (17741769095351103485984156586156851821061957694599130539781741278214376417601806321131507067205433017572801299962512814903617887193*i+4693715481085902126953870788448586932021855778143534284773392139436512832272934205769455659946229190179191745389826960608503781766) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2793942222075364315781373143978036443909958132897938628287159056528279130111665785147595895602550942485160836842104584951963032873*i+12781154655351087648525384859435841607449200993331660834994771626572869932050296773102934391076787218536237371865356034338705115996)*x + (17741769095351103485984156586156851821061957694599130539781741278214376417601806321131507067205433017572801299962512814903617887193*i+4693715481085902126953870788448586932021855778143534284773392139436512832272934205769455659946229190179191745389826960608503781766) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14050823122560144696372847571242157553581069893802176378210805152338511945523617060017883621132240089927396932215865143453085735158*i+12530420410319361129334118482056297622546949086429594543693907714216127069759694827674500987691089951464639835286820365252385510644)*x + (9981329192008394344916271210195852785590109613787058366864207364349036413332844059083684232699860082556973787043260314640709947604*i+11750600990007665376200294026031590874657132847404885213214892794946892157362623743512638525863316893082997437260187433825853702326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14050823122560144696372847571242157553581069893802176378210805152338511945523617060017883621132240089927396932215865143453085735158*i+12530420410319361129334118482056297622546949086429594543693907714216127069759694827674500987691089951464639835286820365252385510644)*x + (9981329192008394344916271210195852785590109613787058366864207364349036413332844059083684232699860082556973787043260314640709947604*i+11750600990007665376200294026031590874657132847404885213214892794946892157362623743512638525863316893082997437260187433825853702326) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22485950406550896295970236245803185817349641328237329028918902320177724181356205063743952803945333514120695153131317045989136411709*i+5075886296963123684263534338526672879524109000072199257973209580094494818764150164226630644330970308226812914159428904014753207908)*x + (18528297323394594552236086736925151534468033904084788380674453154146775561253196154385422576735259703783877800520352683769301615238*i+3731446620311690397307859340473392738889042164648324240149301029154497877418679017865564418003017030936707449846505614865331228203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22485950406550896295970236245803185817349641328237329028918902320177724181356205063743952803945333514120695153131317045989136411709*i+5075886296963123684263534338526672879524109000072199257973209580094494818764150164226630644330970308226812914159428904014753207908)*x + (18528297323394594552236086736925151534468033904084788380674453154146775561253196154385422576735259703783877800520352683769301615238*i+3731446620311690397307859340473392738889042164648324240149301029154497877418679017865564418003017030936707449846505614865331228203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7793583494560488968408911114655930578117584553243817133234653912805152736948702399349830220364519656258155118669457656186213172598*i+20666290892056854009546298690941232724878971504787915078824656559964594106635450702503129498062502296575748885316033297353674950823)*x + (24382617709131655438607068012804386483048448951520886898292858588778953794516372243531859530530016386476739665679441795978690536035*i+3709061697545131066431009028731720505941952597289110627692286236916845416837967963085332532784110245066014799740957924293020035156) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7793583494560488968408911114655930578117584553243817133234653912805152736948702399349830220364519656258155118669457656186213172598*i+20666290892056854009546298690941232724878971504787915078824656559964594106635450702503129498062502296575748885316033297353674950823)*x + (24382617709131655438607068012804386483048448951520886898292858588778953794516372243531859530530016386476739665679441795978690536035*i+3709061697545131066431009028731720505941952597289110627692286236916845416837967963085332532784110245066014799740957924293020035156) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15716845582464679448966896795469103353637597411117468174573486131871465459289655060898470363946575416249666332009024746270826974225*i+2510464692601394925421206097299975258508126636615564906691902186996287633515227970596603620993150215106948848810480268415101340209)*x + (10318120603828300908074532478566125132944036942448329788205628513916535682569856000933596998772151201284485100869370366578964996232*i+9008374320167325394619204594149223957253019368243546024970456008263839546014319899052474526809473358035636838060850723826337054250) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15716845582464679448966896795469103353637597411117468174573486131871465459289655060898470363946575416249666332009024746270826974225*i+2510464692601394925421206097299975258508126636615564906691902186996287633515227970596603620993150215106948848810480268415101340209)*x + (10318120603828300908074532478566125132944036942448329788205628513916535682569856000933596998772151201284485100869370366578964996232*i+9008374320167325394619204594149223957253019368243546024970456008263839546014319899052474526809473358035636838060850723826337054250) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20029216831758346058287513871993369520207082317236344492736572685884525914821562169194560589336022082924007939709561706346379893038*i+238413031592433230601881676634089674445608592028860767889929166278754143380379303993581562920696245154584835015259452492217159718)*x + (15002671867444909619221942559468410608140562997457666346826877973800791357235668215962616382988192423809171573046025143801311292608*i+2690928790693154514685957127372889527103013223446203909929238865011196276659054630045744951684914436601326888980846643875302580012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20029216831758346058287513871993369520207082317236344492736572685884525914821562169194560589336022082924007939709561706346379893038*i+238413031592433230601881676634089674445608592028860767889929166278754143380379303993581562920696245154584835015259452492217159718)*x + (15002671867444909619221942559468410608140562997457666346826877973800791357235668215962616382988192423809171573046025143801311292608*i+2690928790693154514685957127372889527103013223446203909929238865011196276659054630045744951684914436601326888980846643875302580012) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2128938606315836771625647864305115093381977839104427295626902367287543943702625533045195650273988603766348103334077211488226895834*i+22772209523316416182306738654178859587246540591588401898397553042184433561068872083434673979437870093230253206933936598567434324729)*x + (15693530303805041439534844839058064392224504978367207789154427239590525500891237304397171210411948547931921333473745889910197820133*i+8347503147208602649039753970531983055851380927723151857506581907142511396677105590708946085736651009758699485433240429579056626171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2128938606315836771625647864305115093381977839104427295626902367287543943702625533045195650273988603766348103334077211488226895834*i+22772209523316416182306738654178859587246540591588401898397553042184433561068872083434673979437870093230253206933936598567434324729)*x + (15693530303805041439534844839058064392224504978367207789154427239590525500891237304397171210411948547931921333473745889910197820133*i+8347503147208602649039753970531983055851380927723151857506581907142511396677105590708946085736651009758699485433240429579056626171) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16736868317632821049375556780953487648986958911643284249109065815956397972121760749230457776320222082203469226978142901972053574345*i+22502195981568719328912390272892692833244506273141229221296426537483021400864330442887516917235952139568849788612433639966193970841)*x + (8470706405147821165520941066875432804660891427322682690438930765639743715013931345286673881637177934885114694007914749705992175933*i+2932589038325008230397356738602700332410757691360718186747627037272091940657332696697832346642661186760113498723511388684141729666) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16736868317632821049375556780953487648986958911643284249109065815956397972121760749230457776320222082203469226978142901972053574345*i+22502195981568719328912390272892692833244506273141229221296426537483021400864330442887516917235952139568849788612433639966193970841)*x + (8470706405147821165520941066875432804660891427322682690438930765639743715013931345286673881637177934885114694007914749705992175933*i+2932589038325008230397356738602700332410757691360718186747627037272091940657332696697832346642661186760113498723511388684141729666) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [181]:
E2 = Phi2.codomain()
E1 = Phi1.codomain()
E1, E2
Out[181]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2)
In [182]:
Phi1_P0, Phi1_Q0  = Phi1(P0), Phi1(Q0)
Phi1_P0, Phi1_Q0
Out[182]:
((2645044080363930056197249980335380652970422560144649631034395482396839181372949996607409527459257169467768347863219223179297348233*i + 2648454049737904597081856402901727167277161157439469771471607937797797842802285711880728211522033565491424566037797129804403627585 : 4064988024607682519000650910257554555980315838977164514043426075556702057652742117008351282008977049707236687532296939254854732638*i + 14230879725442198638739872211837434439109837871772525692416370991576713887926950656985089868859613169317870977229273811872583845877 : 1),
 (13709471667326795462011017463152696664443582205010581749350737141397238776038921128411931748056883072233831123250142748682469720026*i + 7747352481991755267938298384074281837052879635953753725171928574322356368677707641618267790469181596227881779877051714021477850764 : 8985898969204477250537267679397333166799966482075982649831971475737506300649589275963817721636128772015576264301173782347724765017*i + 10729535625577638827881312919216111581697917542163749018235782015571998269552829125823287904393373081665474749690867680926443868953 : 1))
In [183]:
Phi2_P1, Phi2_Q1  = Phi2(P1), Phi2(Q1)
Phi2_P1, Phi2_Q1
Out[183]:
((15178090156378864179602133864026737272948127904536535789288434017143882326598297731425410276059980184315435354582594108668121160268*i + 16912917543283453912922988668537942842550084696972032700572919210567679805582094217293906265567855639648779347440510865621050545153 : 2895484002223178882507113078853883970731916944343045809561128287683318391791138572398967907777791113001237836343079901668628281912*i + 7323360573438850564032825835508814125911834666312323115921229142263839414359650785388851369979122567203555125040132400887344138032 : 1),
 (3815160712753275574551396775381608728840572440521036236560222881885009826861089409468508763638067603316870565700774544879563404198*i + 18870155650472515388444776512133143172725331656767838350730125449341860890339893401632956333863350069307191685603064672403428361134 : 5033882713952390568181072062464833849138765542644819431963995096079370859100477127279308506840480785048339956480314558093725055769*i + 3083495123054746413247946553597414450021816016752241473728483027797786981064928627978389288086714108917103654181093857090641681183 : 1))
In [184]:
Phi12 = isogeny_walk(E2, Phi2_P1 + Integer(S1) * Phi2_Q1, l_B,n_B)
Phi12
Out[184]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23279455284886459932918093099882617174253034092809318803361456759398642729859239955929144465610281557324346564111259705423632598137*i+15191447935284338563817347269045381814503227467376437655410082946473655361781449148974443493643619440732506658395536331148452067493)*x + (14310432734309755754279642878737265396392440267209895454009290116150191403331846273764148093210096404434099042856505637792779928426*i+10044233605886266975600124215073076210560275044956906594895104966754767753339746350050123244266545950735834509971193610463787996805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18895531539026267230327771130506647664528914798087134289672772733360234007176345297535370735126614354469282872650763116084650994400*i+13691718341438993840828387774971675104116369937984569357219497884446953780938123990183539709031676912030612005229176987974320133040)*x + (5848265743143003442061963285633090747507622707831433550185374503512738685447586163366133414519147778310931729816357565922114905124*i+12728059470298576398614851756754180658782740370594387171713143177128687306454649682738243616627211370809571930213248907199715148101) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10359407313530365750991541544725724593439907099740739156942342633636959599283564074033456381861233280540554659244371061059841186599*i+15453116734011569902600790734151497055742147347587752452728446085933258971988415432402262207950031327202504840660385864236916895948)*x + (18377436327435110969510856152387939275752402047810323919192365029316510588291056346629699425242873752710975414472107578426986229525*i+19425563721476715185043190237923389277123820412009208007652769446300613989194216413265059009899998946970943722231331950097318502762) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10359407313530365750991541544725724593439907099740739156942342633636959599283564074033456381861233280540554659244371061059841186599*i+15453116734011569902600790734151497055742147347587752452728446085933258971988415432402262207950031327202504840660385864236916895948)*x + (18377436327435110969510856152387939275752402047810323919192365029316510588291056346629699425242873752710975414472107578426986229525*i+19425563721476715185043190237923389277123820412009208007652769446300613989194216413265059009899998946970943722231331950097318502762) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20182738268035692789712384244088348655193873872820309605842968378265667090626882290258632485699350924459765496926714770944488571166*i+9846086946445069038311363402040984622066793924894603545931477080666993420954654991763463049203014389867696933992641784956421062133)*x + (14867376208180344666422176616456596620365114091161351703588843604077190542851058473940199310270192526822997110666723112806357672561*i+20789891650198589462538184349786789409448114110045177192785314647430175214947709034740082902731100464225665620028761366007230137142) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20182738268035692789712384244088348655193873872820309605842968378265667090626882290258632485699350924459765496926714770944488571166*i+9846086946445069038311363402040984622066793924894603545931477080666993420954654991763463049203014389867696933992641784956421062133)*x + (14867376208180344666422176616456596620365114091161351703588843604077190542851058473940199310270192526822997110666723112806357672561*i+20789891650198589462538184349786789409448114110045177192785314647430175214947709034740082902731100464225665620028761366007230137142) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11689784155829610050171486269810511101625456958516863128649388443930556417966919769669123360441017656054283231431976324888980260002*i+2242183637997568224227578604208260202277483317216017103506831147847382896828240650292000733196998440700981617344948488309005526764)*x + (15786723217504473860309226813146937937803334992537597084440448762877791405896517291824145773021882418131842858096788808206862271497*i+2018719767572699906093817430073250844749064797782061318507361096241900594125440754772251498893024065416575274958637089340457853845) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11689784155829610050171486269810511101625456958516863128649388443930556417966919769669123360441017656054283231431976324888980260002*i+2242183637997568224227578604208260202277483317216017103506831147847382896828240650292000733196998440700981617344948488309005526764)*x + (15786723217504473860309226813146937937803334992537597084440448762877791405896517291824145773021882418131842858096788808206862271497*i+2018719767572699906093817430073250844749064797782061318507361096241900594125440754772251498893024065416575274958637089340457853845) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18411232754722532807351405762810233543163395706932484830533752772549532733457169084669880087454714972887454101155589315933045800376*i+13521494768096601289904793829489015651888232717862793342027096974783748931712060764934977932863058489363804593111948250687694546942)*x + (5459047159973588582796785116040565084073153213058033674428865751373417793506709660189703129192373894883721127207144276588145557867*i+601910511934747860760081997924663285301085344309952152307731506266532346268310480227699598978009509519663871288996862581956396275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18411232754722532807351405762810233543163395706932484830533752772549532733457169084669880087454714972887454101155589315933045800376*i+13521494768096601289904793829489015651888232717862793342027096974783748931712060764934977932863058489363804593111948250687694546942)*x + (5459047159973588582796785116040565084073153213058033674428865751373417793506709660189703129192373894883721127207144276588145557867*i+601910511934747860760081997924663285301085344309952152307731506266532346268310480227699598978009509519663871288996862581956396275) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1909390513113652849251898284218108548248564560341268519321082325468525079528904291215978954653202673248478368938397283645714013036*i+14193399026788785947919930580644702116940783682649766172891788731762783992495330441782625109513264644043864186495799888601801132859)*x + (15318590970633296216494727463938310656059362439278963222930962730186001960563234880443389368110554683843663232731605727365711815350*i+24123043742357834186469679562087173641030525557980557957274706203222165361168809323954709327892118271739233825001989722427973634756) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1909390513113652849251898284218108548248564560341268519321082325468525079528904291215978954653202673248478368938397283645714013036*i+14193399026788785947919930580644702116940783682649766172891788731762783992495330441782625109513264644043864186495799888601801132859)*x + (15318590970633296216494727463938310656059362439278963222930962730186001960563234880443389368110554683843663232731605727365711815350*i+24123043742357834186469679562087173641030525557980557957274706203222165361168809323954709327892118271739233825001989722427973634756) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4464399230945803334379741954738010051391239898433694026314940585454160450957204227915047361251394485463915997098556822819768867298*i+7687628402084760519515114849033962472627949964673429714482417712449043040337097524526732202617090523531467093486101429137380401699)*x + (17548410621580943970710950769850886008737843903827695597658175885721354173320576718545748371286651410760120709049373237448108535518*i+9475172220450933110375145347603113354278818704463026216621999423315240257076356250798461349572541760791823493362694990782476432373) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4464399230945803334379741954738010051391239898433694026314940585454160450957204227915047361251394485463915997098556822819768867298*i+7687628402084760519515114849033962472627949964673429714482417712449043040337097524526732202617090523531467093486101429137380401699)*x + (17548410621580943970710950769850886008737843903827695597658175885721354173320576718545748371286651410760120709049373237448108535518*i+9475172220450933110375145347603113354278818704463026216621999423315240257076356250798461349572541760791823493362694990782476432373) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5909535297789702017580971222190423536213963502531105754175613325507818652731022056156507901365020041858308150755389972531885921379*i+2772246849760451367384164365422578025946649834466023533513523410262088170028709710344791406688019998014297035717420509679507741078)*x + (10852548828825022202111654902988760511019080440731653220104769657287458073409313384855047120320807372892218132607892102802479405394*i+10925422402817653384145037141410632946524967218531364230763165500611274486018322667291053937647313177738743487974018445410576862524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5909535297789702017580971222190423536213963502531105754175613325507818652731022056156507901365020041858308150755389972531885921379*i+2772246849760451367384164365422578025946649834466023533513523410262088170028709710344791406688019998014297035717420509679507741078)*x + (10852548828825022202111654902988760511019080440731653220104769657287458073409313384855047120320807372892218132607892102802479405394*i+10925422402817653384145037141410632946524967218531364230763165500611274486018322667291053937647313177738743487974018445410576862524) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18006755761929365883834048643505382414291001291550725476557882871972303337226080827703205780750471598562325882911118333295014515473*i+643520850783865819011161462295861640585770934558254513256520024434456033463217483016001073256911202998376803454430547540304439569)*x + (22704993313630569732668983100945742210751623272308591485294659872561889023300970900520858340124393118938614303848106401977114066878*i+1568846304069928313846817048446860498472532355691755803321950628136262537884821605837257796280992237029988323654949904788109630407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18006755761929365883834048643505382414291001291550725476557882871972303337226080827703205780750471598562325882911118333295014515473*i+643520850783865819011161462295861640585770934558254513256520024434456033463217483016001073256911202998376803454430547540304439569)*x + (22704993313630569732668983100945742210751623272308591485294659872561889023300970900520858340124393118938614303848106401977114066878*i+1568846304069928313846817048446860498472532355691755803321950628136262537884821605837257796280992237029988323654949904788109630407) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23821310073200194012634509783335967503467988199771383257086792221260409314796439665193610346430905781976798775198136417190078545256*i+14737276467152953040647603324403076236763702662289943099161784193548565053739477325366910901503939890046217789980432192007917552044)*x + (16442849908256648208814583110920650987070573547707236360305018424019276614348264656086675957232593047908236958246573501366932036518*i+22498425415806330647294059830979546641537305790709557700480702937544307115722711513340487392104975940151984093530018376119531102650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23821310073200194012634509783335967503467988199771383257086792221260409314796439665193610346430905781976798775198136417190078545256*i+14737276467152953040647603324403076236763702662289943099161784193548565053739477325366910901503939890046217789980432192007917552044)*x + (16442849908256648208814583110920650987070573547707236360305018424019276614348264656086675957232593047908236958246573501366932036518*i+22498425415806330647294059830979546641537305790709557700480702937544307115722711513340487392104975940151984093530018376119531102650) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7215918573348503241883223761058858318711985648329037023126060271894653332524142336817434786031226059995765954808864934927513625122*i+18220229347448546629419948151087356331717283724455010687851860202038751388714041426243606630222949343207212796959595074754872031795)*x + (16034816427729618786942572269754687516092799820321191896366777047659796357773670362388454934827160590250983201403455912122558555962*i+8134738665735054473679543654227295768207264734471735735516438146701026951710318219119813329794206823791004538866653927596495200835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7215918573348503241883223761058858318711985648329037023126060271894653332524142336817434786031226059995765954808864934927513625122*i+18220229347448546629419948151087356331717283724455010687851860202038751388714041426243606630222949343207212796959595074754872031795)*x + (16034816427729618786942572269754687516092799820321191896366777047659796357773670362388454934827160590250983201403455912122558555962*i+8134738665735054473679543654227295768207264734471735735516438146701026951710318219119813329794206823791004538866653927596495200835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13783252266269482661758193768326366774072736563151499375124761787187640681536664597609192361041074021164298910265203284816810603315*i+14436382229673043998219344869772669143507846262901469991543716336057168240162822448870726396986759017269277980961586239844315254304)*x + (19603974151965353019135767734999243157263909914996493252512888425461826224111009371891718696668274239856870435511945639013279477762*i+634828682654436199806366835028720599827899702805404480554577013406173354376935384785979937293968293524376159216728786723098880019) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13783252266269482661758193768326366774072736563151499375124761787187640681536664597609192361041074021164298910265203284816810603315*i+14436382229673043998219344869772669143507846262901469991543716336057168240162822448870726396986759017269277980961586239844315254304)*x + (19603974151965353019135767734999243157263909914996493252512888425461826224111009371891718696668274239856870435511945639013279477762*i+634828682654436199806366835028720599827899702805404480554577013406173354376935384785979937293968293524376159216728786723098880019) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8602628080221509043787468409734239193526977000233330725033881195182652108884239759778250234085588599418217805962960066075387319719*i+12013062269109606681360565023283033863725882291257495718610950314808739596635969322561584026778080876459936370333302681706893614068)*x + (4951101577466668923770425940652118338375652183275392039388977980292670462318547231174579315093391882125550965127242902178595478229*i+11443716507379425310058095580384988453379079652961303125706337714732541238802537962111949093137071007160927448188806226299103888293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8602628080221509043787468409734239193526977000233330725033881195182652108884239759778250234085588599418217805962960066075387319719*i+12013062269109606681360565023283033863725882291257495718610950314808739596635969322561584026778080876459936370333302681706893614068)*x + (4951101577466668923770425940652118338375652183275392039388977980292670462318547231174579315093391882125550965127242902178595478229*i+11443716507379425310058095580384988453379079652961303125706337714732541238802537962111949093137071007160927448188806226299103888293) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4965762536492399132306979943069580719688103808750612317543273747970756178655403178166158906208066065058180277358772029278786151230*i+13795317682307602653480462774301641458055869503250231322864148936969074628414448425853767086651423508089181053257974103100263622862)*x + (2158116848054213332267607810396037502530476812777093628602980247531612332888460093033278930657678982393422640388014074648442671073*i+11681124986096884017592731690445577757942716381801660036927937702504121614372091325342796606062101346308995337394652053325100063355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4965762536492399132306979943069580719688103808750612317543273747970756178655403178166158906208066065058180277358772029278786151230*i+13795317682307602653480462774301641458055869503250231322864148936969074628414448425853767086651423508089181053257974103100263622862)*x + (2158116848054213332267607810396037502530476812777093628602980247531612332888460093033278930657678982393422640388014074648442671073*i+11681124986096884017592731690445577757942716381801660036927937702504121614372091325342796606062101346308995337394652053325100063355) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8807707517090419514933540080839576509021151261381633074647647453190209293061907601073003118796008433776403678529361680521967785810*i+8343908368011096526975159746031807456560152708226369648119579065262126691166941171776007976814472428009404621060909941253194387927)*x + (77967768790512173405435642031929432498489668714837906436589237180059531132843336397579594298959585321624120400390864715908714686*i+10669755177602401453609823413277897799154295945290776339258489414694004754523192752114341208570924357361422124874764732620501243675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8807707517090419514933540080839576509021151261381633074647647453190209293061907601073003118796008433776403678529361680521967785810*i+8343908368011096526975159746031807456560152708226369648119579065262126691166941171776007976814472428009404621060909941253194387927)*x + (77967768790512173405435642031929432498489668714837906436589237180059531132843336397579594298959585321624120400390864715908714686*i+10669755177602401453609823413277897799154295945290776339258489414694004754523192752114341208570924357361422124874764732620501243675) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6179307743912541219054691115238546802238272378302941034628506785048618928738247872891846075197646008430104213899949957979697770128*i+8044316752027049545858952835607528365529083820758897964333704988767637758350756428092433766645006892988692588793006822366782685522)*x + (13857738756205506753797450696992386881000520761570851516837623202678309961243645088955994295491519481068576198208296328714414872179*i+7541926800137791417427111692185588516991089562050292710610961871745099053085898689109842648612976755971773623650243888478464503206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6179307743912541219054691115238546802238272378302941034628506785048618928738247872891846075197646008430104213899949957979697770128*i+8044316752027049545858952835607528365529083820758897964333704988767637758350756428092433766645006892988692588793006822366782685522)*x + (13857738756205506753797450696992386881000520761570851516837623202678309961243645088955994295491519481068576198208296328714414872179*i+7541926800137791417427111692185588516991089562050292710610961871745099053085898689109842648612976755971773623650243888478464503206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5053897668301240059804284303152093673755178511805469232675259966015775797121690080398600586316101792691443376716521427973793918876*i+1919689387505322028011777147294709821479616437884154646750631601321501541460384208441787699842982949418946549912365121831247697089)*x + (12925039490629756920998327669141348383282534067306305706768655357560024592166187496205546944872419615380548251943863196587508357674*i+15449693259714085150569420640501487497074016665291273136622565424998379973496462631321005233405782033136525060677153601928707928818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5053897668301240059804284303152093673755178511805469232675259966015775797121690080398600586316101792691443376716521427973793918876*i+1919689387505322028011777147294709821479616437884154646750631601321501541460384208441787699842982949418946549912365121831247697089)*x + (12925039490629756920998327669141348383282534067306305706768655357560024592166187496205546944872419615380548251943863196587508357674*i+15449693259714085150569420640501487497074016665291273136622565424998379973496462631321005233405782033136525060677153601928707928818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17869140482955912542492762027754801672883029009226818752916902784556453357298968004187197362985790494320451503405056220226848946961*i+19936737730032073072391781941357597354548581660601525087511046927562299338925617879700490340680017879318736446777436629459358712313)*x + (21408678492091737861457174858879285195957582403830226269117139666287388059369647496208451006090349641409582497165721884923996578976*i+19211325706307308388817663426707070499996964172110411390032378918243901699142833950797427853431505154571484605563533825120138509812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17869140482955912542492762027754801672883029009226818752916902784556453357298968004187197362985790494320451503405056220226848946961*i+19936737730032073072391781941357597354548581660601525087511046927562299338925617879700490340680017879318736446777436629459358712313)*x + (21408678492091737861457174858879285195957582403830226269117139666287388059369647496208451006090349641409582497165721884923996578976*i+19211325706307308388817663426707070499996964172110411390032378918243901699142833950797427853431505154571484605563533825120138509812) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7833718558692469834759070233878163413316390583452381154104342925926719451991152824993556486970671870208980647688383631095394569929*i+16171428577708447155684248868877539238875857981478456199878495461247336411050251829292877830948627386933139345229019250113260773060)*x + (11336793799312088581159138173889500494396494238835256723089237154574741463223600841173973258543933832403037608055619290166196442050*i+10324773401493588964306682521582665417152260254225728555261621909280148677802444272621790051285880568283876801883017282671529381214) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7833718558692469834759070233878163413316390583452381154104342925926719451991152824993556486970671870208980647688383631095394569929*i+16171428577708447155684248868877539238875857981478456199878495461247336411050251829292877830948627386933139345229019250113260773060)*x + (11336793799312088581159138173889500494396494238835256723089237154574741463223600841173973258543933832403037608055619290166196442050*i+10324773401493588964306682521582665417152260254225728555261621909280148677802444272621790051285880568283876801883017282671529381214) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8986084283464191597923007136951674427865914062813373585461230722249093553822332374222339406614451557932880825313543025997339012335*i+14225393958964586681203032624698694353413554865425107393261930672151557350535438207126576865743891383694457108297576778314540749226)*x + (15791261248683904178007923569609581959285612592542819061379607734512240712418091132518669907130827484102473962311316406459208519413*i+20671884978262690875562252202496218301427302055684101061083727094408766131345063621688916116008868142241886967380477821438300039970) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8986084283464191597923007136951674427865914062813373585461230722249093553822332374222339406614451557932880825313543025997339012335*i+14225393958964586681203032624698694353413554865425107393261930672151557350535438207126576865743891383694457108297576778314540749226)*x + (15791261248683904178007923569609581959285612592542819061379607734512240712418091132518669907130827484102473962311316406459208519413*i+20671884978262690875562252202496218301427302055684101061083727094408766131345063621688916116008868142241886967380477821438300039970) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5911773664337621733919480456313442759275918303909158644229319385957243700181435472698282569509037011795555365818409004074304626276*i+10921014173320654836826478566540999619869879851318699553457388932652028310709858891042025055956797033106403173492431143104701195692)*x + (23979900475529456592205442469248470428349717487469065793681190632557969835656380575148790425681522855928221298239467007908141033474*i+13467246753169592401729005153435932318543256948966301408216418753984670296789500969179547148710249662782707142368348081605873390006) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5911773664337621733919480456313442759275918303909158644229319385957243700181435472698282569509037011795555365818409004074304626276*i+10921014173320654836826478566540999619869879851318699553457388932652028310709858891042025055956797033106403173492431143104701195692)*x + (23979900475529456592205442469248470428349717487469065793681190632557969835656380575148790425681522855928221298239467007908141033474*i+13467246753169592401729005153435932318543256948966301408216418753984670296789500969179547148710249662782707142368348081605873390006) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9584434439205889730220763560414720589830581871930046932651055520999291599531945693754985169308596686666303517349483506223368897620*i+1630765534401894756930370851891475769838059786020009071545892918266919138773900055994635705308453949301483122805565991783537549889)*x + (21404116732799419351317580865537597977502584500308542886960682900152029853015823241375720712805543860625134800098250039380393313167*i+15748514747722775974478095070979890251535273286968425710865445627540366545731305742435901596515062676192296093550285891152320214544) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9584434439205889730220763560414720589830581871930046932651055520999291599531945693754985169308596686666303517349483506223368897620*i+1630765534401894756930370851891475769838059786020009071545892918266919138773900055994635705308453949301483122805565991783537549889)*x + (21404116732799419351317580865537597977502584500308542886960682900152029853015823241375720712805543860625134800098250039380393313167*i+15748514747722775974478095070979890251535273286968425710865445627540366545731305742435901596515062676192296093550285891152320214544) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15054877861744536111373487510894208249910793501958296607698278825440506325561639741028330859750480031915621521815604814143798929078*i+8525688332861962347325733261593883484112044007368915971386368525989620095546082144393830275621302068661518193969553988069934203328)*x + (17302962042054158835179542531170842610599477353449480146210254478959318853750032296740711200253612167386745863131255970916230892442*i+1561068049817430006405956207747530249966175036031203082921513972371156827558629885180557372468308299303042811252845044896651577396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15054877861744536111373487510894208249910793501958296607698278825440506325561639741028330859750480031915621521815604814143798929078*i+8525688332861962347325733261593883484112044007368915971386368525989620095546082144393830275621302068661518193969553988069934203328)*x + (17302962042054158835179542531170842610599477353449480146210254478959318853750032296740711200253612167386745863131255970916230892442*i+1561068049817430006405956207747530249966175036031203082921513972371156827558629885180557372468308299303042811252845044896651577396) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18823187560770288101011262249960862247800681832398849053568777614628286262436143675116830211129530295778059961882704688364847762656*i+13630823394364172900430818483038626657517364399277277354678102876327175591123045079319700075953704483023111045630022695698341026529)*x + (3928111376625311818842407472712181842737420481061750186130536245223165778932316645858917406621491750266982434287891890981544896074*i+13872489118057159495026437950471904776200994190465257234191496685734768482538035460239022883741412414763673625203967515095566229800) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18823187560770288101011262249960862247800681832398849053568777614628286262436143675116830211129530295778059961882704688364847762656*i+13630823394364172900430818483038626657517364399277277354678102876327175591123045079319700075953704483023111045630022695698341026529)*x + (3928111376625311818842407472712181842737420481061750186130536245223165778932316645858917406621491750266982434287891890981544896074*i+13872489118057159495026437950471904776200994190465257234191496685734768482538035460239022883741412414763673625203967515095566229800) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10895979929041351670011506726897007094539995742456362593840126314189756268361315958371623974236895695430641159615426866813873781269*i+2262443951260722202250077618728308026355664149392600491258421137625482805249791728424339970959851054189279979208770384180741893352)*x + (3194287345819879756321176151083180292508325337446793009118856257807231512778704618637730075687209949513439809666315390826874058475*i+10979119550389262802573992675356737994918828939713868627416540613697324131423363684557895166704823933321586999286847734878162860928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10895979929041351670011506726897007094539995742456362593840126314189756268361315958371623974236895695430641159615426866813873781269*i+2262443951260722202250077618728308026355664149392600491258421137625482805249791728424339970959851054189279979208770384180741893352)*x + (3194287345819879756321176151083180292508325337446793009118856257807231512778704618637730075687209949513439809666315390826874058475*i+10979119550389262802573992675356737994918828939713868627416540613697324131423363684557895166704823933321586999286847734878162860928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7334329969101978573927887568183060309600454528736314905931252383702327408825016600108841676314629174932773668105208767209107869452*i+7703432527078753425641165196832755597583572678179767247185385608603795844964824164984757405768167317388245131827297086877429486940)*x + (2490180448276605284594712218999004915698391938413046491504010157467737999357100251456247426303380324717733627694550593609783336259*i+7518888943977618370267435977056660953613742155405473865012156019834548901685179033995868549939998051340901495629884158821345241132) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7334329969101978573927887568183060309600454528736314905931252383702327408825016600108841676314629174932773668105208767209107869452*i+7703432527078753425641165196832755597583572678179767247185385608603795844964824164984757405768167317388245131827297086877429486940)*x + (2490180448276605284594712218999004915698391938413046491504010157467737999357100251456247426303380324717733627694550593609783336259*i+7518888943977618370267435977056660953613742155405473865012156019834548901685179033995868549939998051340901495629884158821345241132) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3014527147879910108793347760754371717992830829931482319846048067891526053636814237649996599753105452989397935969989596249898453018*i+2918927446478661107318182788005376118103059291894801303962517014942849561538280570000703972007001704479950255101573282427380452990)*x + (20116769222365645311870875582663862082021882587245579371824581167704721845162451219916689937685659257327177756055861188382366461218*i+4841469478747457103958701102005555953891633414869095350814095929856681651408590886653288259766504130746540088133935335184742209532) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3014527147879910108793347760754371717992830829931482319846048067891526053636814237649996599753105452989397935969989596249898453018*i+2918927446478661107318182788005376118103059291894801303962517014942849561538280570000703972007001704479950255101573282427380452990)*x + (20116769222365645311870875582663862082021882587245579371824581167704721845162451219916689937685659257327177756055861188382366461218*i+4841469478747457103958701102005555953891633414869095350814095929856681651408590886653288259766504130746540088133935335184742209532) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8223656306399592659318417037453955756105768227779978266681645590034097138770661191274924606925547677408236642163240200197256366357*i+4439672272635195038114626058358692662127719631542871094904073222971533851669602039844857438701391296438769411915260733142812423717)*x + (2697199946367660643426991178324388860697744886939080502359076999725515526125572627377181560517758614428819192020857812836105697197*i+17081468184191465223445442776709421178125814826740186877476416202586129810762360952336589628432774047582540557826146900380982547607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8223656306399592659318417037453955756105768227779978266681645590034097138770661191274924606925547677408236642163240200197256366357*i+4439672272635195038114626058358692662127719631542871094904073222971533851669602039844857438701391296438769411915260733142812423717)*x + (2697199946367660643426991178324388860697744886939080502359076999725515526125572627377181560517758614428819192020857812836105697197*i+17081468184191465223445442776709421178125814826740186877476416202586129810762360952336589628432774047582540557826146900380982547607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6754678329026603660958424393122396904654573899094917481080583285641122702750976138623103563450935727519529507271906755670014310058*i+12937023273016561672072540171019454158872889434918919934716631262388452601122678794233097085074070330781336940148070675236717977699)*x + (5875264119989669443997643111538324038754165869662502785167421319205641335930285353272567058462108550390441802308099325365995503868*i+21293618521192945471774772182001635301069550068993522943182062671265238967817223892788305382671404232995771079566141198911388145438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6754678329026603660958424393122396904654573899094917481080583285641122702750976138623103563450935727519529507271906755670014310058*i+12937023273016561672072540171019454158872889434918919934716631262388452601122678794233097085074070330781336940148070675236717977699)*x + (5875264119989669443997643111538324038754165869662502785167421319205641335930285353272567058462108550390441802308099325365995503868*i+21293618521192945471774772182001635301069550068993522943182062671265238967817223892788305382671404232995771079566141198911388145438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14380987407008442687890826256759343787716297096661086462564575404313816331772210746297013612674761567606269933928464828074183375415*i+4303766318284578503039030746940304300186140480963693295619078315189317912161250303697678232188591219946249798745638135795014422976)*x + (15313812427400451220440472341532853307923684592858667818070500702959481577349735380389007399519080406003614061598674811900253561909*i+8083253733218414534809399534113158117839453258446878959497388687378635053005680545848673244304360214437615938084760990143901485894) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14380987407008442687890826256759343787716297096661086462564575404313816331772210746297013612674761567606269933928464828074183375415*i+4303766318284578503039030746940304300186140480963693295619078315189317912161250303697678232188591219946249798745638135795014422976)*x + (15313812427400451220440472341532853307923684592858667818070500702959481577349735380389007399519080406003614061598674811900253561909*i+8083253733218414534809399534113158117839453258446878959497388687378635053005680545848673244304360214437615938084760990143901485894) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24318980542740209066293145414148377889741698546505696849173938890371061913455499757811139272143274571232320506649614438562930022120*i+6220469038007927364980165971681987094412799123031890729418446890435937596349292203189016410916982388310733100787527643731803255335)*x + (12689542450648509059134558971380948211748850393970630340792529176695782013714765477565791042311984465830668570196659222198291398588*i+18035781636270421051272375580261030213416610486324314302273338686334785472923954925865825691643494707843051229877856117545305756820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24318980542740209066293145414148377889741698546505696849173938890371061913455499757811139272143274571232320506649614438562930022120*i+6220469038007927364980165971681987094412799123031890729418446890435937596349292203189016410916982388310733100787527643731803255335)*x + (12689542450648509059134558971380948211748850393970630340792529176695782013714765477565791042311984465830668570196659222198291398588*i+18035781636270421051272375580261030213416610486324314302273338686334785472923954925865825691643494707843051229877856117545305756820) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10251282136500354171708959363744753630540480007024010367068886055493402042254802066109834429073974754445923587682843513604495357427*i+16613814987558158591095990362014999261537840524257948750550500885271895993328823734091725301109023700594221324620309111376904947114)*x + (4618028816533770274684503347598118884026797129846687054472757620320662932422668742903631504618385481077545675832643328853072475295*i+14211495177584146617062341003643669405578143137382418916343319405101632223491217649726102697731691284751888770542090169127903813152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10251282136500354171708959363744753630540480007024010367068886055493402042254802066109834429073974754445923587682843513604495357427*i+16613814987558158591095990362014999261537840524257948750550500885271895993328823734091725301109023700594221324620309111376904947114)*x + (4618028816533770274684503347598118884026797129846687054472757620320662932422668742903631504618385481077545675832643328853072475295*i+14211495177584146617062341003643669405578143137382418916343319405101632223491217649726102697731691284751888770542090169127903813152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17836922889178171268289696556812618092580268796967249974044791952738184461145099523405472670741449397599146171248548864265353971499*i+13221762943899064415196399350997509696289543704574332260713950963668413741559652374359917722221799642298297458560144196484874429343)*x + (11042304835842935627127898312342917194672247006866131904726820892879358129475594249842334827434849835581554282184021398764983889796*i+5898476931026417757770066746515567577292943760991806404653144784573868277178079154250200152227125429533346087878149646356968306338) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17836922889178171268289696556812618092580268796967249974044791952738184461145099523405472670741449397599146171248548864265353971499*i+13221762943899064415196399350997509696289543704574332260713950963668413741559652374359917722221799642298297458560144196484874429343)*x + (11042304835842935627127898312342917194672247006866131904726820892879358129475594249842334827434849835581554282184021398764983889796*i+5898476931026417757770066746515567577292943760991806404653144784573868277178079154250200152227125429533346087878149646356968306338) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7043615148793855301660879073482426038505831456022636370593527690717349746908426648280440409382842706560790907924620475567605156467*i+2863258047239368638009990317057362755482521339262278036884965977684593866561410398713176391313993627162874498732252930593388581232)*x + (186032107887122940885134460255266510855584059689194008184615365163368540409247403847470895629324668718306098655865646431259179972*i+4745768176040485851552342225297400958541030176801284113480631786508690090049174642205896897208511077675953683469119338547375429205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7043615148793855301660879073482426038505831456022636370593527690717349746908426648280440409382842706560790907924620475567605156467*i+2863258047239368638009990317057362755482521339262278036884965977684593866561410398713176391313993627162874498732252930593388581232)*x + (186032107887122940885134460255266510855584059689194008184615365163368540409247403847470895629324668718306098655865646431259179972*i+4745768176040485851552342225297400958541030176801284113480631786508690090049174642205896897208511077675953683469119338547375429205) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23219167889362088550225496018552807603528767503913519201227154154564982235554628917910414935942723870338870985923727451675287528088*i+23172899961122158150989230954208729002574489222343653920572770393962327504336140005231881265794612589836585175439107800289021406043)*x + (1078509075093807920701692195265265559848481346437946773611229211218490713589701305251717278200524255694730572549965271750543616772*i+9262521843179914101142598729290114510136760487846732658566552142951424095113369701505543120363374593792299093530901763569054228206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23219167889362088550225496018552807603528767503913519201227154154564982235554628917910414935942723870338870985923727451675287528088*i+23172899961122158150989230954208729002574489222343653920572770393962327504336140005231881265794612589836585175439107800289021406043)*x + (1078509075093807920701692195265265559848481346437946773611229211218490713589701305251717278200524255694730572549965271750543616772*i+9262521843179914101142598729290114510136760487846732658566552142951424095113369701505543120363374593792299093530901763569054228206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11040599976184614595938763159334688039929035822669054823288143727610741440290127174313284751151933261458882118140236633355665765849*i+16780800729493733987262437345083676645003584929587893360189169784386242134547959153017652627500539538885151676542632767195731966565)*x + (3497948107540100454938639988295957779633476715797011858730467642747094474442902158611655228287606357942402305178187646762479062128*i+18078080021660888378588221903235096100254629679472892137630752457433763089456604569336872532432580304067080686918098877448257962296) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11040599976184614595938763159334688039929035822669054823288143727610741440290127174313284751151933261458882118140236633355665765849*i+16780800729493733987262437345083676645003584929587893360189169784386242134547959153017652627500539538885151676542632767195731966565)*x + (3497948107540100454938639988295957779633476715797011858730467642747094474442902158611655228287606357942402305178187646762479062128*i+18078080021660888378588221903235096100254629679472892137630752457433763089456604569336872532432580304067080686918098877448257962296) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9592639629466075256711351573287049876283087504542984146754778105834819736595984393576791499413553074675460503685648623513569147972*i+4102740701629663979729398785781228513903700727220331685119280874655093267288842774041816448908003329477667446472770714934102849406)*x + (9261013313265352892681598430637165530135690354894450815711901962292466342468715472081306391300980815500944734353677206155553530510*i+1412839057014882103741421785529821998619954533496365754031808780822793241728676895568375656692220439029590509818196488065264861065) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9592639629466075256711351573287049876283087504542984146754778105834819736595984393576791499413553074675460503685648623513569147972*i+4102740701629663979729398785781228513903700727220331685119280874655093267288842774041816448908003329477667446472770714934102849406)*x + (9261013313265352892681598430637165530135690354894450815711901962292466342468715472081306391300980815500944734353677206155553530510*i+1412839057014882103741421785529821998619954533496365754031808780822793241728676895568375656692220439029590509818196488065264861065) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7907803055917474258880527669767099348443564626393434777412598021429200430097449965592476071250431923028518810525604761442617946002*i+16516673233219792140436223209771059534670377867946978464418724031699260277854608396583974100558391479912270607929494828417551343565)*x + (16018284804198129423832528643428764395691407057655398138465789532673352863460878104922089514383280709218216143547577483163186146228*i+13080617206564581115808442485580537524648805423017386075567431847698716725000180483431355624607569641623873951085340131806701821074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7907803055917474258880527669767099348443564626393434777412598021429200430097449965592476071250431923028518810525604761442617946002*i+16516673233219792140436223209771059534670377867946978464418724031699260277854608396583974100558391479912270607929494828417551343565)*x + (16018284804198129423832528643428764395691407057655398138465789532673352863460878104922089514383280709218216143547577483163186146228*i+13080617206564581115808442485580537524648805423017386075567431847698716725000180483431355624607569641623873951085340131806701821074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4378093977238029290699854058328204536602248658746432529312575691948095750820632241884144494756981054405646642699086716250834549361*i+10838493052395457713620265290109517342427302963452811435966961039168076660876679180774390501003457176143312743672925275105405239607)*x + (14519882248072070189253951386233950294589819038275603295083246779123696405578092249297208213130581189261398173476957857618120449936*i+12542567269815546110175238185972148507893708896772297198207655887086206154006163271125657273331312952478058924575062026302399276196) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4378093977238029290699854058328204536602248658746432529312575691948095750820632241884144494756981054405646642699086716250834549361*i+10838493052395457713620265290109517342427302963452811435966961039168076660876679180774390501003457176143312743672925275105405239607)*x + (14519882248072070189253951386233950294589819038275603295083246779123696405578092249297208213130581189261398173476957857618120449936*i+12542567269815546110175238185972148507893708896772297198207655887086206154006163271125657273331312952478058924575062026302399276196) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1868358940107150501084413384817652143709347696062575479741730693380522184989340471233726879979019061326722855784894900423156110836*i+16023709340434346439149737864341153753065696999669041649787338980765397039570369564304816872710783947341990634925106309068545271480)*x + (2508612908489806485506682967807028856657720275230762655390394207335339961838004715039480917642883655031499904557379905118795688033*i+7834752495243338212678089145314572664035366868053794324119406178254266458068412286215800763336761281804401985855776040352043128457) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1868358940107150501084413384817652143709347696062575479741730693380522184989340471233726879979019061326722855784894900423156110836*i+16023709340434346439149737864341153753065696999669041649787338980765397039570369564304816872710783947341990634925106309068545271480)*x + (2508612908489806485506682967807028856657720275230762655390394207335339961838004715039480917642883655031499904557379905118795688033*i+7834752495243338212678089145314572664035366868053794324119406178254266458068412286215800763336761281804401985855776040352043128457) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19296333529170664921078965021804759699058941756796717868710257049045934504754001020611375886488642959016505936652080810722103445803*i+16277985028508229683641265720893065292517413550250540626001925912396601628866625632402929385720586312074551973272137583448701192459)*x + (6598748609473453184971580754897295111728482098806626883959162042568646611816080797672799489424588618451837646122901699463295312659*i+9969520935465287984954437875328897456231670099980674479372848371863204002321413391028173192505445970548926760558741388266017848866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19296333529170664921078965021804759699058941756796717868710257049045934504754001020611375886488642959016505936652080810722103445803*i+16277985028508229683641265720893065292517413550250540626001925912396601628866625632402929385720586312074551973272137583448701192459)*x + (6598748609473453184971580754897295111728482098806626883959162042568646611816080797672799489424588618451837646122901699463295312659*i+9969520935465287984954437875328897456231670099980674479372848371863204002321413391028173192505445970548926760558741388266017848866) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12611837578204124204484979146762406810557792277986194557155110059973574401223622388491592566158028785638527386599133253127365353042*i+8543567678680924769498851069996233051618228942868916903452777368871086113055082817920660747148692846250177653476711824763351861683)*x + (5164939933664369827797882704188052178211791113934199842761333987180620733140070475829890838114650530493634579793753344530635615519*i+17150631725749748627867841671033149312395727738512691310122458104079310138544180921386127281719325000707360391204149767061246791197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12611837578204124204484979146762406810557792277986194557155110059973574401223622388491592566158028785638527386599133253127365353042*i+8543567678680924769498851069996233051618228942868916903452777368871086113055082817920660747148692846250177653476711824763351861683)*x + (5164939933664369827797882704188052178211791113934199842761333987180620733140070475829890838114650530493634579793753344530635615519*i+17150631725749748627867841671033149312395727738512691310122458104079310138544180921386127281719325000707360391204149767061246791197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11538076807346268133336707535207790553057818707086396059174741286603992699110756641498519239707170839867451549006226298936560644512*i+23812532392888774566230646955611603347855868851294680784800296524708624036412837061955164940952324960443374074346329712092655972406)*x + (8047302538526006023472129170753753302710225394524225491074899779034108452124894872545829937770288781711819771044383614497973009157*i+19812007339860812594787226530609326747854044126911353558681202583335886461701122818560764777812760758312707474624627651006911114573) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11538076807346268133336707535207790553057818707086396059174741286603992699110756641498519239707170839867451549006226298936560644512*i+23812532392888774566230646955611603347855868851294680784800296524708624036412837061955164940952324960443374074346329712092655972406)*x + (8047302538526006023472129170753753302710225394524225491074899779034108452124894872545829937770288781711819771044383614497973009157*i+19812007339860812594787226530609326747854044126911353558681202583335886461701122818560764777812760758312707474624627651006911114573) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4550008425457429418156705449894184089185358482633477906563210870860252650042030187308021527932953417513127808299499875375599425123*i+1905884976954149163634326657622673277230450901593989229504035880487912777261688241480781904568567682525617979649204333325080419042)*x + (23629719510597553983069302798998592520725694662707049243996740042438718905410287316883930585572167509547705586621057207886909468725*i+22393081720548934404189723987960508482050437501619359754845035936629678268831526249110957656050679527750976778095517882447491946958) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4550008425457429418156705449894184089185358482633477906563210870860252650042030187308021527932953417513127808299499875375599425123*i+1905884976954149163634326657622673277230450901593989229504035880487912777261688241480781904568567682525617979649204333325080419042)*x + (23629719510597553983069302798998592520725694662707049243996740042438718905410287316883930585572167509547705586621057207886909468725*i+22393081720548934404189723987960508482050437501619359754845035936629678268831526249110957656050679527750976778095517882447491946958) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8921091288531667020606571734177397048669796657722734457695150018756107775062041369935964226558222781038861992854520586628205416184*i+8125828809185492492964737523989131314845945041496147133918045076831917943327169016926161347557475535122804775571474095232169318637)*x + (14357425431558171977728251348178352186373837282414543007476079367812553613666883914529741461379574256941661688398682702142301599992*i+5697947684127377361717647754212525083607977169531318437455733435737026013860074108425903426397601950054955491649875041374145908690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8921091288531667020606571734177397048669796657722734457695150018756107775062041369935964226558222781038861992854520586628205416184*i+8125828809185492492964737523989131314845945041496147133918045076831917943327169016926161347557475535122804775571474095232169318637)*x + (14357425431558171977728251348178352186373837282414543007476079367812553613666883914529741461379574256941661688398682702142301599992*i+5697947684127377361717647754212525083607977169531318437455733435737026013860074108425903426397601950054955491649875041374145908690) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23319317310777844968748684512056592040360414908862764106777028155430145329297540652937296963440892154326087916428228306162180959805*i+4414183379716021553488605946633795645410765613666929630875466293488055245154268539613881812924579249925338693108170614327210683964)*x + (13299040136187465446894877816171686458681629501715924589371161980068904283793751469678533882008326651249576247435888342987252271524*i+16088392302407704500650567412854038243575676063360781526605682907440482539528672682948512627378919563916949976456970856236055266458) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23319317310777844968748684512056592040360414908862764106777028155430145329297540652937296963440892154326087916428228306162180959805*i+4414183379716021553488605946633795645410765613666929630875466293488055245154268539613881812924579249925338693108170614327210683964)*x + (13299040136187465446894877816171686458681629501715924589371161980068904283793751469678533882008326651249576247435888342987252271524*i+16088392302407704500650567412854038243575676063360781526605682907440482539528672682948512627378919563916949976456970856236055266458) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7116324575614171940236213674342627729718000505526345029013319216754401723402434544723469945658645945203232705594453450487305780591*i+6270267103374046989621597028155146492072173599969866428657867626082969954436163590686255402471958828950356439196347409212642725183)*x + (14635554007260503534190328965785956065169931418708680328623807747497804893844017659704197241425673965140955285902633168019614993852*i+7676607838335903269692941396155488471020944845939370950637796402848756244501633163883446193168455137524906496838192520676010683263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7116324575614171940236213674342627729718000505526345029013319216754401723402434544723469945658645945203232705594453450487305780591*i+6270267103374046989621597028155146492072173599969866428657867626082969954436163590686255402471958828950356439196347409212642725183)*x + (14635554007260503534190328965785956065169931418708680328623807747497804893844017659704197241425673965140955285902633168019614993852*i+7676607838335903269692941396155488471020944845939370950637796402848756244501633163883446193168455137524906496838192520676010683263) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15505014318066180728719141390058842092562878555024681525390558456148629251112179482043613255372540577546650149820767287184319812961*i+2602269993552808152156016145877883036771880932964560919773501405606900915808746058918300902610150872909225415518474907390520430533)*x + (17600658711886406259584121822072097187334644877904606364462343561070711057401466414099369258377687836612437279116881258353552857811*i+23886906760287875291768461438779000956044333671371107039751754228930508408617344229098564655318564535792165204688916108021954941126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15505014318066180728719141390058842092562878555024681525390558456148629251112179482043613255372540577546650149820767287184319812961*i+2602269993552808152156016145877883036771880932964560919773501405606900915808746058918300902610150872909225415518474907390520430533)*x + (17600658711886406259584121822072097187334644877904606364462343561070711057401466414099369258377687836612437279116881258353552857811*i+23886906760287875291768461438779000956044333671371107039751754228930508408617344229098564655318564535792165204688916108021954941126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9496437994678606489099371192612216701000227454789081048759934476097234293621781988437451552337258305522090302781021467017801142407*i+21124757378604110553271022537993247144298861056966200005061945062496914715232868057586194515055332880507708572619094037109598615242)*x + (17721243438291250314713787245609559008554009527855220931036175273617068812851566536114516318690345278132868673883090169132672915207*i+23826707675230749608632657593641317134147628209511352312281171830810188746213219119534320593299484382720931645803790500844250027003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9496437994678606489099371192612216701000227454789081048759934476097234293621781988437451552337258305522090302781021467017801142407*i+21124757378604110553271022537993247144298861056966200005061945062496914715232868057586194515055332880507708572619094037109598615242)*x + (17721243438291250314713787245609559008554009527855220931036175273617068812851566536114516318690345278132868673883090169132672915207*i+23826707675230749608632657593641317134147628209511352312281171830810188746213219119534320593299484382720931645803790500844250027003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16292144205378043602470888169138121364692053985050829535721845180304650290516415105866160355138117012547978451295856565904630538283*i+21724956337343353897965390615771850540397807143636357569389160872456711769677330643768646663910614018172835003587749674700165684251)*x + (22296248415956104942335769823426460931631761367003869943589652950869261726127353203059822684507287292998639727580374622884571590341*i+8751479805060524763970303591211274750782684314588431358842239213023128685161594146476357153635828405310846552059085669470486246550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16292144205378043602470888169138121364692053985050829535721845180304650290516415105866160355138117012547978451295856565904630538283*i+21724956337343353897965390615771850540397807143636357569389160872456711769677330643768646663910614018172835003587749674700165684251)*x + (22296248415956104942335769823426460931631761367003869943589652950869261726127353203059822684507287292998639727580374622884571590341*i+8751479805060524763970303591211274750782684314588431358842239213023128685161594146476357153635828405310846552059085669470486246550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11821220243517942503875630150374677389503428814083543669833113232225760568957780970204832886191649911622764577860205956378089405405*i+22852052952352262133383602062277127981642486248872043694054025889523378781594272215978598152814432888415630480082316207128151055494)*x + (9835315044245390629462687827520010495765850669972595510423316986831024628050538089735600672510474789714168992930222462735568311363*i+20159556784841212112936200763017832398503076387535669021474790856330793050710135222188369023924468731260409057533337940588796074470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11821220243517942503875630150374677389503428814083543669833113232225760568957780970204832886191649911622764577860205956378089405405*i+22852052952352262133383602062277127981642486248872043694054025889523378781594272215978598152814432888415630480082316207128151055494)*x + (9835315044245390629462687827520010495765850669972595510423316986831024628050538089735600672510474789714168992930222462735568311363*i+20159556784841212112936200763017832398503076387535669021474790856330793050710135222188369023924468731260409057533337940588796074470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22866029026059176422761289856391069398100105781273597376563376092631716145711123590834383330804213418804390594485341149920587629801*i+8082190214946272214927475626054430960133993627431994893508234085207065672711891398092779811701593812943843066232001776798107249383)*x + (14528778442722836374233764765853534591462361001728366142618121893068468996270488117267205890997634578765252383708054934663623808865*i+19578014869079342326231064846132401135459880761618631562939125488940534134489192601119983850753551550708144486689281321943221707220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22866029026059176422761289856391069398100105781273597376563376092631716145711123590834383330804213418804390594485341149920587629801*i+8082190214946272214927475626054430960133993627431994893508234085207065672711891398092779811701593812943843066232001776798107249383)*x + (14528778442722836374233764765853534591462361001728366142618121893068468996270488117267205890997634578765252383708054934663623808865*i+19578014869079342326231064846132401135459880761618631562939125488940534134489192601119983850753551550708144486689281321943221707220) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4483740369570926882260480172903168704785826418684757436076793883103486407327321865112190232759156459161969544718337893263295629965*i+2814828634327930153628991228907863119894096349504273220782145603032227555967379990178992470012469529765289405063749894988327017145)*x + (20747040738324014200927653426236954367484180678856806967632889819207585746163770905224174241247420277831120095896181638817381282705*i+9396468822740641286233411286622946779092449461087336385537560592544228598030626439043475854621210843165256496738860287369876381509) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4483740369570926882260480172903168704785826418684757436076793883103486407327321865112190232759156459161969544718337893263295629965*i+2814828634327930153628991228907863119894096349504273220782145603032227555967379990178992470012469529765289405063749894988327017145)*x + (20747040738324014200927653426236954367484180678856806967632889819207585746163770905224174241247420277831120095896181638817381282705*i+9396468822740641286233411286622946779092449461087336385537560592544228598030626439043475854621210843165256496738860287369876381509) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10026211044792144410696129882765383929760692036416539610904563847234615339311239417324248004406119179193098180217863957322638340779*i+1064317032887845019576126643884217595940340834980054105617095467005296041608024965370380969492929076401705569493070510599575896890)*x + (19870167414783597724852420035906074175735691141012806771305002411630363464441700733146881922586030901842683281907239765999237057681*i+13746300690966451239604349614226113549396939795808638532134862254014856839688625754790220789458976072739817755963548095244404277083) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10026211044792144410696129882765383929760692036416539610904563847234615339311239417324248004406119179193098180217863957322638340779*i+1064317032887845019576126643884217595940340834980054105617095467005296041608024965370380969492929076401705569493070510599575896890)*x + (19870167414783597724852420035906074175735691141012806771305002411630363464441700733146881922586030901842683281907239765999237057681*i+13746300690966451239604349614226113549396939795808638532134862254014856839688625754790220789458976072739817755963548095244404277083) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18198464568550898169002688467580649544542447839711062462061944786931316476413593603312103625918667365878861125736479833021957105249*i+16953465164584577514536720008597909937888323914041897798773000054432074181758707715568553712238020687169348571787877620740389793051)*x + (18263480796392320836181120994227723427510361400999301599443723236152946606041923383053748650952880415831815080272808756410953634027*i+20105029095021871346569374965714855119745129102723069614570524203236854292247694861255005474931371585762919469961693115474010770192) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18198464568550898169002688467580649544542447839711062462061944786931316476413593603312103625918667365878861125736479833021957105249*i+16953465164584577514536720008597909937888323914041897798773000054432074181758707715568553712238020687169348571787877620740389793051)*x + (18263480796392320836181120994227723427510361400999301599443723236152946606041923383053748650952880415831815080272808756410953634027*i+20105029095021871346569374965714855119745129102723069614570524203236854292247694861255005474931371585762919469961693115474010770192) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21874540391741557129978210974469056940616621812018890351247730559928910358044848862757228454973553646757047465856040198718204884313*i+4868609556239614780373385355040542092091509597810683169430937573447842434120050513090149870642834403758544609148408589112811493307)*x + (12146543758794879543703061576825540565540949391260996028965010098648169527337925341401441747254993237172769753617627732979760720608*i+18287344587876213446315100709412285314232522434738972099744809085833433561919100117733744637732192726317407851377324750824894700309) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21874540391741557129978210974469056940616621812018890351247730559928910358044848862757228454973553646757047465856040198718204884313*i+4868609556239614780373385355040542092091509597810683169430937573447842434120050513090149870642834403758544609148408589112811493307)*x + (12146543758794879543703061576825540565540949391260996028965010098648169527337925341401441747254993237172769753617627732979760720608*i+18287344587876213446315100709412285314232522434738972099744809085833433561919100117733744637732192726317407851377324750824894700309) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1873408776897917671120750279553377271346749559788607351170794468182804606635260512084079953670379357340371409561616631618763203094*i+22646541160775775006095452695187266773134777284940869031619374622937082860195071178653086795856108069597167671643779140620287042669)*x + (295385649833210582479550389772875857213812869974732240489238503465360803541862634460801971833644318090243911032428908804076428304*i+20899270596543089879897280858001353194589430786717654602723674176503204674918813684050614587853499327723675260205699006110645867677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1873408776897917671120750279553377271346749559788607351170794468182804606635260512084079953670379357340371409561616631618763203094*i+22646541160775775006095452695187266773134777284940869031619374622937082860195071178653086795856108069597167671643779140620287042669)*x + (295385649833210582479550389772875857213812869974732240489238503465360803541862634460801971833644318090243911032428908804076428304*i+20899270596543089879897280858001353194589430786717654602723674176503204674918813684050614587853499327723675260205699006110645867677) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23842137056544927044771110721285812891822183527930618674789287570012623804366551509724922624924208049548684635759614144902659550646*i+5678773811207851456408463181266234782783368335095394362297411901493090078183437700193549139926836219420256935503046266959107436458)*x + (18876370099376742593158462294416005606116179458322258391891790077692180780649999539117290054677450999681310596392417264490419113478*i+14706225030886248593682625969144410966613992604599699999142739098418712487615839767596786327658865725736008831271919484432515925372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23842137056544927044771110721285812891822183527930618674789287570012623804366551509724922624924208049548684635759614144902659550646*i+5678773811207851456408463181266234782783368335095394362297411901493090078183437700193549139926836219420256935503046266959107436458)*x + (18876370099376742593158462294416005606116179458322258391891790077692180780649999539117290054677450999681310596392417264490419113478*i+14706225030886248593682625969144410966613992604599699999142739098418712487615839767596786327658865725736008831271919484432515925372) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13747578493304800502400060506472697400183319516843604142716760673505836124432622415907418479671218771397429273789433803438126040525*i+14291172351258059561453166066624507984289175192465185190925962861692877072122140276458487999359085672656784453131105340844073793277)*x + (7253834178231593510017374963786039700169638723175583771289852941776274912103787807825251207633960196447083718282591340186520898120*i+14620883382213064041543153478280422830573012486835940753077679058404391545252246657074555257258482668444714496327699647498755173707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13747578493304800502400060506472697400183319516843604142716760673505836124432622415907418479671218771397429273789433803438126040525*i+14291172351258059561453166066624507984289175192465185190925962861692877072122140276458487999359085672656784453131105340844073793277)*x + (7253834178231593510017374963786039700169638723175583771289852941776274912103787807825251207633960196447083718282591340186520898120*i+14620883382213064041543153478280422830573012486835940753077679058404391545252246657074555257258482668444714496327699647498755173707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24374194054017043953279207653304745387321713571069532471440589431321850296253718223564088955371530418733004302847912269875315020216*i+14379858345259141677126960588555145217149921698916211482083074621352960906506679943678834018366198246838042295629573422184965602962)*x + (18443789367596004655174744994715994875701557063122846578662704309748980795539890523542758003825626089269820832287164662207857688942*i+18597463536595006663854666042170080256366382500396730707888604288438718511170456381866609840179507506874481729156821641040741680455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24374194054017043953279207653304745387321713571069532471440589431321850296253718223564088955371530418733004302847912269875315020216*i+14379858345259141677126960588555145217149921698916211482083074621352960906506679943678834018366198246838042295629573422184965602962)*x + (18443789367596004655174744994715994875701557063122846578662704309748980795539890523542758003825626089269820832287164662207857688942*i+18597463536595006663854666042170080256366382500396730707888604288438718511170456381866609840179507506874481729156821641040741680455) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23807942158032340655697110679499352534798841622768947409676276562479192266945435260528249659058636424535295627834034516536792611701*i+8134051069068907386682437274272094657978285044180254495983563024177099970693499042575972530330239697854901074019064330310664706686)*x + (17550790505537449605123484552562904694828836318558752467472077803601336153677021563715587276072671836531901603644630539427002719058*i+14311428518428500863549007737985689321607836582360748634385191634240802195587789437619158014255109976688126205513143427666504608534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23807942158032340655697110679499352534798841622768947409676276562479192266945435260528249659058636424535295627834034516536792611701*i+8134051069068907386682437274272094657978285044180254495983563024177099970693499042575972530330239697854901074019064330310664706686)*x + (17550790505537449605123484552562904694828836318558752467472077803601336153677021563715587276072671836531901603644630539427002719058*i+14311428518428500863549007737985689321607836582360748634385191634240802195587789437619158014255109976688126205513143427666504608534) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9514300407724441532878316521696252074775894025916983269460859091815535495837224502438192407117335318590742035656611642966716945169*i+667704907811738739811465262997775031783361654056146954353591489104232981781958062247240631052196284567839756828165313077104270761)*x + (5448851704203339777969360136107480520766433899530344272522569978308115849514130324210360160603573242592801676372662723263145606753*i+1288298867342051589678028125172822790897564959767581522806412060416406939160587923586442351203289630235351273879111554313911773854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9514300407724441532878316521696252074775894025916983269460859091815535495837224502438192407117335318590742035656611642966716945169*i+667704907811738739811465262997775031783361654056146954353591489104232981781958062247240631052196284567839756828165313077104270761)*x + (5448851704203339777969360136107480520766433899530344272522569978308115849514130324210360160603573242592801676372662723263145606753*i+1288298867342051589678028125172822790897564959767581522806412060416406939160587923586442351203289630235351273879111554313911773854) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16848612841374337313527045061176804160250635745397699247316602749539434706697718725146348532661918589348314432650489030247449960491*i+5458521638840520249597577731822150211509617603625438308056424223587287390312387873621555080770071306431871808727361719421555111725)*x + (5531345766572306798741321803401644253383362181507727577353200324178457675394775068517780230507848870730049772934809952592192294158*i+21471857713870555538265264149149025133075794233042519084371506682714756726124338715054976495737689896271920243960065372157315779989) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16848612841374337313527045061176804160250635745397699247316602749539434706697718725146348532661918589348314432650489030247449960491*i+5458521638840520249597577731822150211509617603625438308056424223587287390312387873621555080770071306431871808727361719421555111725)*x + (5531345766572306798741321803401644253383362181507727577353200324178457675394775068517780230507848870730049772934809952592192294158*i+21471857713870555538265264149149025133075794233042519084371506682714756726124338715054976495737689896271920243960065372157315779989) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19676538981031157652760491326343593312478180396534163024601039259077599702846359997082682039336907111835663075495515711658287181935*i+21431309346621407089056611515853387078046409901174549891931130802408565405979656989681907816687009692776261872439972514305975481443)*x + (2872717906011004279963218127804623485456850408815692483979638628085014986690258139327457427084863322796701181369657346402823429903*i+22430045341051314277417612202058701634878259859552331358838541734963881244152589828176091754328558602759989579678502970586132868681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19676538981031157652760491326343593312478180396534163024601039259077599702846359997082682039336907111835663075495515711658287181935*i+21431309346621407089056611515853387078046409901174549891931130802408565405979656989681907816687009692776261872439972514305975481443)*x + (2872717906011004279963218127804623485456850408815692483979638628085014986690258139327457427084863322796701181369657346402823429903*i+22430045341051314277417612202058701634878259859552331358838541734963881244152589828176091754328558602759989579678502970586132868681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11732181277974841582800851628197823195924196608684808510202583733019325191424200297710434589310153715518161812642378975680856853696*i+18641841790586122271717645841192644852894508741400671866653829738766618200833360781703694117721421388841908424131920096496494479001)*x + (15522885043348890230798297007156855934973022905821146366742182116756709900368681414537300016052821834446298174568385194822926831863*i+19513199224665520211908389032694804727849459707388199938600697250103720945397812758312800247900529918477767175296420759040340753922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11732181277974841582800851628197823195924196608684808510202583733019325191424200297710434589310153715518161812642378975680856853696*i+18641841790586122271717645841192644852894508741400671866653829738766618200833360781703694117721421388841908424131920096496494479001)*x + (15522885043348890230798297007156855934973022905821146366742182116756709900368681414537300016052821834446298174568385194822926831863*i+19513199224665520211908389032694804727849459707388199938600697250103720945397812758312800247900529918477767175296420759040340753922) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23235545224071995853551529527210448100110107324217411766493660838755100150842046423261861138976284999774089520129406397030178661440*i+11743341476627932454944982007606908090464034146493639797636820975154625501217279110216390948669996817977042536187853221782021854556)*x + (8263567347815595509401611049491509023016957755947150794726371823341166690108604808333258492411559420192540966349774880019624821207*i+18088906238259598432694372745239330708600451975881298277450860671708955541640842126562501126246518785324146947444287158650378003017) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23235545224071995853551529527210448100110107324217411766493660838755100150842046423261861138976284999774089520129406397030178661440*i+11743341476627932454944982007606908090464034146493639797636820975154625501217279110216390948669996817977042536187853221782021854556)*x + (8263567347815595509401611049491509023016957755947150794726371823341166690108604808333258492411559420192540966349774880019624821207*i+18088906238259598432694372745239330708600451975881298277450860671708955541640842126562501126246518785324146947444287158650378003017) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1690478991672348325427054218748541425087757544532502991795018479062855729127573920010210397298757055425998167917110098427830871058*i+13888794506126468874907345596133206019358970262697950350593125270479153506017944372977625903762443782441124193675618674063947414429)*x + (7910830230677004213253770892747158491620130535485035452776853050723274506400966907462980493023420252805069123562518116676599489849*i+13976952326394315143451531976401214754541587142467697622693784733255870074943056794390913370331783945332928785764434997394218353607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1690478991672348325427054218748541425087757544532502991795018479062855729127573920010210397298757055425998167917110098427830871058*i+13888794506126468874907345596133206019358970262697950350593125270479153506017944372977625903762443782441124193675618674063947414429)*x + (7910830230677004213253770892747158491620130535485035452776853050723274506400966907462980493023420252805069123562518116676599489849*i+13976952326394315143451531976401214754541587142467697622693784733255870074943056794390913370331783945332928785764434997394218353607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12958937367684243297828302105194264006360013995337976360065920774405059025408307236102765917130989145227077263506702225383288891400*i+19659840552992475415730112464518769128973287416085099911454153344342426476468347648541506191255109534055463221308489150294062478099)*x + (14163864598249188722971817545371424980530097080036298711881600084658522744830400700844153112668606240631695606353705722712862024845*i+3530627308208833694684007834413794207855621619883449332271339735075683527341467347339182106631065817781159158244440020756997722319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12958937367684243297828302105194264006360013995337976360065920774405059025408307236102765917130989145227077263506702225383288891400*i+19659840552992475415730112464518769128973287416085099911454153344342426476468347648541506191255109534055463221308489150294062478099)*x + (14163864598249188722971817545371424980530097080036298711881600084658522744830400700844153112668606240631695606353705722712862024845*i+3530627308208833694684007834413794207855621619883449332271339735075683527341467347339182106631065817781159158244440020756997722319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7162435619346514967169036941167742296524606843548778267860752667362909075816967435905390908878717528474786382351858238336768650989*i+6395995808281995401008533158254379246917153282519178596895254406413472093118170881770474147931882697456226711350475969256619373336)*x + (10171796359825587678794068803246595574676078579589691276173293957992328588848136647044976219895987761063507066481752048322913420688*i+6439478879321979756413315245147952284769546060959717327957481045243803889524135962786608157508614339104321887477754126401270310317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7162435619346514967169036941167742296524606843548778267860752667362909075816967435905390908878717528474786382351858238336768650989*i+6395995808281995401008533158254379246917153282519178596895254406413472093118170881770474147931882697456226711350475969256619373336)*x + (10171796359825587678794068803246595574676078579589691276173293957992328588848136647044976219895987761063507066481752048322913420688*i+6439478879321979756413315245147952284769546060959717327957481045243803889524135962786608157508614339104321887477754126401270310317) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4989668781305933095676744956841812647721936151355099711456473717570963027368906059645269639905055880466649311674575330147456514621*i+3543615829607405690093274072762599269547890785819224901604520077438232328868741027939394319216829521867710115680125598693088202427)*x + (19499435795642124758554736950815677053120743384465110974604563688482376562043675333945449076898117835897761799620728497943781750017*i+15123755062732471790808792207008847542663199786567768081952036833093700483515763542664332414930982990179603984659493667893029888640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4989668781305933095676744956841812647721936151355099711456473717570963027368906059645269639905055880466649311674575330147456514621*i+3543615829607405690093274072762599269547890785819224901604520077438232328868741027939394319216829521867710115680125598693088202427)*x + (19499435795642124758554736950815677053120743384465110974604563688482376562043675333945449076898117835897761799620728497943781750017*i+15123755062732471790808792207008847542663199786567768081952036833093700483515763542664332414930982990179603984659493667893029888640) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12389894077950988334999027809971944666651713287458175311935820539617338951898452142232165334056588870651474989968234658177930511361*i+6659099743666248832411801368928818085315361217940251450400877220064156364496667697579551339716278334760170592448420721629228356739)*x + (3826684327463261798113513718603424653137632992383039958529755178389711547342664358112875542647235911824001455102721243575025370806*i+6396834533490130532083442368203446233952762357790109516764782506455533771920915040773057524860662447743298679787624913387562789111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12389894077950988334999027809971944666651713287458175311935820539617338951898452142232165334056588870651474989968234658177930511361*i+6659099743666248832411801368928818085315361217940251450400877220064156364496667697579551339716278334760170592448420721629228356739)*x + (3826684327463261798113513718603424653137632992383039958529755178389711547342664358112875542647235911824001455102721243575025370806*i+6396834533490130532083442368203446233952762357790109516764782506455533771920915040773057524860662447743298679787624913387562789111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21904318605584288142080729625670288630285170365708491397624441507233445506466876099042015115324076289967607303400918843759174271183*i+16480169950141051521300829148638584703757681515429259095207841689424063203135870747138198189670610200316092720039396158258483741114)*x + (73651068423470891508671253095913707191782668740912546165448062191633558175006865924033715340281986322900591540420804909440060128*i+14602452317099715669220205737877469451803334794672482167993589101568773637842479863598513475411693421351685300731224263933082125213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21904318605584288142080729625670288630285170365708491397624441507233445506466876099042015115324076289967607303400918843759174271183*i+16480169950141051521300829148638584703757681515429259095207841689424063203135870747138198189670610200316092720039396158258483741114)*x + (73651068423470891508671253095913707191782668740912546165448062191633558175006865924033715340281986322900591540420804909440060128*i+14602452317099715669220205737877469451803334794672482167993589101568773637842479863598513475411693421351685300731224263933082125213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9879030248763218699955661923364136290844726520203431256307149686239925479180843863565741385098572749339272744301940540258142279395*i+3309878014716341471299201350463922928163481458608933742656039548052994998536725440797448770112423245001884934343661883121555431827)*x + (11512310544300268913334682732763096500346419123776474085902528275112217628731565891566267890278892784138457902113514542084130801647*i+19466514005358650230561230736772605590987407227950726470807098147775473609538274876523512430611951232361574199587439386995065178399) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9879030248763218699955661923364136290844726520203431256307149686239925479180843863565741385098572749339272744301940540258142279395*i+3309878014716341471299201350463922928163481458608933742656039548052994998536725440797448770112423245001884934343661883121555431827)*x + (11512310544300268913334682732763096500346419123776474085902528275112217628731565891566267890278892784138457902113514542084130801647*i+19466514005358650230561230736772605590987407227950726470807098147775473609538274876523512430611951232361574199587439386995065178399) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (48987100547451755515286940753912304496042784925553931510223257341419376280747280774705223049179364087948668008110212347779322838*i+23939675381356520027905625773281262139313572832999279600472102080619160104530877650395490204528428650490941627467464522064487302864)*x + (22882983493384722965189920381864194514866552148769674383697320490878515622458532425281800813434136115154708469539174433134526259141*i+16144084453000610974025078390508803311581602580054151210934082373335932137467301518795652528407131715929296596493654316151741112935) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (48987100547451755515286940753912304496042784925553931510223257341419376280747280774705223049179364087948668008110212347779322838*i+23939675381356520027905625773281262139313572832999279600472102080619160104530877650395490204528428650490941627467464522064487302864)*x + (22882983493384722965189920381864194514866552148769674383697320490878515622458532425281800813434136115154708469539174433134526259141*i+16144084453000610974025078390508803311581602580054151210934082373335932137467301518795652528407131715929296596493654316151741112935) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6342856912360323054391346685220681116490638951177042589669587013574859096305647810528672913024442891773314924400556311418089094615*i+23836926911237906792803883088589942342007104041485583678574730209390720910021684561256238859598824879297555991109348351746809816320)*x + (6099711589141783005527216315116108506141864012994530544417123014201998697628139644893900609758921887972306928685032868709537536870*i+3924834660485183315814829443304650811204818807749725718040942899345640895968079442063556933935140431157026389275889878174888864928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6342856912360323054391346685220681116490638951177042589669587013574859096305647810528672913024442891773314924400556311418089094615*i+23836926911237906792803883088589942342007104041485583678574730209390720910021684561256238859598824879297555991109348351746809816320)*x + (6099711589141783005527216315116108506141864012994530544417123014201998697628139644893900609758921887972306928685032868709537536870*i+3924834660485183315814829443304650811204818807749725718040942899345640895968079442063556933935140431157026389275889878174888864928) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17928940901254160160381941152696040367132384394008618337692230871514131812824443669680417741318123179147629981078409435509012640988*i+20295735311624238625352322283428016559132473400131527455470637725995252130516406118832229288527930904823559220589738619223681784927)*x + (2779866249212885796602413065205296311174341592276341278981934303767149256855863780605632278002442247175107679207454140202709444358*i+14107790654167889334816340402668947877019261466274116491124225014100065992295044061017262893919254701741862983188073937107859106111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17928940901254160160381941152696040367132384394008618337692230871514131812824443669680417741318123179147629981078409435509012640988*i+20295735311624238625352322283428016559132473400131527455470637725995252130516406118832229288527930904823559220589738619223681784927)*x + (2779866249212885796602413065205296311174341592276341278981934303767149256855863780605632278002442247175107679207454140202709444358*i+14107790654167889334816340402668947877019261466274116491124225014100065992295044061017262893919254701741862983188073937107859106111) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6107150246308502120241517766731531431026600652556576690349232917273380207333665969867790807918034063739195668663419171279613075326*i+18513977393767723125741012833975660649676049910427585168729220162852182543633837125593823346686926617744761421007998148108159087547)*x + (4881477015733081274637052428585505839185205817463840085185434921381017615977043278095734315086117979455012099163798924444503041451*i+2294556414773519111843177856608427992672120617557845980311612358113880917252194382010137423512962485293615183375541869982119927876) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6107150246308502120241517766731531431026600652556576690349232917273380207333665969867790807918034063739195668663419171279613075326*i+18513977393767723125741012833975660649676049910427585168729220162852182543633837125593823346686926617744761421007998148108159087547)*x + (4881477015733081274637052428585505839185205817463840085185434921381017615977043278095734315086117979455012099163798924444503041451*i+2294556414773519111843177856608427992672120617557845980311612358113880917252194382010137423512962485293615183375541869982119927876) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18329768819958869209587048622167437898331191145211247807898930624367343777225913396572338137579991470194203659426114647373235792507*i+21346165921683053431874554756703921038674015216658862732284031832102391967769508403726027024458305473297462721987357234745556166276)*x + (15052675749918548202873263993368252720092808738824398491421112765527088980103887958074576729102932081338144988993359610323774572675*i+8943026509944585707022634408760014456666185345304833770342354803673753972914758425770291190199408945250346638621820056969506167426) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18329768819958869209587048622167437898331191145211247807898930624367343777225913396572338137579991470194203659426114647373235792507*i+21346165921683053431874554756703921038674015216658862732284031832102391967769508403726027024458305473297462721987357234745556166276)*x + (15052675749918548202873263993368252720092808738824398491421112765527088980103887958074576729102932081338144988993359610323774572675*i+8943026509944585707022634408760014456666185345304833770342354803673753972914758425770291190199408945250346638621820056969506167426) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8055776085138801022977682423313498699597350644425978586969521763047278184737802176521022195663438839468336811018075746282877352955*i+24226770606038973428947039996078232172068230734127092205305584383875239738318454520342477970202825637939601501358227091612582059589)*x + (295541913662720015871042233205346841181235836566816656772891762885333515900115994269527342428638995592751194126337397798347616414*i+15742982429181973299355828447909945267319101775281820765384222027515515367557473647060374522439417044113787829452564647823201228713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8055776085138801022977682423313498699597350644425978586969521763047278184737802176521022195663438839468336811018075746282877352955*i+24226770606038973428947039996078232172068230734127092205305584383875239738318454520342477970202825637939601501358227091612582059589)*x + (295541913662720015871042233205346841181235836566816656772891762885333515900115994269527342428638995592751194126337397798347616414*i+15742982429181973299355828447909945267319101775281820765384222027515515367557473647060374522439417044113787829452564647823201228713) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12161856299992008916154884461916038398321937712642258846066260528861461729939615428023984547476539799891839361211079124879349019772*i+5905639150338221353924506638978367201731316555908318162203806106060150990317757506208537615096895689711167701844623193331306397202)*x + (18511222308161314064784488865348611046085972290505655481676103197241098632268761227928769696756343513004910122117520666743310898102*i+7950300501747760821708550242370997050296913475717421208991034206343299183875727361738296967181534786330297637172143960338235976408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12161856299992008916154884461916038398321937712642258846066260528861461729939615428023984547476539799891839361211079124879349019772*i+5905639150338221353924506638978367201731316555908318162203806106060150990317757506208537615096895689711167701844623193331306397202)*x + (18511222308161314064784488865348611046085972290505655481676103197241098632268761227928769696756343513004910122117520666743310898102*i+7950300501747760821708550242370997050296913475717421208991034206343299183875727361738296967181534786330297637172143960338235976408) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18780136833548732516095329832265348146275410839236633883244582358348748877991339780906786374750973339592286577312800520433606244485*i+21968552154334192019728391108781928993039849007840477985503486867854120641001709795185239169752569994724262527894326973861253440443)*x + (18902867260645175306791394948791183362722721858697467166564587168943561700747409200275501084115652427824912708220158313049036839217*i+19682777381508049142463771646621576936024763818418527778186535324017514521205111475643882317886409777685635576870573732762049134502) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18780136833548732516095329832265348146275410839236633883244582358348748877991339780906786374750973339592286577312800520433606244485*i+21968552154334192019728391108781928993039849007840477985503486867854120641001709795185239169752569994724262527894326973861253440443)*x + (18902867260645175306791394948791183362722721858697467166564587168943561700747409200275501084115652427824912708220158313049036839217*i+19682777381508049142463771646621576936024763818418527778186535324017514521205111475643882317886409777685635576870573732762049134502) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5282199586206856668117568315265020150851097178179407496862251412137191902711816629881785528432567640035114166665661029306298820365*i+6060209011605248078225523766212703056562567102876429625177380863962001672708696888107499700997833189780156637687342060778667606269)*x + (11965566408284651179489633431321749881199682169497260293854751273943396578401293959183720470239046705328535918631613857501878213569*i+18229720964173778215515521110826402772927615669438597270163968223899519117500946837405781173966824901828163099615992868979285732044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5282199586206856668117568315265020150851097178179407496862251412137191902711816629881785528432567640035114166665661029306298820365*i+6060209011605248078225523766212703056562567102876429625177380863962001672708696888107499700997833189780156637687342060778667606269)*x + (11965566408284651179489633431321749881199682169497260293854751273943396578401293959183720470239046705328535918631613857501878213569*i+18229720964173778215515521110826402772927615669438597270163968223899519117500946837405781173966824901828163099615992868979285732044) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12031419149705196187566613934228433310862515873862907703604120557743533941656455346954073519260852217415202989109052068352827829452*i+17482805936539368300268684182003341628684775559179772824276642086696363043996259454082902406842574896247072278111599346891451437487)*x + (11588115770313653716235139145413701998668038725044657795570365854057010233164473597785564034674370818210774485163452183194352840069*i+7722506774361604508004439382387884294528300809403500217845723350497155541905855741251312340691346237801286336024031849955567934826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12031419149705196187566613934228433310862515873862907703604120557743533941656455346954073519260852217415202989109052068352827829452*i+17482805936539368300268684182003341628684775559179772824276642086696363043996259454082902406842574896247072278111599346891451437487)*x + (11588115770313653716235139145413701998668038725044657795570365854057010233164473597785564034674370818210774485163452183194352840069*i+7722506774361604508004439382387884294528300809403500217845723350497155541905855741251312340691346237801286336024031849955567934826) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21477161279263579960148789485044571138870499193408666706852351948232512015470365261918588735864805473505840342544632488344921878709*i+4864637152986675373776724006819747355745652151728761065775093928515887697727128781189893384959087164850027116767624454910621937109)*x + (17571188184022857025075548069696807394576740047035441805543437506992151749966634817434244923178826131416659088556949417186372787735*i+3574713158464731995167199156816103701424747312547637840090502779067761515657296012844256189072251353253264253075905441131161566152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21477161279263579960148789485044571138870499193408666706852351948232512015470365261918588735864805473505840342544632488344921878709*i+4864637152986675373776724006819747355745652151728761065775093928515887697727128781189893384959087164850027116767624454910621937109)*x + (17571188184022857025075548069696807394576740047035441805543437506992151749966634817434244923178826131416659088556949417186372787735*i+3574713158464731995167199156816103701424747312547637840090502779067761515657296012844256189072251353253264253075905441131161566152) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1031195339791074954200518291802372141117709537609403885507182765465425682190660248115076021948709940336565731965416680975348145169*i+21431650448278641093878838494622115172941406358249035930969036763577044924067752037594712743279335024837983674253919569135310862137)*x + (3518314381132482224594645825861765715499872755254664191498660162419440079349258496838533624717621416440984729099719275878740398400*i+11175441982405600417866229358706647946407479248048753222482253107011872077797161740394471177197260433280872403724331808979824780385) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1031195339791074954200518291802372141117709537609403885507182765465425682190660248115076021948709940336565731965416680975348145169*i+21431650448278641093878838494622115172941406358249035930969036763577044924067752037594712743279335024837983674253919569135310862137)*x + (3518314381132482224594645825861765715499872755254664191498660162419440079349258496838533624717621416440984729099719275878740398400*i+11175441982405600417866229358706647946407479248048753222482253107011872077797161740394471177197260433280872403724331808979824780385) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18942989467297841667160065234520031362836867721074527925705548738294017745420922366421411740806092725600051072870364775741831230621*i+18737917394925275315516922454485761042369369591360968132980452831240005517650502884220426275390835510340279842019196537701614493126)*x + (21974528285544509164946086059851991712929009753466407865010982330546262466946538927865265323348725242407926565094632203061639993805*i+8894903157978734269827955778317829208122965637375440831612780183606090771646943562571393249207140429171627515367809689793469658583) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18942989467297841667160065234520031362836867721074527925705548738294017745420922366421411740806092725600051072870364775741831230621*i+18737917394925275315516922454485761042369369591360968132980452831240005517650502884220426275390835510340279842019196537701614493126)*x + (21974528285544509164946086059851991712929009753466407865010982330546262466946538927865265323348725242407926565094632203061639993805*i+8894903157978734269827955778317829208122965637375440831612780183606090771646943562571393249207140429171627515367809689793469658583) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11531853620235577729750876165080297634445708106760520892103135690730495526140002422621961715934776125178170211993341019525076014530*i+9217895080165837482057353907511604532009368232558784488046797270489851228380497401600473603000460804308930786126303638499286859050)*x + (24237794095657944931811505845294711499932194404224852106758135944867313301206758361795081715476898257242492675871046870597662714530*i+6718955837839670432172866328965861527433611960032472391051870556275365323309151663553105676534693291402685229171199760568774903810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11531853620235577729750876165080297634445708106760520892103135690730495526140002422621961715934776125178170211993341019525076014530*i+9217895080165837482057353907511604532009368232558784488046797270489851228380497401600473603000460804308930786126303638499286859050)*x + (24237794095657944931811505845294711499932194404224852106758135944867313301206758361795081715476898257242492675871046870597662714530*i+6718955837839670432172866328965861527433611960032472391051870556275365323309151663553105676534693291402685229171199760568774903810) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (387048883922884999037422192742364390994188119458673134131474372288844628621909776801780524381125668486778251184799511352896902951*i+10599450365705575511044220276585809924072615709832790721348423501508132602617777620313252879786589195679816152875285858844836696083)*x + (1704412256083261982109862791234831806810085695409982400413984105067391635752862565960883366048513190456380024036759345930218040653*i+10082565856503229844385641158548714699107393695593729081489549971289658135890464798667896965350789288456452343896234733157096051861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (387048883922884999037422192742364390994188119458673134131474372288844628621909776801780524381125668486778251184799511352896902951*i+10599450365705575511044220276585809924072615709832790721348423501508132602617777620313252879786589195679816152875285858844836696083)*x + (1704412256083261982109862791234831806810085695409982400413984105067391635752862565960883366048513190456380024036759345930218040653*i+10082565856503229844385641158548714699107393695593729081489549971289658135890464798667896965350789288456452343896234733157096051861) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (138573914876790987962492913192154342176432232678041579944198034378156617222502676975327153202259057321359653095792361709151327537*i+11285577892740843264493546297003143406748634748228646821129691423907181393054476324187825655006689397798914064617999741282047703230)*x + (7399396682651011161768459999050129175427408286720232427538233136196188869669796170928071197979804853365866463315511116828632201598*i+10390254477232478983751545145931958949946683740940271333501015188940957595997737108746981810284221296691157387308648495555491714206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (138573914876790987962492913192154342176432232678041579944198034378156617222502676975327153202259057321359653095792361709151327537*i+11285577892740843264493546297003143406748634748228646821129691423907181393054476324187825655006689397798914064617999741282047703230)*x + (7399396682651011161768459999050129175427408286720232427538233136196188869669796170928071197979804853365866463315511116828632201598*i+10390254477232478983751545145931958949946683740940271333501015188940957595997737108746981810284221296691157387308648495555491714206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20280887751855977471684584814045724484806405380334517047682880274039029122806124759540017677379238254322588164804101198869726025655*i+22762910674261209209520068403115963205360152290889888863964708712631149363271182880702402971285965139713685486115189274779814218410)*x + (21270520062407214828607275858743366172353086288988764614791408592313644711452471591035657057761626761183195492609909149984496719949*i+3688229512125522716934139851646785130149507348602697363257201972379843192962331095542759352055301418848045427937067211021077953759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20280887751855977471684584814045724484806405380334517047682880274039029122806124759540017677379238254322588164804101198869726025655*i+22762910674261209209520068403115963205360152290889888863964708712631149363271182880702402971285965139713685486115189274779814218410)*x + (21270520062407214828607275858743366172353086288988764614791408592313644711452471591035657057761626761183195492609909149984496719949*i+3688229512125522716934139851646785130149507348602697363257201972379843192962331095542759352055301418848045427937067211021077953759) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19381175237884175271631306048375016301777233515697196136520845473632666074044311848990048913489684193661732870030353361718406605789*i+12921404178776280516991204126586159336754399662951071671812984904835916391299673691486392572845695135043476042255925394949453398443)*x + (10599791585158135768998438896787245180352621652160261745216050172559817504747458008103868606208834537219408997283993224874011072468*i+12437758084806213312913275605692639585296252832839015997994545838203768407630633148307296569250435489969731785876810183773791259960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19381175237884175271631306048375016301777233515697196136520845473632666074044311848990048913489684193661732870030353361718406605789*i+12921404178776280516991204126586159336754399662951071671812984904835916391299673691486392572845695135043476042255925394949453398443)*x + (10599791585158135768998438896787245180352621652160261745216050172559817504747458008103868606208834537219408997283993224874011072468*i+12437758084806213312913275605692639585296252832839015997994545838203768407630633148307296569250435489969731785876810183773791259960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13906965473806617879547016538621034534682868620553329295057660811207350323805599316010635375597184554954948844493385605621796715374*i+19925308399124540541472408966069744681493924245491278573092529319462524089197121763557097513159648515339757680213392716938234831874)*x + (5466804854620565132024881948937900571250907281668230056164477003291208165176479346474521989769586464802864191302347733239456526745*i+17535588342352554656589957168472577202817940451373263270402716474335724058483608533735166134836355751683497061416950988259095569908) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13906965473806617879547016538621034534682868620553329295057660811207350323805599316010635375597184554954948844493385605621796715374*i+19925308399124540541472408966069744681493924245491278573092529319462524089197121763557097513159648515339757680213392716938234831874)*x + (5466804854620565132024881948937900571250907281668230056164477003291208165176479346474521989769586464802864191302347733239456526745*i+17535588342352554656589957168472577202817940451373263270402716474335724058483608533735166134836355751683497061416950988259095569908) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (46239756344833493098998333049128051258542736082357083394120952057464866515974480759500993923039865169641325353024031385189123730*i+10470959881616348793711373749704711988509753817407897305639991042979598411934322385071187019106202954299811118533741552721345606980)*x + (18449657617520335719194680916806778553258574808420374761938594360730963993919073833708830991970401449787438930241040617286538537032*i+4884987299937132267089976709508137256486349584287911200547102546500036817227672475416599109299555725082907216105683556154498069515) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (46239756344833493098998333049128051258542736082357083394120952057464866515974480759500993923039865169641325353024031385189123730*i+10470959881616348793711373749704711988509753817407897305639991042979598411934322385071187019106202954299811118533741552721345606980)*x + (18449657617520335719194680916806778553258574808420374761938594360730963993919073833708830991970401449787438930241040617286538537032*i+4884987299937132267089976709508137256486349584287911200547102546500036817227672475416599109299555725082907216105683556154498069515) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18620096511870200325739860259189647256309805625589054396358563554986644494422706125057074221849681291577381468156433531230078091798*i+4370861092236472212605711416657149943175197774654642166748892861091156475147371726014414206093468237743016767657891116861779471261)*x + (5703401205012136068514997746348881900860114308495092886074947818914709994754025514812973184646776514308811015443595160646378191892*i+3979113138511569369409459888942603194412453720652582559030038608820608323886618438465189686061438750185707337395451874484313543869) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18620096511870200325739860259189647256309805625589054396358563554986644494422706125057074221849681291577381468156433531230078091798*i+4370861092236472212605711416657149943175197774654642166748892861091156475147371726014414206093468237743016767657891116861779471261)*x + (5703401205012136068514997746348881900860114308495092886074947818914709994754025514812973184646776514308811015443595160646378191892*i+3979113138511569369409459888942603194412453720652582559030038608820608323886618438465189686061438750185707337395451874484313543869) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3984794290845570260219903728894450844444188918934738046457732131416593044623824437319996184727564475011343079415216765327560402047*i+13146897073449696851232556362982131500150611260480289649963395674005396578225213849567259697559103779472544254133202309898229149298)*x + (8971198424750993766832489897850063672820658755529967589775519129156039417204136578952839390761182103274945393908171378071877099070*i+10642434535567375496891885387651214902658290736281453063483870634239880052641497880113221923065067821745547750218570811873122925343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3984794290845570260219903728894450844444188918934738046457732131416593044623824437319996184727564475011343079415216765327560402047*i+13146897073449696851232556362982131500150611260480289649963395674005396578225213849567259697559103779472544254133202309898229149298)*x + (8971198424750993766832489897850063672820658755529967589775519129156039417204136578952839390761182103274945393908171378071877099070*i+10642434535567375496891885387651214902658290736281453063483870634239880052641497880113221923065067821745547750218570811873122925343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16220951928267665432943876916261882603610416487087083361378567541131950798581908185521407801134765435201594891500660224606511806413*i+18255598512314536690864578107451411949262160197407170178391371787262944424925151404303807912922150101838337299688536293004793720120)*x + (17582536433847982984972157281580104490747745162312877613821406722736704913825754586827673434152773115343727538812933204918672679023*i+19549563953548577234243854641758742206916501259663770652217096024443880763241981568002763318246658534984383909759901350758689981319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16220951928267665432943876916261882603610416487087083361378567541131950798581908185521407801134765435201594891500660224606511806413*i+18255598512314536690864578107451411949262160197407170178391371787262944424925151404303807912922150101838337299688536293004793720120)*x + (17582536433847982984972157281580104490747745162312877613821406722736704913825754586827673434152773115343727538812933204918672679023*i+19549563953548577234243854641758742206916501259663770652217096024443880763241981568002763318246658534984383909759901350758689981319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15496093552234396508461049401803925166527508834884504732474147792356543507484159818092413951541488650518762454125584659664805570057*i+8407249167250322343583566491950250361869304611433481441473976514868695227481595654800917241491425004389726288325176645129551887100)*x + (17654344250227325603083767663594708495488102197393265553056518673470865630626836373257898404071046312991764626185379153179702188305*i+16165331823340039736522519065643463149455089287889581454463699456712287667356779233318483860411116683566844920400685845936916140679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15496093552234396508461049401803925166527508834884504732474147792356543507484159818092413951541488650518762454125584659664805570057*i+8407249167250322343583566491950250361869304611433481441473976514868695227481595654800917241491425004389726288325176645129551887100)*x + (17654344250227325603083767663594708495488102197393265553056518673470865630626836373257898404071046312991764626185379153179702188305*i+16165331823340039736522519065643463149455089287889581454463699456712287667356779233318483860411116683566844920400685845936916140679) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8157088082028234110263108933650375219572080715747933458965819632050377411367314766981084871913573692467188704849358586662286234053*i+12457804096927853004403763452628343113173378194461959964594648223503828039710423670792315158461034686250020254891700220331442619796)*x + (13967225762243876789601905119621426739667835876789829568816572914421725083000455020203783355933988361134849072622727562494396795706*i+21291348060378365042899428636318533982078711581442500243723176919339456699433060349168083444100675809999145300986988937942574093533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8157088082028234110263108933650375219572080715747933458965819632050377411367314766981084871913573692467188704849358586662286234053*i+12457804096927853004403763452628343113173378194461959964594648223503828039710423670792315158461034686250020254891700220331442619796)*x + (13967225762243876789601905119621426739667835876789829568816572914421725083000455020203783355933988361134849072622727562494396795706*i+21291348060378365042899428636318533982078711581442500243723176919339456699433060349168083444100675809999145300986988937942574093533) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16754179416987932239853328978341690332988529158233900329651597388074359675848384001334484902558502376662454331462733756023441172460*i+7075938490670794052161984558652342079500259922579961230186157998125886516177851513748551267264514349123596048320925768023496549054)*x + (14043078669603326537039719173686720256418065462238214388442035417704948777959656949632531479741011658970423470276493218078946258146*i+9168156837001144987288658385122400478114892618296334963989262657593730916494929467161323922462650434193411559266040849617121017126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16754179416987932239853328978341690332988529158233900329651597388074359675848384001334484902558502376662454331462733756023441172460*i+7075938490670794052161984558652342079500259922579961230186157998125886516177851513748551267264514349123596048320925768023496549054)*x + (14043078669603326537039719173686720256418065462238214388442035417704948777959656949632531479741011658970423470276493218078946258146*i+9168156837001144987288658385122400478114892618296334963989262657593730916494929467161323922462650434193411559266040849617121017126) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5149284215579825228455277665377105849011300737613560943576106501860632316885143768978210371805296684854657224842704625418908407199*i+17169196187382769406067893339144245470704370550522227931869322840072809761779537174667052945352232950886440417136945138815401457408)*x + (9537479300221928215293062035926975584614237076552606125611092362953801468825080827823374072079018386234861108357216923584498783777*i+17488359533740108184847897598465919452533659788213622414253298944530766418591442690908700043286686310210734391603389384303775898682) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5149284215579825228455277665377105849011300737613560943576106501860632316885143768978210371805296684854657224842704625418908407199*i+17169196187382769406067893339144245470704370550522227931869322840072809761779537174667052945352232950886440417136945138815401457408)*x + (9537479300221928215293062035926975584614237076552606125611092362953801468825080827823374072079018386234861108357216923584498783777*i+17488359533740108184847897598465919452533659788213622414253298944530766418591442690908700043286686310210734391603389384303775898682) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12024178327485691158803886946420818582521064524010780534811153102950234858691087389685976106483251728435899914576329046344512891425*i+16875920581800727281017848210660006856476099401281102999386488658231841268161054386614883204606513869083703657179699977474187847070)*x + (664378950305595058593548131674455366453655318804071757578171006852631541031023868034554027238764610453275517269774155839202650993*i+15516443630088783756419130459673617694658528260730993382182776920188285232995233065455209935889819777570127520041605212309869629306) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12024178327485691158803886946420818582521064524010780534811153102950234858691087389685976106483251728435899914576329046344512891425*i+16875920581800727281017848210660006856476099401281102999386488658231841268161054386614883204606513869083703657179699977474187847070)*x + (664378950305595058593548131674455366453655318804071757578171006852631541031023868034554027238764610453275517269774155839202650993*i+15516443630088783756419130459673617694658528260730993382182776920188285232995233065455209935889819777570127520041605212309869629306) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9231452673719824573256332418497154336438905381943135613389939829725728532668269229659373546930169305967391678820574419114132229569*i+6947207153558368420537022086667615298985747060398848569732122163702010129124725261168155268559150568352308463429163040487813657518)*x + (22561226054259637850064285297346644669249072090593850949063403940161266440251604356504587375085027405180524974876732117472271892920*i+7887375523929181185422591143632170634511252827578648011265187742106586763858837686204575723695470228396309188843086622254641972915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9231452673719824573256332418497154336438905381943135613389939829725728532668269229659373546930169305967391678820574419114132229569*i+6947207153558368420537022086667615298985747060398848569732122163702010129124725261168155268559150568352308463429163040487813657518)*x + (22561226054259637850064285297346644669249072090593850949063403940161266440251604356504587375085027405180524974876732117472271892920*i+7887375523929181185422591143632170634511252827578648011265187742106586763858837686204575723695470228396309188843086622254641972915) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7566235262210132861850267564493326511698410488108710893754140327336111340219822170762468320336688531554068705767972394536259601583*i+1482028607830311833333323839206183264717426146504093325264801531413463969047422263091302992531361657448994701967586900574694777852)*x + (5730642674022824639400498915116152188746352081136678680812053862814699578983962447571317332707025294445708131146965015154664603102*i+9068713218142458836163744218978463463119967770592948808859391614443227229644646100137341733971939915406080907682003945349657543249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7566235262210132861850267564493326511698410488108710893754140327336111340219822170762468320336688531554068705767972394536259601583*i+1482028607830311833333323839206183264717426146504093325264801531413463969047422263091302992531361657448994701967586900574694777852)*x + (5730642674022824639400498915116152188746352081136678680812053862814699578983962447571317332707025294445708131146965015154664603102*i+9068713218142458836163744218978463463119967770592948808859391614443227229644646100137341733971939915406080907682003945349657543249) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11113375747909976609014211163739902600288193127375192783532125953253146155849823259374383719113673787690487733117062419464456797590*i+20419694210473664932171529260685661813553652082388005309252987509342191348609501758339641472990716124192943564692665752830763444359)*x + (6475416926152792294133336469640777705018822447321228423176986411171673970803667731502692612972499941988234349734806893822555075457*i+10630399749135537509916034712081024064354349525208609776636108481861953475272382591801487239531729649353713087870695432998264107891) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11113375747909976609014211163739902600288193127375192783532125953253146155849823259374383719113673787690487733117062419464456797590*i+20419694210473664932171529260685661813553652082388005309252987509342191348609501758339641472990716124192943564692665752830763444359)*x + (6475416926152792294133336469640777705018822447321228423176986411171673970803667731502692612972499941988234349734806893822555075457*i+10630399749135537509916034712081024064354349525208609776636108481861953475272382591801487239531729649353713087870695432998264107891) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17581925297688824418492152606441130230486603262546056488930403022359430086623870623081701302669855892390920253660307999876158261325*i+12236526768461951445183052326510153058926426849813972231020343659395322465042171389136112869936117821604824907362106221805675122871)*x + (4514000705652972937170029021903093871978320679666273534290320090239795609905393251584341548183166254408856398321735432803491864340*i+17798015878134402222423930421497039136298839154229894441134090987597497033225992520601149665796728273906029216798271307913430173575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17581925297688824418492152606441130230486603262546056488930403022359430086623870623081701302669855892390920253660307999876158261325*i+12236526768461951445183052326510153058926426849813972231020343659395322465042171389136112869936117821604824907362106221805675122871)*x + (4514000705652972937170029021903093871978320679666273534290320090239795609905393251584341548183166254408856398321735432803491864340*i+17798015878134402222423930421497039136298839154229894441134090987597497033225992520601149665796728273906029216798271307913430173575) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2952854563150130096665266647551157784561402559300563292585667630249387501798918712361800723634854147434881337690989589004444280757*i+3256233480288514169375709865234629350831433668973835850756665051607864050143598645083739331560866277163799176986108278907701675708)*x + (633930402481527272705045978231790640096125572444978031811363951330644421241335669390559017170596474516609884867131984238594744103*i+2648324416630231463992833498928520830111607433085871391973198009754836838668853904146141325428190709637011405675609693724218175883) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2952854563150130096665266647551157784561402559300563292585667630249387501798918712361800723634854147434881337690989589004444280757*i+3256233480288514169375709865234629350831433668973835850756665051607864050143598645083739331560866277163799176986108278907701675708)*x + (633930402481527272705045978231790640096125572444978031811363951330644421241335669390559017170596474516609884867131984238594744103*i+2648324416630231463992833498928520830111607433085871391973198009754836838668853904146141325428190709637011405675609693724218175883) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16734813830364394625218196353524762914897324611864773553808238021047718301361384246795760143730021974406821207450251867445218523302*i+23965439320166857647180547206648688338556437719603924453213487986557440625334626340813822163631443230078232794070825132662220437244)*x + (20954973796722656710961383361254530360229535606675916822238652546695291910348624231358066223861567931167594833173671122614349294880*i+19000997066087919898434524791449065504671408209403057536409004508839997750363335616602811142033189953214320023125378833308827433042) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16734813830364394625218196353524762914897324611864773553808238021047718301361384246795760143730021974406821207450251867445218523302*i+23965439320166857647180547206648688338556437719603924453213487986557440625334626340813822163631443230078232794070825132662220437244)*x + (20954973796722656710961383361254530360229535606675916822238652546695291910348624231358066223861567931167594833173671122614349294880*i+19000997066087919898434524791449065504671408209403057536409004508839997750363335616602811142033189953214320023125378833308827433042) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2295620263172825598046931631245072269107863030151150407868189702753698420901059446852341831071183998803940356691869245368962730766*i+21285596226369444556302840041360041277413110821129894968542505690785394481366181467089084340801588911980174104084537375396535678324)*x + (19859042799667888971083528274129553555555473654842094982208556973565134088030796117343137494508743216139886772611024631388680024646*i+12798317466850879832446818883073950622916673771487622111846861158629169087372667623147752051966577364425357484773324822210943475032) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2295620263172825598046931631245072269107863030151150407868189702753698420901059446852341831071183998803940356691869245368962730766*i+21285596226369444556302840041360041277413110821129894968542505690785394481366181467089084340801588911980174104084537375396535678324)*x + (19859042799667888971083528274129553555555473654842094982208556973565134088030796117343137494508743216139886772611024631388680024646*i+12798317466850879832446818883073950622916673771487622111846861158629169087372667623147752051966577364425357484773324822210943475032) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8966751618840665053948005132043622438036710671435600723599400245438377728190748406765149218482195797362460780910133089764161284944*i+17902275553252259515036463084332506657327266421480302363966168411445219282709815114887837011584863870160135354920419165836227298078)*x + (21915325509409482309962547186164380599623417583991391964506008590084848051496580130331245953112183824445604576027831844914491395244*i+14894089816470507166279798786986561886580870915211515417615958743597370671264226161071338154523431766121015199787698673702264432244) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8966751618840665053948005132043622438036710671435600723599400245438377728190748406765149218482195797362460780910133089764161284944*i+17902275553252259515036463084332506657327266421480302363966168411445219282709815114887837011584863870160135354920419165836227298078)*x + (21915325509409482309962547186164380599623417583991391964506008590084848051496580130331245953112183824445604576027831844914491395244*i+14894089816470507166279798786986561886580870915211515417615958743597370671264226161071338154523431766121015199787698673702264432244) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14563878536370317066304642857866252491251254124719477999192462690806228570790371260302771231553978518977588600198512270513751551543*i+1673884098716757249126141588227301797955702187273332981189263109689410466265471657051118524231908587121411664612907965072519553669)*x + (21603672438817795488866943425394352251461587917389850101912639295771626615161964465194688095271612885889592821165298370101778733432*i+16969114212506452305988762179785362254610691359619367872047471657097879109402372740028405113806469513131344004468303199765266358736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14563878536370317066304642857866252491251254124719477999192462690806228570790371260302771231553978518977588600198512270513751551543*i+1673884098716757249126141588227301797955702187273332981189263109689410466265471657051118524231908587121411664612907965072519553669)*x + (21603672438817795488866943425394352251461587917389850101912639295771626615161964465194688095271612885889592821165298370101778733432*i+16969114212506452305988762179785362254610691359619367872047471657097879109402372740028405113806469513131344004468303199765266358736) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24359700912058646614718335804057307387646474000911846199213373378887106179531503705195818259552637614855583016389685976400852103690*i+1433137007298333087411900231522789322234921016420314247737561296300429200631379721921314851426539570014186504067203095302018790459)*x + (19666841637520039143201788793138564145064743502337856508960962280007291593379678186210078920717239258233358879024486931291568580824*i+18991488963543372150936774210379137791158018228960843845239656753576073907683547671393588254353093770733682554122611123381772136457) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24359700912058646614718335804057307387646474000911846199213373378887106179531503705195818259552637614855583016389685976400852103690*i+1433137007298333087411900231522789322234921016420314247737561296300429200631379721921314851426539570014186504067203095302018790459)*x + (19666841637520039143201788793138564145064743502337856508960962280007291593379678186210078920717239258233358879024486931291568580824*i+18991488963543372150936774210379137791158018228960843845239656753576073907683547671393588254353093770733682554122611123381772136457) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19251632221368798692645728418904429178876916594212451741999604936235749019314890394407432804188792556447115080781896543936589067260*i+8594295286651843956497178783042926731354318270495097569237804201015105925520854525113408982242274033245262718678596058915831571838)*x + (7135564175576396018355626419644566146293249794191985494111557661525679991307069619629970435060897855190023565865248595004661597883*i+3955117921642139083872640857671777684618892645750929131325566540970248765950201859572730250356314461778332751347474285056544426869) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19251632221368798692645728418904429178876916594212451741999604936235749019314890394407432804188792556447115080781896543936589067260*i+8594295286651843956497178783042926731354318270495097569237804201015105925520854525113408982242274033245262718678596058915831571838)*x + (7135564175576396018355626419644566146293249794191985494111557661525679991307069619629970435060897855190023565865248595004661597883*i+3955117921642139083872640857671777684618892645750929131325566540970248765950201859572730250356314461778332751347474285056544426869) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11313592009860356429559079720829897408917062410135884020833480840509464971238654287778491690057508334726589381201757410232258312402*i+8729357798234160230605885370855098152515733672334864620051635353732223611950111696863091272620046390278123984367454348080596015865)*x + (1522294348906895722788140099256918892967502852948150273184080952289961800998026981498031549087221940862142162411400126783278640598*i+13035156933011853000419909418985075327785166242504659769937564592043270912396832217022579415241221710115540154717139197172309814291) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11313592009860356429559079720829897408917062410135884020833480840509464971238654287778491690057508334726589381201757410232258312402*i+8729357798234160230605885370855098152515733672334864620051635353732223611950111696863091272620046390278123984367454348080596015865)*x + (1522294348906895722788140099256918892967502852948150273184080952289961800998026981498031549087221940862142162411400126783278640598*i+13035156933011853000419909418985075327785166242504659769937564592043270912396832217022579415241221710115540154717139197172309814291) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21482034161212844524180634380647402901530797586624953100444694591949177918957900515354778152400850625239459726170254417135760679925*i+17690804540910750456986850981121330381975559200506542477371199240472279171794789754256527495312340507337453321213197470930818632004)*x + (5769085122710497959062564359445962503870335243834055996147737770116209517157127803056884731965072930281768460084745891790075163921*i+7284445239147490936104456876230805991727638717787007553418219250946212410929630401827823796106010082898309486730927873685948972339) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21482034161212844524180634380647402901530797586624953100444694591949177918957900515354778152400850625239459726170254417135760679925*i+17690804540910750456986850981121330381975559200506542477371199240472279171794789754256527495312340507337453321213197470930818632004)*x + (5769085122710497959062564359445962503870335243834055996147737770116209517157127803056884731965072930281768460084745891790075163921*i+7284445239147490936104456876230805991727638717787007553418219250946212410929630401827823796106010082898309486730927873685948972339) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11757264369519756469180911856855383426184791228680627316875481912355721806594964981980607022618012535499426896806165576659565011867*i+10906921897042535175948440669740679057099352533173838004110791734678272550021913461344817645067449237958842955070337988188920021166)*x + (10942801894219330853166591764388597789791731941714485261840592809437138523203535137217409166498445653843940660504890891189347284394*i+7386769074624037080986498620955926497679079677925692652298906448046062893436460439380285962031822262866075727025054941758866178550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11757264369519756469180911856855383426184791228680627316875481912355721806594964981980607022618012535499426896806165576659565011867*i+10906921897042535175948440669740679057099352533173838004110791734678272550021913461344817645067449237958842955070337988188920021166)*x + (10942801894219330853166591764388597789791731941714485261840592809437138523203535137217409166498445653843940660504890891189347284394*i+7386769074624037080986498620955926497679079677925692652298906448046062893436460439380285962031822262866075727025054941758866178550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8288684291154552900904837930224866178667046988811362882180130229244255960508754960993731516570361062527992689284504260337789195431*i+10755676100857861877278649772836758745533634146125342424909217240497093352471372797302056266518820898604546335718409454852968229157)*x + (2593163110165537336182724103056744944528660967214709967147812218805414806548736923750838104712049134108418368869446479291502706909*i+23230139840862779114711718209665340034469497340008955109643505082992968275422238749667378635380352578082523397470884303271958878645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8288684291154552900904837930224866178667046988811362882180130229244255960508754960993731516570361062527992689284504260337789195431*i+10755676100857861877278649772836758745533634146125342424909217240497093352471372797302056266518820898604546335718409454852968229157)*x + (2593163110165537336182724103056744944528660967214709967147812218805414806548736923750838104712049134108418368869446479291502706909*i+23230139840862779114711718209665340034469497340008955109643505082992968275422238749667378635380352578082523397470884303271958878645) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13144772672820891944007945338668406597739217129444621608114105694137519783392816945742463579275698198975113874164750498380199766317*i+14495792906966965566568242734275428220026046263516631658683493298195991589161334339530824638658888639515081787906000287282167301807)*x + (16247947161669670352816467290738060770684437586631913503230334302994242555530533367757534947995363485191910436382413763278613957022*i+17223263501170204251425529522358971844559668341023432406818744478594684217153607613303115295726963647841938092889029431041341663499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13144772672820891944007945338668406597739217129444621608114105694137519783392816945742463579275698198975113874164750498380199766317*i+14495792906966965566568242734275428220026046263516631658683493298195991589161334339530824638658888639515081787906000287282167301807)*x + (16247947161669670352816467290738060770684437586631913503230334302994242555530533367757534947995363485191910436382413763278613957022*i+17223263501170204251425529522358971844559668341023432406818744478594684217153607613303115295726963647841938092889029431041341663499) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (847744843537496449508966920433051873568612550859242741171620371549429316740112959079467436032882452261960669686362191140986340861*i+14481608303401582372240090780074639331296884737624201768299622198669062680211188556011341806777203329870623950591141707593730629043)*x + (4555206138743226536358856486929657802403476030675034407124785039477012413909201065713748862624240553538125433047790202974996722766*i+7480128807113398642894436577138270170280060096570833662577536915644548862769281667648002141068469510812567087880943520494440581765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (847744843537496449508966920433051873568612550859242741171620371549429316740112959079467436032882452261960669686362191140986340861*i+14481608303401582372240090780074639331296884737624201768299622198669062680211188556011341806777203329870623950591141707593730629043)*x + (4555206138743226536358856486929657802403476030675034407124785039477012413909201065713748862624240553538125433047790202974996722766*i+7480128807113398642894436577138270170280060096570833662577536915644548862769281667648002141068469510812567087880943520494440581765) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22511797378542712739698088364848420312195502663103627817151430860726247256520215132995860988458492416731296085213281790332721801201*i+11558868736449802346203715269776520019532219728535525256174659275984876492634239060809179024011775729926694463963777045403319763297)*x + (19251848048859917312102344623225654073968307822256165314999368377743980077167791140523857045130857976824387099134176518737788518817*i+1276462576275291768492465733900854562726720261057240326134321404669874731551715719453994013520262375824718543855293433792989422206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22511797378542712739698088364848420312195502663103627817151430860726247256520215132995860988458492416731296085213281790332721801201*i+11558868736449802346203715269776520019532219728535525256174659275984876492634239060809179024011775729926694463963777045403319763297)*x + (19251848048859917312102344623225654073968307822256165314999368377743980077167791140523857045130857976824387099134176518737788518817*i+1276462576275291768492465733900854562726720261057240326134321404669874731551715719453994013520262375824718543855293433792989422206) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3547489443949199606718054475443166672658947969831648987803357000977037948727869859439077499368681637796865223981434818234873562018*i+11508736990832181664337236354132464953163007897572767226650521137519176241589973753051403675315173169511415091488328237136291821677)*x + (7215022647823504682466807752118967972979793205742536217031539467623275105041410172137064036737267655864079832987897127309789724554*i+9526285794067641456036131298483866691516663795972336363560077002755206413274256683131044704128506840491750720692281067119415603267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3547489443949199606718054475443166672658947969831648987803357000977037948727869859439077499368681637796865223981434818234873562018*i+11508736990832181664337236354132464953163007897572767226650521137519176241589973753051403675315173169511415091488328237136291821677)*x + (7215022647823504682466807752118967972979793205742536217031539467623275105041410172137064036737267655864079832987897127309789724554*i+9526285794067641456036131298483866691516663795972336363560077002755206413274256683131044704128506840491750720692281067119415603267) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3008498393164408800718014891447794615349976110592728501035626404961631034786462742749183505954205638143363773170597109644079564877*i+7789825262120376256735278316202456166876371794848575858806678805783958729423166555711012775909045678565368071228397896653149588980)*x + (1680246444423725997050782356280443954656258328881080293694010004709333936226563431845705250875567044904222127527955760024751112482*i+307898370220641663583473903047702198908228551834227615277327002263057957146209243917924606055276485092672030861063915260962139308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3008498393164408800718014891447794615349976110592728501035626404961631034786462742749183505954205638143363773170597109644079564877*i+7789825262120376256735278316202456166876371794848575858806678805783958729423166555711012775909045678565368071228397896653149588980)*x + (1680246444423725997050782356280443954656258328881080293694010004709333936226563431845705250875567044904222127527955760024751112482*i+307898370220641663583473903047702198908228551834227615277327002263057957146209243917924606055276485092672030861063915260962139308) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8406175766752030559253015645987700324623814643279719607240572814067109012001586376459109667761531605379087102632505696706311205721*i+8936283149062217472757205988570060126209790423133126699040333647266714204270109871268861355539185331147277316275872595863330860441)*x + (5101491306032125418639846348699442595363853572359599939054817323747378200577710938236913106292589317054954765400185542279073437582*i+20799634791703625446696922875481676073859504187396263312369362435867107093810504794532303619270884588896924538439513479970979291568) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8406175766752030559253015645987700324623814643279719607240572814067109012001586376459109667761531605379087102632505696706311205721*i+8936283149062217472757205988570060126209790423133126699040333647266714204270109871268861355539185331147277316275872595863330860441)*x + (5101491306032125418639846348699442595363853572359599939054817323747378200577710938236913106292589317054954765400185542279073437582*i+20799634791703625446696922875481676073859504187396263312369362435867107093810504794532303619270884588896924538439513479970979291568) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12573087094118282929990249224962589695038594521038083535546710581935044805204331539515459049411606676207999720522410097638799801476*i+9442692630983949442915059033183820954738562553044578133237529567004364312239458322700959347789651518063133966177174510685912084300)*x + (2675282902090752187276491061783644060815560399384207229853803111533599769441704542870066388348451953596770520206137830718788139013*i+150885089461902396730035823034650441812636940997495246915466985795771089506457550521612887618216401672393339986619067617368198412) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12573087094118282929990249224962589695038594521038083535546710581935044805204331539515459049411606676207999720522410097638799801476*i+9442692630983949442915059033183820954738562553044578133237529567004364312239458322700959347789651518063133966177174510685912084300)*x + (2675282902090752187276491061783644060815560399384207229853803111533599769441704542870066388348451953596770520206137830718788139013*i+150885089461902396730035823034650441812636940997495246915466985795771089506457550521612887618216401672393339986619067617368198412) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5379501017251922858360167663287942005787733140167625759014821519080032321315713032273506660449865200139451210333310679141847214794*i+1435161931419872674895657802224979257617942725634025237378692499460815485634699996644276041327797871758526320606940931599574426301)*x + (13547189903547289546602218314393356911190569611668370379280176305332174163113099612162438101854937579367833775384715598078077103599*i+7100655117837841254928902348734268476290524085846011924833077625284545394854740822358711168512138258737058186546203710902945234282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5379501017251922858360167663287942005787733140167625759014821519080032321315713032273506660449865200139451210333310679141847214794*i+1435161931419872674895657802224979257617942725634025237378692499460815485634699996644276041327797871758526320606940931599574426301)*x + (13547189903547289546602218314393356911190569611668370379280176305332174163113099612162438101854937579367833775384715598078077103599*i+7100655117837841254928902348734268476290524085846011924833077625284545394854740822358711168512138258737058186546203710902945234282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21116082074826659282543485742993239873561275666152898602297249981601119576871738933545958966124860315018805752785484522608028502916*i+7272120514650504278371504877033548987467001432450409164784785765012095794176754729293553419872762378730815266429707700832527716609)*x + (3533630750719264798099586413964526334978690157024667552549607071663292720805289318769616432868824965583840230461797614729590674503*i+2799209788567315420444847474796436300193285161412319159546162823199731913369480134369370390096839123648026382594880463764167187906) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21116082074826659282543485742993239873561275666152898602297249981601119576871738933545958966124860315018805752785484522608028502916*i+7272120514650504278371504877033548987467001432450409164784785765012095794176754729293553419872762378730815266429707700832527716609)*x + (3533630750719264798099586413964526334978690157024667552549607071663292720805289318769616432868824965583840230461797614729590674503*i+2799209788567315420444847474796436300193285161412319159546162823199731913369480134369370390096839123648026382594880463764167187906) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19092745364910234830866146209060120103032825918335883027328541906879278910105764282012374410742792980117964284435921610711637386658*i+19930479915706797300175196788763972397863419964413373426020976312845862118251416964592444616596984109715523403692725262116107569229)*x + (7537602249748210879370127358368324762290917866715314788127123350586533743481362645480698788032352714775446186695890721511188356005*i+21860476456431882840684273065905523634006088809654805619880749469081031264033346637143198959719496710218662171218541699594487655904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19092745364910234830866146209060120103032825918335883027328541906879278910105764282012374410742792980117964284435921610711637386658*i+19930479915706797300175196788763972397863419964413373426020976312845862118251416964592444616596984109715523403692725262116107569229)*x + (7537602249748210879370127358368324762290917866715314788127123350586533743481362645480698788032352714775446186695890721511188356005*i+21860476456431882840684273065905523634006088809654805619880749469081031264033346637143198959719496710218662171218541699594487655904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20435857587218451589050832702413066702021965316026696869662594006320213424672527628287070315146321337246499102637074716329771063715*i+17009063134389846469804951911262847347846161347029019802542915729338439424283570883259126264526209822837986701938536561225034176928)*x + (20480323866588101810160147414267443447254987281299265443453481619962593918283015561735535571263994883465428248979488376571853672288*i+20343343321597322671214468482161747203579975306063959918389417440429252624510384595398989859203426758392794628058929994801119812347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20435857587218451589050832702413066702021965316026696869662594006320213424672527628287070315146321337246499102637074716329771063715*i+17009063134389846469804951911262847347846161347029019802542915729338439424283570883259126264526209822837986701938536561225034176928)*x + (20480323866588101810160147414267443447254987281299265443453481619962593918283015561735535571263994883465428248979488376571853672288*i+20343343321597322671214468482161747203579975306063959918389417440429252624510384595398989859203426758392794628058929994801119812347) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8881481357090082700119035204817996198045222687356493753151559663221439572734621116874375072422552925814222358996950296891815698511*i+23077986108396333882832662836100867306673129270744412174227603093028977659858246767785861683997434571412614299164816858784413864617)*x + (20870622109625415844507170679134911554933847855075263389407034467076172857290233700074876689645178066541113126500638146489836807050*i+10883693768144396900067891992335762422831856235772522685709221751761257839570732960950906790046664142470200791176927384605236606074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8881481357090082700119035204817996198045222687356493753151559663221439572734621116874375072422552925814222358996950296891815698511*i+23077986108396333882832662836100867306673129270744412174227603093028977659858246767785861683997434571412614299164816858784413864617)*x + (20870622109625415844507170679134911554933847855075263389407034467076172857290233700074876689645178066541113126500638146489836807050*i+10883693768144396900067891992335762422831856235772522685709221751761257839570732960950906790046664142470200791176927384605236606074) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13229554942638752274091832023875007639493365288787939478331367291139486178374776126852507229329186573894123518864151782225908449692*i+13492593300402623573600028760688738095769987450955415346936691938783561100259428161691378627880030367048198152175028481525675194422)*x + (15094419615680367645310533110066871246139523519631526238054528878189706565307678360186715371766113845881999085699320700508949061230*i+6687340116118486273810566172930107695794642138273103451412061457468911078309809279488798632602493265608388921840442479497865535452) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13229554942638752274091832023875007639493365288787939478331367291139486178374776126852507229329186573894123518864151782225908449692*i+13492593300402623573600028760688738095769987450955415346936691938783561100259428161691378627880030367048198152175028481525675194422)*x + (15094419615680367645310533110066871246139523519631526238054528878189706565307678360186715371766113845881999085699320700508949061230*i+6687340116118486273810566172930107695794642138273103451412061457468911078309809279488798632602493265608388921840442479497865535452) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5215199914343933597655510724309651492194725934533770166238415845937565356550449096827945823357382538628039380619783754247142135378*i+13846015967640899472291788622379922903120408787013097469790400250343393045306706124384515799646285736062433796053887710487219200478)*x + (13719843919543625609533931669678243165075324590409865572534808452325917545037506517127019592813717738713191022825338727789112565924*i+11438843498466605222408710478076488134477093190411503954088432629640796097165967148131138427933636295923997411372893090687316781050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5215199914343933597655510724309651492194725934533770166238415845937565356550449096827945823357382538628039380619783754247142135378*i+13846015967640899472291788622379922903120408787013097469790400250343393045306706124384515799646285736062433796053887710487219200478)*x + (13719843919543625609533931669678243165075324590409865572534808452325917545037506517127019592813717738713191022825338727789112565924*i+11438843498466605222408710478076488134477093190411503954088432629640796097165967148131138427933636295923997411372893090687316781050) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19496470731706854031979010063188762853854790523765228509194930509310621292016951760959123311764693793654448089175971392733400931471*i+7867508903807165097104827940237953129842208442162066685127998926250716530942380622391986963940110576431615198360698703651132826846)*x + (16012659290730284103653735434290881628871797743737177515516381889984914356739062437119267695331928753147100170648477737129621664905*i+19486524816412631413535289623185567414417120397000756288978449443763034011892185275240887010297489240748827096598771748608617015805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19496470731706854031979010063188762853854790523765228509194930509310621292016951760959123311764693793654448089175971392733400931471*i+7867508903807165097104827940237953129842208442162066685127998926250716530942380622391986963940110576431615198360698703651132826846)*x + (16012659290730284103653735434290881628871797743737177515516381889984914356739062437119267695331928753147100170648477737129621664905*i+19486524816412631413535289623185567414417120397000756288978449443763034011892185275240887010297489240748827096598771748608617015805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2558049139596254110712518733595307398908702208671838318099113806830988138506770745387938638570518976899667063009466833315941633851*i+2623221667041305497716439569370845995712084690934063613195648433568303622651467448090287340234927952892805767778456944394190597033)*x + (4449231932995998712956858302786287459454142873550445800078097751836798105407831418218059548831975232345921973246797072197689789072*i+18890501372796608069954304157732208122452452002354293029201069400526955319345272783926850425975209336622159511972435518265731704994) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2558049139596254110712518733595307398908702208671838318099113806830988138506770745387938638570518976899667063009466833315941633851*i+2623221667041305497716439569370845995712084690934063613195648433568303622651467448090287340234927952892805767778456944394190597033)*x + (4449231932995998712956858302786287459454142873550445800078097751836798105407831418218059548831975232345921973246797072197689789072*i+18890501372796608069954304157732208122452452002354293029201069400526955319345272783926850425975209336622159511972435518265731704994) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22787103773680900799736410652158923353074049748508744278564525680481430970136798540767191324110357023445843000704539991096600251610*i+12025698243215098267369049217196524043348611248132252671329702817473501039948207970439496711592577477998615138434004115306834863121)*x + (24004119257105324862010761479002995624987148730533424686900862473452894683297622401953632968918136782608707404199025221648176808891*i+22963915470457894949493513294783440152085319352877670305606943174245666880148748777353670288011557205020826070620474748628076628996) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22787103773680900799736410652158923353074049748508744278564525680481430970136798540767191324110357023445843000704539991096600251610*i+12025698243215098267369049217196524043348611248132252671329702817473501039948207970439496711592577477998615138434004115306834863121)*x + (24004119257105324862010761479002995624987148730533424686900862473452894683297622401953632968918136782608707404199025221648176808891*i+22963915470457894949493513294783440152085319352877670305606943174245666880148748777353670288011557205020826070620474748628076628996) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7048701270409655617376643371686995467562523523203464328349891954527560954819525125665257859305340665216666546471863488597895098393*i+12357581610128663078721645589948033231249751712637495216317965009005248114186814909490517025629063059396061960291524401068788448650)*x + (9671939856321035283842485009053862240480609277070965231332718690907629830332333052092779955832227145335492144915421831332220270375*i+419198779044227947250035128719205865949639520547083734482493219508863992926953800105971956817316084332146367250824310127529130500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7048701270409655617376643371686995467562523523203464328349891954527560954819525125665257859305340665216666546471863488597895098393*i+12357581610128663078721645589948033231249751712637495216317965009005248114186814909490517025629063059396061960291524401068788448650)*x + (9671939856321035283842485009053862240480609277070965231332718690907629830332333052092779955832227145335492144915421831332220270375*i+419198779044227947250035128719205865949639520547083734482493219508863992926953800105971956817316084332146367250824310127529130500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11004497055247941300592420895110574494656843850525971022855511383986990885879997025980154563372876411688972666133427338376492447957*i+22466103198347822174553806806801832414945340496556734717277083519778953173266186065691875334134819709460775226176773514719176635128)*x + (16045545903044277749053041162610605906941789883410161864417064843435284384812853577947644418915280460567076759248799189815638811408*i+4669462749655430766200171565159628147773113326751081055439212485564734358499032577378796310447811739028303285929095793040864631337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11004497055247941300592420895110574494656843850525971022855511383986990885879997025980154563372876411688972666133427338376492447957*i+22466103198347822174553806806801832414945340496556734717277083519778953173266186065691875334134819709460775226176773514719176635128)*x + (16045545903044277749053041162610605906941789883410161864417064843435284384812853577947644418915280460567076759248799189815638811408*i+4669462749655430766200171565159628147773113326751081055439212485564734358499032577378796310447811739028303285929095793040864631337) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10592262471978210524076256198672639228128852431725505876088514750326107267211584093013877265209768867238839895240187105932143936284*i+2290086435201803222219586382486387120751450874364638299376531650183981690792487561735607841316906350318311708375528278946475173277)*x + (1705355159694939248442629291626495256991913362240428822599606872894886455450812964916009587328411610111844785064142134822577489827*i+8967672513540548294802128275796600498810934347873605184814401738230820469167700823061151608435676438380430464386086763659079557904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10592262471978210524076256198672639228128852431725505876088514750326107267211584093013877265209768867238839895240187105932143936284*i+2290086435201803222219586382486387120751450874364638299376531650183981690792487561735607841316906350318311708375528278946475173277)*x + (1705355159694939248442629291626495256991913362240428822599606872894886455450812964916009587328411610111844785064142134822577489827*i+8967672513540548294802128275796600498810934347873605184814401738230820469167700823061151608435676438380430464386086763659079557904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20109844780366069253122876052422405741322505783867623565211151717854688102277872706980095769759041840862442860154443571710173275458*i+16732808494131501707103096101555698845645599022824346280029666936623181481331862878803672309770836067657587319847326578816810882386)*x + (21427044435156583161957735844915356465952508056447820104769020128436625973105432287076793281731115742268823928270526894837515120244*i+10762620284817434796719953437500867143769712812366293520629507278977238497253608644978554608165104084941691939922266062843159690134) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 3 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20109844780366069253122876052422405741322505783867623565211151717854688102277872706980095769759041840862442860154443571710173275458*i+16732808494131501707103096101555698845645599022824346280029666936623181481331862878803672309770836067657587319847326578816810882386)*x + (21427044435156583161957735844915356465952508056447820104769020128436625973105432287076793281731115742268823928270526894837515120244*i+10762620284817434796719953437500867143769712812366293520629507278977238497253608644978554608165104084941691939922266062843159690134) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23279455284886459932918093099882617174253034092809318803361456759398642729859239955929144465610281557324346564111259705423632598137*i+15191447935284338563817347269045381814503227467376437655410082946473655361781449148974443493643619440732506658395536331148452067493)*x + (14310432734309755754279642878737265396392440267209895454009290116150191403331846273764148093210096404434099042856505637792779928426*i+10044233605886266975600124215073076210560275044956906594895104966754767753339746350050123244266545950735834509971193610463787996805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [185]:
Phi21 = isogeny_walk(E1, Phi1_P0 + Integer(S2) * Phi1_Q0, l_A,n_A)
Phi21
Out[185]:
Composite map:
  From: Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  To:   Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23279455284886459932918093099882617174253034092809318803361456759398642729859239955929144465610281557324346564111259705423632598137*i+15191447935284338563817347269045381814503227467376437655410082946473655361781449148974443493643619440732506658395536331148452067493)*x + (14310432734309755754279642878737265396392440267209895454009290116150191403331846273764148093210096404434099042856505637792779928426*i+10044233605886266975600124215073076210560275044956906594895104966754767753339746350050123244266545950735834509971193610463787996805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
  Defn:   Isogeny of degree 1 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (472862088482923983784664343201143692956011976573778413356468721052440683695933451893905142551123626720940612012476933168123238419*i+13841329764519840292399705126938319179915898117463747179593426687256968840330872403975282168944296925655720865935339033704049719503)*x + (3615911922196923510776709335603936841984774765173923901629557608028417545072859023526842958362167961178381799849790784298616058320*i+23993295233053058838060155649123194876654134846681797079695835999688817317719513197870446540684624243879273095966923321358979951818) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21081876879366750269887387605624757544760332300197684841904099305075123248279237923941053798019126361021540067955304055596455793209*i+9723190992110231604904707825098758104366016670474063865600758135761593085023043522609591132169193461217626597773532445706588461914)*x + (3578839813331196748736123171280606473410683553619042406211788595146101739700730464361166845011135139917890744323310510803813345863*i+5458387209793922301974427767055734132689877762367668340587571369271251206084067432984772462439539394020769704306752280046749158562) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21081876879366750269887387605624757544760332300197684841904099305075123248279237923941053798019126361021540067955304055596455793209*i+9723190992110231604904707825098758104366016670474063865600758135761593085023043522609591132169193461217626597773532445706588461914)*x + (3578839813331196748736123171280606473410683553619042406211788595146101739700730464361166845011135139917890744323310510803813345863*i+5458387209793922301974427767055734132689877762367668340587571369271251206084067432984772462439539394020769704306752280046749158562) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7277384337712011937707681767149107661577897361605167972871094907578562359870784818710920297737978381940522569782992920513384897074*i+10382047136949163526853487329713908922092743704672868066332783931798431131533412573406861597245623573659781289899004831830732185099)*x + (16861289394235523171037251300888733780993938058816645135461448663676514956516293531847020632594234209560743923733792942786169818420*i+9839179785777010464627132472431945576206842921672594566507806465804588286100586135761584245432144713460024302251759168130626900485) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7277384337712011937707681767149107661577897361605167972871094907578562359870784818710920297737978381940522569782992920513384897074*i+10382047136949163526853487329713908922092743704672868066332783931798431131533412573406861597245623573659781289899004831830732185099)*x + (16861289394235523171037251300888733780993938058816645135461448663676514956516293531847020632594234209560743923733792942786169818420*i+9839179785777010464627132472431945576206842921672594566507806465804588286100586135761584245432144713460024302251759168130626900485) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14893288211489459617632914954510592145635822359114394062772139838946246679664896598768563524695363178571326812664494608732026841641*i+1340873270629372607268564823236748315041625963712211656547526483520425052468144708479368634838096215411283208858497952745254574299)*x + (17473286763173617238989192504542475888042440869714594484536902567665962376598145634323880248505240790631952629233647275714243575496*i+22084167154655052081652903764056646245962947929772583071946835513082909260506287158970691790250850838040765013628932066850482668322) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14893288211489459617632914954510592145635822359114394062772139838946246679664896598768563524695363178571326812664494608732026841641*i+1340873270629372607268564823236748315041625963712211656547526483520425052468144708479368634838096215411283208858497952745254574299)*x + (17473286763173617238989192504542475888042440869714594484536902567665962376598145634323880248505240790631952629233647275714243575496*i+22084167154655052081652903764056646245962947929772583071946835513082909260506287158970691790250850838040765013628932066850482668322) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5612837421032507673264112382952133705373220119294264335313825926566098720254740362298733931399075078976612438371218905942909661241*i+22682579555385120037960959381696868719129584109935763021135585852547299987383530573332034336147767950230409626334826788041139256755)*x + (14651854684096090958677017339493424437388853240103533881023614518867915515398934446839641934261164186327707826365157501624443278223*i+7875006598163971833655333717163521650813640772287557536904641623061665551319671467728103596047446631109971343258841420176907831831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5612837421032507673264112382952133705373220119294264335313825926566098720254740362298733931399075078976612438371218905942909661241*i+22682579555385120037960959381696868719129584109935763021135585852547299987383530573332034336147767950230409626334826788041139256755)*x + (14651854684096090958677017339493424437388853240103533881023614518867915515398934446839641934261164186327707826365157501624443278223*i+7875006598163971833655333717163521650813640772287557536904641623061665551319671467728103596047446631109971343258841420176907831831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1671612958462469978220589934156262091125435574494140293040387148595248177841020818950945714975482200680981153331218610998750521572*i+13669604106875583830667258216239001024663734903990603042390655919946058286682182096912585299570237670831273097349350630157454675846)*x + (24204978229314607113568611186013228541063141324356512651627135245575739325480791010948122411215610453055220257329791128616590308088*i+6214953847648407925955239949141006112546294104763082924482665472458731391687250032378155590937290850567868743841532346974380211535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1671612958462469978220589934156262091125435574494140293040387148595248177841020818950945714975482200680981153331218610998750521572*i+13669604106875583830667258216239001024663734903990603042390655919946058286682182096912585299570237670831273097349350630157454675846)*x + (24204978229314607113568611186013228541063141324356512651627135245575739325480791010948122411215610453055220257329791128616590308088*i+6214953847648407925955239949141006112546294104763082924482665472458731391687250032378155590937290850567868743841532346974380211535) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13411817717756325730669152352844873881973227881224491536455166805460467998534004266363506458667736911426001422788633389065363231056*i+8388281560503569866995503953048792716665547316592928552216244233774452368373091184602269364564686995768668332245747824319145636501)*x + (10278919973471080941112110868914351773273806400480596132543279681199831073296528877418494274704398430661578875501477526930386957756*i+6089646142591541284101101208922417242382299152882217895115312499325249668092247606566539575656073662768244725359272284105613774708) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13411817717756325730669152352844873881973227881224491536455166805460467998534004266363506458667736911426001422788633389065363231056*i+8388281560503569866995503953048792716665547316592928552216244233774452368373091184602269364564686995768668332245747824319145636501)*x + (10278919973471080941112110868914351773273806400480596132543279681199831073296528877418494274704398430661578875501477526930386957756*i+6089646142591541284101101208922417242382299152882217895115312499325249668092247606566539575656073662768244725359272284105613774708) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19419484230988590936788463917797710465492242031463718342000490875123625290747409034601968055772385264525296630030427470627478147266*i+22707496441517944029997389049692432107228982129016148804519025747300187677718428471345357652270537504916802148850098589788413247923)*x + (7298128980127433115328741879322914879650085739059472200446114049029224362669187517148134825981011826421734674373406564038236678755*i+10043356203195708671930131051192042503756977585522704750048977920071819677386261945548459903652356401191122777510371749096476936404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19419484230988590936788463917797710465492242031463718342000490875123625290747409034601968055772385264525296630030427470627478147266*i+22707496441517944029997389049692432107228982129016148804519025747300187677718428471345357652270537504916802148850098589788413247923)*x + (7298128980127433115328741879322914879650085739059472200446114049029224362669187517148134825981011826421734674373406564038236678755*i+10043356203195708671930131051192042503756977585522704750048977920071819677386261945548459903652356401191122777510371749096476936404) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (548727353090127735544179492722405574788619933906702838925733077289798726479588866701373449636902064028526230519630844449559047055*i+7977517817235737963912929787015288760803426157128636436510303445421884600923397429894146733726593837192687531189624860858396525620)*x + (18583175183730132738213598459079854703838242311825012218111751275138646819811406567141302985970336421673017472091764326134217766202*i+15810036282112151132449373774420246783540690082679861531551709119505480628998171777134402794330718730432805289575021465168207581464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (548727353090127735544179492722405574788619933906702838925733077289798726479588866701373449636902064028526230519630844449559047055*i+7977517817235737963912929787015288760803426157128636436510303445421884600923397429894146733726593837192687531189624860858396525620)*x + (18583175183730132738213598459079854703838242311825012218111751275138646819811406567141302985970336421673017472091764326134217766202*i+15810036282112151132449373774420246783540690082679861531551709119505480628998171777134402794330718730432805289575021465168207581464) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21284094091517474777679950174727794013468782918437528430929347191428853381182562468702318138229796984469221094745648675419219467408*i+20660646907498305025954065026804651138149341036747756752379876447575838765841782206170322254853324597658384224215779910447133194295)*x + (18938580469647036567342054272253651038768959975581955892580742792756715327096803493593330063951498679008703973342304939551648781444*i+9293740087256883598784414908561837921386115194842448455858641514465374898771021762061234807504042153639898793725009296532469611833) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21284094091517474777679950174727794013468782918437528430929347191428853381182562468702318138229796984469221094745648675419219467408*i+20660646907498305025954065026804651138149341036747756752379876447575838765841782206170322254853324597658384224215779910447133194295)*x + (18938580469647036567342054272253651038768959975581955892580742792756715327096803493593330063951498679008703973342304939551648781444*i+9293740087256883598784414908561837921386115194842448455858641514465374898771021762061234807504042153639898793725009296532469611833) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1355422953314138451429001590758523311058889364413449634041832516407331230492804927989111247667721059642759527062120855628088633246*i+8637476737831782312719092706107374736705588705344503501035231613405846893902120666267570959159326415734079287931646110239850109062)*x + (15080657457384370459085952056312897616799675499768919834412016766440554800580698203853474508780564922343667090878752323561669555748*i+14836919398461979710525462111013544576947369826897073069730506917359242852848619528543322309354385274467162859541735187022389858662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1355422953314138451429001590758523311058889364413449634041832516407331230492804927989111247667721059642759527062120855628088633246*i+8637476737831782312719092706107374736705588705344503501035231613405846893902120666267570959159326415734079287931646110239850109062)*x + (15080657457384370459085952056312897616799675499768919834412016766440554800580698203853474508780564922343667090878752323561669555748*i+14836919398461979710525462111013544576947369826897073069730506917359242852848619528543322309354385274467162859541735187022389858662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21356233924984331745698684420983452428951744596706045161885891492854254701050285636282912666457421651523110136894156490919299304744*i+12146748494199314875310296646929040833067017252257184775330846223425103070651182401047420413416277067897806557798420788534525651636)*x + (11263361155244958057061898649405702688623293846114756422536553082557421273307725744386549281260780324365678482250403835651982032640*i+7331021316426444611545986647978616467328346672937818799349216828414778003969353398644482735255373044055791855959254115851421671376) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21356233924984331745698684420983452428951744596706045161885891492854254701050285636282912666457421651523110136894156490919299304744*i+12146748494199314875310296646929040833067017252257184775330846223425103070651182401047420413416277067897806557798420788534525651636)*x + (11263361155244958057061898649405702688623293846114756422536553082557421273307725744386549281260780324365678482250403835651982032640*i+7331021316426444611545986647978616467328346672937818799349216828414778003969353398644482735255373044055791855959254115851421671376) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16575695115522706563814333264321471481759166471485854521948137345093420837975658066571231384980511872943936579053221607334354808978*i+299465469203260409687365019139179658051302780092089879501964644429025836215948114601667851731324849937121256749095731351236275997)*x + (14105396080069803527797278753844489783756667905882761103860419191797618701311174815071796372468224988556866508054106309738554337449*i+20051411509764347053628885416584786324531339708864692411816150420235960365626420490482228237745723318555196398245200969802225501918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16575695115522706563814333264321471481759166471485854521948137345093420837975658066571231384980511872943936579053221607334354808978*i+299465469203260409687365019139179658051302780092089879501964644429025836215948114601667851731324849937121256749095731351236275997)*x + (14105396080069803527797278753844489783756667905882761103860419191797618701311174815071796372468224988556866508054106309738554337449*i+20051411509764347053628885416584786324531339708864692411816150420235960365626420490482228237745723318555196398245200969802225501918) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18366216097761050133343730330284369255999830428955065283201489884295317858694289136154061749407405506108189668107147585821987802748*i+3370371395434008084164838591583766439431055240903484461569870785055488068489577428959119919848175710609906922720021640598681618691)*x + (12535287941822337026566339543877529940311768128188184116022664881598842413697732676092945947502358153925032680738372897521645580174*i+10018485357507051223620896795491584318500544086321170338676131676659071103340156579012762252550116601523517035757366244627412745934) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18366216097761050133343730330284369255999830428955065283201489884295317858694289136154061749407405506108189668107147585821987802748*i+3370371395434008084164838591583766439431055240903484461569870785055488068489577428959119919848175710609906922720021640598681618691)*x + (12535287941822337026566339543877529940311768128188184116022664881598842413697732676092945947502358153925032680738372897521645580174*i+10018485357507051223620896795491584318500544086321170338676131676659071103340156579012762252550116601523517035757366244627412745934) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18148602625256896549767807051809088715560263466347222466817360809223651304193553541543456946022863876432166983351586295235908399959*i+21374918030697837204470798414001676905114348307378267540365033937161764951262919755097696224869093804028204410313569356080550159735)*x + (20886096397076836664566337389311307125444124685292395789363156159748271035175580977776954981992766524744480540280766385416117219170*i+22382497213241753233706803954236539604481659090012900796912769843367057619409657449738171429125807125520699163442462802981500905871) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18148602625256896549767807051809088715560263466347222466817360809223651304193553541543456946022863876432166983351586295235908399959*i+21374918030697837204470798414001676905114348307378267540365033937161764951262919755097696224869093804028204410313569356080550159735)*x + (20886096397076836664566337389311307125444124685292395789363156159748271035175580977776954981992766524744480540280766385416117219170*i+22382497213241753233706803954236539604481659090012900796912769843367057619409657449738171429125807125520699163442462802981500905871) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15950172071232900815612184030072385766048480821178160910411454436940489441095215363748511436759407422130451621485288681853665973012*i+17900905985290533764775264836475263624058706429750565777254915004915190093576873133004525373309840228694165444378892846976722230477)*x + (21238159908329563185339575432858827274637364032995517298264901481367489202211476519087127335663672647215166140072992056629849166786*i+16628999925359141906918600163509402623624518200321305731153033914153134433190135165179882458195435838129252069844893975624623294348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15950172071232900815612184030072385766048480821178160910411454436940489441095215363748511436759407422130451621485288681853665973012*i+17900905985290533764775264836475263624058706429750565777254915004915190093576873133004525373309840228694165444378892846976722230477)*x + (21238159908329563185339575432858827274637364032995517298264901481367489202211476519087127335663672647215166140072992056629849166786*i+16628999925359141906918600163509402623624518200321305731153033914153134433190135165179882458195435838129252069844893975624623294348) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2524539352468311384487190635509042945809656244208644327675473601927466746664631717382582380993248175289994561678048488006971100906*i+12815262216949986175629288033338589875481210834059218749668892009105292273533454314715552185822263114683818954263919678823415877217)*x + (19377286172294688050763623654210637843992816556062540068672403161080233526853049033542328780293045031711006525736585387239873012779*i+21096628704366841077058791642660073794370772348059251353038173027693796945462984360646225645544802042375796346764123169289958116564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2524539352468311384487190635509042945809656244208644327675473601927466746664631717382582380993248175289994561678048488006971100906*i+12815262216949986175629288033338589875481210834059218749668892009105292273533454314715552185822263114683818954263919678823415877217)*x + (19377286172294688050763623654210637843992816556062540068672403161080233526853049033542328780293045031711006525736585387239873012779*i+21096628704366841077058791642660073794370772348059251353038173027693796945462984360646225645544802042375796346764123169289958116564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (361862892159966184295690340094588023547171329608514976836081026273964682496019473018748888117446282190946484630437325051714514238*i+19206669997870492304372386254794530590869256079567511379740469956138045286108532767405070715088474696262346903624353748449821654384)*x + (3060269059666957063832256469910363490465801717089270806586504286415363382559654686356367012628017710343099607172312863548234095952*i+13718972753164684317451968460961799625690606539922940864106559645684609198485590915097927554746801969211169640608727819423688346976) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (361862892159966184295690340094588023547171329608514976836081026273964682496019473018748888117446282190946484630437325051714514238*i+19206669997870492304372386254794530590869256079567511379740469956138045286108532767405070715088474696262346903624353748449821654384)*x + (3060269059666957063832256469910363490465801717089270806586504286415363382559654686356367012628017710343099607172312863548234095952*i+13718972753164684317451968460961799625690606539922940864106559645684609198485590915097927554746801969211169640608727819423688346976) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15431695305749320225068905727900469549762178707540629011816483237723205592387960802930429882111652937363091518694598496146959813433*i+3140475048591978366255684277456870853206885849194755103984604136258635121588885357111820976347410233816924097623212416404973982577)*x + (20617846428546368130074968326015471669157433053871767855275058459948782466719527995027011636685085016088308278364645216390866501407*i+4002537069069095074817947785247617917100034571025280361740785339691667979429919018774567744153992954018581110125002009689448528225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15431695305749320225068905727900469549762178707540629011816483237723205592387960802930429882111652937363091518694598496146959813433*i+3140475048591978366255684277456870853206885849194755103984604136258635121588885357111820976347410233816924097623212416404973982577)*x + (20617846428546368130074968326015471669157433053871767855275058459948782466719527995027011636685085016088308278364645216390866501407*i+4002537069069095074817947785247617917100034571025280361740785339691667979429919018774567744153992954018581110125002009689448528225) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16508085120800044467037105606873246689145606493053416206087490609596218260949114610998925897157851204797066002413751137608500917253*i+6294224411840043665639915569030950453647219325560871725447967584544190108863478534041358019125100188849293951278941318744472520341)*x + (22679638127937494048890232673460978581476370150907614072775569300328858359347515155821737608245940028879474668225076548636679921112*i+1049418775398580547855561118393439164488602188244753266488907303749528003706132387065073022140767013306627669305789841703241933975) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16508085120800044467037105606873246689145606493053416206087490609596218260949114610998925897157851204797066002413751137608500917253*i+6294224411840043665639915569030950453647219325560871725447967584544190108863478534041358019125100188849293951278941318744472520341)*x + (22679638127937494048890232673460978581476370150907614072775569300328858359347515155821737608245940028879474668225076548636679921112*i+1049418775398580547855561118393439164488602188244753266488907303749528003706132387065073022140767013306627669305789841703241933975) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16545091724805336026221436647735910890276236842474809839892802178977748075892661100956084392013735416287263110664735671388183822026*i+19615193867636509463654841897838298414514945422084359685461948543771263587948259498437215200046983736944573009577672330646241181775)*x + (13122026640235121817836455075513771507600128294494824635638181415706832747743649111962240250794539813631680922876601300288541438860*i+19254938818631333571549991633879523623925928330376289799807914888121539029032856686803696655982916888521752901347336249670511283889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16545091724805336026221436647735910890276236842474809839892802178977748075892661100956084392013735416287263110664735671388183822026*i+19615193867636509463654841897838298414514945422084359685461948543771263587948259498437215200046983736944573009577672330646241181775)*x + (13122026640235121817836455075513771507600128294494824635638181415706832747743649111962240250794539813631680922876601300288541438860*i+19254938818631333571549991633879523623925928330376289799807914888121539029032856686803696655982916888521752901347336249670511283889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23524351622888790496049735150874572636133065192951592924835936799983251405049638087764639403903212232815577561627320240296994792709*i+12460011616936507740332299239302687368078789703685660588937718800972502907099279462965845073573258486053544378833012804749721811876)*x + (22391509953140945006125549286332957722172013571887834620399088674149949708572235873916138251654625421611914076988570015706805717734*i+4551270243802296761047302465074043782361340473134763645958548021325963183814385948381689820304375698002756935994206943558953970223) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23524351622888790496049735150874572636133065192951592924835936799983251405049638087764639403903212232815577561627320240296994792709*i+12460011616936507740332299239302687368078789703685660588937718800972502907099279462965845073573258486053544378833012804749721811876)*x + (22391509953140945006125549286332957722172013571887834620399088674149949708572235873916138251654625421611914076988570015706805717734*i+4551270243802296761047302465074043782361340473134763645958548021325963183814385948381689820304375698002756935994206943558953970223) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1567554643142475042508038529823286791179561023540217828302870350716756717728310895210563708428961595933503659837187849117489854064*i+11132606361028267641516417551126980454847244373826140692574013060542757467989598986007147833059633236747821249473634145526301506184)*x + (20986121386504891778132156985290013158840436488056478165384457401468325430510592242569043981033362126431102673008340095727937845459*i+3877802953801380982877877381946292375838581930178561714211139805862701445742166993110079261735053687533912673980461305919169281770) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1567554643142475042508038529823286791179561023540217828302870350716756717728310895210563708428961595933503659837187849117489854064*i+11132606361028267641516417551126980454847244373826140692574013060542757467989598986007147833059633236747821249473634145526301506184)*x + (20986121386504891778132156985290013158840436488056478165384457401468325430510592242569043981033362126431102673008340095727937845459*i+3877802953801380982877877381946292375838581930178561714211139805862701445742166993110079261735053687533912673980461305919169281770) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19530068376422287547691881507450036919534139074744296204501806047454010011451681604349569417119535547989876220835259672635934390881*i+12812465470241373317801000424184364302187978427021056065035355704662102884298397402825706231849441573632317458105469823587028966069)*x + (15806981447535714380698645376948661282490167395894010752779407263714487035224152701898486327999886213643051130365236057412878146691*i+17650722312722604329580971726789486169975963151661411183002026525434071849461270515286419444109040296113796013930966140021992545203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19530068376422287547691881507450036919534139074744296204501806047454010011451681604349569417119535547989876220835259672635934390881*i+12812465470241373317801000424184364302187978427021056065035355704662102884298397402825706231849441573632317458105469823587028966069)*x + (15806981447535714380698645376948661282490167395894010752779407263714487035224152701898486327999886213643051130365236057412878146691*i+17650722312722604329580971726789486169975963151661411183002026525434071849461270515286419444109040296113796013930966140021992545203) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19537911160677209958811805329163595143895980116664916182627995461018675663459288113158902923909368268162247251478145680392925790512*i+22942987919892621142944204598304489144801472802780417586362336891863247287467191631772155833764391172234076435768456020992418429714)*x + (6018883805892060425672768029303803159158944715683777925714149360437464573326934473821365960949210211918341074646860351187836821381*i+13695025463919895678760724729917429349350874900435103356961620556484051897972699568226046598668335680645147708991963397654597972067) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19537911160677209958811805329163595143895980116664916182627995461018675663459288113158902923909368268162247251478145680392925790512*i+22942987919892621142944204598304489144801472802780417586362336891863247287467191631772155833764391172234076435768456020992418429714)*x + (6018883805892060425672768029303803159158944715683777925714149360437464573326934473821365960949210211918341074646860351187836821381*i+13695025463919895678760724729917429349350874900435103356961620556484051897972699568226046598668335680645147708991963397654597972067) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15083369899021437437550869384813663911226451939116627884575769721627419573815779337471036999465814607873277047089372498369840228892*i+15752721296512623486855572238794012770926475544323588334719943997888014148287364955429841009483081614135841968874993429180683119944)*x + (9327612378775041548707482848050399038970231257010931455808621711289396609138743269446515143511822015358885210339967092932475802689*i+1076277405485489437550253545894548752115494624540385276965161500526549664232323625093698452012033779983258040065150125861941966088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15083369899021437437550869384813663911226451939116627884575769721627419573815779337471036999465814607873277047089372498369840228892*i+15752721296512623486855572238794012770926475544323588334719943997888014148287364955429841009483081614135841968874993429180683119944)*x + (9327612378775041548707482848050399038970231257010931455808621711289396609138743269446515143511822015358885210339967092932475802689*i+1076277405485489437550253545894548752115494624540385276965161500526549664232323625093698452012033779983258040065150125861941966088) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21657655330965651231218339570944941248869750210097531332570886914041299204286141990417503642784981213231030195753359273590028174702*i+18101477202673557176660997469274003584164305764575274804296605060717758922083278140655760940200178778770471653555932865011855076616)*x + (11147643807934024190356657642218336378570791146971312012142465589530484585416758767633328971720310322744907030911484754361752808381*i+221127987430447011437309720428303220106518311755278531057235375670132600059788536178193164183052846128832511183875860495608097997) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21657655330965651231218339570944941248869750210097531332570886914041299204286141990417503642784981213231030195753359273590028174702*i+18101477202673557176660997469274003584164305764575274804296605060717758922083278140655760940200178778770471653555932865011855076616)*x + (11147643807934024190356657642218336378570791146971312012142465589530484585416758767633328971720310322744907030911484754361752808381*i+221127987430447011437309720428303220106518311755278531057235375670132600059788536178193164183052846128832511183875860495608097997) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12776394062227560269388589072627079600541606439896287783163979226867042754384630289647529765949135194778073749681238016479338232276*i+3068229629822593052431632675893514736142963421392764982513749244699153238615874702736445745082304580071954120328512250912516092445)*x + (5590175902375904377745742004449349588611508172488789417669386576732823961829726526778809504212827257784161828537170166421408082306*i+16565932430929848955609160985752981288594897823734863388592444513682486991329193015068930154920373069098697375002335234440467677904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12776394062227560269388589072627079600541606439896287783163979226867042754384630289647529765949135194778073749681238016479338232276*i+3068229629822593052431632675893514736142963421392764982513749244699153238615874702736445745082304580071954120328512250912516092445)*x + (5590175902375904377745742004449349588611508172488789417669386576732823961829726526778809504212827257784161828537170166421408082306*i+16565932430929848955609160985752981288594897823734863388592444513682486991329193015068930154920373069098697375002335234440467677904) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4168923491943265303905210509511302117668206437817289820479849731801461385631049096988493663649283832287621951740335213521489592417*i+8165444963275320932192611359313054990633622180125917244378977394798048664222235144698605310164380453827265909279616396086688943087)*x + (13030402477643363162757926927433554443079907484502296859359482923112733453079947570019867443591776358446719665761887309039419290841*i+6572174522740753663337894707137631447321131036050231033064998519011768565491119752377344240644586169311794693942502862309278933148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4168923491943265303905210509511302117668206437817289820479849731801461385631049096988493663649283832287621951740335213521489592417*i+8165444963275320932192611359313054990633622180125917244378977394798048664222235144698605310164380453827265909279616396086688943087)*x + (13030402477643363162757926927433554443079907484502296859359482923112733453079947570019867443591776358446719665761887309039419290841*i+6572174522740753663337894707137631447321131036050231033064998519011768565491119752377344240644586169311794693942502862309278933148) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15208934759293390797946021819410910253485859107948744170422226495278489459865246056208763091275180861712338056445329866166397149889*i+19181164091162122224524010252633963377761077982945666263360585109150942465288093585269963881636886444575283603092187976567770293591)*x + (10190717660249018267402154213459617354060263151641512259685497306490016117803242473711729668986836862855884266655947625042235990053*i+18854114910791509685846089770674873620938644988013810934319626551273530547683929900140817180179365177283765678236839771623558095664) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15208934759293390797946021819410910253485859107948744170422226495278489459865246056208763091275180861712338056445329866166397149889*i+19181164091162122224524010252633963377761077982945666263360585109150942465288093585269963881636886444575283603092187976567770293591)*x + (10190717660249018267402154213459617354060263151641512259685497306490016117803242473711729668986836862855884266655947625042235990053*i+18854114910791509685846089770674873620938644988013810934319626551273530547683929900140817180179365177283765678236839771623558095664) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1155094780659161994461073347389466262399231169536255131563964946536117311045287909638276363309528733850404917660806417950673493165*i+12629010586465856697027248236673668566082066072725215001288002243033997694029643304334740142684289956425226664525261949083275094594)*x + (23266025263413442913980012457699008362885932166839040738024765215960928605228555567744188862478235014190231585703046686954675644941*i+1778533207984385906797375210766484233817693095370191922165298830025651958696430628741800478276857236193396989244145008830238519653) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1155094780659161994461073347389466262399231169536255131563964946536117311045287909638276363309528733850404917660806417950673493165*i+12629010586465856697027248236673668566082066072725215001288002243033997694029643304334740142684289956425226664525261949083275094594)*x + (23266025263413442913980012457699008362885932166839040738024765215960928605228555567744188862478235014190231585703046686954675644941*i+1778533207984385906797375210766484233817693095370191922165298830025651958696430628741800478276857236193396989244145008830238519653) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20127178865847207481401309529546136604228929369959247862981099971850815761553793239606746182338019805883241652968641930217109177355*i+22454695111291913323225488369738016306831770792568418058292011191050405294782327054231315793960399966999709425821412931329629624551)*x + (5490213985671649175770859678313274027094521639552950552659734214786174731389774901803125792282338045731607982446944615719905509557*i+6717579021950528794634238145674516988467058064768279730459544089256150598952022457954671699381502495561528684835817326730925575369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20127178865847207481401309529546136604228929369959247862981099971850815761553793239606746182338019805883241652968641930217109177355*i+22454695111291913323225488369738016306831770792568418058292011191050405294782327054231315793960399966999709425821412931329629624551)*x + (5490213985671649175770859678313274027094521639552950552659734214786174731389774901803125792282338045731607982446944615719905509557*i+6717579021950528794634238145674516988467058064768279730459544089256150598952022457954671699381502495561528684835817326730925575369) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21760776743447251823354810849633782075815835669663866134052075240675430231663368557237777891144640298468380480066278535223652467641*i+1492126967867188029356655802189974895763246469374300545531672513906090959887598987599680122268377941166373194734908316843808147478)*x + (19417721060190799442249355750160470950318692708357303669844459904787536853750735141629712025479935145248265741078485621709739571133*i+19139147232122730205802971377560792537277542336811451172319312089299367434423229373698250497209817015739039629872405622409935020835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21760776743447251823354810849633782075815835669663866134052075240675430231663368557237777891144640298468380480066278535223652467641*i+1492126967867188029356655802189974895763246469374300545531672513906090959887598987599680122268377941166373194734908316843808147478)*x + (19417721060190799442249355750160470950318692708357303669844459904787536853750735141629712025479935145248265741078485621709739571133*i+19139147232122730205802971377560792537277542336811451172319312089299367434423229373698250497209817015739039629872405622409935020835) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18254890921510801762698376293248598057241085973568039905480825464876262382263207632450481328975542382266293267856289082089131376576*i+21451031400166895478903774666431636569086453270537880539205441193540252771266694483904608362494310600613215875660676217099806976365)*x + (13697765226647466308334897736378315010043371018376368587823754639153570689801252477017558110273655344236694301759276359500188236706*i+4142653321104789721678037875466037205886221577613292178472043419999144706020511805542755640269277555934596403233478854121147409319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18254890921510801762698376293248598057241085973568039905480825464876262382263207632450481328975542382266293267856289082089131376576*i+21451031400166895478903774666431636569086453270537880539205441193540252771266694483904608362494310600613215875660676217099806976365)*x + (13697765226647466308334897736378315010043371018376368587823754639153570689801252477017558110273655344236694301759276359500188236706*i+4142653321104789721678037875466037205886221577613292178472043419999144706020511805542755640269277555934596403233478854121147409319) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12776874554705768196313193762045492838889973268541470256745474751895775055076455220955240803504145189917362350631214766440118027342*i+11371435442647163677999012811024142614312340411062837229496536534058330448834790469389184597247253880040573545584622122159539425068)*x + (19623304688871843601790565301773810778576688420537326233476149570557155879888975807933247521108170037619615899803457006090595391722*i+1507827760935269003932536907431406311983049994580178326456306128807699119345215844453376935969528084391013237621156042981709666473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12776874554705768196313193762045492838889973268541470256745474751895775055076455220955240803504145189917362350631214766440118027342*i+11371435442647163677999012811024142614312340411062837229496536534058330448834790469389184597247253880040573545584622122159539425068)*x + (19623304688871843601790565301773810778576688420537326233476149570557155879888975807933247521108170037619615899803457006090595391722*i+1507827760935269003932536907431406311983049994580178326456306128807699119345215844453376935969528084391013237621156042981709666473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7957722979089306389055126885095533004207687204534841416432985669489248739121997289616151715437955711385467015997251510237338730178*i+2390129668457941115629758622074431982046912335026295342346783427830756625019069519704708102316118656155332715738727907681559150396)*x + (21428660688136212484967838885856230772335764020901602164400902601261939607390966274944211884700993711377511087968707366812292563947*i+3349032671805538614509732614557195191601787823382364086603155052915983839578571918004178967211760225001137645222610776855053588357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7957722979089306389055126885095533004207687204534841416432985669489248739121997289616151715437955711385467015997251510237338730178*i+2390129668457941115629758622074431982046912335026295342346783427830756625019069519704708102316118656155332715738727907681559150396)*x + (21428660688136212484967838885856230772335764020901602164400902601261939607390966274944211884700993711377511087968707366812292563947*i+3349032671805538614509732614557195191601787823382364086603155052915983839578571918004178967211760225001137645222610776855053588357) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11260392713640473508817451673794315273378920337818621996864664129276158864139223038980849594501165543023836667715262993211096659807*i+5334033684816418553207893336150445190805628434402452159396319027413899161495958865591183695830042895693532126540110570840196091860)*x + (15407341461528511861644583111904694656178837231044656793804772906628752452963483668205670704563431629073748037181183402366708613083*i+8839170816144907949067377094989220832652587671534153855110452721920864132957743379126433640407225049912178084723051033483467398552) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11260392713640473508817451673794315273378920337818621996864664129276158864139223038980849594501165543023836667715262993211096659807*i+5334033684816418553207893336150445190805628434402452159396319027413899161495958865591183695830042895693532126540110570840196091860)*x + (15407341461528511861644583111904694656178837231044656793804772906628752452963483668205670704563431629073748037181183402366708613083*i+8839170816144907949067377094989220832652587671534153855110452721920864132957743379126433640407225049912178084723051033483467398552) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15746110793169304355781116100196425469938208324592133473068848982676910149628082145963574793969716040883995261568961104794569637516*i+23604299199491560595850095872971483010999649383730073245391944390543542688565843552685723382112515722393635156036576405800492396902)*x + (8594722967229198820689029098886482382285981736254115798050942463425824691960888827415105344150090763992455445849763672209790435329*i+17733867304186424246486641799808545183748614078218614272505145258676916372329025608401360231803668639760749435616435868465992071619) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15746110793169304355781116100196425469938208324592133473068848982676910149628082145963574793969716040883995261568961104794569637516*i+23604299199491560595850095872971483010999649383730073245391944390543542688565843552685723382112515722393635156036576405800492396902)*x + (8594722967229198820689029098886482382285981736254115798050942463425824691960888827415105344150090763992455445849763672209790435329*i+17733867304186424246486641799808545183748614078218614272505145258676916372329025608401360231803668639760749435616435868465992071619) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15373413732697658224099335618996014514784736478796499822842021781515502192671536053677537191825707095931997385101259900619472631818*i+6948842307306672215885497452449769234581467967181553741315964889664468669369318407198118429915143012585355863913628136239374734339)*x + (20810517957338415699813666487164943526141705003334110153125077341898458011302453546930063000679674034452180982877239420358391984130*i+3624491666166827193079203540316583741686252556296888161161354179923884892174634716829728656417261743675979321206758279526640659282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15373413732697658224099335618996014514784736478796499822842021781515502192671536053677537191825707095931997385101259900619472631818*i+6948842307306672215885497452449769234581467967181553741315964889664468669369318407198118429915143012585355863913628136239374734339)*x + (20810517957338415699813666487164943526141705003334110153125077341898458011302453546930063000679674034452180982877239420358391984130*i+3624491666166827193079203540316583741686252556296888161161354179923884892174634716829728656417261743675979321206758279526640659282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13091710735875124867840707194939068187476672405720429708056955035587250149917792046435322966246627866418772797805369413631222798904*i+7471476001271298386587571686928930519099514136341566462351325133521611944700654041589657396673125711944392029118827186559029761734)*x + (15904495959197806914664215134142985713043980481339953879264326425282712981128629295491225771312727842875332373880335765804558882611*i+23747549270048342796037978312527794209030804459989900886580247145502541022373175334303620633871062031282527790681174122350708436213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13091710735875124867840707194939068187476672405720429708056955035587250149917792046435322966246627866418772797805369413631222798904*i+7471476001271298386587571686928930519099514136341566462351325133521611944700654041589657396673125711944392029118827186559029761734)*x + (15904495959197806914664215134142985713043980481339953879264326425282712981128629295491225771312727842875332373880335765804558882611*i+23747549270048342796037978312527794209030804459989900886580247145502541022373175334303620633871062031282527790681174122350708436213) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3031801815302323323519494373101869261731386103330234091904048704700283516708446832473203926377018759266033229259714962163835274083*i+19134112815951953587877689652568262917176155482076443371889125595557086427090910709498175340448640220016138055681268204698392625782)*x + (21212717419573984637877657055593492089447416290931731896494225255825113712904934533020048214036738064947412599898997880658352986349*i+6773639295248708593902103238195699202723588941180350296762063359965651738274957483901023853583934038314823578416072334611284346166) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3031801815302323323519494373101869261731386103330234091904048704700283516708446832473203926377018759266033229259714962163835274083*i+19134112815951953587877689652568262917176155482076443371889125595557086427090910709498175340448640220016138055681268204698392625782)*x + (21212717419573984637877657055593492089447416290931731896494225255825113712904934533020048214036738064947412599898997880658352986349*i+6773639295248708593902103238195699202723588941180350296762063359965651738274957483901023853583934038314823578416072334611284346166) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15895295941918849125896768520752813231168928911309478160217983180680344543371336232128807332593528405341376080487761492623469992017*i+15087133307889372043199643201457035885220710687600037887175401682665818149888732797946812757201775290936185313550121992176940621145)*x + (13140892069677318744908671416455397996491572398053439428872270391385076640372181750438702155364886109084247617382845723470813950127*i+16666812784978331878313554516281634743988428435810674163415910238281263259964811352885011860171440845532120787044664876751284015672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15895295941918849125896768520752813231168928911309478160217983180680344543371336232128807332593528405341376080487761492623469992017*i+15087133307889372043199643201457035885220710687600037887175401682665818149888732797946812757201775290936185313550121992176940621145)*x + (13140892069677318744908671416455397996491572398053439428872270391385076640372181750438702155364886109084247617382845723470813950127*i+16666812784978331878313554516281634743988428435810674163415910238281263259964811352885011860171440845532120787044664876751284015672) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2543185146328461581639337504396116635509869575280750015307403318214765983567517685830644322329687949027563176626387481858714526004*i+18525678574745354899261116456822182466406254458874727547660650586805280160785652939415100966052612590183644363655304038164720016432)*x + (4800585103740527311450708117592518225388670736589694430982865988320429736144841040884380235312559322675061712859377781799612920145*i+16689702784120692476979340173446733500197674797777695158166605567210570265640724141761821331899009173405958444913764952335331597500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2543185146328461581639337504396116635509869575280750015307403318214765983567517685830644322329687949027563176626387481858714526004*i+18525678574745354899261116456822182466406254458874727547660650586805280160785652939415100966052612590183644363655304038164720016432)*x + (4800585103740527311450708117592518225388670736589694430982865988320429736144841040884380235312559322675061712859377781799612920145*i+16689702784120692476979340173446733500197674797777695158166605567210570265640724141761821331899009173405958444913764952335331597500) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12524296231311830592428402824175745594199069290776681691496893811232053816163435983280316792074776076923903768216172931473546297665*i+13936371279002611534065462561963247362609353311352623730542207711307872126470209739366878613484946533623313431117823097549866677786)*x + (1696669906711862048057763184359369489920316804524828297394570898027135802312426899383127443715973771016051671085942635008185910341*i+12244715279858307828368721039637383231214299746817354283163182228018941226547632153630192445091688943719708510514019993613563947796) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12524296231311830592428402824175745594199069290776681691496893811232053816163435983280316792074776076923903768216172931473546297665*i+13936371279002611534065462561963247362609353311352623730542207711307872126470209739366878613484946533623313431117823097549866677786)*x + (1696669906711862048057763184359369489920316804524828297394570898027135802312426899383127443715973771016051671085942635008185910341*i+12244715279858307828368721039637383231214299746817354283163182228018941226547632153630192445091688943719708510514019993613563947796) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17135386430861289077812131437187125035864887096998899241710902542525409057428950990116324911798812447098301142385884366038289760801*i+6149206145857382470105256523650315114617068846385493510035242112760831096412284890897064496776098148005565701414825222577186521210)*x + (18195961234241867270220330941584564070003199741855054083829450371103579450011549623914744373362372544595897120417793646284368239499*i+19396562513558338825669447606075112604628523055167389191058274445725411106267812925231133196017713169335786240762208566978203744061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17135386430861289077812131437187125035864887096998899241710902542525409057428950990116324911798812447098301142385884366038289760801*i+6149206145857382470105256523650315114617068846385493510035242112760831096412284890897064496776098148005565701414825222577186521210)*x + (18195961234241867270220330941584564070003199741855054083829450371103579450011549623914744373362372544595897120417793646284368239499*i+19396562513558338825669447606075112604628523055167389191058274445725411106267812925231133196017713169335786240762208566978203744061) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16137850470895443427804664461501315670418647222226838779611614204988756583175703171135786012086371746038010998150495493838525600743*i+17796294552060782211812022993221367855887122480975476187215401843230347116823288718552288213687153043280035142184146920442853419563)*x + (2602277778150282256587952709038244660525147892990501538206486891368702832440215483429431465527592553330321968632256546427270026746*i+14317667601047578367787586654455988759387118576046573554108225202765801142886373141362153159434258915948583636582338422028978483368) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16137850470895443427804664461501315670418647222226838779611614204988756583175703171135786012086371746038010998150495493838525600743*i+17796294552060782211812022993221367855887122480975476187215401843230347116823288718552288213687153043280035142184146920442853419563)*x + (2602277778150282256587952709038244660525147892990501538206486891368702832440215483429431465527592553330321968632256546427270026746*i+14317667601047578367787586654455988759387118576046573554108225202765801142886373141362153159434258915948583636582338422028978483368) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3504094154788520011712410707352465673280145172772056351995777432763302652907231149199681415300307953943072152706259017816996209847*i+18322678596340271641180263763633813606901865021132537846477835856853349731273975982468804733457850240575109031818103309236270231655)*x + (5343420618848226955320378202000352394244098304934338794284381961094990360363563066732913956814419521482429881336689247075907521999*i+17428993670632530995132611508448758632743638775023247667917862716920516973373104961511526894225129798694119426419358790870458819477) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3504094154788520011712410707352465673280145172772056351995777432763302652907231149199681415300307953943072152706259017816996209847*i+18322678596340271641180263763633813606901865021132537846477835856853349731273975982468804733457850240575109031818103309236270231655)*x + (5343420618848226955320378202000352394244098304934338794284381961094990360363563066732913956814419521482429881336689247075907521999*i+17428993670632530995132611508448758632743638775023247667917862716920516973373104961511526894225129798694119426419358790870458819477) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9829983587439032154969804833463756286817464929454936218227902675164290894577799108433828219793947126262185697600082328557198564462*i+11570258480142167506247575896093413008391409062780334409670723310104967588889125416271720544046287586559519100546771696764985181689)*x + (17141716436646184713328884553489295943079310921603930883329516467146740907945598435442849785888606491480403085467857773832465442464*i+22929732684024759002458024988290536695822054428001746504164176767684903897613216490251677804139769442802887027605609575509282919375) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9829983587439032154969804833463756286817464929454936218227902675164290894577799108433828219793947126262185697600082328557198564462*i+11570258480142167506247575896093413008391409062780334409670723310104967588889125416271720544046287586559519100546771696764985181689)*x + (17141716436646184713328884553489295943079310921603930883329516467146740907945598435442849785888606491480403085467857773832465442464*i+22929732684024759002458024988290536695822054428001746504164176767684903897613216490251677804139769442802887027605609575509282919375) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11202071484271540495377456393506127284144694005049878254580635804367587665149984660973300399044119562543899539006653677620832167307*i+22506253190465762870890207197252413033130534009464607159991474823542068372583158868733693555501888595858231729774134924687410930068)*x + (13680659551858771430576980492828599154953054414717174678181873345052161642807141009878392604749946621631912689962555897444313433932*i+19137653515602387922591868186662953326723187341194156784729560818298773649465896023494977490095451586158008628043986216892234800282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11202071484271540495377456393506127284144694005049878254580635804367587665149984660973300399044119562543899539006653677620832167307*i+22506253190465762870890207197252413033130534009464607159991474823542068372583158868733693555501888595858231729774134924687410930068)*x + (13680659551858771430576980492828599154953054414717174678181873345052161642807141009878392604749946621631912689962555897444313433932*i+19137653515602387922591868186662953326723187341194156784729560818298773649465896023494977490095451586158008628043986216892234800282) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6519349892092644540620329873606569494126006206483130484833198610559910672443152747037076427990947224104958747457833316058447163404*i+14486425284091520649015531769930073072687224452533916416463472811983755947431471789002089698499805319917458314775388578605391630108)*x + (1466639230624244127373200937962158212962471314166539831662937653601176277781212402806992399547684288351283251404551136133031840054*i+21102763083924323342642560928741561251161398378770945521600385784127035452188330694525381997009914720936637129486349582819345627768) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6519349892092644540620329873606569494126006206483130484833198610559910672443152747037076427990947224104958747457833316058447163404*i+14486425284091520649015531769930073072687224452533916416463472811983755947431471789002089698499805319917458314775388578605391630108)*x + (1466639230624244127373200937962158212962471314166539831662937653601176277781212402806992399547684288351283251404551136133031840054*i+21102763083924323342642560928741561251161398378770945521600385784127035452188330694525381997009914720936637129486349582819345627768) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4197267682878054309915861469655119983516875209606562879030872960474775194115200766167156606913174501019758509683168849360283496968*i+17606527559039094972461398463337063817944195639860696051788406096708548368338614597349046139641291160507478334377031628622085049854)*x + (16626632863807597823397227672427768388711992930934185047509021034566094883660258785498732273619907373951294837576022503636268315394*i+20001912376867930956334125116831374259877207341315608220487038683572569969832794311818333308109490102459618429570544987716525742057) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4197267682878054309915861469655119983516875209606562879030872960474775194115200766167156606913174501019758509683168849360283496968*i+17606527559039094972461398463337063817944195639860696051788406096708548368338614597349046139641291160507478334377031628622085049854)*x + (16626632863807597823397227672427768388711992930934185047509021034566094883660258785498732273619907373951294837576022503636268315394*i+20001912376867930956334125116831374259877207341315608220487038683572569969832794311818333308109490102459618429570544987716525742057) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1921110879527188243055162905611442347523682549930992156873477623221695709076821131972234764356784593773035982335713606701576742479*i+5607048716643894682097433074340219301488970969495080838598301317116384002199615666954509078318292589371838408008007510864581823433)*x + (19937079842930258796178269954887822279534273254645514936813766761285417551808148814292255913071652727056397723388681019597738985055*i+12165771676580113614767859592133797414741056543786917459313930615510633944652264397235543029305597526626666937077585216096250177451) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1921110879527188243055162905611442347523682549930992156873477623221695709076821131972234764356784593773035982335713606701576742479*i+5607048716643894682097433074340219301488970969495080838598301317116384002199615666954509078318292589371838408008007510864581823433)*x + (19937079842930258796178269954887822279534273254645514936813766761285417551808148814292255913071652727056397723388681019597738985055*i+12165771676580113614767859592133797414741056543786917459313930615510633944652264397235543029305597526626666937077585216096250177451) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19100244556427476393433956343523328113411793676272623634126082986837919985002939771680902013213290154503229802211380213818928967378*i+3933763176066905817519871785334037136571615965192478728837358632913453895273962433387986542632913620086616408403141757178981364997)*x + (4031377861160956317294127010466501061853822089583974008126146459032100854168178974564895979578711727496060130991685594163543979507*i+15906035012241748719425560320736414011488896628074138340963621271510317111239804422544716630166360871663753767850387265186364717504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19100244556427476393433956343523328113411793676272623634126082986837919985002939771680902013213290154503229802211380213818928967378*i+3933763176066905817519871785334037136571615965192478728837358632913453895273962433387986542632913620086616408403141757178981364997)*x + (4031377861160956317294127010466501061853822089583974008126146459032100854168178974564895979578711727496060130991685594163543979507*i+15906035012241748719425560320736414011488896628074138340963621271510317111239804422544716630166360871663753767850387265186364717504) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10983180349948234400321570387576273182501317209534845478460737971833065249996646216362344042561358917661172735517959288003088893048*i+233215669015862663390489657239449175933611622190120120964120688370186463532976594403438860302499022853611779537787347884609670264)*x + (10925529570221197928814649915464586104885729233197322131192659233522450463533981898152244695462367687122662306256574798262507532147*i+5556057607840347043107909056317738292554673005884386610737634742358296536623177035594967122568676954615047882073224795570520728880) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10983180349948234400321570387576273182501317209534845478460737971833065249996646216362344042561358917661172735517959288003088893048*i+233215669015862663390489657239449175933611622190120120964120688370186463532976594403438860302499022853611779537787347884609670264)*x + (10925529570221197928814649915464586104885729233197322131192659233522450463533981898152244695462367687122662306256574798262507532147*i+5556057607840347043107909056317738292554673005884386610737634742358296536623177035594967122568676954615047882073224795570520728880) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8597926776603530125686052384426025806490243441968938545497319135546834301839247326678463030047920143649547819644710558564597669126*i+13154258156055241586750183503484143377006012302374526742019369143198088807834084546592258453755116773733525090564620744327759990554)*x + (23014624769434201511504902389452150726984161450245934457112244894262085306467533823414672416792537158696395839109428841830335689711*i+3012339056533193904020624411297427930323417490221190554089495801108042490453743494313092307648204414652965783674779705259408300018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8597926776603530125686052384426025806490243441968938545497319135546834301839247326678463030047920143649547819644710558564597669126*i+13154258156055241586750183503484143377006012302374526742019369143198088807834084546592258453755116773733525090564620744327759990554)*x + (23014624769434201511504902389452150726984161450245934457112244894262085306467533823414672416792537158696395839109428841830335689711*i+3012339056533193904020624411297427930323417490221190554089495801108042490453743494313092307648204414652965783674779705259408300018) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22719735041844512039670125820489598277686473350197981629493071605337947708232380747421500622715016656727197213096638552759434467910*i+20538420945905755827883520551487184680985086548925907990232647058676493441557122560548128699611649999722094112412798237086099212454)*x + (22964446016262718193253907242081132292660047041962424467660400320179383803305199644372547527801120575739164544789043357069215839073*i+24215893195842827156817923136932399070658265103464463282182232865948103100073726488412657552227968674619106428192857154299078369856) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22719735041844512039670125820489598277686473350197981629493071605337947708232380747421500622715016656727197213096638552759434467910*i+20538420945905755827883520551487184680985086548925907990232647058676493441557122560548128699611649999722094112412798237086099212454)*x + (22964446016262718193253907242081132292660047041962424467660400320179383803305199644372547527801120575739164544789043357069215839073*i+24215893195842827156817923136932399070658265103464463282182232865948103100073726488412657552227968674619106428192857154299078369856) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (300833076932450859289187167029999784207607905286652258411651641426058227321179860210888388182970191683977434538249093465670898078*i+12598753729079928359260860736311086482553595874079452941246324977292588609074006390882048855282638235129666738299693543299931159171)*x + (9928627779816902975487509852768491176087535473947413625626894177049355719483169524632330344773255072993090715187706764109767787029*i+7376083635066664273455151240632872759838399751905184740662957739889651833313681902170707980673723055633571317124013311042752753608) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (300833076932450859289187167029999784207607905286652258411651641426058227321179860210888388182970191683977434538249093465670898078*i+12598753729079928359260860736311086482553595874079452941246324977292588609074006390882048855282638235129666738299693543299931159171)*x + (9928627779816902975487509852768491176087535473947413625626894177049355719483169524632330344773255072993090715187706764109767787029*i+7376083635066664273455151240632872759838399751905184740662957739889651833313681902170707980673723055633571317124013311042752753608) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4629742753439399262278725913054970656267153445320460221628506517948727508195481645436928071879439788257437139024169837144722407836*i+5007882864537081026039876422677218847795423358707614019501139877136633909671593002035645154316820213561098037137735112961487767872)*x + (16514820379548622318824560522339730720779528696395254878522471769552063413435908522380026832644820429080031553371778100257019083684*i+11459496049096839749281473115677044451172647554455415566322559926886940555466515507131517048776432266063873543741916246217763830709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4629742753439399262278725913054970656267153445320460221628506517948727508195481645436928071879439788257437139024169837144722407836*i+5007882864537081026039876422677218847795423358707614019501139877136633909671593002035645154316820213561098037137735112961487767872)*x + (16514820379548622318824560522339730720779528696395254878522471769552063413435908522380026832644820429080031553371778100257019083684*i+11459496049096839749281473115677044451172647554455415566322559926886940555466515507131517048776432266063873543741916246217763830709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9794808079209049705087737741871359038591964574460886806157529721088322498596964689629075914229833387817403362815439347078510096913*i+9264115046165494241924079452426529992558575839257191869311823010451044218577196734786427640993441772658830207478767022152273661625)*x + (15058125503998983766966777849810541724423639934771399046455385302981612430461786750076656459395614287065590125090004855162762535138*i+19373685317881523158792233254845281826509226387450240302681587402202245790477723579235482899956685888912362732062601072822569344633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9794808079209049705087737741871359038591964574460886806157529721088322498596964689629075914229833387817403362815439347078510096913*i+9264115046165494241924079452426529992558575839257191869311823010451044218577196734786427640993441772658830207478767022152273661625)*x + (15058125503998983766966777849810541724423639934771399046455385302981612430461786750076656459395614287065590125090004855162762535138*i+19373685317881523158792233254845281826509226387450240302681587402202245790477723579235482899956685888912362732062601072822569344633) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22656989098878033824238913881755859926122347341275502180542445604253685114474234520421405296660543944326301309986897934378349390485*i+12440718922790305702052677225205019774980706201730071519676225645734192951918099544082664478066045595877262781634056006804660397405)*x + (16528473846523795903023366168096036079677716306695723611651224739345471432012600760369479664614324734426702560012118750458344848515*i+463556754121571682918564834252739213956319304982202495250086649853385020032286002648771995565104396393056005852237576339059976332) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22656989098878033824238913881755859926122347341275502180542445604253685114474234520421405296660543944326301309986897934378349390485*i+12440718922790305702052677225205019774980706201730071519676225645734192951918099544082664478066045595877262781634056006804660397405)*x + (16528473846523795903023366168096036079677716306695723611651224739345471432012600760369479664614324734426702560012118750458344848515*i+463556754121571682918564834252739213956319304982202495250086649853385020032286002648771995565104396393056005852237576339059976332) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11873707982353035861649185913184154094255400030115905963570733542984145124662773075516620863116747992310860116278123383934572408348*i+21018185927750108772232877706164744624565871049695396189497551650104795791076417207842482915555413363389858205990350594397977253593)*x + (12366476786523180315480881617715617212279862356656825853081831618177021028427164613229420791921845709164013305572358554904825929839*i+10285214985363497626257713057916716452712899220408055385328678955802448022698256803888177187914609880504765609603987614576373361277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11873707982353035861649185913184154094255400030115905963570733542984145124662773075516620863116747992310860116278123383934572408348*i+21018185927750108772232877706164744624565871049695396189497551650104795791076417207842482915555413363389858205990350594397977253593)*x + (12366476786523180315480881617715617212279862356656825853081831618177021028427164613229420791921845709164013305572358554904825929839*i+10285214985363497626257713057916716452712899220408055385328678955802448022698256803888177187914609880504765609603987614576373361277) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15609820376028666314044022432131926296243293957281373057589214503529339710092308138901562705910606458223132476106504527380625596017*i+19982354660026733076379410248490030884924622575794024705456521614650456397213879298414830552004796119467717921610041467648399404837)*x + (15175139297198023144537751993175319547745819559400454668713740748989267570312813709663115069938308490136895133046760363607946165522*i+19940174036922136684292412788980541196355011937847780274932441930617417280793901658827792066719751734350123808316491438622108361273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15609820376028666314044022432131926296243293957281373057589214503529339710092308138901562705910606458223132476106504527380625596017*i+19982354660026733076379410248490030884924622575794024705456521614650456397213879298414830552004796119467717921610041467648399404837)*x + (15175139297198023144537751993175319547745819559400454668713740748989267570312813709663115069938308490136895133046760363607946165522*i+19940174036922136684292412788980541196355011937847780274932441930617417280793901658827792066719751734350123808316491438622108361273) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13730504354263996901000670679522071957307720190497728155043287835233080379883820562068599038332491296991757066884426100544067279008*i+3418866893004074457019983977147104450131000785082627468041964605638794464657906089665652122515446655623892696123517734128409759967)*x + (10227150545772787598917120108702587082672321666863597804893839282718466513898746129725699882593281082066701767048203438762610391125*i+17502106236532360355243193730494608478748048398136691981681825279005068125593490043953238470860640647459303362442453904015846748916) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13730504354263996901000670679522071957307720190497728155043287835233080379883820562068599038332491296991757066884426100544067279008*i+3418866893004074457019983977147104450131000785082627468041964605638794464657906089665652122515446655623892696123517734128409759967)*x + (10227150545772787598917120108702587082672321666863597804893839282718466513898746129725699882593281082066701767048203438762610391125*i+17502106236532360355243193730494608478748048398136691981681825279005068125593490043953238470860640647459303362442453904015846748916) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8263101821572265853809491182769355842371861582456456277597569478941891966520121994096560044565201935400028591246175996176699399591*i+3627268043643876449002815423178321314528917786680931661339170291476305182885728921218068930442278912673021061626448992618176710589)*x + (1433823217186586588633457974469588931678836418416017277531822802984570975642317508512901575704641805609780081356991176002984662059*i+14202462827186611140710284042684678797094803644902180833882343870013838709060047895421761334170793558401900797345769944884438063136) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8263101821572265853809491182769355842371861582456456277597569478941891966520121994096560044565201935400028591246175996176699399591*i+3627268043643876449002815423178321314528917786680931661339170291476305182885728921218068930442278912673021061626448992618176710589)*x + (1433823217186586588633457974469588931678836418416017277531822802984570975642317508512901575704641805609780081356991176002984662059*i+14202462827186611140710284042684678797094803644902180833882343870013838709060047895421761334170793558401900797345769944884438063136) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6837935936319289997200900856491790720739519671683344440527296879311443061758149175300650645905791000599115156382586304193355085847*i+3809626052203567716722806058804021862179930480256967213957521104004577250172700778145717151512425062499235007818482058644919922359)*x + (9097462609703347146994910061460912115980910014813746114122603824655064450098013657005793098414473152896694174940440527265617493050*i+21960847808607989730856717718719944013427988019535772361742425510837234028323124282379808182922524568881804183798755886774206326190) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6837935936319289997200900856491790720739519671683344440527296879311443061758149175300650645905791000599115156382586304193355085847*i+3809626052203567716722806058804021862179930480256967213957521104004577250172700778145717151512425062499235007818482058644919922359)*x + (9097462609703347146994910061460912115980910014813746114122603824655064450098013657005793098414473152896694174940440527265617493050*i+21960847808607989730856717718719944013427988019535772361742425510837234028323124282379808182922524568881804183798755886774206326190) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17049264054844897808238968891998276177494870067438146884437448791854663076077654084930790303651339944255094015237987071654354564737*i+15996057467957806631347342069439524408871323735490152344991198373400570150164682495798501595097935296040325327032923428354140330333)*x + (20820677817853874355636473211113973689898799849144341156843068560411162200452776826294820722987458904254886896058292130846624017894*i+8712496919892653913475753551302756752134176137817311991511133150131719637874931396411539973794712100694913392721346623923369068177) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17049264054844897808238968891998276177494870067438146884437448791854663076077654084930790303651339944255094015237987071654354564737*i+15996057467957806631347342069439524408871323735490152344991198373400570150164682495798501595097935296040325327032923428354140330333)*x + (20820677817853874355636473211113973689898799849144341156843068560411162200452776826294820722987458904254886896058292130846624017894*i+8712496919892653913475753551302756752134176137817311991511133150131719637874931396411539973794712100694913392721346623923369068177) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8532572239034145470050020968808290393128451828154922668500638746055599377073801777518899140358349885649579163260764845641479323362*i+13449510629193664902278248912568642245238737449966506962801919876391940347800270804887824672287132909228442336044694530553606314801)*x + (22111779075670297031204164702764863986125687608068646510947217705969574409452754153547261257234746560567901688944660066330767326365*i+13649260569966790538982981563121577637121246604449890780095338348825950625471754681826819374127970452360365440033543783595628171591) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8532572239034145470050020968808290393128451828154922668500638746055599377073801777518899140358349885649579163260764845641479323362*i+13449510629193664902278248912568642245238737449966506962801919876391940347800270804887824672287132909228442336044694530553606314801)*x + (22111779075670297031204164702764863986125687608068646510947217705969574409452754153547261257234746560567901688944660066330767326365*i+13649260569966790538982981563121577637121246604449890780095338348825950625471754681826819374127970452360365440033543783595628171591) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11328921804314478714937380668207014187477206104867241002633290927808485846287664751899352618423590982104838396595914186983289711150*i+20372021162081554506766010273362431023261644676196639765013976446665299254506040542692008960665302245200079310029108560562240262557)*x + (21961658913350003167228361131763110576020622540875170243664893697219520709436368030622215480779446892098878156117700698096615900021*i+527059151298660498364235505757436295820479507740379492677932876695151859701217073148374998774908921373471757502279816914220973693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11328921804314478714937380668207014187477206104867241002633290927808485846287664751899352618423590982104838396595914186983289711150*i+20372021162081554506766010273362431023261644676196639765013976446665299254506040542692008960665302245200079310029108560562240262557)*x + (21961658913350003167228361131763110576020622540875170243664893697219520709436368030622215480779446892098878156117700698096615900021*i+527059151298660498364235505757436295820479507740379492677932876695151859701217073148374998774908921373471757502279816914220973693) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7148169135731536004636390546642934452065416127469973638897452507285859611930055000567806198666664691893172822781724360778547049489*i+16136357925869713699327239072437494371161971224160324102501760416350368776812740345146743174685390871483963259366778177903352187098)*x + (4631953632909814045431627160899135697992611571083188323709851433286691879991339078159675788141851686316308561800592157980313636950*i+11779367841079567691433044696822332464647854935290215127143757471265044978062319459909378517724106184462081522556997155264606720143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7148169135731536004636390546642934452065416127469973638897452507285859611930055000567806198666664691893172822781724360778547049489*i+16136357925869713699327239072437494371161971224160324102501760416350368776812740345146743174685390871483963259366778177903352187098)*x + (4631953632909814045431627160899135697992611571083188323709851433286691879991339078159675788141851686316308561800592157980313636950*i+11779367841079567691433044696822332464647854935290215127143757471265044978062319459909378517724106184462081522556997155264606720143) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2927045145087467087723521591177061569964255257403069874787259727964290858881364041506750631577914268557594006272691887984851341250*i+22245138732369508785042200947981290489990712853282776635628798295528375623030182219363607799401706631838416758053216445199414033580)*x + (2651968603119946107214850476481060347491141606822006442398515909283717626416404328943524115693964265576353249908645045080713369954*i+10286577170419013852818976598403898490313675946465979454423591908943197587926901911451473110473086119150685546238327488542380384318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2927045145087467087723521591177061569964255257403069874787259727964290858881364041506750631577914268557594006272691887984851341250*i+22245138732369508785042200947981290489990712853282776635628798295528375623030182219363607799401706631838416758053216445199414033580)*x + (2651968603119946107214850476481060347491141606822006442398515909283717626416404328943524115693964265576353249908645045080713369954*i+10286577170419013852818976598403898490313675946465979454423591908943197587926901911451473110473086119150685546238327488542380384318) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23171547123610585005256371528886688238646040213383435074691880344448946073232893047201852196609781890475131733929384667394124019*i+1236515292801439201425192659920284195259446559183927770354443607550271056862403254087802470327887644561828311628923670575183902372)*x + (19596512348611216857033890326325387990315136286403740566286583610771950709239947207401347773208451502185940967937104220537167089595*i+24071089921136383944205462180037489439042762840000572555586730687617547599742574229143286778796154268154827228406008790360778062017) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23171547123610585005256371528886688238646040213383435074691880344448946073232893047201852196609781890475131733929384667394124019*i+1236515292801439201425192659920284195259446559183927770354443607550271056862403254087802470327887644561828311628923670575183902372)*x + (19596512348611216857033890326325387990315136286403740566286583610771950709239947207401347773208451502185940967937104220537167089595*i+24071089921136383944205462180037489439042762840000572555586730687617547599742574229143286778796154268154827228406008790360778062017) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13314204292841794298524849510009987241238773168305649707735447008175000110544869695826493557151300935463875609529740930765112760223*i+16803160713737731014584095273592611869501707443721163558728189015239794669734726884468762898231036844019027107198354363531011439959)*x + (1777311412269206956533509651864448324069839062252336736387610088145601526661798375581206004552635001759867062247109166685179402017*i+8221755442364656021740802974263443840729167111974996688797752891066222897985793346108748005917537101306755266313338613459578777278) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13314204292841794298524849510009987241238773168305649707735447008175000110544869695826493557151300935463875609529740930765112760223*i+16803160713737731014584095273592611869501707443721163558728189015239794669734726884468762898231036844019027107198354363531011439959)*x + (1777311412269206956533509651864448324069839062252336736387610088145601526661798375581206004552635001759867062247109166685179402017*i+8221755442364656021740802974263443840729167111974996688797752891066222897985793346108748005917537101306755266313338613459578777278) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14140111415310607867800073614384847811719603241225307858970385550663143339741209156495105411300500874200811569191971989062540083179*i+11289707878214192606693539144076349196725692336101970118506841526171829305312366242219192718708265952257937156625552050600987958991)*x + (24280341326794931420303905015521090298089704228154812433205151656850831116532148295619994629606673384434231751053069781104719877365*i+22961932516863038474841343614409846484947076568115415109255581876568189556798248272271553465653552652912287510323098556702023837680) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14140111415310607867800073614384847811719603241225307858970385550663143339741209156495105411300500874200811569191971989062540083179*i+11289707878214192606693539144076349196725692336101970118506841526171829305312366242219192718708265952257937156625552050600987958991)*x + (24280341326794931420303905015521090298089704228154812433205151656850831116532148295619994629606673384434231751053069781104719877365*i+22961932516863038474841343614409846484947076568115415109255581876568189556798248272271553465653552652912287510323098556702023837680) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6451213714275829899007318667605235636732610121265590614102137851948657022882381173301217249279089970202764723163438826480210165534*i+4516116731726543962350621748662784136916564752837660850555944298798212184134633703343175860947662575583965540959411777952516819819)*x + (20386718142545773757368435503403515130642409633482524985392009383247920042029963018342873060992143985295693480539972332737521389813*i+18800828317385872931764994971887494428117532557331044061522460521326438843026589987309687134363625566839021122696347964372646167662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6451213714275829899007318667605235636732610121265590614102137851948657022882381173301217249279089970202764723163438826480210165534*i+4516116731726543962350621748662784136916564752837660850555944298798212184134633703343175860947662575583965540959411777952516819819)*x + (20386718142545773757368435503403515130642409633482524985392009383247920042029963018342873060992143985295693480539972332737521389813*i+18800828317385872931764994971887494428117532557331044061522460521326438843026589987309687134363625566839021122696347964372646167662) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13092846243481420974329481830197721447937192833109714147680501754861004246035906812129442387747632725925268234711454132073936047911*i+23648619606497411667703651406049740502683474119364589806805146350030121307534220694599991480173052957016621318409543525782761219006)*x + (9257037854641483424228795206598307764972349805635423411451122777405027140416389182049509013422633902155705739401745305366808136194*i+1479492903591325760540621651662420496466958690909532385977881213899290567879553475452497906965060397469229653373937990207714773151) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13092846243481420974329481830197721447937192833109714147680501754861004246035906812129442387747632725925268234711454132073936047911*i+23648619606497411667703651406049740502683474119364589806805146350030121307534220694599991480173052957016621318409543525782761219006)*x + (9257037854641483424228795206598307764972349805635423411451122777405027140416389182049509013422633902155705739401745305366808136194*i+1479492903591325760540621651662420496466958690909532385977881213899290567879553475452497906965060397469229653373937990207714773151) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6036721965889524943225343698170938203528359623670315002431486929390048605144865447115989505469399436947692023201556562670705794276*i+17634882257158533451018515318419254408761696285409131929980186138589085175351039562713270180360372482452560581349184641445468296873)*x + (21620847531187204379572027695687091521406528995976853434137844860947374119015921190939989527124019817640706108627361374456631809558*i+2863094335313924723505406087895381368387375741408352828688787766929651748155114004045425589901852311333057588621825413410512379874) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6036721965889524943225343698170938203528359623670315002431486929390048605144865447115989505469399436947692023201556562670705794276*i+17634882257158533451018515318419254408761696285409131929980186138589085175351039562713270180360372482452560581349184641445468296873)*x + (21620847531187204379572027695687091521406528995976853434137844860947374119015921190939989527124019817640706108627361374456631809558*i+2863094335313924723505406087895381368387375741408352828688787766929651748155114004045425589901852311333057588621825413410512379874) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4271396618947075461681283981326366779819656942596169313366913292626041375901393500866060221910764786205129789445526652700218457553*i+8193619513609197536597170505411719447115915002693902412692826582444236461840361681905194906153862721148348349342744050860252354252)*x + (11973053232207417834922041119746622532993056016928554476485036438988375781545425760403578945782740055665381222077615654908397088012*i+14445083924679157388473031650219147575168165194809027915249078135605048998262040634067992907637262137831100587222678216475444226604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4271396618947075461681283981326366779819656942596169313366913292626041375901393500866060221910764786205129789445526652700218457553*i+8193619513609197536597170505411719447115915002693902412692826582444236461840361681905194906153862721148348349342744050860252354252)*x + (11973053232207417834922041119746622532993056016928554476485036438988375781545425760403578945782740055665381222077615654908397088012*i+14445083924679157388473031650219147575168165194809027915249078135605048998262040634067992907637262137831100587222678216475444226604) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (555524910499521947720544029698946910043454984275302673665206158448555066152755172929260322704742707227835985540987949748493355313*i+10936970990250620484037946843861325135409266435911801172892777393917365509810517203510193515115076868481494077839583925094358180078)*x + (18034522091945313969883878179900262028486770227914197051284216074008502972644138563311978768502906226090003494136105919032742962975*i+17384179679586263339486401807907883111742798866695521597036223445326840159752781888304856348113893471917177464859558157366589434935) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (555524910499521947720544029698946910043454984275302673665206158448555066152755172929260322704742707227835985540987949748493355313*i+10936970990250620484037946843861325135409266435911801172892777393917365509810517203510193515115076868481494077839583925094358180078)*x + (18034522091945313969883878179900262028486770227914197051284216074008502972644138563311978768502906226090003494136105919032742962975*i+17384179679586263339486401807907883111742798866695521597036223445326840159752781888304856348113893471917177464859558157366589434935) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14078642475918424567908026972988195005202587463655099365365889998299034104035232586087320586922828268969936050141798924056728245686*i+18748324516862747906178307812576593109497283937545156351551891619276736281509982837311958854561267673590234310204304279519839221581)*x + (13318628887485964480689450049900921296951403826415184570111383705472969846782021000975806505695068058349660478894527235965234189123*i+16040696001483693901107086888916940376135578575625885397674924405627839623294937148088129892330780889586398586620904956277775707593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14078642475918424567908026972988195005202587463655099365365889998299034104035232586087320586922828268969936050141798924056728245686*i+18748324516862747906178307812576593109497283937545156351551891619276736281509982837311958854561267673590234310204304279519839221581)*x + (13318628887485964480689450049900921296951403826415184570111383705472969846782021000975806505695068058349660478894527235965234189123*i+16040696001483693901107086888916940376135578575625885397674924405627839623294937148088129892330780889586398586620904956277775707593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6669148372283630857991030885135257303406146412068488632216905551390023806226801220520900834092647226070169620525238224718722946023*i+6934517183694828740166744416055108991690063462414677247642769691557240778974775591088158436822714804474037781667106212666448058038)*x + (3221260954076527608688230899034676958516458373646626215748964800777744183078370474950488055118437347053154776977723796474268136245*i+1927336194532153662481059020969839133714147292516168141691192192372097513252086420744128615571857720368612353282984984428654881392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6669148372283630857991030885135257303406146412068488632216905551390023806226801220520900834092647226070169620525238224718722946023*i+6934517183694828740166744416055108991690063462414677247642769691557240778974775591088158436822714804474037781667106212666448058038)*x + (3221260954076527608688230899034676958516458373646626215748964800777744183078370474950488055118437347053154776977723796474268136245*i+1927336194532153662481059020969839133714147292516168141691192192372097513252086420744128615571857720368612353282984984428654881392) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10934277439788689751761897029563589181723693830792231010034973335779908557788598402750499307801573854499471678681791035636892261993*i+11167853035755017001201378166777343777511938818944490725616658725795691100539652512215682385111412315138554060908539078018325036363)*x + (17958820140553266826880887695768844477920213128049888870674602724172818972725244727661345350564278965182223243894778279697789682999*i+5484633978033274970782491124510952307273205922498815252933372570656633156977363008011106861512936095912502178428255576046733454290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10934277439788689751761897029563589181723693830792231010034973335779908557788598402750499307801573854499471678681791035636892261993*i+11167853035755017001201378166777343777511938818944490725616658725795691100539652512215682385111412315138554060908539078018325036363)*x + (17958820140553266826880887695768844477920213128049888870674602724172818972725244727661345350564278965182223243894778279697789682999*i+5484633978033274970782491124510952307273205922498815252933372570656633156977363008011106861512936095912502178428255576046733454290) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11206258088145380578349260589447742827795617057700422176724522288675167652351851791041320793929955049970029204073312284096857764714*i+4823502826048082052751819586681549889510205261982209446554471397945077529710600679890349113190261935614151339317322704564727396274)*x + (10899337020057624420027534308837756071228484411810809812525656928615906430359527304531081964307809450550395117278682802838844585315*i+22816721328889815692719952478959651632287352225795575627344822984028747036947716162109137274912570974584099383075936726629769736197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11206258088145380578349260589447742827795617057700422176724522288675167652351851791041320793929955049970029204073312284096857764714*i+4823502826048082052751819586681549889510205261982209446554471397945077529710600679890349113190261935614151339317322704564727396274)*x + (10899337020057624420027534308837756071228484411810809812525656928615906430359527304531081964307809450550395117278682802838844585315*i+22816721328889815692719952478959651632287352225795575627344822984028747036947716162109137274912570974584099383075936726629769736197) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2713014233980456676704083279612072960388074560435515632406159796644446748701959402536158845029361351315558503536430046749185044776*i+18171064797689425712876923169433610347715658416427811026785492596477352667768661393562431598763556198124827588661586411234701825923)*x + (10265761681659171724747549145945191399619184014909067365170124469513845898485831699059983356607691950150491710666780818921973951031*i+11031350639392129936590843716467499427474970592671629832548993363535460560255260815431045128926047641323121870984258251977095309356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2713014233980456676704083279612072960388074560435515632406159796644446748701959402536158845029361351315558503536430046749185044776*i+18171064797689425712876923169433610347715658416427811026785492596477352667768661393562431598763556198124827588661586411234701825923)*x + (10265761681659171724747549145945191399619184014909067365170124469513845898485831699059983356607691950150491710666780818921973951031*i+11031350639392129936590843716467499427474970592671629832548993363535460560255260815431045128926047641323121870984258251977095309356) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2027219332912033629869389748387271427297006733580974973389732683484609762187911360858893113072251769458769327370454457614250844125*i+3887644202144822385306862388365338923649515455113500697240052111242158728719406334832872756730371359370371299643849514782155106936)*x + (20772110597056610217693755257681005218887887220518360444558621775880227805775209229789382741964600614734540874247813858586454869127*i+22412626036546924345227918071864323879267611045443179709450482660889737199362092498422066278306720256493171178393087594938634579432) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2027219332912033629869389748387271427297006733580974973389732683484609762187911360858893113072251769458769327370454457614250844125*i+3887644202144822385306862388365338923649515455113500697240052111242158728719406334832872756730371359370371299643849514782155106936)*x + (20772110597056610217693755257681005218887887220518360444558621775880227805775209229789382741964600614734540874247813858586454869127*i+22412626036546924345227918071864323879267611045443179709450482660889737199362092498422066278306720256493171178393087594938634579432) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9089226950653090477226503902186237880590219537062343436666550635948431031998176211616753043750873309157237033862886085106750039738*i+9334814044408727028505069649238859762505888799877565390682832571290898894961079001648468010749575606813894563311743667771711835756)*x + (1629540314402667455957721449494601954819179287804704579850067620303215384768176087860577209413908771019186870948909947927061461131*i+6393818778537257702461529279441942955951005655780836382156064481419354147493953602867180693222958569739301319438188214807463715831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9089226950653090477226503902186237880590219537062343436666550635948431031998176211616753043750873309157237033862886085106750039738*i+9334814044408727028505069649238859762505888799877565390682832571290898894961079001648468010749575606813894563311743667771711835756)*x + (1629540314402667455957721449494601954819179287804704579850067620303215384768176087860577209413908771019186870948909947927061461131*i+6393818778537257702461529279441942955951005655780836382156064481419354147493953602867180693222958569739301319438188214807463715831) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21496014522822681358036541847837703493828468337299282222110304770796507977842293319763304662104102279685301694402171407318855610474*i+22170451509313717037827197248352483687372932363568045905735697897592118058091863088305739775062776386815787567431349372979018622352)*x + (14420686143055466415472190257973638975107039310837370026087163705207915401876742323222128633351917348007646364706078845486694549098*i+23215785167654303057395335191118099810782204933508178496577652580431136669662619177699792544253681925985074304182259784985831319185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21496014522822681358036541847837703493828468337299282222110304770796507977842293319763304662104102279685301694402171407318855610474*i+22170451509313717037827197248352483687372932363568045905735697897592118058091863088305739775062776386815787567431349372979018622352)*x + (14420686143055466415472190257973638975107039310837370026087163705207915401876742323222128633351917348007646364706078845486694549098*i+23215785167654303057395335191118099810782204933508178496577652580431136669662619177699792544253681925985074304182259784985831319185) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6104195582835322224076655390343649220104330765293423978280432930677964898601597221146111971936938747775734209046649301643337749786*i+22845612530673676258359986506819746097725083323765829243981139234509678564999186027566110887285934277513948967463065675365822038311)*x + (22175857164143060000526133747269448966036406009526767126207540882400413058199958093160744706987233406205073631830310478965666299329*i+10274836737229331440541237623966712183477465349633571934945573532417127210529758257354915177021333339685375317326685320681479294586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6104195582835322224076655390343649220104330765293423978280432930677964898601597221146111971936938747775734209046649301643337749786*i+22845612530673676258359986506819746097725083323765829243981139234509678564999186027566110887285934277513948967463065675365822038311)*x + (22175857164143060000526133747269448966036406009526767126207540882400413058199958093160744706987233406205073631830310478965666299329*i+10274836737229331440541237623966712183477465349633571934945573532417127210529758257354915177021333339685375317326685320681479294586) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7097408530894186629785551674208925733966926886038772135491629944262484750525376685507687973295007526158584162516867126227985235293*i+16140996631485504555252523653801943438397296250897215573365788892289293658417749257780560552992760707972290162413192397722622359687)*x + (8529710586003699341634159713461643996659071455182694405350745868571598197400584673520140010596493974250707891422520505838076545257*i+6698396013259471736084692789956920860441052717692724451299740111278816230847905862252340292876078449887094259601223468548275034216) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7097408530894186629785551674208925733966926886038772135491629944262484750525376685507687973295007526158584162516867126227985235293*i+16140996631485504555252523653801943438397296250897215573365788892289293658417749257780560552992760707972290162413192397722622359687)*x + (8529710586003699341634159713461643996659071455182694405350745868571598197400584673520140010596493974250707891422520505838076545257*i+6698396013259471736084692789956920860441052717692724451299740111278816230847905862252340292876078449887094259601223468548275034216) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16772714262041479496253515881095212132311028180256652090367045401534938434579959306483279260553813319465880140197899317025791311990*i+14292027403166800375025851194638941391556763181645285285865172936253891072852176052411215796196287224956464093946235988149872895261)*x + (14383704935016859816174880874033741081573203698288204711897105013629138294621671914396575443777059539182662288742059480536317452204*i+20080164210348765564796434567252162610588894854689590216765480847885173426578908146394819502856283030074137218461572312330542892438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16772714262041479496253515881095212132311028180256652090367045401534938434579959306483279260553813319465880140197899317025791311990*i+14292027403166800375025851194638941391556763181645285285865172936253891072852176052411215796196287224956464093946235988149872895261)*x + (14383704935016859816174880874033741081573203698288204711897105013629138294621671914396575443777059539182662288742059480536317452204*i+20080164210348765564796434567252162610588894854689590216765480847885173426578908146394819502856283030074137218461572312330542892438) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (644431642537054017381824075378286866816248794562034375025802363287061675121883609920647361032227379989647436727596984460550513847*i+7736987044327315190819220887357739417826605242232819307555247817313226472707878227297502970609912356298668920057395440684662329683)*x + (4171209230924288708674268234952770110343971558272331297162502810055949107441721751830473758967483298456151261772057430684677091929*i+9870020025984428527397881913767912377106970197561107225434117951938715453814146230741127042574913502948774474254535823087004674470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (644431642537054017381824075378286866816248794562034375025802363287061675121883609920647361032227379989647436727596984460550513847*i+7736987044327315190819220887357739417826605242232819307555247817313226472707878227297502970609912356298668920057395440684662329683)*x + (4171209230924288708674268234952770110343971558272331297162502810055949107441721751830473758967483298456151261772057430684677091929*i+9870020025984428527397881913767912377106970197561107225434117951938715453814146230741127042574913502948774474254535823087004674470) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20208151529296227596285498501737888961652295395228923075898264660253160003790443526074359208737014459296655504520931528615560812856*i+152290048339969822425358153716610576802906636243382657710211857874168527922578982141371827286488894191422529952843838347618245010)*x + (13843868004932126636688875476097021727444138810627366569541608849453848073842417228170686851838275310242605795394891974391011691040*i+23300778411016906981938867529313921741923314523435204984058248086959539860903364670097336756295382471170561723523271038158561663865) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20208151529296227596285498501737888961652295395228923075898264660253160003790443526074359208737014459296655504520931528615560812856*i+152290048339969822425358153716610576802906636243382657710211857874168527922578982141371827286488894191422529952843838347618245010)*x + (13843868004932126636688875476097021727444138810627366569541608849453848073842417228170686851838275310242605795394891974391011691040*i+23300778411016906981938867529313921741923314523435204984058248086959539860903364670097336756295382471170561723523271038158561663865) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21659023500858639008516975169302234197754055788447117594565874094971648102618717784208362381257026924003501449357207188738102699554*i+13426386315511844867817457128729777231488648949063233664706732880162992956200401007295477311620851311033323519800868722288715679831)*x + (24083308620997737533246453149318216026453757878434283451480122262658341729360017872936100428680305757956633740865783611836768182484*i+4656833744892194176596788637658061982769537793358891780395576456493917767034942571732131354651777589477690983235795449654075205416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21659023500858639008516975169302234197754055788447117594565874094971648102618717784208362381257026924003501449357207188738102699554*i+13426386315511844867817457128729777231488648949063233664706732880162992956200401007295477311620851311033323519800868722288715679831)*x + (24083308620997737533246453149318216026453757878434283451480122262658341729360017872936100428680305757956633740865783611836768182484*i+4656833744892194176596788637658061982769537793358891780395576456493917767034942571732131354651777589477690983235795449654075205416) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3859397253870097983179013567086902404508388659067382826099181503660674486924158540418833652333360246600680789659745327324746244428*i+16215571949742121743708292324587812577616455433148984091487092841747070278474798218187975343710201280867752811249926122879335825067)*x + (20127285718201992420625550679868163148822898851869734381256235351939733184459134524459368592219330473763688625938529624286533569789*i+10622903603327156382447406579518672817967794590526521132346171998757309303673735470427757961201995189368841012925908146989985424629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3859397253870097983179013567086902404508388659067382826099181503660674486924158540418833652333360246600680789659745327324746244428*i+16215571949742121743708292324587812577616455433148984091487092841747070278474798218187975343710201280867752811249926122879335825067)*x + (20127285718201992420625550679868163148822898851869734381256235351939733184459134524459368592219330473763688625938529624286533569789*i+10622903603327156382447406579518672817967794590526521132346171998757309303673735470427757961201995189368841012925908146989985424629) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17036687424245928800324894528104525042258647788644538522707967713688492140071311726244668757413329061553426995865049699081443844698*i+5641292179437635773294429410632796475685096316291079647160170872489171723079033293066310296309049993798499014013508482605482234400)*x + (9013856219562392241566962951035351042774770647783435343097291284329502221136216582245213666115854176661751747107323716658095916951*i+3433243690295506477543463182368768268869218733087514479943664640491640243638670000840515520163549483809589982996040758919181678343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17036687424245928800324894528104525042258647788644538522707967713688492140071311726244668757413329061553426995865049699081443844698*i+5641292179437635773294429410632796475685096316291079647160170872489171723079033293066310296309049993798499014013508482605482234400)*x + (9013856219562392241566962951035351042774770647783435343097291284329502221136216582245213666115854176661751747107323716658095916951*i+3433243690295506477543463182368768268869218733087514479943664640491640243638670000840515520163549483809589982996040758919181678343) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5616379147158199056557755277505917009737783672374418281557145359209063260267327594275076908368334842120341257604983940662896327375*i+24064926034788420871866322580615700468180951698529290708584000934047343679171050790825504501102675332579233315801464131155846702206)*x + (4588389669659202269082052036644323366033538222473579784989793524900299010540318306124062920427364099856902171978123536895594478575*i+3857042675623874198951746414834653514558251416169706505891402529248483208578565434628807330044514064358082277980092401183564871367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5616379147158199056557755277505917009737783672374418281557145359209063260267327594275076908368334842120341257604983940662896327375*i+24064926034788420871866322580615700468180951698529290708584000934047343679171050790825504501102675332579233315801464131155846702206)*x + (4588389669659202269082052036644323366033538222473579784989793524900299010540318306124062920427364099856902171978123536895594478575*i+3857042675623874198951746414834653514558251416169706505891402529248483208578565434628807330044514064358082277980092401183564871367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5310624969348572681650848998857177379481123556047128869239166968970734659647598704537398304679338519702119806509514618538313074367*i+24084659254021655410643707511776876345208405670636952387293714448910115702512384686855163308627898129479903548433612731360174636775)*x + (21671840883146078548926446776139328020279817979439465298448549390608406949287587625315258614565681301753516578111919272749917473382*i+13702070512946480372234814175335100666346710190598585157261632550877811047732425648530796234863682766833562856624482937955510313340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5310624969348572681650848998857177379481123556047128869239166968970734659647598704537398304679338519702119806509514618538313074367*i+24084659254021655410643707511776876345208405670636952387293714448910115702512384686855163308627898129479903548433612731360174636775)*x + (21671840883146078548926446776139328020279817979439465298448549390608406949287587625315258614565681301753516578111919272749917473382*i+13702070512946480372234814175335100666346710190598585157261632550877811047732425648530796234863682766833562856624482937955510313340) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16233012487653497113452567005560556812996506003159902781006077931076865534880476664724737337361771799130248087331631285691868455917*i+13709386478076187233231655212042487927392583457848225869754009868364380343612982400535125598392658343016661783114636143783224335452)*x + (1747720325195682830723529438569435663930680077622892992266777115050455405367295590508906145142104151541975695720105115383254000605*i+12054124715586537765197367120351241240596728602309026234352505830350153256560936801000458248111402496909575108593380928985906674079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16233012487653497113452567005560556812996506003159902781006077931076865534880476664724737337361771799130248087331631285691868455917*i+13709386478076187233231655212042487927392583457848225869754009868364380343612982400535125598392658343016661783114636143783224335452)*x + (1747720325195682830723529438569435663930680077622892992266777115050455405367295590508906145142104151541975695720105115383254000605*i+12054124715586537765197367120351241240596728602309026234352505830350153256560936801000458248111402496909575108593380928985906674079) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9912179747972756739919189444591292465313260014357212560270704741434728898854090746269754959248689653400882949616481343588261886157*i+4603522220083064099416079140245315104932298910792919151133694034544063297802645834816840796925676549644441264858282116499169146061)*x + (14731252245953430163119323108403752988565483903685020302183017594996238153667311923842817407804812649753519226790071742193131282096*i+14346879604177231055144829312636061826970325250696601072925068184694976952995947926349963321913791197817345833580141784008875855979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9912179747972756739919189444591292465313260014357212560270704741434728898854090746269754959248689653400882949616481343588261886157*i+4603522220083064099416079140245315104932298910792919151133694034544063297802645834816840796925676549644441264858282116499169146061)*x + (14731252245953430163119323108403752988565483903685020302183017594996238153667311923842817407804812649753519226790071742193131282096*i+14346879604177231055144829312636061826970325250696601072925068184694976952995947926349963321913791197817345833580141784008875855979) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18171745039502201937802553880027630612179684019503379981395283203596623203368011512153500926987684172093366583594461443016590114935*i+20525616717802005823432169348764828548488818163216309649991974682047887698195803222265943572959283751712987406049335044082018442515)*x + (16104140376688442375063391155128762470016297298904229194343386546487335257461777456839432894296566612198413698099459953460726554719*i+12774035022568492746969904081498823462290706010280582022821499661766290009740999608514235817126792489031805992384911651511798104621) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18171745039502201937802553880027630612179684019503379981395283203596623203368011512153500926987684172093366583594461443016590114935*i+20525616717802005823432169348764828548488818163216309649991974682047887698195803222265943572959283751712987406049335044082018442515)*x + (16104140376688442375063391155128762470016297298904229194343386546487335257461777456839432894296566612198413698099459953460726554719*i+12774035022568492746969904081498823462290706010280582022821499661766290009740999608514235817126792489031805992384911651511798104621) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20831722523918635813824102863314993106982169213230756617148977298556668662760397598352946253555735830735259584536732919245878680678*i+20893650461472292682582847525727782575336533599488347472359976994355946676716002189030208351976881404501217616167309210793996446804)*x + (4811701776166183274498639179908608533771110099968399435553415185476215969037539208531252175034663559005942866251660134992216488619*i+12772539834525754652568360202387383878494722401336264887438456031554883597745067340041740665981732728614811946334640652953356988493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20831722523918635813824102863314993106982169213230756617148977298556668662760397598352946253555735830735259584536732919245878680678*i+20893650461472292682582847525727782575336533599488347472359976994355946676716002189030208351976881404501217616167309210793996446804)*x + (4811701776166183274498639179908608533771110099968399435553415185476215969037539208531252175034663559005942866251660134992216488619*i+12772539834525754652568360202387383878494722401336264887438456031554883597745067340041740665981732728614811946334640652953356988493) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1263811867090722106012306628822032966215016779821199199356065847926007224681869300193855519496960620525977491562824837571980371082*i+5347867651415457919756578608247709286327460195547767313928868698119355937923791729484716140908447726002559045930761881869802860499)*x + (875573719262244294960176377840021230969066334770295603504980274962370020095668614122566280990552055911340806825028716456229401164*i+3460516215872739181143841956090725460086489378683379283948971947988171612663209134852904464590564066161271120697830984100940483550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1263811867090722106012306628822032966215016779821199199356065847926007224681869300193855519496960620525977491562824837571980371082*i+5347867651415457919756578608247709286327460195547767313928868698119355937923791729484716140908447726002559045930761881869802860499)*x + (875573719262244294960176377840021230969066334770295603504980274962370020095668614122566280990552055911340806825028716456229401164*i+3460516215872739181143841956090725460086489378683379283948971947988171612663209134852904464590564066161271120697830984100940483550) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3955245132026610406915136776243702822478052071276952310015147153455226403055839578127064520176381497900658747993826711623017756785*i+9008771659284641661737893332487273870362284190020797516122892643596810545118031176537615043775288035188712335901795178186272417792)*x + (20988305659494504816684101013240259444214905488836165296822049060651867913568472805519287850010454803108952599845945179209299531662*i+13059737091029302833399163350538016822196907220360311385385350415839528995618915621612386326737290719569632716106364435441577075735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3955245132026610406915136776243702822478052071276952310015147153455226403055839578127064520176381497900658747993826711623017756785*i+9008771659284641661737893332487273870362284190020797516122892643596810545118031176537615043775288035188712335901795178186272417792)*x + (20988305659494504816684101013240259444214905488836165296822049060651867913568472805519287850010454803108952599845945179209299531662*i+13059737091029302833399163350538016822196907220360311385385350415839528995618915621612386326737290719569632716106364435441577075735) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6720669876325002371874513876545803446881975013778288180248613087302277378655102568284616953049307055916136876556715105284203704705*i+18675086555860822530336744131684134510999541869858629567958097848228851533674131095383419554067947009680933109316139767797891424809)*x + (14921448283104945072394622493251344924574468679351398599784283423923445586510650681354217443069910108348676040234661384122712313595*i+10958242623466831698806814609445693490874595668310314372830624036181994191755624998051531407195618585006589045367467795189814815692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6720669876325002371874513876545803446881975013778288180248613087302277378655102568284616953049307055916136876556715105284203704705*i+18675086555860822530336744131684134510999541869858629567958097848228851533674131095383419554067947009680933109316139767797891424809)*x + (14921448283104945072394622493251344924574468679351398599784283423923445586510650681354217443069910108348676040234661384122712313595*i+10958242623466831698806814609445693490874595668310314372830624036181994191755624998051531407195618585006589045367467795189814815692) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12533913754460179444398602741010366808135846092693217395699132776590012141396732028958300396378330265344195320851635664855913193365*i+8884998773626548862216341132643298941999790328181164519497292609931779233376944025407406778200555064480756247704725679625602410931)*x + (20206366212035974788181068699943168405913376309381777987087123059091509962186636073074710243292401123538454189839978685803545857927*i+499818829358432942954363781057563258094401000138836502899053174413738940078163669965484349481721800173549617885202286771755321744) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12533913754460179444398602741010366808135846092693217395699132776590012141396732028958300396378330265344195320851635664855913193365*i+8884998773626548862216341132643298941999790328181164519497292609931779233376944025407406778200555064480756247704725679625602410931)*x + (20206366212035974788181068699943168405913376309381777987087123059091509962186636073074710243292401123538454189839978685803545857927*i+499818829358432942954363781057563258094401000138836502899053174413738940078163669965484349481721800173549617885202286771755321744) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (271749216582867871681248802914381164233829946396952127884257560137345409452693723816142922013197200015352893958265631558417331092*i+19581331765236491894875074173701978327475400971168751255015259826549382575615304975977373997709259654480802845870081090577744773066)*x + (6204560454402632771033218655713519298898004084593894061738943738056824359935333887998912439913571924328751945644398216307591785886*i+22173216659926901758200064314409641412217583425925863336077435530568978780093716208226979456438217263637687586764373120144622493367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (271749216582867871681248802914381164233829946396952127884257560137345409452693723816142922013197200015352893958265631558417331092*i+19581331765236491894875074173701978327475400971168751255015259826549382575615304975977373997709259654480802845870081090577744773066)*x + (6204560454402632771033218655713519298898004084593894061738943738056824359935333887998912439913571924328751945644398216307591785886*i+22173216659926901758200064314409641412217583425925863336077435530568978780093716208226979456438217263637687586764373120144622493367) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1409132955775089343308276404812346330539094703202493243863707483390472278692456730959442129619013228643626796692311672070062065386*i+14901063813061795840523409870851144422321364056861392884580380610832916149467199579573183614594526295017176396071421831891920602226)*x + (1815205092437201912972791424008203529855935099993893169088369915258781198619779732427841901119230675291808694118363651588744013360*i+530516635008981194329910375824074283429731140770928606968889239778285475532551504110958893291605430589070669976260307526195304114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1409132955775089343308276404812346330539094703202493243863707483390472278692456730959442129619013228643626796692311672070062065386*i+14901063813061795840523409870851144422321364056861392884580380610832916149467199579573183614594526295017176396071421831891920602226)*x + (1815205092437201912972791424008203529855935099993893169088369915258781198619779732427841901119230675291808694118363651588744013360*i+530516635008981194329910375824074283429731140770928606968889239778285475532551504110958893291605430589070669976260307526195304114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2932540970040416863079413873453196464708152452493435629688010540480243014878483595756524114580881287704183735207182021136114745169*i+13775221323157770688750849473386357189806882402090646296489168046495603654884107539189135757471005505904797966035936544061212135156)*x + (12690223001592895822831640722690558994198302316142071367147388845242210170377863650985285942033025737318347583898103844219388433191*i+2864647601310615739510244990988227411574228433265685320795778332307893413190118390271182036783821151728377787665614871656000494676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2932540970040416863079413873453196464708152452493435629688010540480243014878483595756524114580881287704183735207182021136114745169*i+13775221323157770688750849473386357189806882402090646296489168046495603654884107539189135757471005505904797966035936544061212135156)*x + (12690223001592895822831640722690558994198302316142071367147388845242210170377863650985285942033025737318347583898103844219388433191*i+2864647601310615739510244990988227411574228433265685320795778332307893413190118390271182036783821151728377787665614871656000494676) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14820719066857829252471417554846764443134847580554612747985799744796969496336416280262996859119261126122756468709357072815677851616*i+23584014134592834783878292828793641374793827095333079113264704787322128365363625001060637338777364947114237891492830593741351186508)*x + (2656966288915236278788577738893255492470848914367192264951179203096254325357755261449959391794816772861300381992879094033780235117*i+7952038621678946583382423585745683069867167654849504424782866572410584455821049884555221081919465782719201560989226587721135256305) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14820719066857829252471417554846764443134847580554612747985799744796969496336416280262996859119261126122756468709357072815677851616*i+23584014134592834783878292828793641374793827095333079113264704787322128365363625001060637338777364947114237891492830593741351186508)*x + (2656966288915236278788577738893255492470848914367192264951179203096254325357755261449959391794816772861300381992879094033780235117*i+7952038621678946583382423585745683069867167654849504424782866572410584455821049884555221081919465782719201560989226587721135256305) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3137128290366837887222361443061832366682012437320569799238904518580351633628224733940354665733095276786383155228251889006480018609*i+16991239782238734762831536459866508361525542630782842511600604429635457585738892301665735286977144328803981342658578617620469149958)*x + (19216332774256139611484344754978334795740487022054049790784208090894549616916144461954830037672789014305065063115665701452214522619*i+17302145459927154112339678463497413824155460766507980452510667714660321047882795534368169347808657574727312204315928987658554879710) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3137128290366837887222361443061832366682012437320569799238904518580351633628224733940354665733095276786383155228251889006480018609*i+16991239782238734762831536459866508361525542630782842511600604429635457585738892301665735286977144328803981342658578617620469149958)*x + (19216332774256139611484344754978334795740487022054049790784208090894549616916144461954830037672789014305065063115665701452214522619*i+17302145459927154112339678463497413824155460766507980452510667714660321047882795534368169347808657574727312204315928987658554879710) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24128358135207254098549045317295152373992067296005199558983000413524925083496448678497899001290454734377298086885110548250760599144*i+10535986027074959109918076891700422522913098712241079786557108857732887717665745333561562980254550758676255654843829351075727314776)*x + (15980804347163192052294421003445644595854421708167804208002746121281531028180340419850770544012408409170402238545585995097643768204*i+19318641046972774954019759063611134696651753226278800221228972893872837264842586494514933235318576144861355628861963655737730508459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24128358135207254098549045317295152373992067296005199558983000413524925083496448678497899001290454734377298086885110548250760599144*i+10535986027074959109918076891700422522913098712241079786557108857732887717665745333561562980254550758676255654843829351075727314776)*x + (15980804347163192052294421003445644595854421708167804208002746121281531028180340419850770544012408409170402238545585995097643768204*i+19318641046972774954019759063611134696651753226278800221228972893872837264842586494514933235318576144861355628861963655737730508459) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22663468489062392865081597660071639691310940362478192333101603765967702446953965842813996639940393476004371251411048005160722616929*i+13430559603389887837439671083418892973604225317846878998456340630407794260728747080782599418229430963057863216260571290997173491720)*x + (10684116157021446303984961567513591855362721249028655514029953042573395141654343231564248986666282156855232564368682374630166890236*i+22537977733246607905526080947135644817428854567929074026957064481138809010105543692025630296231625840476843616312874248977425785752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22663468489062392865081597660071639691310940362478192333101603765967702446953965842813996639940393476004371251411048005160722616929*i+13430559603389887837439671083418892973604225317846878998456340630407794260728747080782599418229430963057863216260571290997173491720)*x + (10684116157021446303984961567513591855362721249028655514029953042573395141654343231564248986666282156855232564368682374630166890236*i+22537977733246607905526080947135644817428854567929074026957064481138809010105543692025630296231625840476843616312874248977425785752) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22016121486173859364198653604028053176541786509473105656535397504625159351289506889019175458251554615769997934210267493366848424053*i+9721584654785675356000503690707163074068152447768184888633709605535171186402880710318425574019676120667802346774814902408741510392)*x + (14308779808480307727777159352447144964227622992454222090911984383063515344334922390194223708330978845121419303288388338569058682183*i+12918576787447207811969771004973261959564900192527677022190705784775529792240033084378342780006898117953795300404149566831904470978) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22016121486173859364198653604028053176541786509473105656535397504625159351289506889019175458251554615769997934210267493366848424053*i+9721584654785675356000503690707163074068152447768184888633709605535171186402880710318425574019676120667802346774814902408741510392)*x + (14308779808480307727777159352447144964227622992454222090911984383063515344334922390194223708330978845121419303288388338569058682183*i+12918576787447207811969771004973261959564900192527677022190705784775529792240033084378342780006898117953795300404149566831904470978) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9131757845466115558457362644525169250120500960675036549807370957036154762471747142101491338225136874921219027380092718903317889650*i+11252766390399812234880756615384431417573149231428707506073051357727620930591424577639596856779787513751280821823247773734573451731)*x + (15668662092426839972236988606585345379102383621345375336362867217248721992938396605422437898022993254285085235015547899255517918568*i+18316701600749084463968793272023153861453873250230387142307935449462805190029877098128124590950151647143621226878824651812168632965) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9131757845466115558457362644525169250120500960675036549807370957036154762471747142101491338225136874921219027380092718903317889650*i+11252766390399812234880756615384431417573149231428707506073051357727620930591424577639596856779787513751280821823247773734573451731)*x + (15668662092426839972236988606585345379102383621345375336362867217248721992938396605422437898022993254285085235015547899255517918568*i+18316701600749084463968793272023153861453873250230387142307935449462805190029877098128124590950151647143621226878824651812168632965) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14614546123790248848982857640620000935786894339726948457690189891535631482424140184006066320283681012631009095636123760766990476272*i+4796019490010774644589910726176522980641842379962838666921614575340631009748963776367783827289087717309005650360031360152808163688)*x + (6057497450036258735219784666047577396872792153168715493467386931924706591049921811327460890186310317039657434491075130144441858044*i+12726896584025247591436010650369966241047970592786434486787437754755760512206876536171687400825422658603499011782493047500761972146) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14614546123790248848982857640620000935786894339726948457690189891535631482424140184006066320283681012631009095636123760766990476272*i+4796019490010774644589910726176522980641842379962838666921614575340631009748963776367783827289087717309005650360031360152808163688)*x + (6057497450036258735219784666047577396872792153168715493467386931924706591049921811327460890186310317039657434491075130144441858044*i+12726896584025247591436010650369966241047970592786434486787437754755760512206876536171687400825422658603499011782493047500761972146) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23251865072434879547432121471971199106592672174044979199815055145165957694486129902824041532339112575616560752607763307759745662246*i+14469249048844244121295693008578330274512478161761859732872150833918125093465400155824796530280326993585214481729754972511842655650)*x + (23723489850958121104229153727195380124017488974073227737162328646087428146299815250512646749845136799733632061965030711481128906061*i+3312435876398367893865800806616720898074537510581154298490294375927465448380964347329577618594304501968992899941256777088513631373) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23251865072434879547432121471971199106592672174044979199815055145165957694486129902824041532339112575616560752607763307759745662246*i+14469249048844244121295693008578330274512478161761859732872150833918125093465400155824796530280326993585214481729754972511842655650)*x + (23723489850958121104229153727195380124017488974073227737162328646087428146299815250512646749845136799733632061965030711481128906061*i+3312435876398367893865800806616720898074537510581154298490294375927465448380964347329577618594304501968992899941256777088513631373) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21475807574229033690217374038905722231229974963845084168818746255765579049775353854630817762966268323891735126608845489298825036256*i+5658892667290986146465891210896775074621415752704762783461407652163632142658530033862887098366214748959043690177268951150921839704)*x + (12778098145985911663853782563778655056211814104812975608982999489308935256991405739450945962925804462074475045547619519609852138473*i+6894443277828600948311633637714912575118071268834191837935113346219840540877744900405502078969664040114550408726756107372377445059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21475807574229033690217374038905722231229974963845084168818746255765579049775353854630817762966268323891735126608845489298825036256*i+5658892667290986146465891210896775074621415752704762783461407652163632142658530033862887098366214748959043690177268951150921839704)*x + (12778098145985911663853782563778655056211814104812975608982999489308935256991405739450945962925804462074475045547619519609852138473*i+6894443277828600948311633637714912575118071268834191837935113346219840540877744900405502078969664040114550408726756107372377445059) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15076685346332059885678929344426372649254381399819663680426458394361726572904846386925264900536978233117537166377782844564291081174*i+9918751521505467101182090531247766925874242317793264384461876087756388647400803264833314294848943190548851170329323546637267689653)*x + (16582654759163689679843288888785087372215928131779251281931047266398745605412687204470929421020112760293589341471322559019343799237*i+18145799753803198104419973256882810653166749316083123964611003815078105906472780237556754496799757932075327222455589747542182654098) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15076685346332059885678929344426372649254381399819663680426458394361726572904846386925264900536978233117537166377782844564291081174*i+9918751521505467101182090531247766925874242317793264384461876087756388647400803264833314294848943190548851170329323546637267689653)*x + (16582654759163689679843288888785087372215928131779251281931047266398745605412687204470929421020112760293589341471322559019343799237*i+18145799753803198104419973256882810653166749316083123964611003815078105906472780237556754496799757932075327222455589747542182654098) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7253719361676783560227445273541024056994385097663863040419650716809216730656525445784402196445512625153460866517626399201240544963*i+19075747539874390264395956478730483329380983993547369643128205582974655412201564635874897815902366237861732468188382483886588640138)*x + (2187447780563913392372409650162632572963615865171551327588772992476485132346475469610898028440099443996889195912898574854406534266*i+1744068781198737515382547385235616024653010542018836702290704752969571479748973456259495668790045909206439963555397798410832324731) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7253719361676783560227445273541024056994385097663863040419650716809216730656525445784402196445512625153460866517626399201240544963*i+19075747539874390264395956478730483329380983993547369643128205582974655412201564635874897815902366237861732468188382483886588640138)*x + (2187447780563913392372409650162632572963615865171551327588772992476485132346475469610898028440099443996889195912898574854406534266*i+1744068781198737515382547385235616024653010542018836702290704752969571479748973456259495668790045909206439963555397798410832324731) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18947590953934628724105493227585415889843825095771642449702909446128687679392522046299949089755387088522503686965664936320671506214*i+9637085596095743838601274001922652981133551768469609099688638733780449721262287567724950584315582416269936685204224010655549754963)*x + (13157752683106793060056195908600530698294697130781707832965417520975283842015356958182986993288472538869512282067182779260001335170*i+12457970859140106839163731786092562414830860531609036648552190707639734708817129119367306306086327977564982061880456374056639126857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18947590953934628724105493227585415889843825095771642449702909446128687679392522046299949089755387088522503686965664936320671506214*i+9637085596095743838601274001922652981133551768469609099688638733780449721262287567724950584315582416269936685204224010655549754963)*x + (13157752683106793060056195908600530698294697130781707832965417520975283842015356958182986993288472538869512282067182779260001335170*i+12457970859140106839163731786092562414830860531609036648552190707639734708817129119367306306086327977564982061880456374056639126857) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8311884127295217440226659160020730097278543534279282245332383065136755463842828758254312605016257522932262532263174910932763834714*i+1077031607200570473740789818307924329793896568880082138987656053413145769520358673304348993075845614311173481629344160641486306124)*x + (16737580899147042898831159259058481265463226604126527298042284605754491566168672237346199839051244582549316275164225428082780967466*i+18998298739289248555694005201607997954643507646310943901616341320637162593679490510877883879150188596778672011750451745385759041104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8311884127295217440226659160020730097278543534279282245332383065136755463842828758254312605016257522932262532263174910932763834714*i+1077031607200570473740789818307924329793896568880082138987656053413145769520358673304348993075845614311173481629344160641486306124)*x + (16737580899147042898831159259058481265463226604126527298042284605754491566168672237346199839051244582549316275164225428082780967466*i+18998298739289248555694005201607997954643507646310943901616341320637162593679490510877883879150188596778672011750451745385759041104) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5578137483196368023948690535936924042767981213783814313896435385987239728308307466200413679851676132109148866370561021117386573292*i+4503452139269095704891110635240789599345927997954745848137843049388197558499606546206928473255916524935589084711965348537725022983)*x + (12446665750170453204023320922323146297346071358917249296702460914184883208733776519174099050680106601725262315062799687409265545404*i+9090838979007870225992900178277061506653355030359328767993868170766574025642495607041460503155449474989794987953829847025293085198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5578137483196368023948690535936924042767981213783814313896435385987239728308307466200413679851676132109148866370561021117386573292*i+4503452139269095704891110635240789599345927997954745848137843049388197558499606546206928473255916524935589084711965348537725022983)*x + (12446665750170453204023320922323146297346071358917249296702460914184883208733776519174099050680106601725262315062799687409265545404*i+9090838979007870225992900178277061506653355030359328767993868170766574025642495607041460503155449474989794987953829847025293085198) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19947126947042035991026334923787018786497364488196182776673233013517076346935160913958390524108981813086963719850023569208107642319*i+19284358082641910287973310324709103408757148651454025374166580571499351786499829143781556910200154602103864814068771273376687838714)*x + (7663257833749041748876624355706381283909527794322100352490788701122037629155599551358719014501359116960149069656782995226471018012*i+12731018149537541357604904717711388023295226158795244750212150456549844089186099736196902526502837636261683562730095901339079341760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19947126947042035991026334923787018786497364488196182776673233013517076346935160913958390524108981813086963719850023569208107642319*i+19284358082641910287973310324709103408757148651454025374166580571499351786499829143781556910200154602103864814068771273376687838714)*x + (7663257833749041748876624355706381283909527794322100352490788701122037629155599551358719014501359116960149069656782995226471018012*i+12731018149537541357604904717711388023295226158795244750212150456549844089186099736196902526502837636261683562730095901339079341760) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13266317716275950831806682084709740706296872899674689032103723403850085577211092830368654972019397434005350584691609965188026669071*i+20350102011923531282493484492579070575328582882909647425911299400052353293571904015625143372964341998294038376593534245852206482907)*x + (24287979518730694346436076567406476652544014099536716120139832928849782872396304854245850602252974439239772240820155374498427562416*i+16190959378733668610220351992977438448042840857316101079601369154822625744269974708038876471127757194448446859460554237127301348598) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13266317716275950831806682084709740706296872899674689032103723403850085577211092830368654972019397434005350584691609965188026669071*i+20350102011923531282493484492579070575328582882909647425911299400052353293571904015625143372964341998294038376593534245852206482907)*x + (24287979518730694346436076567406476652544014099536716120139832928849782872396304854245850602252974439239772240820155374498427562416*i+16190959378733668610220351992977438448042840857316101079601369154822625744269974708038876471127757194448446859460554237127301348598) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2127097932398572281365450332442647157226106250881047055190711035632159610680980196322255855855390911369832017140357174816859171456*i+22937111219255575367536359608127953089474792473334719311347187330919980420820296985667691839218916823462086415960452286105868031395)*x + (13708959455652832263042991891431010782142417579058577547803884719900210861841551902707151896426617447791059640370835681830991564235*i+11884034278324275471138349908421245428631347548500430639165631726390295592166629935359675460429376530914875876425939672370407139118) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2127097932398572281365450332442647157226106250881047055190711035632159610680980196322255855855390911369832017140357174816859171456*i+22937111219255575367536359608127953089474792473334719311347187330919980420820296985667691839218916823462086415960452286105868031395)*x + (13708959455652832263042991891431010782142417579058577547803884719900210861841551902707151896426617447791059640370835681830991564235*i+11884034278324275471138349908421245428631347548500430639165631726390295592166629935359675460429376530914875876425939672370407139118) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7047942957005287988698696010514278787953537616786288950945335463510067233615205331025038009030359727595305783913485383642981509368*i+22917884180201446060926778907716251764574534826774044499055281808063506716164995693254969834951929718588061953123737593840539039748)*x + (3666625076792694330407724399973963015623491462552329150868844065776237983230282762938891853805745475628071558114411568677107453412*i+11266907680690785331356171195661304476302948695539650001966276410347979827799258602376170179721993008662832609813547343226069338283) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7047942957005287988698696010514278787953537616786288950945335463510067233615205331025038009030359727595305783913485383642981509368*i+22917884180201446060926778907716251764574534826774044499055281808063506716164995693254969834951929718588061953123737593840539039748)*x + (3666625076792694330407724399973963015623491462552329150868844065776237983230282762938891853805745475628071558114411568677107453412*i+11266907680690785331356171195661304476302948695539650001966276410347979827799258602376170179721993008662832609813547343226069338283) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23600425735068328908822474679131903672013443693877821685486669972909271941580099747499781343673247454554729343736567113061350590995*i+21826596210211724678208153578575100271019007062445376722852489270366292220171038295076194236938100576703969211815688037167216187710)*x + (5400768721050484434738473693110221599334801600430231372252989289220646180204503418464455540506797256198390460850959142696933186857*i+6962599758331411186445590634451069685148364945684874010583120919315966186403208931373261779731467298725049951653008693146218342219) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23600425735068328908822474679131903672013443693877821685486669972909271941580099747499781343673247454554729343736567113061350590995*i+21826596210211724678208153578575100271019007062445376722852489270366292220171038295076194236938100576703969211815688037167216187710)*x + (5400768721050484434738473693110221599334801600430231372252989289220646180204503418464455540506797256198390460850959142696933186857*i+6962599758331411186445590634451069685148364945684874010583120919315966186403208931373261779731467298725049951653008693146218342219) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8689483169995289400252281144811584225112698832585064033397281413837507811092658572695697912449938867440367518399427212817500379777*i+6425796486409821346911676709184498035718675222663141566158690156653364385580525681053262122227093867925375471745619727847471159271)*x + (18181367322248710632565248123535618810153656188322076233558247039183908758176106015298391261339603870794449057711190814019511010183*i+17000184796528839505694004946396928179521263986533697271772478046311081226212504298844707258253768892158478313377089580165175225137) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8689483169995289400252281144811584225112698832585064033397281413837507811092658572695697912449938867440367518399427212817500379777*i+6425796486409821346911676709184498035718675222663141566158690156653364385580525681053262122227093867925375471745619727847471159271)*x + (18181367322248710632565248123535618810153656188322076233558247039183908758176106015298391261339603870794449057711190814019511010183*i+17000184796528839505694004946396928179521263986533697271772478046311081226212504298844707258253768892158478313377089580165175225137) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12167721796022167926054275976533351297901215911505537535591451197890275403721035922298248919330566400998085827685209934409594424965*i+16741762417226657636837587742269012935954477954338921315547185180912290843400896907338021767781217439287643178386541188330006399415)*x + (2461303622092347209352966682738075901054209291765141613875877084349607312204112751905507990514476695613637971712259448515710893512*i+11946942178266229976867442129361671880336109343688246736256197686636465606455721156448762669323673550440535132607481663409616408463) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12167721796022167926054275976533351297901215911505537535591451197890275403721035922298248919330566400998085827685209934409594424965*i+16741762417226657636837587742269012935954477954338921315547185180912290843400896907338021767781217439287643178386541188330006399415)*x + (2461303622092347209352966682738075901054209291765141613875877084349607312204112751905507990514476695613637971712259448515710893512*i+11946942178266229976867442129361671880336109343688246736256197686636465606455721156448762669323673550440535132607481663409616408463) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22443457162282077568605396548113972957822017712002998156463073737502304276381184648946763353751469576618130095308924692922073130438*i+6962929618128882730174278330497597470119698786552968326439928217744813115391446732544373484594292529209184655480373488609998211036)*x + (3624713570071669994983153369380231357009365596518020346267971026955546416295259158329136797667818291151650292515194972382669748502*i+22891429880705455923087665015236308445511053695971834432393419049372446206120398658891805843089286619892266348985179951179224407003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22443457162282077568605396548113972957822017712002998156463073737502304276381184648946763353751469576618130095308924692922073130438*i+6962929618128882730174278330497597470119698786552968326439928217744813115391446732544373484594292529209184655480373488609998211036)*x + (3624713570071669994983153369380231357009365596518020346267971026955546416295259158329136797667818291151650292515194972382669748502*i+22891429880705455923087665015236308445511053695971834432393419049372446206120398658891805843089286619892266348985179951179224407003) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21885208874922987115752539144153827924876617983200026277600685021677794394188226882073280570253014219477583795543321513781314682247*i+21662106139229482540417623983029492328543380508889432617668429138868214469363971252894162764640505340846385416618808708383874498668)*x + (10908655057714714260447709871887050423197165892078540476179470262718245757126349404888927662706155876666467387289658015661062103301*i+5064623621660819615231807847814100634858112801669667981681174503161641155670456856158998430999178075038034726791297095126440631274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21885208874922987115752539144153827924876617983200026277600685021677794394188226882073280570253014219477583795543321513781314682247*i+21662106139229482540417623983029492328543380508889432617668429138868214469363971252894162764640505340846385416618808708383874498668)*x + (10908655057714714260447709871887050423197165892078540476179470262718245757126349404888927662706155876666467387289658015661062103301*i+5064623621660819615231807847814100634858112801669667981681174503161641155670456856158998430999178075038034726791297095126440631274) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14325108026035123459752470004087760591601738407471348100834337556327578314748186026310727093806295493782745190166319543130682215488*i+9412605694108518972057985727052290990428658364869658637308691793872905095833697423763361752914905301760125904070824254326019653105)*x + (3595701128848395848144226436633264912110399579152173480287586480826418549520895393082189710258875475488054652727112960021417231580*i+6987928491141050272866928017713524389394415256525494078565792836561552582063992651414711856966783932266939309119555401825438434889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14325108026035123459752470004087760591601738407471348100834337556327578314748186026310727093806295493782745190166319543130682215488*i+9412605694108518972057985727052290990428658364869658637308691793872905095833697423763361752914905301760125904070824254326019653105)*x + (3595701128848395848144226436633264912110399579152173480287586480826418549520895393082189710258875475488054652727112960021417231580*i+6987928491141050272866928017713524389394415256525494078565792836561552582063992651414711856966783932266939309119555401825438434889) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7641236938290651016213673794507296588261148722600803123862101629586901240232356278754596288102911297124131539856354729004563763260*i+8506231281662007957074029870423365545148994729086507549470662213389045234421813986412118882732678979388960127119002620101958973247)*x + (18973695938703874309758367022617153940577670957395078307868352804019892681033371135096590576584150363990635352605341755242648947746*i+13773995721644529016297942791779951021207222874967923428470585906753733642347776652885244757923660682549647512462721165903959620842) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7641236938290651016213673794507296588261148722600803123862101629586901240232356278754596288102911297124131539856354729004563763260*i+8506231281662007957074029870423365545148994729086507549470662213389045234421813986412118882732678979388960127119002620101958973247)*x + (18973695938703874309758367022617153940577670957395078307868352804019892681033371135096590576584150363990635352605341755242648947746*i+13773995721644529016297942791779951021207222874967923428470585906753733642347776652885244757923660682549647512462721165903959620842) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21777803929784011958550547833678317027432352255641854641913324904846122650574416496856611056492498044711150937726310419400581923116*i+2269658893497566082656585451853174757288941837642488951147532987527035112523277349649253804601888802933251209039260466809669637057)*x + (14609819546664747943321468476839989437179936388495284262356726477097692415779501286997372210688467968010943060235267012921109626878*i+3658920356712454833921740443828048078993562881985163686764456107215136614024087924845802125884709376309745219482697873586744041511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21777803929784011958550547833678317027432352255641854641913324904846122650574416496856611056492498044711150937726310419400581923116*i+2269658893497566082656585451853174757288941837642488951147532987527035112523277349649253804601888802933251209039260466809669637057)*x + (14609819546664747943321468476839989437179936388495284262356726477097692415779501286997372210688467968010943060235267012921109626878*i+3658920356712454833921740443828048078993562881985163686764456107215136614024087924845802125884709376309745219482697873586744041511) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13073965639912511844504578469413179390371713792764169661167090311767896988386562497768246657311593749139954321696866690698621114113*i+257218537515780015188568456828754023448449729179209626184718663013812320996919166029200654876653931486542578534632006399101041437)*x + (5768299353193676114032368702087851389310481631709279202206174912229807813118498725823620066082789636908348483187773243676274651561*i+1425168000000947977824239663688677360197967147555150088624208355332793585619438136093495376377848125340259938480273153828576174905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13073965639912511844504578469413179390371713792764169661167090311767896988386562497768246657311593749139954321696866690698621114113*i+257218537515780015188568456828754023448449729179209626184718663013812320996919166029200654876653931486542578534632006399101041437)*x + (5768299353193676114032368702087851389310481631709279202206174912229807813118498725823620066082789636908348483187773243676274651561*i+1425168000000947977824239663688677360197967147555150088624208355332793585619438136093495376377848125340259938480273153828576174905) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7307152416027454866953277828685993882082645674889466368788906390819304165922674504991025356124928263863622402299759717188634055313*i+9042433558687369006687245568135772332711572291525865183035123948693030517321858486463440334514462569110182032672983910071097021797)*x + (5412301257081293379916611684955124867548142457505037337664681593954750898803791131594297128893908996841884004648735914350108364177*i+5464631653228305542239761316574754097105741471320252317018181488025272178817389625584693203608438735589354274199710494690365930442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7307152416027454866953277828685993882082645674889466368788906390819304165922674504991025356124928263863622402299759717188634055313*i+9042433558687369006687245568135772332711572291525865183035123948693030517321858486463440334514462569110182032672983910071097021797)*x + (5412301257081293379916611684955124867548142457505037337664681593954750898803791131594297128893908996841884004648735914350108364177*i+5464631653228305542239761316574754097105741471320252317018181488025272178817389625584693203608438735589354274199710494690365930442) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17321308851759465972559421284841005044890499196762965091047936095297073233860676312573231591527923887454913649255828512650637645941*i+503281442485991645401035620724447967142664793612740117693889244700449056162792506824183751192800955068448144817779078780844894622)*x + (14955336948256728140525680750511321283835720352160061431776178673167282962149575118125024125623312179258109185391684351172833508398*i+4138554100766024776286652820090145702773023577288361650272137956147162890047424179161751822832424302814584774743913230514455006707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17321308851759465972559421284841005044890499196762965091047936095297073233860676312573231591527923887454913649255828512650637645941*i+503281442485991645401035620724447967142664793612740117693889244700449056162792506824183751192800955068448144817779078780844894622)*x + (14955336948256728140525680750511321283835720352160061431776178673167282962149575118125024125623312179258109185391684351172833508398*i+4138554100766024776286652820090145702773023577288361650272137956147162890047424179161751822832424302814584774743913230514455006707) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23875121309565637572377558843851776987127236932935371037075808896184167083029871357565963035542443209974782337453805482404300420373*i+5557847866473422719444859961026468496736953576306929950488633873402719531541900536623329558491495289639563255175794192088994943426)*x + (4617761482046663607095243174693318236175410432674871492877755526933346269128680023551058992559877388138053872812430234260917493026*i+5901559117348965623643665570738375197967631230395416182906415051708778165765279754585352328631039228460456201464582081229069500891) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23875121309565637572377558843851776987127236932935371037075808896184167083029871357565963035542443209974782337453805482404300420373*i+5557847866473422719444859961026468496736953576306929950488633873402719531541900536623329558491495289639563255175794192088994943426)*x + (4617761482046663607095243174693318236175410432674871492877755526933346269128680023551058992559877388138053872812430234260917493026*i+5901559117348965623643665570738375197967631230395416182906415051708778165765279754585352328631039228460456201464582081229069500891) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14739834762202688796686073825005018524942234788346136502225892785532407804425607219869274920744905062779890145434224734384259673939*i+10964611832964327633666032635057348991153013873479323119974611164907871913745460957592264660030854245210416404312594682896137790754)*x + (20369240889174999305819868366278636547813459508647123745362778172659398478844540478124125890928820609686724937455006102830931746091*i+6381240374193021463091195792320960452895738655703837035478330290832238686286995258574196544479443426055325952580621823505191739624) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14739834762202688796686073825005018524942234788346136502225892785532407804425607219869274920744905062779890145434224734384259673939*i+10964611832964327633666032635057348991153013873479323119974611164907871913745460957592264660030854245210416404312594682896137790754)*x + (20369240889174999305819868366278636547813459508647123745362778172659398478844540478124125890928820609686724937455006102830931746091*i+6381240374193021463091195792320960452895738655703837035478330290832238686286995258574196544479443426055325952580621823505191739624) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7967927260976157153456100210629308406803802758711684824353806942620435850728085395070370677897912260630464590209853251292463672551*i+19663287201339687780580383545623037637445519365850683567526163942406987716577777458159697259345595195388122353335822260097325489852)*x + (13924769469360724453879961975850224020069143304354498904290143445925292303168238308976281891969665201349305262540572533635000175728*i+19091414136014656435188833659894914133439813533774733937533960621205205413225555715451103872608164778414720930785355939184560881165) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7967927260976157153456100210629308406803802758711684824353806942620435850728085395070370677897912260630464590209853251292463672551*i+19663287201339687780580383545623037637445519365850683567526163942406987716577777458159697259345595195388122353335822260097325489852)*x + (13924769469360724453879961975850224020069143304354498904290143445925292303168238308976281891969665201349305262540572533635000175728*i+19091414136014656435188833659894914133439813533774733937533960621205205413225555715451103872608164778414720930785355939184560881165) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8856362477691308908237273938056870718990956435091518974263612040031757708907039183057139673101864485422798394462932410016193294402*i+15447981765830412635754015954481068521712650264568836909225868770276769377121975904013355409390381467232577464170314984962271035097)*x + (6026857478597227953464227703366696221727603082476601693145769348145068730368998904520747075318424760217750783234497856381934693827*i+3337859073523113263476227885149470414174540476146926550063216697526470728299981315532385269744846585127048274395130418291628847825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8856362477691308908237273938056870718990956435091518974263612040031757708907039183057139673101864485422798394462932410016193294402*i+15447981765830412635754015954481068521712650264568836909225868770276769377121975904013355409390381467232577464170314984962271035097)*x + (6026857478597227953464227703366696221727603082476601693145769348145068730368998904520747075318424760217750783234497856381934693827*i+3337859073523113263476227885149470414174540476146926550063216697526470728299981315532385269744846585127048274395130418291628847825) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18006052095349956960036044738705082074714597987919081487072145671040454901631248597756917666229160945125942298197621397475242576029*i+3126682555439778069340543244311818169168988159198002149335259757988872100666718343156615449719822855159920496057764357610699906)*x + (7692447796316786118591297729253623152821809116691659744021479858375090229754078471879653338007784072978312285973729324289616805494*i+9666764293272705151645344780840698382461145669690667331131270135961475093215478147634413669306385842021385549664718391637763237724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18006052095349956960036044738705082074714597987919081487072145671040454901631248597756917666229160945125942298197621397475242576029*i+3126682555439778069340543244311818169168988159198002149335259757988872100666718343156615449719822855159920496057764357610699906)*x + (7692447796316786118591297729253623152821809116691659744021479858375090229754078471879653338007784072978312285973729324289616805494*i+9666764293272705151645344780840698382461145669690667331131270135961475093215478147634413669306385842021385549664718391637763237724) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12998946587602764761153990569382751828997681813711669172312346846234083462155022283130823131819469559570668283339834972015160387119*i+9833851533069811107042420169248302717818500315878568209223586441525518024408095810717435286154071360920488359475952402002621849190)*x + (15174548769904746982497518171564753924424118237369932940780902742520133562105463803554835223555805841525004919606348650367226360648*i+20755483394151752947309674661507324447358045390308974033228920543402668217137638357144533502200849592901140064633851952748483193450) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12998946587602764761153990569382751828997681813711669172312346846234083462155022283130823131819469559570668283339834972015160387119*i+9833851533069811107042420169248302717818500315878568209223586441525518024408095810717435286154071360920488359475952402002621849190)*x + (15174548769904746982497518171564753924424118237369932940780902742520133562105463803554835223555805841525004919606348650367226360648*i+20755483394151752947309674661507324447358045390308974033228920543402668217137638357144533502200849592901140064633851952748483193450) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3734671062289886708572846168952729833135949568997132907555141711781003701669844108763001477118010055410198228031664940247812401323*i+21265989607364908657791543310693441178932092473395337042120949829332335476532532114424190582558620833527452786384910262788622604045)*x + (19727915838703446243312964248127267119484667133836427546328849210301535780377913789797827135619893963023364314923972937429817232612*i+18913347000131747746871831016652194471931196349163114410239123045860684116606654845331651572007645110727672885626695672396860552924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (3734671062289886708572846168952729833135949568997132907555141711781003701669844108763001477118010055410198228031664940247812401323*i+21265989607364908657791543310693441178932092473395337042120949829332335476532532114424190582558620833527452786384910262788622604045)*x + (19727915838703446243312964248127267119484667133836427546328849210301535780377913789797827135619893963023364314923972937429817232612*i+18913347000131747746871831016652194471931196349163114410239123045860684116606654845331651572007645110727672885626695672396860552924) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23137580138728607542413590478138104823709891968569016436448011458908169794255259325495130125184202056140997605681237069610861308870*i+7198165125042868218539845760490758422193634269827745763645141891489331124324923345536830899831439003757823836423038100068687732439)*x + (4301191439945208373946434533362457452305853107204008133742782404691726791170892381612166945191623889626526631177963004429548055125*i+22310628439787366667654914127944360157898679355012148221350354512273608712330961285133942120097708018737822254052872542655144558566) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23137580138728607542413590478138104823709891968569016436448011458908169794255259325495130125184202056140997605681237069610861308870*i+7198165125042868218539845760490758422193634269827745763645141891489331124324923345536830899831439003757823836423038100068687732439)*x + (4301191439945208373946434533362457452305853107204008133742782404691726791170892381612166945191623889626526631177963004429548055125*i+22310628439787366667654914127944360157898679355012148221350354512273608712330961285133942120097708018737822254052872542655144558566) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6534525027906587461788151855954606276879416309169224769578445596074456833036808601096036412992231472615915924674260311155080571717*i+18717383063172709718926912385668429261583656053850444506222125393867094354888997090609742476472583681106013879829044983768681196178)*x + (8268589945255280374340585190141343595564890415658034622064325414404644347641586291423440741051600549658294363243310548189880463887*i+1419231615236347488545497439908758871766539694551371995254170283985588406998276273771098536806736877897454343763891460098788574983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6534525027906587461788151855954606276879416309169224769578445596074456833036808601096036412992231472615915924674260311155080571717*i+18717383063172709718926912385668429261583656053850444506222125393867094354888997090609742476472583681106013879829044983768681196178)*x + (8268589945255280374340585190141343595564890415658034622064325414404644347641586291423440741051600549658294363243310548189880463887*i+1419231615236347488545497439908758871766539694551371995254170283985588406998276273771098536806736877897454343763891460098788574983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6849833387772168764754480453240873273248368010612955063129308244013422955719444950681091555974524270923168455228565687521295751023*i+11824225962256731451961103530601126461423384409291522527132258003353548419681069813409199994503943810729141212272875113022377441974)*x + (16815637196009459178814281108961834633171597878321485156192122014192400107296377462474857590984166350876991393344892728915494049467*i+13937298987559908745550273324211313766626948391149192332592636015119973581637670786551091400785336451272448850872225275303590884580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6849833387772168764754480453240873273248368010612955063129308244013422955719444950681091555974524270923168455228565687521295751023*i+11824225962256731451961103530601126461423384409291522527132258003353548419681069813409199994503943810729141212272875113022377441974)*x + (16815637196009459178814281108961834633171597878321485156192122014192400107296377462474857590984166350876991393344892728915494049467*i+13937298987559908745550273324211313766626948391149192332592636015119973581637670786551091400785336451272448850872225275303590884580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8472857822196768031480856694500386093606551910563480933106992203596136363558301350548152087316548392875994799673242196179953815193*i+17247931920809219161050398056359304505291011000949942504195318760263569458817570579547935245688354274608814344206778803409000606046)*x + (21677164372108909038645381952044886633364504157523669456592703675683152513856876600691682062693606548351908056743657381334293911374*i+9808566429720633788164916764155096876946254963741734271109028925360227995360649482925207093087820290792250077074443278976959476057) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8472857822196768031480856694500386093606551910563480933106992203596136363558301350548152087316548392875994799673242196179953815193*i+17247931920809219161050398056359304505291011000949942504195318760263569458817570579547935245688354274608814344206778803409000606046)*x + (21677164372108909038645381952044886633364504157523669456592703675683152513856876600691682062693606548351908056743657381334293911374*i+9808566429720633788164916764155096876946254963741734271109028925360227995360649482925207093087820290792250077074443278976959476057) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20702576326572818350368091869283914808993804201710196947445005704498158494602772450952892697160888454429280405050307411597936848253*i+24222948168736547818621457846307885193731856418527383874405574313925724913373732112587633564114989919716270391255780303387264227588)*x + (314194842644568906941848251106815326194190078334720548277448629314951599558190533702106495277542088783644834265378695403111410831*i+10341637871051538192813846837925530162552999172843158874680688371719487560170094758585621328387195285821318375783684723868726087065) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20702576326572818350368091869283914808993804201710196947445005704498158494602772450952892697160888454429280405050307411597936848253*i+24222948168736547818621457846307885193731856418527383874405574313925724913373732112587633564114989919716270391255780303387264227588)*x + (314194842644568906941848251106815326194190078334720548277448629314951599558190533702106495277542088783644834265378695403111410831*i+10341637871051538192813846837925530162552999172843158874680688371719487560170094758585621328387195285821318375783684723868726087065) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22320989921531628993546524264046111921497690215721993858412319858684154563233363587974803859157829567639390130062571125931995800111*i+14347248185725955068362188204848285344154940089416959475945911347572287974782984889959788271822901783286217966418798261375811654993)*x + (5816218609061493553023807866814290046974222170614772446746409623648775904517262599465918921645761815841770560119107224319495448393*i+4734611848546940525476576304106484030797753542991841619245286868739533547394768869550008151731100236801924474657254804526549359334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22320989921531628993546524264046111921497690215721993858412319858684154563233363587974803859157829567639390130062571125931995800111*i+14347248185725955068362188204848285344154940089416959475945911347572287974782984889959788271822901783286217966418798261375811654993)*x + (5816218609061493553023807866814290046974222170614772446746409623648775904517262599465918921645761815841770560119107224319495448393*i+4734611848546940525476576304106484030797753542991841619245286868739533547394768869550008151731100236801924474657254804526549359334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24264052726725788994152984761921597375913745618609963844298401327137769735015794477691179165893158153860787049224665981064996456198*i+11465250924667670949776939354895590840394879590744007098507375611541972916339381286909713286997288120159799384203044550887839098177)*x + (5082087676619558020765599270289381893741831221161606037462637529786646295357496790253530226532474677706844588867613369621466074294*i+10435042151665953777187514937807924097505322699671051589453998108384554208883162004320690897621132624063558778196507921564406582681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24264052726725788994152984761921597375913745618609963844298401327137769735015794477691179165893158153860787049224665981064996456198*i+11465250924667670949776939354895590840394879590744007098507375611541972916339381286909713286997288120159799384203044550887839098177)*x + (5082087676619558020765599270289381893741831221161606037462637529786646295357496790253530226532474677706844588867613369621466074294*i+10435042151665953777187514937807924097505322699671051589453998108384554208883162004320690897621132624063558778196507921564406582681) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8080978224037721401270762217524783251071779048670330131419612666749997809430361927643270418538916525773092240297691821527765284591*i+8630073095428777099729313518690979297353796534927770651439743038696196770704495154291514733231505702506249587418519879263420116412)*x + (4054629360774374311979346120332072452621183402448125277651703428551609498184750622711972028766559081911852274995534059925843575061*i+4085457525084794669391792096495746147085454975628620621346664892696065184259907750213294428871170560712080985694355399238684528687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8080978224037721401270762217524783251071779048670330131419612666749997809430361927643270418538916525773092240297691821527765284591*i+8630073095428777099729313518690979297353796534927770651439743038696196770704495154291514733231505702506249587418519879263420116412)*x + (4054629360774374311979346120332072452621183402448125277651703428551609498184750622711972028766559081911852274995534059925843575061*i+4085457525084794669391792096495746147085454975628620621346664892696065184259907750213294428871170560712080985694355399238684528687) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19692491870030149612531451046589048244859354973815022632593429295212371217427528739504939971306255622775559345441159283672604449090*i+10902470146789724702063428870122076207557290491380655358653835124172186734190819211921383524037213031622012940870477829812901248727)*x + (12060796923308710257488212026117361549764223358904747378230383319844085285504778316245701254186375117104571390173047810513488579036*i+22168486414877002265721020196995891866101361608277217425932727969152615448764416851090630841878470684217322517595416194738400547580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19692491870030149612531451046589048244859354973815022632593429295212371217427528739504939971306255622775559345441159283672604449090*i+10902470146789724702063428870122076207557290491380655358653835124172186734190819211921383524037213031622012940870477829812901248727)*x + (12060796923308710257488212026117361549764223358904747378230383319844085285504778316245701254186375117104571390173047810513488579036*i+22168486414877002265721020196995891866101361608277217425932727969152615448764416851090630841878470684217322517595416194738400547580) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1989614505107990470886961278782150133803892145086550517489811180518538193228682761136179404129601501067277296704268415534584663471*i+23595544530466851456704747628207967071589108197842508420645349386791647242516466614159777271691427703354442977013889853196306782669)*x + (11906442528869811447157084765185493085645846604242803058556807253002547901728301891680721673923952349448819897725995940881478732108*i+15130651281435570673674184297558934092295297069990218647977410568681351242191608178831855687472521633886498508769054554281527937703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1989614505107990470886961278782150133803892145086550517489811180518538193228682761136179404129601501067277296704268415534584663471*i+23595544530466851456704747628207967071589108197842508420645349386791647242516466614159777271691427703354442977013889853196306782669)*x + (11906442528869811447157084765185493085645846604242803058556807253002547901728301891680721673923952349448819897725995940881478732108*i+15130651281435570673674184297558934092295297069990218647977410568681351242191608178831855687472521633886498508769054554281527937703) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13964695327433325221884902669706749167568767737967510292136212451137844247759195019454487151077044419055411833099511774469465377691*i+21719055083668992131417890728109016821232457814669099999548852255878002958776665865028020288523715508572169272065589929916822717844)*x + (12672874536677297582006931927782562567865067539835257512484613046403169799447207335968580244988824995696220185324555414776338071393*i+20009081995731783325242644889279648735684347231485510842729696021498266276885099679182956115252244830389479678474994508199123620228) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13964695327433325221884902669706749167568767737967510292136212451137844247759195019454487151077044419055411833099511774469465377691*i+21719055083668992131417890728109016821232457814669099999548852255878002958776665865028020288523715508572169272065589929916822717844)*x + (12672874536677297582006931927782562567865067539835257512484613046403169799447207335968580244988824995696220185324555414776338071393*i+20009081995731783325242644889279648735684347231485510842729696021498266276885099679182956115252244830389479678474994508199123620228) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (730625816782268015288917127645557278086203395338172357129358051262958436500195126849618051833345357417474178961093443460760418489*i+20032191421431966254030943148956795058223796759062342627739557892927749980639101826160661321690109374498550890491986485404451527168)*x + (18242971209764902666017086379129352473620566837631020047099464279233458350393999705085810132521398652841251251545354397368900765944*i+304077104750976458313522457239288992303280023023544021639632322124263496756251649997617283091516337864514747764863865756174276398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (730625816782268015288917127645557278086203395338172357129358051262958436500195126849618051833345357417474178961093443460760418489*i+20032191421431966254030943148956795058223796759062342627739557892927749980639101826160661321690109374498550890491986485404451527168)*x + (18242971209764902666017086379129352473620566837631020047099464279233458350393999705085810132521398652841251251545354397368900765944*i+304077104750976458313522457239288992303280023023544021639632322124263496756251649997617283091516337864514747764863865756174276398) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21254184132390858041491347977883438023218393224902173672180174169617061791306493338522396033162851067106370116351939975498051302879*i+9032830962095386072001249062968282909400311900311148446235528273818577233793000324444356689373467377630145311631425245391916080927)*x + (11371773331348942838832581752140678533020719695637513892337133970250452760721614010657736466493113904957465876606721561702974955848*i+368294732950250387878419202523242322676392548529333179281216723193110552455016964100598589084938178607419713450261400974743026991) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21254184132390858041491347977883438023218393224902173672180174169617061791306493338522396033162851067106370116351939975498051302879*i+9032830962095386072001249062968282909400311900311148446235528273818577233793000324444356689373467377630145311631425245391916080927)*x + (11371773331348942838832581752140678533020719695637513892337133970250452760721614010657736466493113904957465876606721561702974955848*i+368294732950250387878419202523242322676392548529333179281216723193110552455016964100598589084938178607419713450261400974743026991) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12473293701968955107390005814603052410862101889266362795741849719246280766658233392692661458922239714604859349958553624960389364584*i+19676624265206444682466429481204409710466508926930972116376954965719043727453410160028421445564237239779479280627034096237634594994)*x + (21204365943293903195294396070186017780982119615795292031434050414712707009431613587446101391276514259299598972542773839328872735977*i+21579838615266324193217315640239849690587826121220141567714757577592529503134637179726814161767504011544672181960172907351989267060) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (12473293701968955107390005814603052410862101889266362795741849719246280766658233392692661458922239714604859349958553624960389364584*i+19676624265206444682466429481204409710466508926930972116376954965719043727453410160028421445564237239779479280627034096237634594994)*x + (21204365943293903195294396070186017780982119615795292031434050414712707009431613587446101391276514259299598972542773839328872735977*i+21579838615266324193217315640239849690587826121220141567714757577592529503134637179726814161767504011544672181960172907351989267060) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5867885338899774250766290777595900035072897787593232128942768265406014270077714342536263861874827527443630400201217505277304353825*i+13507705501411191461860817743910189797861465722237745163551314543368398392069920121683913639056462807073580260281875940175053922667)*x + (6636929286548802846118160674604519951633506285875915743825596734551592428560597606780766269874304875339545896426926343729567559170*i+5599568424080729737072909907265314864566314616113195681817033519796689280564023683575839745840903853956432154793674697909244375242) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5867885338899774250766290777595900035072897787593232128942768265406014270077714342536263861874827527443630400201217505277304353825*i+13507705501411191461860817743910189797861465722237745163551314543368398392069920121683913639056462807073580260281875940175053922667)*x + (6636929286548802846118160674604519951633506285875915743825596734551592428560597606780766269874304875339545896426926343729567559170*i+5599568424080729737072909907265314864566314616113195681817033519796689280564023683575839745840903853956432154793674697909244375242) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11233662477397915494760667818237956259444725737760324144259323304430179474427265354545734019776837898871731444043386214764121754813*i+7725652153024014911618600285781736103603881648017216994339929239795324770401881150502860022810474245703481039817088315474512247849)*x + (2877387282044203170805194875796028670531093966322706822292069422280333796600686050564303645762776841574278874792370329285410280996*i+14079834758827403709092114212210821507829843619943735194442575892987597862138028016071364204790724600263622768638977106021492480902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11233662477397915494760667818237956259444725737760324144259323304430179474427265354545734019776837898871731444043386214764121754813*i+7725652153024014911618600285781736103603881648017216994339929239795324770401881150502860022810474245703481039817088315474512247849)*x + (2877387282044203170805194875796028670531093966322706822292069422280333796600686050564303645762776841574278874792370329285410280996*i+14079834758827403709092114212210821507829843619943735194442575892987597862138028016071364204790724600263622768638977106021492480902) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13064650439389116266798095062712204783177656163625404705887890151359405403504982845268231612409199244198847103166046894901414053862*i+11547727702852050117418706783781224408089932833856000251234873340636443989877836115118207765762930751755995976765549109196994777051)*x + (21841467341740320690836111763817718626057002438485525172376404820533318664176927748682613311436493296176824441673091315953245124187*i+23706300220127978970107110983188578436764633926486012708170032493400741662971962429470996364863328003800064540764199302394377200712) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13064650439389116266798095062712204783177656163625404705887890151359405403504982845268231612409199244198847103166046894901414053862*i+11547727702852050117418706783781224408089932833856000251234873340636443989877836115118207765762930751755995976765549109196994777051)*x + (21841467341740320690836111763817718626057002438485525172376404820533318664176927748682613311436493296176824441673091315953245124187*i+23706300220127978970107110983188578436764633926486012708170032493400741662971962429470996364863328003800064540764199302394377200712) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2277652597413804100750025573786768187708182914894659260120177070260072163272896342373127930773309085883496288197319981708705001239*i+21529378312028621329417248617994628078554671337544090641492393243802021743086153908747372751968592325165791493816663125030820438246)*x + (6088191058300311546251423734679119979390744542310421311757559959041138018427293901052782960604509894425986634917577150868728303267*i+19526873557859196053260692152142733763414661583854924734868456817923723377801268395130186804016423282838721964197904479366874271514) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (2277652597413804100750025573786768187708182914894659260120177070260072163272896342373127930773309085883496288197319981708705001239*i+21529378312028621329417248617994628078554671337544090641492393243802021743086153908747372751968592325165791493816663125030820438246)*x + (6088191058300311546251423734679119979390744542310421311757559959041138018427293901052782960604509894425986634917577150868728303267*i+19526873557859196053260692152142733763414661583854924734868456817923723377801268395130186804016423282838721964197904479366874271514) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10911039819752610405156761065348161729288812660249705738458314180771370254695069926605014192500218742941794769427087666212610630231*i+11845727940396367611773106491347190084611906456397007339683359919445933315335882212243289577301386638972668964474178913430947095886)*x + (6517107220228463620658252089870517965238988961550838323992475607343414942062079310538210731557178894822507249114961409596734037875*i+22370087781697890291821654735023843351299279497732600657939166253949137985632013960981116664561586072686370309045935770988563833852) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10911039819752610405156761065348161729288812660249705738458314180771370254695069926605014192500218742941794769427087666212610630231*i+11845727940396367611773106491347190084611906456397007339683359919445933315335882212243289577301386638972668964474178913430947095886)*x + (6517107220228463620658252089870517965238988961550838323992475607343414942062079310538210731557178894822507249114961409596734037875*i+22370087781697890291821654735023843351299279497732600657939166253949137985632013960981116664561586072686370309045935770988563833852) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23948618285885747277349144795737357391030351613471824692351584980346744913502659542212350824296993830689748174527797302201629945502*i+195884847666075151698176040927277094265112441191287259484429975296120894771298895575829707832999267230354752214090937802027086020)*x + (3463443293270797883918934706156806437105415713278816256988993272118395749704843704395343419207655799337806384014053396566205043151*i+283425430466829368423735705576026993648198592755466825871076266826894023737035543683441573220132968357680069303982775095951570569) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23948618285885747277349144795737357391030351613471824692351584980346744913502659542212350824296993830689748174527797302201629945502*i+195884847666075151698176040927277094265112441191287259484429975296120894771298895575829707832999267230354752214090937802027086020)*x + (3463443293270797883918934706156806437105415713278816256988993272118395749704843704395343419207655799337806384014053396566205043151*i+283425430466829368423735705576026993648198592755466825871076266826894023737035543683441573220132968357680069303982775095951570569) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14596278619516237228149229036672375025483948862719376851750140288075134112171161063718760092972200652048013876875176685255996151825*i+11503672702801117860103791264614046268022847058727174342965036835880644811940836495551909897024418417657356638064598013688650819056)*x + (21156575412763305339221654809512603279495617653186469077622418335117188119861174408056891787032121240323234980497154225315222999430*i+6036428633457931826122708092783267088362815282668208742789610328337170224985339290972535957430639708274476793952562324631583943527) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14596278619516237228149229036672375025483948862719376851750140288075134112171161063718760092972200652048013876875176685255996151825*i+11503672702801117860103791264614046268022847058727174342965036835880644811940836495551909897024418417657356638064598013688650819056)*x + (21156575412763305339221654809512603279495617653186469077622418335117188119861174408056891787032121240323234980497154225315222999430*i+6036428633457931826122708092783267088362815282668208742789610328337170224985339290972535957430639708274476793952562324631583943527) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22067311350849450968241260940554860469793394807895314530412047138173603583514554865273274315006707594448700853915218126107609565018*i+10774048711867178463761158032980920449462832729955830620387375652994050459965120066998310332945630081861981839479213780589669662011)*x + (2920578582318230746658896448297536943219792911637661339923394367177012195295494326712982281521371792688934813115943930024243157345*i+20899592948249675120708159445584528793369811111806798849073364867589632467814911969321834557229738529079508654200449604289568832804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22067311350849450968241260940554860469793394807895314530412047138173603583514554865273274315006707594448700853915218126107609565018*i+10774048711867178463761158032980920449462832729955830620387375652994050459965120066998310332945630081861981839479213780589669662011)*x + (2920578582318230746658896448297536943219792911637661339923394367177012195295494326712982281521371792688934813115943930024243157345*i+20899592948249675120708159445584528793369811111806798849073364867589632467814911969321834557229738529079508654200449604289568832804) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7965675300175560084915184914054196317594215304682395529520632325082885113801261501109532366405987949260181399494719412137672058558*i+17283002117646151731226162689124332753888200139976011921585927860577109981143709503251403770688706455949673976879958494964959749168)*x + (22640649109251988005335795410671147776639663744008441927945341675224570828614586501471176885515035679557822216486044396632932318824*i+13285678205848546960712475219204739721934751776196964239226396497692091212460210154118823193417223369779206474589917850710837432997) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (7965675300175560084915184914054196317594215304682395529520632325082885113801261501109532366405987949260181399494719412137672058558*i+17283002117646151731226162689124332753888200139976011921585927860577109981143709503251403770688706455949673976879958494964959749168)*x + (22640649109251988005335795410671147776639663744008441927945341675224570828614586501471176885515035679557822216486044396632932318824*i+13285678205848546960712475219204739721934751776196964239226396497692091212460210154118823193417223369779206474589917850710837432997) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17258737567202705120562196873659713187989790456741276164556153628781298908067031727487353169625645209150201474479802027445149479999*i+574142026480185923898618738273626697675632448705749252367383275738951161300833024111181854781742710126086019988881785334954990475)*x + (13748004978252892283356569409812593843611386845094054877044861486167311830794336133798195053672364236622117953285217688332487233107*i+10898498999821972543823223845612213322243766413477363834604623464662587130922309847948755035541596512798283960980271405525398902775) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17258737567202705120562196873659713187989790456741276164556153628781298908067031727487353169625645209150201474479802027445149479999*i+574142026480185923898618738273626697675632448705749252367383275738951161300833024111181854781742710126086019988881785334954990475)*x + (13748004978252892283356569409812593843611386845094054877044861486167311830794336133798195053672364236622117953285217688332487233107*i+10898498999821972543823223845612213322243766413477363834604623464662587130922309847948755035541596512798283960980271405525398902775) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16298361561347869287706476005766894230495128259342915207410976687133594223928583116801735972145808362624846412895937106884228652339*i+1641935662205345274107475392636837856430742023579155853534322614748732855768808200441955884704266741327065633867544289800566566132)*x + (2680279123607772212323120264959786218863132280574495908567178062900832371274785266209261290781834809889940308577691734779065225813*i+6297304204954445389013092547275176449057246546390981574984532598932872997152988194178971341954278313813188482783873112711215290189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16298361561347869287706476005766894230495128259342915207410976687133594223928583116801735972145808362624846412895937106884228652339*i+1641935662205345274107475392636837856430742023579155853534322614748732855768808200441955884704266741327065633867544289800566566132)*x + (2680279123607772212323120264959786218863132280574495908567178062900832371274785266209261290781834809889940308577691734779065225813*i+6297304204954445389013092547275176449057246546390981574984532598932872997152988194178971341954278313813188482783873112711215290189) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6393516990042174962336879680889535068788282275821231151487021622216501288041900718541456975880990475123426983022266509295745269707*i+17511484505751499518666987468944320074280262689044148850231657671738462372439426263484391182079334552729454772625835110054727504042)*x + (7365364746156481585365552289215715495863379422709181901364821993549488032841609684081444418246825281284284073400407628686716941309*i+24171310576548424958458627220587878895164331523878906142736620942272417453710373902218216963017235143209451164548430426505608388523) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6393516990042174962336879680889535068788282275821231151487021622216501288041900718541456975880990475123426983022266509295745269707*i+17511484505751499518666987468944320074280262689044148850231657671738462372439426263484391182079334552729454772625835110054727504042)*x + (7365364746156481585365552289215715495863379422709181901364821993549488032841609684081444418246825281284284073400407628686716941309*i+24171310576548424958458627220587878895164331523878906142736620942272417453710373902218216963017235143209451164548430426505608388523) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15185763939399764166395324047119057292951153344074808593254882365478332606758822204654675051902761221722505318538888105078399584795*i+19808166809480588090226959221567318345693842746497253106846711847660009220976745419684802931325258420723653821638889457622723659947)*x + (575979620238342344171972129984559722116119449825823463264689720464909922848369606200730601142412422083209691808647903896145519544*i+15995054355275844481304871656794356205017793707943681782984125942274052858788866457287705961679313053490372117825305048543027708334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15185763939399764166395324047119057292951153344074808593254882365478332606758822204654675051902761221722505318538888105078399584795*i+19808166809480588090226959221567318345693842746497253106846711847660009220976745419684802931325258420723653821638889457622723659947)*x + (575979620238342344171972129984559722116119449825823463264689720464909922848369606200730601142412422083209691808647903896145519544*i+15995054355275844481304871656794356205017793707943681782984125942274052858788866457287705961679313053490372117825305048543027708334) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6497761294563434151921184165749070299197413391739579721615416593760136953800027754627339505985783870921506436905405068582314596904*i+18073431422212208578436252203047926315495355181441346641868640251151157394714729000636314755854948631113784973122056373761325362967)*x + (11006501138578121099768258722261398184420931906047298545580746379210834618265646567748515983863025694226011160367321763130664312351*i+22517274244304504657179211048386257755922531574510273797576156125788400044574831170534911903945570357948207203455169267842281061169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6497761294563434151921184165749070299197413391739579721615416593760136953800027754627339505985783870921506436905405068582314596904*i+18073431422212208578436252203047926315495355181441346641868640251151157394714729000636314755854948631113784973122056373761325362967)*x + (11006501138578121099768258722261398184420931906047298545580746379210834618265646567748515983863025694226011160367321763130664312351*i+22517274244304504657179211048386257755922531574510273797576156125788400044574831170534911903945570357948207203455169267842281061169) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19171414668100595170631294250676398982144762710353838172770672435191105453597817099090095835013114394099799105365277962103518798846*i+13453353289757795917062677339493227775774766156425867996034384810890649814187754044391115712775472961164137876473626714154201412121)*x + (10002085546405933603854382403001969723436615120748340902646384126459558929629863107931112520223287482514803698687727935617877573045*i+12542128666590070655942765418554541807730653506233881206301489716170176460016624980205080658737162699654000037726858831349381495572) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19171414668100595170631294250676398982144762710353838172770672435191105453597817099090095835013114394099799105365277962103518798846*i+13453353289757795917062677339493227775774766156425867996034384810890649814187754044391115712775472961164137876473626714154201412121)*x + (10002085546405933603854382403001969723436615120748340902646384126459558929629863107931112520223287482514803698687727935617877573045*i+12542128666590070655942765418554541807730653506233881206301489716170176460016624980205080658737162699654000037726858831349381495572) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16829671012761094644256745263050429573636546547484568088827753590842755113479296331313894202730954637630743193688999643072647421774*i+7694799910778857811973246589637404673695893949032473851735838779826237734954003022993494469489593507014178822495330084959005147404)*x + (2950313155170691350320655636088926215408469186142355727402645545041391194794192786784455752730140233090078953882334336279227092783*i+16073682385567458263676125165102496216216534460459548780233718452028923173344625446688143423068819150319135317545685847655654189636) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16829671012761094644256745263050429573636546547484568088827753590842755113479296331313894202730954637630743193688999643072647421774*i+7694799910778857811973246589637404673695893949032473851735838779826237734954003022993494469489593507014178822495330084959005147404)*x + (2950313155170691350320655636088926215408469186142355727402645545041391194794192786784455752730140233090078953882334336279227092783*i+16073682385567458263676125165102496216216534460459548780233718452028923173344625446688143423068819150319135317545685847655654189636) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24379529764937018412178144746935317911613180721207535583021482952343481330853721146655579377729345927116634809266760475470286227761*i+2075737472546192472613415667963523571159234154033362223132113060846879892178550243585625396044253889083374014613862993708784954285)*x + (20878105386301783067318244861662443075147281437244153604539164938148777852385745070780207016996478547859017991719255237981801051817*i+8688984648606900538032433870757096975548355813463122816396873728008643755230670559317707643264199084835807463342338690183387731114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (24379529764937018412178144746935317911613180721207535583021482952343481330853721146655579377729345927116634809266760475470286227761*i+2075737472546192472613415667963523571159234154033362223132113060846879892178550243585625396044253889083374014613862993708784954285)*x + (20878105386301783067318244861662443075147281437244153604539164938148777852385745070780207016996478547859017991719255237981801051817*i+8688984648606900538032433870757096975548355813463122816396873728008643755230670559317707643264199084835807463342338690183387731114) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8966071459522325303583001787888663672853880561988981922032529512647439440961717546933206708360830222898704921598852663745596794398*i+8345288330212090781923290732571780440739988169224641037764648762308170423204791668551969904825370716251222554206586515954414148404)*x + (4445809754581931333528323997620894502276428543202977219425442520733965946463077734638749036187947131716766366918573513230079183858*i+5077745172530273916675241795547869353684578090858214685990836029492824044748226602073038593891966621490061302202405092251162871607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (8966071459522325303583001787888663672853880561988981922032529512647439440961717546933206708360830222898704921598852663745596794398*i+8345288330212090781923290732571780440739988169224641037764648762308170423204791668551969904825370716251222554206586515954414148404)*x + (4445809754581931333528323997620894502276428543202977219425442520733965946463077734638749036187947131716766366918573513230079183858*i+5077745172530273916675241795547869353684578090858214685990836029492824044748226602073038593891966621490061302202405092251162871607) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9443458000704005828587291943839285547272383320684542654829498224868689883607731758629566711050403564007358147853243296262031521466*i+5889366072859389070700846053338966791075975481802434453606670026606613841109577311513108195744086252778116270570535448176456349632)*x + (16140865071743616311175732560130500329506544498097124699000945417585031125684204606566675692721406821159913720658117527988383496871*i+13884909998681037361188166940756138539284500795932871256782743962094116500534190765246685646074144235574540080989104705684451425834) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9443458000704005828587291943839285547272383320684542654829498224868689883607731758629566711050403564007358147853243296262031521466*i+5889366072859389070700846053338966791075975481802434453606670026606613841109577311513108195744086252778116270570535448176456349632)*x + (16140865071743616311175732560130500329506544498097124699000945417585031125684204606566675692721406821159913720658117527988383496871*i+13884909998681037361188166940756138539284500795932871256782743962094116500534190765246685646074144235574540080989104705684451425834) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11389037019953273561018665939158954664553895734039150775831663126424207821833832471703414144776367333064656380207050513915406447745*i+1294103218985227783285279601581342613452947259713619549504685549174225569458990356663933282998216740499779034970159092486042775514)*x + (4911031597816754615395090963001333889250758556484868655396642223847296633296434938521434452997079700523371492559765194655645342245*i+8095703269242163461129114243885230926416432681108596876338085016214292480396539945507980048386077788087627971971464160158010976555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11389037019953273561018665939158954664553895734039150775831663126424207821833832471703414144776367333064656380207050513915406447745*i+1294103218985227783285279601581342613452947259713619549504685549174225569458990356663933282998216740499779034970159092486042775514)*x + (4911031597816754615395090963001333889250758556484868655396642223847296633296434938521434452997079700523371492559765194655645342245*i+8095703269242163461129114243885230926416432681108596876338085016214292480396539945507980048386077788087627971971464160158010976555) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13774679732101907451008284661981283847587574874179557989156348081595833846266102945842205752929077016950073927699470775204018049726*i+21312242178138712595758639383237363250354364158986808213654931874169720778556708808833628910365566382362195368229119915579518362738)*x + (1944425675237832300960875150343459660245818272722633364732893781451931665593013037665908222639192885371932964264949628441436160424*i+12683310207410544097495939942112508955457067805725964917871291464928576119798088344225481759659070607612929985634679687790513354983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (13774679732101907451008284661981283847587574874179557989156348081595833846266102945842205752929077016950073927699470775204018049726*i+21312242178138712595758639383237363250354364158986808213654931874169720778556708808833628910365566382362195368229119915579518362738)*x + (1944425675237832300960875150343459660245818272722633364732893781451931665593013037665908222639192885371932964264949628441436160424*i+12683310207410544097495939942112508955457067805725964917871291464928576119798088344225481759659070607612929985634679687790513354983) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6962748704059039390118405412413618744356078251531330844726786606958478598267542376333103379437919535756003053980707905732039649272*i+15123392794293131393813249672580809735841816667759228895597425021643983929350902093819054453870568585525862480507427916668701971785)*x + (5114504505991093636841205416522361416036095081872684060000731065550661882979662675942233758468542426803798466690050401144717750078*i+4586191236420154666320575254876963651499088748920698422060426500489375953228611120030463242682264971227459425422949506344346853574) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6962748704059039390118405412413618744356078251531330844726786606958478598267542376333103379437919535756003053980707905732039649272*i+15123392794293131393813249672580809735841816667759228895597425021643983929350902093819054453870568585525862480507427916668701971785)*x + (5114504505991093636841205416522361416036095081872684060000731065550661882979662675942233758468542426803798466690050401144717750078*i+4586191236420154666320575254876963651499088748920698422060426500489375953228611120030463242682264971227459425422949506344346853574) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11641472237549382354615455511706507225279974773613599136711355588970135528568952273202990446977751295733989060751186259671551001198*i+8639231897084535306911005798565150634396904915206068413344786872730175329749194866186723029865008152196256388048985316039009568452)*x + (12769721510952833065454995489222281961431045869008701550802622582634950074589122249481379569619886717653999383847551914006030620930*i+16614888349333294919682656266491472167907066510697598147299599782316461662618060606633006572357299291565122641356895990802174933251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11641472237549382354615455511706507225279974773613599136711355588970135528568952273202990446977751295733989060751186259671551001198*i+8639231897084535306911005798565150634396904915206068413344786872730175329749194866186723029865008152196256388048985316039009568452)*x + (12769721510952833065454995489222281961431045869008701550802622582634950074589122249481379569619886717653999383847551914006030620930*i+16614888349333294919682656266491472167907066510697598147299599782316461662618060606633006572357299291565122641356895990802174933251) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17526589798161463629813963452423804207361363145224648483929542514768325728675663409622166244310326221736370415971498144338399564032*i+21010448330725811542635904008552428887705391287034303033367226046424386890319177017486668090317346396744959851366835203197104755192)*x + (10413403190620740635381203971604563046293521489617988373211678922983940237534010934156425803372855110565800073611210931325522713866*i+17706337753724390442224501245704310102207617631560527742288516177390510025425156948058284001075688358616431322770001266986484979485) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17526589798161463629813963452423804207361363145224648483929542514768325728675663409622166244310326221736370415971498144338399564032*i+21010448330725811542635904008552428887705391287034303033367226046424386890319177017486668090317346396744959851366835203197104755192)*x + (10413403190620740635381203971604563046293521489617988373211678922983940237534010934156425803372855110565800073611210931325522713866*i+17706337753724390442224501245704310102207617631560527742288516177390510025425156948058284001075688358616431322770001266986484979485) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1879856122763447277078750789925073742284950884276396530419650814383052086143014529155957275261841358314968695640037785468997435866*i+12926949978606196060186630392301242943886509363028521802295124503785199071674964754350900105528568290916402184357224361172519239878)*x + (1324599113762318728131765369890917004648019359066010550233637483084067579094034812516782032664778779667955747127517147543439133256*i+9169654450673959993371323779506539485428047671596054202996515304570789921519858171205831767439298958969195123273185670302519868674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1879856122763447277078750789925073742284950884276396530419650814383052086143014529155957275261841358314968695640037785468997435866*i+12926949978606196060186630392301242943886509363028521802295124503785199071674964754350900105528568290916402184357224361172519239878)*x + (1324599113762318728131765369890917004648019359066010550233637483084067579094034812516782032664778779667955747127517147543439133256*i+9169654450673959993371323779506539485428047671596054202996515304570789921519858171205831767439298958969195123273185670302519868674) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6768315887899068663382039630372845498029437626635819995491953981105067480183512034973763418166197971398559522865236896408540619850*i+23854742959854710298096221507350718713000994908077548605103545548210334161801963171521651984728637768104508797499008003433533086504)*x + (23965964220230714371810889434935034138621393499729334354646007624665556152413489711123051985528181504191500997412698015204013326019*i+2846806931907384048417322336304800762921986894752510135404301096150398454996791398388513253761399886333646928154311500815718650960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6768315887899068663382039630372845498029437626635819995491953981105067480183512034973763418166197971398559522865236896408540619850*i+23854742959854710298096221507350718713000994908077548605103545548210334161801963171521651984728637768104508797499008003433533086504)*x + (23965964220230714371810889434935034138621393499729334354646007624665556152413489711123051985528181504191500997412698015204013326019*i+2846806931907384048417322336304800762921986894752510135404301096150398454996791398388513253761399886333646928154311500815718650960) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15105473285767508454051247384623957914098621944996814428348919710101152420919729182352316726929491169769512894731800217086366176519*i+6468008707848298626201571004992179409076805201442770779095470182147655668437572934990343612415458963461898122783205214096177769831)*x + (10612667076234908165440486126206003121257753561528773930066519817383169540124304140490188103515137958988912503563008881891295868829*i+23940650924220839572602205252987239755794592654246052219067392526166951501966596955306195409677823451973253889479849239193226975215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (15105473285767508454051247384623957914098621944996814428348919710101152420919729182352316726929491169769512894731800217086366176519*i+6468008707848298626201571004992179409076805201442770779095470182147655668437572934990343612415458963461898122783205214096177769831)*x + (10612667076234908165440486126206003121257753561528773930066519817383169540124304140490188103515137958988912503563008881891295868829*i+23940650924220839572602205252987239755794592654246052219067392526166951501966596955306195409677823451973253889479849239193226975215) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20585230461627632151206244157191705873202185365043404697228991878893869440113222323142681064986740493019037958761514539794248560831*i+5588216838204205554452677133976543225757092089642924226213007189548161625180405996678931885385819248071318242209125935580574265056)*x + (15786734475484247924959304238591632304306357345923735566223631092326972797324392227844205409997684562312422564088887675568545363955*i+6501181531130595073229108426375163723280227543227420981072561115307453190315228297718832671903922225802117803050943255139784673563) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (20585230461627632151206244157191705873202185365043404697228991878893869440113222323142681064986740493019037958761514539794248560831*i+5588216838204205554452677133976543225757092089642924226213007189548161625180405996678931885385819248071318242209125935580574265056)*x + (15786734475484247924959304238591632304306357345923735566223631092326972797324392227844205409997684562312422564088887675568545363955*i+6501181531130595073229108426375163723280227543227420981072561115307453190315228297718832671903922225802117803050943255139784673563) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17094845059232902278050395351164663706540302365837183905366314193498950841536113178177116393176635472434784287053756649006449457628*i+289659053794670667374368478315083957667596757839450579121168005138175593311148214417340999685971288366110700167682341137102942831)*x + (3261526413506443819763910582089020002192350523226073988802158696613775461886836773725578509444984066731303406623073862021489519534*i+2867771447086091127016259632637368975589523727744720846436725956987482403509347065267467464535261632141491872746461493365848350072) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (17094845059232902278050395351164663706540302365837183905366314193498950841536113178177116393176635472434784287053756649006449457628*i+289659053794670667374368478315083957667596757839450579121168005138175593311148214417340999685971288366110700167682341137102942831)*x + (3261526413506443819763910582089020002192350523226073988802158696613775461886836773725578509444984066731303406623073862021489519534*i+2867771447086091127016259632637368975589523727744720846436725956987482403509347065267467464535261632141491872746461493365848350072) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9576234945435877295354576061632400063602204210671847717088689958673676427322794630828203411590412602996809469406078226128468793487*i+2488359381412832092173460093902895818657760991201275058542949242250234818084780121063070613345839813123348105168385843806361431659)*x + (11513511342546187107734503955036824768398810724440531027961349613254815355887288622951315265023430698315899884640530538482817045051*i+20424841240245668911312203568276389573850313032218935664187903441147302752425873167955824677997354656865722852573301874457696767951) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9576234945435877295354576061632400063602204210671847717088689958673676427322794630828203411590412602996809469406078226128468793487*i+2488359381412832092173460093902895818657760991201275058542949242250234818084780121063070613345839813123348105168385843806361431659)*x + (11513511342546187107734503955036824768398810724440531027961349613254815355887288622951315265023430698315899884640530538482817045051*i+20424841240245668911312203568276389573850313032218935664187903441147302752425873167955824677997354656865722852573301874457696767951) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19999659023403238528516890366963434947460077622882115887777492567356707063582837518019929921969035953318877713356599552022816338364*i+22736175259003800590134213214437181319375925017466629991158218102528634098288117329880554131547125937896883901057438653407805971714)*x + (15947121414960755328942934056941633502894017559523977758121235293365720521945801897772498798161247952437222547987659358072131943749*i+21819968247086431285604616058438061270213818265008222424453734284077441163753303002580105975954399031612299012489311104259453787709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (19999659023403238528516890366963434947460077622882115887777492567356707063582837518019929921969035953318877713356599552022816338364*i+22736175259003800590134213214437181319375925017466629991158218102528634098288117329880554131547125937896883901057438653407805971714)*x + (15947121414960755328942934056941633502894017559523977758121235293365720521945801897772498798161247952437222547987659358072131943749*i+21819968247086431285604616058438061270213818265008222424453734284077441163753303002580105975954399031612299012489311104259453787709) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16468656704014755230714171938918145029018011496107488153349644593343342591961497092988896101576738531024836481796788156338689924761*i+21907797015195946878247197409822716563509371177525861338739889886852960233460604001400225978951197070430692283615250970331778184661)*x + (14528075363958063564383181975592552295398451425180670339523422906259651494438319488017591629214111873567984981916532962832774285075*i+1280577094943134138259051820315113798116787051682380844236043946114821412842041063755356874924725751165088287745098733224040395473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16468656704014755230714171938918145029018011496107488153349644593343342591961497092988896101576738531024836481796788156338689924761*i+21907797015195946878247197409822716563509371177525861338739889886852960233460604001400225978951197070430692283615250970331778184661)*x + (14528075363958063564383181975592552295398451425180670339523422906259651494438319488017591629214111873567984981916532962832774285075*i+1280577094943134138259051820315113798116787051682380844236043946114821412842041063755356874924725751165088287745098733224040395473) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11022094656545977211050910648295154859110010868103728328913985642182970579744870986850270403477977033016375688626060939210118150248*i+14603771273493362650211906802290057313547852949480585046573000719817989136274879698221690264567411647243812599052437265831867270060)*x + (6462759441403396922833817766215420065494236104936893447001910264174534713115857996372038040368595813112688582000621581492669199117*i+8872247315433554530692534639574773835995908010602924435041927312418652125789094303472170347328376608444447087100245658612581551047) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11022094656545977211050910648295154859110010868103728328913985642182970579744870986850270403477977033016375688626060939210118150248*i+14603771273493362650211906802290057313547852949480585046573000719817989136274879698221690264567411647243812599052437265831867270060)*x + (6462759441403396922833817766215420065494236104936893447001910264174534713115857996372038040368595813112688582000621581492669199117*i+8872247315433554530692534639574773835995908010602924435041927312418652125789094303472170347328376608444447087100245658612581551047) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14143242361477026579310591835486936056301381044763261646642191247992740551062902846427445216480399505579552220678775663334699829914*i+10154787851081849106229714592807002683505170194144965762272359784259235298602487613330602243555782024291550900703831903881096696188)*x + (20751406019501585285935499392807771262043869762135948761725091500215946232380516421126329215263479210557901608739216722842346219173*i+20764021592448992915282225462829463095707774755506442031726177659165468266124609684745464079356527359549261628617748724159502827503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14143242361477026579310591835486936056301381044763261646642191247992740551062902846427445216480399505579552220678775663334699829914*i+10154787851081849106229714592807002683505170194144965762272359784259235298602487613330602243555782024291550900703831903881096696188)*x + (20751406019501585285935499392807771262043869762135948761725091500215946232380516421126329215263479210557901608739216722842346219173*i+20764021592448992915282225462829463095707774755506442031726177659165468266124609684745464079356527359549261628617748724159502827503) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10227648996563255373014027216939394135924198071219071276749689631224172233330231786063592528164153845074760994856910683463480315564*i+15243858662811853675844615380071950545136970137779827333056209657669268460388319514208633968790759608492554276243099571460233596590)*x + (9070317275724750632891396521914494239046607848207082399926988769244214295494282603653054046940914839784659411829419146736658016573*i+720035760253714750600359518776927897784431634347029190888845206183515751571485539280941813784667904639973163840284521103194722164) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (10227648996563255373014027216939394135924198071219071276749689631224172233330231786063592528164153845074760994856910683463480315564*i+15243858662811853675844615380071950545136970137779827333056209657669268460388319514208633968790759608492554276243099571460233596590)*x + (9070317275724750632891396521914494239046607848207082399926988769244214295494282603653054046940914839784659411829419146736658016573*i+720035760253714750600359518776927897784431634347029190888845206183515751571485539280941813784667904639973163840284521103194722164) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5307634270358161348642493173692408030151621858261617291834316878767932883170076339766490655778232384712554798143782839495039636026*i+9610388321532680452699508831812512560372534305995759452557121473281068472348374404091360273164565662176827166944707308473574558291)*x + (22077139453335444343546028955351002921540192056737091577617798138732138513138342484600547072398780590595724346535607600718272539426*i+6373583087712006795969733990233041576786694289574865713568281621133844437665040342929068972203793922900792382148405199254362360176) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5307634270358161348642493173692408030151621858261617291834316878767932883170076339766490655778232384712554798143782839495039636026*i+9610388321532680452699508831812512560372534305995759452557121473281068472348374404091360273164565662176827166944707308473574558291)*x + (22077139453335444343546028955351002921540192056737091577617798138732138513138342484600547072398780590595724346535607600718272539426*i+6373583087712006795969733990233041576786694289574865713568281621133844437665040342929068972203793922900792382148405199254362360176) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23742165678486910902715913804409390601993814413263433683543705095226231902971959311772276076296197567403414036294635440683996714323*i+23133160250335677772269473207786682332108098029820173088358891386233857908713343993850201872357181723741834174685556700051686915357)*x + (1545496374706174509908760857022560688436094271513265993779760112876370230166804179765552317414400561215021795438024680882602125230*i+13322705632124124773646706869190833061393451286170098507689899751655323776207389802897224354057996479708481025523606902847267934794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23742165678486910902715913804409390601993814413263433683543705095226231902971959311772276076296197567403414036294635440683996714323*i+23133160250335677772269473207786682332108098029820173088358891386233857908713343993850201872357181723741834174685556700051686915357)*x + (1545496374706174509908760857022560688436094271513265993779760112876370230166804179765552317414400561215021795438024680882602125230*i+13322705632124124773646706869190833061393451286170098507689899751655323776207389802897224354057996479708481025523606902847267934794) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21343059500639866140285866613631157777867429490140326729883660279179673842031678253619434091222116741762755370529760361485880169127*i+2103995352629773109883223889635063121933797287675930700656038103943296774371608868614344757017206077841186509117983588212019333365)*x + (2961040594245732422913503083925666100700429754740170162200959738109369676710931572396770904729600051663129285950789467555912877712*i+1644013793192201710148867992514462627436471386412432804021836564379149281101369805066484690948689564348278576670567740018633280678) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21343059500639866140285866613631157777867429490140326729883660279179673842031678253619434091222116741762755370529760361485880169127*i+2103995352629773109883223889635063121933797287675930700656038103943296774371608868614344757017206077841186509117983588212019333365)*x + (2961040594245732422913503083925666100700429754740170162200959738109369676710931572396770904729600051663129285950789467555912877712*i+1644013793192201710148867992514462627436471386412432804021836564379149281101369805066484690948689564348278576670567740018633280678) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22316776018502804855832580221967558987412137285255484353255266285651737877723500189295527853579257157233155746970258040983763770362*i+22508149205329378129427930707645249412214922517413144793464554249467241960157584736672628894057916187748182548549387893731222546270)*x + (15180758007413559168647375358795116807588871934004074443734731298762256370714048543077749478819029412206156137223689350966269146270*i+22586926288626524934064459618789300353789828071262068681194168548387514670842699756887359154991468946049126202794557868032904478481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22316776018502804855832580221967558987412137285255484353255266285651737877723500189295527853579257157233155746970258040983763770362*i+22508149205329378129427930707645249412214922517413144793464554249467241960157584736672628894057916187748182548549387893731222546270)*x + (15180758007413559168647375358795116807588871934004074443734731298762256370714048543077749478819029412206156137223689350966269146270*i+22586926288626524934064459618789300353789828071262068681194168548387514670842699756887359154991468946049126202794557868032904478481) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5077125051513193147936228119238943404116584529563407889831132779246824254528483798984391366078824402790640840334991181899395732037*i+15553177821959128324680447311817002885920852069739906804252949957421220483786434012728980027337207456604700942920483886836158950367)*x + (10811970346969074985060508734727762332999318884999190894136762137961227235425154754761869498494926778882440134023748627109258952641*i+6798615897013842225200190135627876533923665583832358077120255803929792340884352369587125549190648885597025305141282511614775248774) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (5077125051513193147936228119238943404116584529563407889831132779246824254528483798984391366078824402790640840334991181899395732037*i+15553177821959128324680447311817002885920852069739906804252949957421220483786434012728980027337207456604700942920483886836158950367)*x + (10811970346969074985060508734727762332999318884999190894136762137961227235425154754761869498494926778882440134023748627109258952641*i+6798615897013842225200190135627876533923665583832358077120255803929792340884352369587125549190648885597025305141282511614775248774) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6123758765457763866534221936705311625340257579548286867007984029556799837498797610094514377146297827459872200402405347759080351510*i+23166320409876905381350379181028037618185408343732498255373280068791527571505696439976704165888977332806457793673251809494673327222)*x + (7578972533588726643301867946478756120252477082181327951966333265582797738688336432499269173962324694832855729566207079495168296469*i+1297540448298423589123651381935424220030607171794142787871087042994796323099167665844537290517107882347473134891527616310892635149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6123758765457763866534221936705311625340257579548286867007984029556799837498797610094514377146297827459872200402405347759080351510*i+23166320409876905381350379181028037618185408343732498255373280068791527571505696439976704165888977332806457793673251809494673327222)*x + (7578972533588726643301867946478756120252477082181327951966333265582797738688336432499269173962324694832855729566207079495168296469*i+1297540448298423589123651381935424220030607171794142787871087042994796323099167665844537290517107882347473134891527616310892635149) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16984879542656837984046046501334463720692040672554958579245133534361467674426318926330797002133276219582231201923340188026494274924*i+2246802621113218371162976961015729868995647874049169776000889348086020821031322270238690551161911755315518095953042854565668711041)*x + (5211497518117920379031964906637517614626362775644596160659726105376806271276516808056947894983811433804607199295754551763255734203*i+16525489060263612255336892425970030687500287634316051956677849628371967433850465631946409488899124461393484333100980118683682739593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16984879542656837984046046501334463720692040672554958579245133534361467674426318926330797002133276219582231201923340188026494274924*i+2246802621113218371162976961015729868995647874049169776000889348086020821031322270238690551161911755315518095953042854565668711041)*x + (5211497518117920379031964906637517614626362775644596160659726105376806271276516808056947894983811433804607199295754551763255734203*i+16525489060263612255336892425970030687500287634316051956677849628371967433850465631946409488899124461393484333100980118683682739593) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9829132168353113093332560781066698460472925184299592865070672982954699355422446068612070407766042652194305183578240555052660018064*i+14657645543457329001599242891568641074828359903506099104792941875839154327206091015577877280880877961028859700506477898882606636392)*x + (23087202878912278184401800024734723370923470100048329495109425314434546537302635521486748899963871880965065060621661480847660224316*i+20360913257000210521564823464095088950563804589539256197935531853565448026232475107546756649609239474643417261474450566646788789092) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (9829132168353113093332560781066698460472925184299592865070672982954699355422446068612070407766042652194305183578240555052660018064*i+14657645543457329001599242891568641074828359903506099104792941875839154327206091015577877280880877961028859700506477898882606636392)*x + (23087202878912278184401800024734723370923470100048329495109425314434546537302635521486748899963871880965065060621661480847660224316*i+20360913257000210521564823464095088950563804589539256197935531853565448026232475107546756649609239474643417261474450566646788789092) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23333480179320676217222991607868057424902357092868490220463855066782706182425495816173680099733946816443797896031097313338902530662*i+20076941566464704523291172142807340285960403914647993062079544884454831798027780059619406113578081548387319340359390312633015544048)*x + (15088132811865013320546505702950301187561963223733104918603725481547195956488806694985955803057212224604839794760171358573817263199*i+8395771670518449882607942990415711378633294043394293334182370398528070520554985723059012103342903069493519744204900627603013519764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23333480179320676217222991607868057424902357092868490220463855066782706182425495816173680099733946816443797896031097313338902530662*i+20076941566464704523291172142807340285960403914647993062079544884454831798027780059619406113578081548387319340359390312633015544048)*x + (15088132811865013320546505702950301187561963223733104918603725481547195956488806694985955803057212224604839794760171358573817263199*i+8395771670518449882607942990415711378633294043394293334182370398528070520554985723059012103342903069493519744204900627603013519764) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23723914165662460024237089583636636855065476046569092177675904640606907256607684883707941633651702775721888980699361401593217767211*i+13560483505236455037757796166954021965357737441768743563693971982423037044874603516279744140112044106759173266522578353319125099711)*x + (16088155902982736347449806394611563212939148382585079723129809162803527475863674609377101296913216540743130568699075293828430417603*i+19783510610801059362223537675570108585210683517750051218898259246618128430442071875749382621347018892970075121189409078016006835092) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23723914165662460024237089583636636855065476046569092177675904640606907256607684883707941633651702775721888980699361401593217767211*i+13560483505236455037757796166954021965357737441768743563693971982423037044874603516279744140112044106759173266522578353319125099711)*x + (16088155902982736347449806394611563212939148382585079723129809162803527475863674609377101296913216540743130568699075293828430417603*i+19783510610801059362223537675570108585210683517750051218898259246618128430442071875749382621347018892970075121189409078016006835092) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11864962607025908666233091579352800583812316342636196254186317146774445912814078289692353747197445601917731818698638007523297280856*i+16645572434151021064385980994810204930232561487927132854294464627240298970481454844960305379964992804088561437389836972645344292565)*x + (16410544671239014558047568795291641672743017086924239063883301430405466456886721592485024412124102265734927129792396993053925482811*i+3660048734053491787354943794679909852841747539196388928373725324831266381733034421863841415927741503580970251141476661329509409516) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11864962607025908666233091579352800583812316342636196254186317146774445912814078289692353747197445601917731818698638007523297280856*i+16645572434151021064385980994810204930232561487927132854294464627240298970481454844960305379964992804088561437389836972645344292565)*x + (16410544671239014558047568795291641672743017086924239063883301430405466456886721592485024412124102265734927129792396993053925482811*i+3660048734053491787354943794679909852841747539196388928373725324831266381733034421863841415927741503580970251141476661329509409516) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22499647205564479328057953318202816293657555379391089437014833935624269053241661148247765479584938739912176315477002094435694733361*i+14797052771446308164692020613373817871700674345474769048549004135774102822566166934000234081011824911738452783212182245967087976788)*x + (1193367217354885631854775817117085380496919375582548402768664089077447156214112418257057937895741431668764245169552009035874932090*i+5056708251132741029678786950163969782240237895590599227094497008854275220157082586487027618766202845563011755711992592904007117011) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22499647205564479328057953318202816293657555379391089437014833935624269053241661148247765479584938739912176315477002094435694733361*i+14797052771446308164692020613373817871700674345474769048549004135774102822566166934000234081011824911738452783212182245967087976788)*x + (1193367217354885631854775817117085380496919375582548402768664089077447156214112418257057937895741431668764245169552009035874932090*i+5056708251132741029678786950163969782240237895590599227094497008854275220157082586487027618766202845563011755711992592904007117011) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11647117315133310883734374344712987098119880541685821632326583128225573745670406311006892921017268725296840296847116382777168899764*i+5805008109383046539295296781398887154349262963415826711404926156043537601588513958329896639360635312764913387425522359195701058235)*x + (11171461559525846770094916462371157629273754778519799158646616584119793562201676614550429046053043408189971963062927578121738602735*i+6656335415434601494652828005494477708522158004177163371696358003425847113587556304464114733608995409457389632370018961918837594108) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (11647117315133310883734374344712987098119880541685821632326583128225573745670406311006892921017268725296840296847116382777168899764*i+5805008109383046539295296781398887154349262963415826711404926156043537601588513958329896639360635312764913387425522359195701058235)*x + (11171461559525846770094916462371157629273754778519799158646616584119793562201676614550429046053043408189971963062927578121738602735*i+6656335415434601494652828005494477708522158004177163371696358003425847113587556304464114733608995409457389632370018961918837594108) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14089548920530872475187174758640044385266163458506209458603143570566865071765372965429387821473033018922899940067037110531458925992*i+9878459785687718831356632798257293631250877051068154981340182974491301529585763414791394346992185265060424017304083339929484981108)*x + (8872750468633948845568559545754677846892242411614091653186976884915822172895808059402688452147478647882290550203915750652030641434*i+23321731660803128054014643326560881666300090688130911654858838064611383807024222942342896834451305742600284860720599216736799740564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (14089548920530872475187174758640044385266163458506209458603143570566865071765372965429387821473033018922899940067037110531458925992*i+9878459785687718831356632798257293631250877051068154981340182974491301529585763414791394346992185265060424017304083339929484981108)*x + (8872750468633948845568559545754677846892242411614091653186976884915822172895808059402688452147478647882290550203915750652030641434*i+23321731660803128054014643326560881666300090688130911654858838064611383807024222942342896834451305742600284860720599216736799740564) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (549612526281689450961531807494020921628898875366858827256256925569925307665929545799051979625316925032353064035598232017927699775*i+9524816564693309143872292712558224197642216704411020280836095288999578308451878065649025915390032603070559639267675150216624349779)*x + (12319722037109147477932244343817967935414945412525071362519018473882264872950694851727644749408060738403747090839232933391089320777*i+23362446630004436130532034441032869892450837265453540290085045967125168254749323457323095302642869347656855152806465879047403642157) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (549612526281689450961531807494020921628898875366858827256256925569925307665929545799051979625316925032353064035598232017927699775*i+9524816564693309143872292712558224197642216704411020280836095288999578308451878065649025915390032603070559639267675150216624349779)*x + (12319722037109147477932244343817967935414945412525071362519018473882264872950694851727644749408060738403747090839232933391089320777*i+23362446630004436130532034441032869892450837265453540290085045967125168254749323457323095302642869347656855152806465879047403642157) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22415738211249391022137590199261769058983070855281888868340364228524123958887639192049989198331574439358203138845122175308676719337*i+6323321085035280903075080643918901674353952203836448088835358176138974110336689605866573493379101149316752402905014902277664181877)*x + (13648941788058123219587490334007918050139461766143751288297614353447739787599380990695935098281456139623157980465967386488614921097*i+11539777437045266050227546423658284782145878301142278548702784244906044130048265440683341911207912473813330003868411153569949078843) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (22415738211249391022137590199261769058983070855281888868340364228524123958887639192049989198331574439358203138845122175308676719337*i+6323321085035280903075080643918901674353952203836448088835358176138974110336689605866573493379101149316752402905014902277664181877)*x + (13648941788058123219587490334007918050139461766143751288297614353447739787599380990695935098281456139623157980465967386488614921097*i+11539777437045266050227546423658284782145878301142278548702784244906044130048265440683341911207912473813330003868411153569949078843) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6512168998115624614227589362072103494123029462507291902062213807365929443546021817070122026709824180312644902675182520406686413591*i+7348326126708386172002048807264598733708349446282664862019364698283442567644504419888391235938458783861105671939073454979786710530)*x + (6616990330377730284975219212569694274003677228285111171947195657478566315843821292293930187743479292541028881317734388025900652220*i+8649999878552707853342118309675405748961895198414820045654798858299938266419515765269975871509172984280816821745760749899186970038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (6512168998115624614227589362072103494123029462507291902062213807365929443546021817070122026709824180312644902675182520406686413591*i+7348326126708386172002048807264598733708349446282664862019364698283442567644504419888391235938458783861105671939073454979786710530)*x + (6616990330377730284975219212569694274003677228285111171947195657478566315843821292293930187743479292541028881317734388025900652220*i+8649999878552707853342118309675405748961895198414820045654798858299938266419515765269975871509172984280816821745760749899186970038) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18195911656091597858549425792101684668320253293672668632574793737729733223956689947136469090751959484283487994502099347169434630809*i+19243355168601318012239376574331633471035087140371332372907089980043491395687874196164280740870615273028183373146677080175422956622)*x + (2018601548043408907563979134994450128385650694050998943232982417015163652102046699413199154873769674670811781801262754323390730781*i+14746201738526165645751137066898063856938318649176983015250414826558684762379216299978235698810624458192135368304753376690105861584) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (18195911656091597858549425792101684668320253293672668632574793737729733223956689947136469090751959484283487994502099347169434630809*i+19243355168601318012239376574331633471035087140371332372907089980043491395687874196164280740870615273028183373146677080175422956622)*x + (2018601548043408907563979134994450128385650694050998943232982417015163652102046699413199154873769674670811781801262754323390730781*i+14746201738526165645751137066898063856938318649176983015250414826558684762379216299978235698810624458192135368304753376690105861584) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (25471548951378055159545107681527510935906491716565720383018055470621571938485389519410666089658661406759445976401250968283410201*i+22596295056340970544187273625943061481936966072429012097509108886442812998657373535667389117892281888456126136343705278537349285158)*x + (10267389042961597792515771270258635256141607449700330117072468226396566404144543969418024420217367706425483461545894590189096150581*i+17885443046377197466181655524174142178131721489539273835865047840391822666893878961651848655555062583381679016773423795121038846600) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (25471548951378055159545107681527510935906491716565720383018055470621571938485389519410666089658661406759445976401250968283410201*i+22596295056340970544187273625943061481936966072429012097509108886442812998657373535667389117892281888456126136343705278537349285158)*x + (10267389042961597792515771270258635256141607449700330117072468226396566404144543969418024420217367706425483461545894590189096150581*i+17885443046377197466181655524174142178131721489539273835865047840391822666893878961651848655555062583381679016773423795121038846600) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4709755907373251675316647766142745182596611323648600672329285152287264320387937844477608167618355213106723764093665029088114248191*i+12053071594965838845751176987242489902024099447179882060558168250614769269201826141489559474083277638743812613378007178741409892844)*x + (9358865663634948868414980417917511677672733058485692738521739251207910685913915487287167672113466439048142606596724356347622165594*i+16006672873750841447003170585349343829128017145718748392225189708791836497039408014753498171510576781067965538766335292912124096387) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (4709755907373251675316647766142745182596611323648600672329285152287264320387937844477608167618355213106723764093665029088114248191*i+12053071594965838845751176987242489902024099447179882060558168250614769269201826141489559474083277638743812613378007178741409892844)*x + (9358865663634948868414980417917511677672733058485692738521739251207910685913915487287167672113466439048142606596724356347622165594*i+16006672873750841447003170585349343829128017145718748392225189708791836497039408014753498171510576781067965538766335292912124096387) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21142826252228781723218100591876684341948335244456467491809389942040718641630325436805232736203539795513234301735839842089278121153*i+8368481904671450679154036027380546545284444409500988448881226586833051906747120861594442706791413386285001457865287476342526693856)*x + (5785924886232524165195567269094127976069863563245553903589319921669620825604432291081406435234264524190170188817685425515498143820*i+24396844056420105424650463141557799501923076097882129532284049842009552284048735000229432010363049204590021916237115964053223594058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21142826252228781723218100591876684341948335244456467491809389942040718641630325436805232736203539795513234301735839842089278121153*i+8368481904671450679154036027380546545284444409500988448881226586833051906747120861594442706791413386285001457865287476342526693856)*x + (5785924886232524165195567269094127976069863563245553903589319921669620825604432291081406435234264524190170188817685425515498143820*i+24396844056420105424650463141557799501923076097882129532284049842009552284048735000229432010363049204590021916237115964053223594058) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21756046879010972886884361371210068852499007788974510048287753936347103553276845187443819403985946773275177899290318662808289688222*i+5072358588900005197405865138520482457374484016543653272216181928123202959627037341092196327945759210842840661944512950360076495443)*x + (15202568719584211874986611067144030700322023214553848397435263169322826357692547421323116593451749357598884965428193293326093810239*i+16958272142602678467151728259738022148543059265293680352743220905817658923068005096740008230615610479886557548967807224308772014191) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (21756046879010972886884361371210068852499007788974510048287753936347103553276845187443819403985946773275177899290318662808289688222*i+5072358588900005197405865138520482457374484016543653272216181928123202959627037341092196327945759210842840661944512950360076495443)*x + (15202568719584211874986611067144030700322023214553848397435263169322826357692547421323116593451749357598884965428193293326093810239*i+16958272142602678467151728259738022148543059265293680352743220905817658923068005096740008230615610479886557548967807224308772014191) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1671770890588742110419552501336165584003316935877255549478755656933298292426122912421818566675614375950872181464764479194663360570*i+16028195004470673067823412410811260228350053116766445691656778183570564935559321184283305674241156704173554494360479655902025519165)*x + (10904388537211355105227697876160533644965340708809639058251064350671612868032075764793421508860196420396601408723853484132474656581*i+5812490133013000268479478674885387542387205823650065371183580098676143093192987961989364461598913891383457163019437843885818283963) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (1671770890588742110419552501336165584003316935877255549478755656933298292426122912421818566675614375950872181464764479194663360570*i+16028195004470673067823412410811260228350053116766445691656778183570564935559321184283305674241156704173554494360479655902025519165)*x + (10904388537211355105227697876160533644965340708809639058251064350671612868032075764793421508860196420396601408723853484132474656581*i+5812490133013000268479478674885387542387205823650065371183580098676143093192987961989364461598913891383457163019437843885818283963) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16664542442445855636520273778403051163216533943862477245224149065261786449885252250685855038799761634774429842315179000787211224177*i+19171974693012470300349614984236530647912636067182855277350343282281081554970827879479919556585420533316323613755739766681846674182)*x + (22086749475339873930863411330115793138381694556716200717191683931624229000664177866607355929624321702623980882846199726069990440596*i+6532838641890784086204830388056894684912136354831401047397146924497693013822489299061996036434598873177551716836407023796044524574) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
        then
          Isogeny of degree 2 from Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (16664542442445855636520273778403051163216533943862477245224149065261786449885252250685855038799761634774429842315179000787211224177*i+19171974693012470300349614984236530647912636067182855277350343282281081554970827879479919556585420533316323613755739766681846674182)*x + (22086749475339873930863411330115793138381694556716200717191683931624229000664177866607355929624321702623980882846199726069990440596*i+6532838641890784086204830388056894684912136354831401047397146924497693013822489299061996036434598873177551716836407023796044524574) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2 to Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23279455284886459932918093099882617174253034092809318803361456759398642729859239955929144465610281557324346564111259705423632598137*i+15191447935284338563817347269045381814503227467376437655410082946473655361781449148974443493643619440732506658395536331148452067493)*x + (14310432734309755754279642878737265396392440267209895454009290116150191403331846273764148093210096404434099042856505637792779928426*i+10044233605886266975600124215073076210560275044956906594895104966754767753339746350050123244266545950735834509971193610463787996805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2
In [186]:
E12 = Phi12.codomain(), E21 = Phi21.codomain()
E12, E12.j_invariant(), E21, E21.j_invariant(), E21.j_invariant() == E12.j_invariant()
  File "<ipython-input-186-9afbf7b2631f>", line 1
    E12 = Phi12.codomain(), E21 = Phi21.codomain()
         ^
SyntaxError: can't assign to function call
In [187]:
E12 = Phi12.codomain()
E12, E12.j_invariant()
Out[187]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23279455284886459932918093099882617174253034092809318803361456759398642729859239955929144465610281557324346564111259705423632598137*i+15191447935284338563817347269045381814503227467376437655410082946473655361781449148974443493643619440732506658395536331148452067493)*x + (14310432734309755754279642878737265396392440267209895454009290116150191403331846273764148093210096404434099042856505637792779928426*i+10044233605886266975600124215073076210560275044956906594895104966754767753339746350050123244266545950735834509971193610463787996805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 3980308228017906778128343578289336606126023440037680010273658891399125763085885214013588152861257012854866449420747410107990230927*i + 3418552211422308180400126549953616844726009454781696084849420008891864642156288148051274918340685007255791643894268165596374462896)
In [188]:
E21 = Phi21.codomain()
E21, E21.j_invariant()
Out[188]:
(Elliptic Curve defined by y^2 = x^3 + 6*x^2 + (23279455284886459932918093099882617174253034092809318803361456759398642729859239955929144465610281557324346564111259705423632598137*i+15191447935284338563817347269045381814503227467376437655410082946473655361781449148974443493643619440732506658395536331148452067493)*x + (14310432734309755754279642878737265396392440267209895454009290116150191403331846273764148093210096404434099042856505637792779928426*i+10044233605886266975600124215073076210560275044956906594895104966754767753339746350050123244266545950735834509971193610463787996805) over Finite Field in i of size 24439423661345221551909145011457493619085780243761596511325807336205221239331976725970216671828618445898719026692884939342314733567^2,
 3980308228017906778128343578289336606126023440037680010273658891399125763085885214013588152861257012854866449420747410107990230927*i + 3418552211422308180400126549953616844726009454781696084849420008891864642156288148051274918340685007255791643894268165596374462896)
In [189]:
E21.j_invariant() == E12.j_invariant()
Out[189]:
True
In [ ]: